decay data in the calculation of decay-energy spectra
TRANSCRIPT
LA-7483-MSInformal Report
(!3●ClC-l 4 REPORT COLLECTION
REPRODUCTIONCOPY
The Application of a Library of
Processed ENDF/B-lV Fission-Product Aggregate
Decay Data in the Calculation of
Decay-Energy Spectra
.-
15>
.-C#)
Z>.-
L%%LOSALAMOS SCIENTIFIC LABORATORYPost Office Box 1663 Los Alamos. New Mexico 87545
AIIAff~mativeAction/EquslOpportunityEmployes
Thisworkwassupportedby theUS DepartmentofEnergy,DivisionofReactorResearchandTechnology.
This rrv.rt was prcswcd as an .ccount 01 work smmsorcdby the Un,ted States GOVCrI)!llC”l. Ne,lh,, the U“,ted SUtcs“or the Umtrd SI.trs Drp. rlmrnt of Enerm’. nor .nY of Ih.lr●mployees. mn ●ny of thmr contr.. t.rs. s. bcontr.ctorx ortheir .mplov. es. makes ..Y wamantv. cxvrcss or tmphrd. orassume. any legal habdtty or responsobd$ty for the accuracy.completeness. ?. usefulness of an. reform. tlon. .IWMr.t.*.product. or Prxess dmclo$ed. or repccwnti that Ifs usc wculdm.t lnfrmse mtvatelv owned twhts.
UN ITEO STATESDEPARTMENT OF ENERGY
CONTRACT W-740 S-ENG. 36
LA-7483-MSInformal Report
UC-34Cissued: September 1978
The Application of a Library of
Processed ENDF/B4V Fission=Product Aggregate
Decay Data in the Calculation of
Decay-Energy Spectra
R. J. LaBauveT. R. EnglandD. C. George
M. G. Stamatelatos*
‘Science “Applications,Inc.,P.O.Box 2351, La Jolla,CA 92037.-
THE APPLICATION OF A LIBRARY OF PROCESSED ENDF/B-IVFISSION-PRODUCT AGGREGATE DECAY DATA IN THE CALCULATION
OF DECAY-ENERGY SPECTRA
by
R. J. LaBauve, T. R. England, D. c. George, and M. Go stamatelato~
ABSTRACT
Results from summation calculations by the CINDER-10code and ENDF/B-IV decay, cross-section, and yield data
for fission pulses have been incorporated into an ENDF/B-type format. The organization and content of this basicfine-group source-term library is described. In addition,two codes are described that provide pulse functions asfits to a user-specified multigrouping of the fine-grouplibrary. These can be readily used, essentially as Green’sfunctions, to produce the spectra following any specific
reactor power history. A particular set of fitted betaand gamma spectra having wide utility is described. Ab-sorption effects are incorporated.
I. INTRODUCTION
The ENDF/B-IV fission-product files contain neutron cross sections, decay
constants, decay energies, and other decay data for 824 important fission prod-
ucts . They also contain fission yields for these fission products produced by
one or more fission-neutron energies (14 MeV, fast, and thermal fission) of232Th 233U 235
six important nuclides:u 238U 239PU and 241
9 9 s > 9 Pu . Also, spec-
tral data (i.e., beta end-point energies and intensities, gamma-line energies
and intensities) exist for the most important decay-heat contributors among
the 824 nuclides. In ENDF/B-IV, beta-spectral data exist for 163 fission prod-
ucts, and gamma-spectral data exist for 172 nuclides (nuclides emitting both
beta and gamma radiation are included separately in both types of radiation
counts). The contents of the ENDF/B-IV fission-product file are detailed in
Refs. 1-3 and summarized in Table I.
1
In recent years, great emphasis has been placed on obtaining experimental
and computational information on delayed energy release at short cooling times
for nuclear reactor safety studies of the hypothetical loss-of-coolant-accident
(LOCA). There is, however, also interest in long cooling times. A computer4,5
code system has been developed at the Los Alamos Scientific Laboratory (LASL)
that uses the ENDF/B-IV fission-product data to calculate cumulative delayed
beta and gamma spectra on arbitrary energy grids for arbitrary irradiation his-
tories and cooling times. This code system is shown in Fig. 1.
It can be noted in the figure that the basic ENDF/B-IV fission-product data
library is accessed along three paths. The center path, after the preparation
of an input library, proceeds via the CINDER-10 code. CINDER-10 is the latest
and most versatile version of CINDER, a well-known fission-product and depletion
code. The most recent documentation on CINDER is Ref. 4 (for Version 7), but
the additional features of Version 10 are discussed in Ref. 6. CINDER-10 calcu-
lates fission-product and actinide concentrations, activities, gaseous contents,
energy releases, effective group absorption cross sections, etc. for any fis-
sionable nuclide mixture irradiated in arbitrary neutron fluxes for arbitrary
intervals of time followed by arbitrary cooling times. The neutron cross sec-
tions7’8 used in CINDER-10 are generated by spectrum collapse of multigroup data9
generated with the NJOY code. This input path to CINDER-10 is the lower path
shown in the figure. Spectrum collapse is achieved with the TOAFEW8code.
The ENDF/B-IV data is also accessed by the FPDCYS code along the upper pro-
cessing path shown in Fig. 1. This code is used to generate multigroup beta and
gamma spectra for individual nuclides for which spectral data exist on the
ENDF/B-IV file. FPDCYS incorporates four options for calculating beta spectra
and two options for calculating gamma spectra. The differences among the four
beta-spectrum options are mainly in the ways in which the Fermi function F(Z,W)
is represented and calculated. The first of the two gamma-spectrum options
consists of incorporating the unbroadened lines weighted by their intensities
into an arbitrary number of energy groups. Alternatively, gamma lines are
broadened according to detector resolutions before multigrouping in the second
option.
The output of FPDCYS and the output of CINDER-10 are input to the FPSPEC
code. Actually, only a small portion of the CINDER-10 output is utilized,
namely, fission-product activities and total decay energies at the instant of
time when corresponding spectra are sought. FPSPEC combines the individual
2
TABLE I
SUMMARY OF ENDF/B-IV FISSION-PRODUCT DATA FILE CONTENT
824 Nuclides (total)181 Have differential cross sections180 Have individual ~ and y “lines” (spectral data
consisting of energies and intensities)712 Are unstable and each has an average ~, y, and a
energy and branching fraction10 Yield sets for 6 fissionable nuclides (%10 000 yields)
(%310 000 Data entries required in ENDF/B-IV)
— —.
—. \ \()1.54 cm ——_ ..__
{/4—.-
LFPOCYS
I:SCCY
I!__7KEY
m
0
LIBRARIFX
3~=:a*f=.&-@c(E)
23
[1ST:OADNJOY
&+6 ~NORMAL
~&!~}Nc- ;—ACGRffiATE kNU&IIUMC#TA~ : -—
1+3FITPuIs
4
0;Iu-rur:
FUNCTIONS.
(AN55’!!)STD )
:EEEEI
I
Fig. 1.LASL nuclide processing codes and libraries,
3
spectra from FPDCYS and the nuclide activities from CINDER-10 to generate aggre-
gate fission-product spectra for each irradiation and shutdown time. Note that
CINDER-10 also incorporates a spectral subroutine capable of utilizing the mul-
tigroup data produced by the FPDCYS code. Plots of sample output from FPSPEC
are shown in Figs. 2-5. In these illustrations, the calculated spectra are com-
pared with the LASL experiment cited in Ref. 10.
As indicated above, spectral data are not available for all 824 fission
products in ENDF/B-IV, and missing spectra must be approximately constructed.
This is done for a particular nuclide by assuming that the shape of the beta
(or gamma) spectrum for the nuclide is approximated by the spectrum shape of the
aggregate 181 nuclides from a pulse after a cooling time approximately equal to
the half-life of the nuclide in question. This shape is then normalized to the
average beta- (gamma-) decay energy of the nuclide. Figures 6 and 7, respectively,139
compare the gamma spectra of Cs with those constructed for a hypothetical nu-
clide having the same half-life and average gamma- and beta-decay energies as139CS
The nuclide139
. Cs is a relatively important nuclide in the 0.1-s cooling
time bin for 20 000-h thermal irradiation of235
U. However, it should be noted
that such constructed individual .spect~a are used only in the aggregate.
The libraries used in the CINDER-10 and auxiliary codes FPDCYS and FPSPEC
are extensive and the codes are designed to use the libraries for any specified
irradiation history. However, for many users the scope of application is un-
necessary and aggregate results, rather than the detailed nuclide-by-nuclide
output, are needed. The purpose of this report and the associated codes described
is to eliminate the need for extensive summation code calculations for a wide
range of problems. The summation codes and libraries have been used to produce
multigroup beta and gamma spectra vs time following fission pulses, including
the components of
of applications.
We have used
gregate libraries
which can be used
we have
the spectra due to halogens and noble gases for a wide range
the summation codes and libraries to produce secondary ag-
and pulse functions shown as “additional output” in Fig. 1>
directly or incorporated into neutronics codes. In particular,
● Used the summation codes to produce beta- and gamma-temporal spectra in150 groups following fission pulses for each fuel and fission neutronenergy in ENDF/B-IV and stored the results in formats similar to ENDF/B.
These files delineate the noble gas and halogen spectra. Users canreadily collapse the results to other tnultigroup spectra.
4
MeV
Fig. 2.
Gamma spectrum 5.56-h irradiationof 235
U, 70-s cooling.
MeV
Fig. 4.Gamma spectrum, 5.56-h irradiationof 235
U, 388-s cooling.
MeV
Fig. 3.
Gamma spectrum, 5.56-h irradiation
of 235U 199-s cooling$ .
MeV
??ig. 5Gamma spectrum, 5.56-h irradiationof 235
U, 660-s cooling.
5
1 : ..... lPCS Camma Spwtrum— COnslruckt Spectrum I
I!l!L1so
Energy (MeV)
139 Fig. 6.Cs gamma spectrum compared with
constructed spectrum.
Ener~ (MeV)
139Fig, 7.
Cs beta spectrum compared withconstructed spectrum,
D
● Collapsing and exponential fitting and folding codes are also described,
the latter being useful for generation of spectra following finite powerhistories.
● For immediate use, exponential fits to a particular few-group spectra are
provided in this report.
Because the spectra are based on fission pulses, the libraries have a gen-
eral utility. The exponential fits, for example, can be folded into any power
(fission) history that can be described analytically or by a histogram repre-
sentation. The effects of neutron absorption are also described and approxi-
mately accounted for in the methodology.
II. LIBRARY FOR PROCESSED ENDF/B AGGREGATE FISSION PRODUCT SPECTRA
Of particular interest is the application of the LASL code system to pro-
duce delayed beta- and gamma-spectral data on a fine energy grid (150 groups in
O.OS MeV steps from O to 7.5 MeV) for irradiation of the ENDF/B-IV fissionable-4
nuclides with very short pulses (typically 10 –s irradiation time; shorter
pulses do not alter the calculated spectra) of thermal, fast, and 14-MeV neu-
trons. The results can then be further processed into broad groups and fit with
6
n
z
-Aitfunctions of the type fc(t) = aie , as described in Sees. III and IV.
i=l
The fine-group results from the LJ4SLcode system are assembled into a single
library in an ENDF-like format.11
Definitions for the format for this processed
~NDF/B fission–product and energy-yield data (PEFPYD) library are as follows,— —
MAT : Mat-No. of target nucleus,
MF: File No., used to identifydefined as follows:
MF=80 - fission induced by
MF=81 - fission induced by
MF=82 - fission induced by
Fission nuclide and energygiven in Table II.
same as in ENDF/B.
energy type of incident neutron,
thermal neutrons
fast neutrons
high–energy (14-MeV) neutrons.
combinations available in ENDF/B-IV are
MT: Section number used to describe data contents of the section. MT num-bers are
MI’=801 -
MT=802 -
MT=803 -
MT=811 -
MT=812 -
MT=813 -
MT=821 -
MT=822 -
MT=823 -
MT=831 -
MT=832 -
MT=833 -
as follows:
delayed energy/fission for @- + y summed over all fissionproducts
delayed energy/fission for @- summed over all fission products
delayed energy/fission for Y summed over all fission products
delayed energy/fission for (3-+ Y summed over all gaseousfission products (halogens plus noble gases)
delayed energy/fission for f3-summed over all gaseous fissionproducts
delayed energy/fission for y summed over all gaseous fissionproducts
delayed energy/fission for y + ~- summed over the noble gasfission products
delayed energy/fission for @- summed over noble gas fissionproducts
delayed energy/fission for y summed over noble gas fissionproducts
delayed energy/fission for (3-+ y summed over halogenfission products
delayed energy/fission for $- summed over halogen fissionproducts
delayed energy/fission for y summed over halogen fissionproducts
Other MT-numbers can be defined as needed; for example, MT-numberscould be assigned to any of the above spectra summed over energy.
TABLE II
FISSION YIELD DATA IN ENDF/B-IV
Incident Neutron Energy TypeHigh Energy
Nuclide Thermal Fast (14 MeV)
232Th -- Yes No
233UYes No No
235UYes Yes Yes
238U -- Yes Yes
239PUYes Yes No
241PUYes No No
The data are given in a TAB2 record with tables of spectra (decay energy/
fission vs energy) given for a number of cooling times. Standard ENDF/B inter-
polation schemes between cooling times (TAB2 interpolation) are not recommended
and, in any case, would be of interest only for fission pulses. However, when
the pulse data are placed on a broad-group mesh and fitted with parameters as
described in Sees. 111 and IV, calculations for ~ irradiation-cooling time
combinations are possible, precluding the need for interpolation on the fine
grid. Histogram interpolation is assigned for TAB1 interpolations.
File 1 (MF=l) information is also included, giving some processing infor-
mation and a “dictionary” of the data to follow. The structure of MF=l is as
described in ENDF-102.11
The structure of a section containing the processed
data is
[MAT,MF,MT/ZA,AWR,O,O,O,O] HEAD
[MAT,MF,MT/O.O,O.O,O,O,l,NTS/TSint] TAB2
[MAT,MF,MT/O.O,TS1,O,O,l,NP/E’ ~nt/DE(E’,TS1)] TAB1
[MAT,MF,MT/0.0,TS2,0,0,1,NP/E’ ~nt/DE(E’,TS2)] TAB1
--- --- --— --- --— --- --- --- -
---- ---- ---- ---- ---- ---- -
[MAT,~,MT/O.O,TDNFS,O,O,l,NP/E’ ~nt/DE(E’,TSNTS)] TAB1
[MAT,MF,MT/O.O,O.O,O,O,O,O] SEND
where
8
TS = cooling time step in seconds
DE = decay energy in MeV/fission (MeV/s)/(fiss/s)
E’ = energy of particle ((3-)[photon (y)] in MeV
NTS = number of cooling time steps given for a particular MT
NP = number of DE,E’ pairs given in a particular TABI record.
Other quantities are defined in ENDF-102. Note that interpolation along cooling-
time steps (the TAB2 records) is always set to zero, meaning that interpolation
is not recommended, and that interpolation is always set to one (histogram) for
the TAB1 records. A sample PEFPYD listing is given in Appendix A.
III. REDUCING AND FITTING THE PEFPYD DATA -- THE FITPULS CODE
In general, the data in the I?EFPYD library are too detailed along the energy
axis and not detailed enough along the cooling-time axis for application to de-
sign problems. The FITPULS code is designed to access the PEFPYD library, col-
lapse the 150 energy-group spectra into few groups (up to 25), and fit the re-
sulting spectra along the cooling-time axis with a linear combination of func-
tions of the type
n
fc(t) =x
a.e_xit1 (MeV/fiss/s) .
i=1
Note that there are two sets of parameters in Eq. (l), namely, the set of a andi
the set of Ai. FITPULS contains options allowing either a least-squares single-
parameter fit, that is, a ff.tof the a’s, given a set of ~’s, or a nonlinear
least-squares two-parameter fit (a simultaneous fit of both the a’s and 1’s).
The first option is described in detail in Ref. 12, and the second uses the non-
linear least-squares STEPIT routine described in Ref. 13.
In both fitting routines, comparisons between calculated and original val-
ues are made for every data point. This, however, is not sufficient to guaran-
tee a good fit,because the function may oscillate wildly between data points. A
subroutine called FINECHK detects such oscillations by calculating the function
on a fine grid and printing out values differing more than 10% from those cal-
(1)
culated using a
this difference
negative values
simple semilog interpolation between points on either side. If
exceeds 100%, the point is additionally flagged by FINECHK; if
occur, the user is warned that a fit has not been achieved.
9
The percentage differences flagged are arbitrary and may be changed by the user.
Also , it is suggested that the user insert a plotting option at this point in
the code so that oscillations in the fit can be inspected visually. The LASL
CDC-7600 version of FITPULS contains the LASL plotting routines that compare
the fine-mesh points calculated in FINECHK with the original data. The FINECHK
routine will also flag those calculated points where slopes are ascending, thus
giving additional indications of possible problems with the functional fit.
Normally, the two–parameter nonlinear fitting routine STEPIT will run to
convergence at minimum chi–square, but an option is in FITPULS to stop the cal-
culation when an input maximum allowed percent deviation (DIFLIM) of the calcu-
lated values from all original values has been achieved. For efficiency of code
operation, it is suggested that the user set DIFLIM high in early passes and
tighten up as desired convergence is approached.
Although.,in principal.a two-parameter fit can be made from scratch, given
a reasonable set of parameters for a particular coarse group structure, a great
saving in total problem running time can be attained by first running single-
parameter fits. The code contains several options for selecting initial A’s,
removing duplicate A’s, making adjustments for resulting negative coefficients
with large values, etc. In fae-t, this and other fitting codes can only be run
effectively uith a rather Large mount of user interaction, as indicated by the
discussion in Sec. IV.
The FITPULS code also has an option for obtaining fitted pulse parameters
from data given for finite-irradiation times (IRAD=l option). This option is
particularly useful for reducing data from a number of different experiments
with different irradiation times to pulses for comparison purposes.
The technique of running FITPULS in the normal mode, for example, IRAD=O,
is provided in the example problem sequence below. A listing of the FITpULS
code is given in Appendix B and input specifications are listed in Table III.
Iv. FITPULS INPUT AND SAMPLE PROBLEM: A USEFUL FITTED SPECTRUM
The input specifications for the FITPULS code are shown in Table III. As
a sample problem, consider a mulfigroup collapse of the PEFPYD data for the-4
gamma spectra of fission products produced by a pulse (10 -s irradiation time)233
of thermal neutrons on U, (MAT1=1260, MF1=80, and MT1=803). Some of the
PEFPYD data used in this example are shown in Appendix
structure used for this problem is shown in Table IV.
10
A. The broad-group
Note that there are
TABLE III
FITPULS INPUT SPECIFICATIONS
Card No. Format Variable Comment
(Input for Subroutine CORSBIN)
1 6111 MAT1 MAT-No of desired fissioning nuclide.
MF1 MF desired (incident energy type).
MT1 MT desired (particle/photon data type).
2 6111 NE
3 6E11.4 EB(I)
(Input for Program FITPULS)
1 1216 NPUN
8A1O
1216
IRAD
NCORS
TITL(I)
IPROB
NTOTER
NPUN
No. of desired broad groups + 1.
Energy bounds in MeV, including lowerand upper bounds. Read low to highenergy.
Set NPUN = 7 here if rebinned datacards wanted; otherwise set to zero.
Set IRAD = O for regular pulse fit,set IRAD = 1 to reduce finite irradi-ation data to pulse.
Set NCORS = O to call subroutineCORSBIN. Set NCORS = 1 for no call,i.e., if input data is not to be re-binned, which is usually the casefor fitting experimental data (IRAD= 1).
80 character title, if TITLE(1) =SELECT subroutine SELECT is calledand this input goes here (see SELECTinput) . If TITLE(1) = DO NOT GO,program stops.
Problem No. Make negative if fitis to be made in segments. See con-ditional input below.
Option to read data from cards.Used for experimental data.See subroutine RUNTOTS.
Flag for punched output. Set equalto 7 if punched output is desired,equal to 20 if punched output notdesired. In general, punched outputis needed for subsequent runs.
11
TABLE III (cent)
Card No. Format Variable
3 (cont.) NSTEP
NFINL
6E12.5
1216
DIFLIM
RUNTIM
TMIN
GXMIN
KKN(I)
--- --- ___ --- --- --- _
FITPULS Conditional Input
--
Comment
Flag to call subroutine DHFIT, whichcalls the routine STEPIT, which per-forms a two-parameter fit. Routineusually not called until a couple ofpasses are made to get a coarse ad-justment of the parameters with a sin-gle fit. Set equal to zero if call toDHFIT is not desired, otherwise set to1. Also note below option for call-ing DHFIT by group.
Flag for option to read all parametersfor all groups from previous problem.Used when striving for final conver-gence. Set equal to 1 to activate,otherwise set equal to zero. See con-ditional input below.
Maximum per cent deviation allowed inSTEPIT. Set high on initial passes andtighten up as desired convergence isapproached.
Running time. Make fraction of secondless than time limit set on controlcard to get punched cards for subse-quent run.
:Minimum cooling time desired. If setto zero, code will choose minimum cool-ing time available on data file.
Maximum cooling time desired. If setto zero, code will choose maximum cool-ing time available on data file.
Minimum allowed value of decay energy.Set so fit is limited to about 15decades.
Flags for calling STEPIT routine (two-parameter fit) by group. If call fora particular group, say Group IG, isdesired, set KKN(IG) = IG. If call isnot desired, set KKN(IG) = zero.
--- -—- --- --- --- --- -
If NFINL = 1, cards ouput from previous problems are read here. These cards arethe a’s and A’s for ali groups,-and they-are in an ENDF-like format. If NFINL =1, no futher input is needed. Note, however, that a’s and A’s for particular
12
TABLE III (cent)
Card NO. Format Variable Comment
groups can be entered in subroutine PULSFIT, distinct from this option in thatthey need not be entered for every group, thus permitting a mixture of options.
IPROB set negative allows the data for the groups to be fitted in several seg-ments.
KKN is set negative for a particular group if a call to subroutine TRMSEE is de–sired. (See code listing in Appendix-B.)
5 1216 NSEG
NS (I)
(Input for subroutine PULSFIT)
1 1216 LWT
NOK
KTRM
IPRT
--- --- --- --- --— --- ---
NOK, KTRM specifications, NOK = O, KTRM =
2 3(11X,E11.4) ALAMDA(K)
Number of segments + 1
Breakpoints of segments
Weight function desired in single pa-rameter fit.
If LWT = O, Weight function = 1
If LWT = 1, Weight function = l/FX
If LWT = 2, Weight function = l/FX2
If LWT = 3, Weight function = l/FX1.5
Flag for parameter selection
Flag for parameter selection.
NOK, KTRM combination determines theoption by which the initial X’s forthe group are selected. See below.
Flag for print option. Set equal to1 for complete print, otherwise setto zero.
--- --- --- --- --- --- -
number of A’s to be read in,
Read in (ALAMDA(K),K = 1, KTRM)
(Note from format that if cards fromprevious run are used, coefficientswill not be read.)
NOK = 1, KTRM = 1, ~’s calculated at every pair of cooling time-decay energypoints. (No input is necessary, and card No. 2 does not exist.)
TABLE III (cent)
Card No. Format Variable Comment
NOK = 1, KTRM = number of ~’s to be calculated by code.
2 1216 KCAL (L) Selects points between which A’s are tobe calculated. First point is alwaysselected by code. Read KCAL(L), L = 2,
KTRM
NOK = 2, KTRM = 1, cards in ENDF-like format from previous problem for this groupare read in here, and the subroutine returns immediately to main program. No fur-ther input is needed for this group. This option is used after a single-parameterfit has been made in a previous pass, and two-parameter fitting is now being donein STEPIT for this group. This is similar to the NFINL = 1 option in the mainprogram, except that the two-parameter fits are allowed on a group-by-group basis.
3 1216 IWANT
KCAL(L)
(Input for subroutine SELECT)
1 1216 ITS ,ITP
(Input for subroutine TRMSEE)
1 1216 MLT
2 16 L
E12.5 ALF(K,L)
E12.5 ALAM(K,L)
3 1216 LT
LTM(L)
Select A’s wanted by position number.If all are to be retained, as in afirst pass, set equal to zero.
Position numbers of A’s to be kept.Do not enter if IWANT = O.
Number of time steps desired, indexesof desired time steps. SELECT used ifone wishes to fit a subset of a partic-ular data file, and this input followsthe title code.
Number of parameters to be changed
Time step number of parameters to bechanged
New value of a
New value of ~
Number of terms to be removed
Term numbers of terms removed
14
TABLE IV
GROUP STRUCTURE USED FOR SAMPLE PROBLEM
Group No.
12345
6789
10
11
Lower EnergyBoundary (MeV)
0.100.400.901.351.80
2.202.603.004.005.00
6.00
Upper EnergyBoundary (MeV)
0.400,901.351.802.20
2.603.004.005.006.00
7.00
NOTE : There are essentially no data on PEFPYSfor E > 7.0 MeV
15
negligible gammas above 7 MeV, the upper bound of the last firoup. Also note
that in collapsing to the broad-group structure, the code changes the units of
the fission-product decay energy from MeV/fission to MeV/fission-s, the standard
units in use for pulse functions.
For the first pass, we make only a single-parameter fit12 and allow the code
to calculate initial A’s from semilog slopes between pairs of cooling-time and
gamma-energy (MeV/fission-s) points. This is done by setting the input as
follows:
Input to Program FITPULS
Card 1 NPUN = 20IRAD = ONCORS = O
Input to Subroutine CORSBIN
Card 1 MAT1 = 1260M_Fl= 80MT1 = 803
Card 2 NE=12
Card 3 (group bounds from Table IV)
Input to Program FITPULS (cont.)
Card 2 IPROB = 1NTOTER = ONPUN=7NSTEP = ONFINL = O
Card 3 DIFLIM = 1.0 (not used in this run)RUNTIM = 29.9 (not needed in this run)TMIN = 0.1TMAX = 1.0E+9GxMAx = 1.OE-21
Card 4 KKN (K) = group numbers, although not used in this run as NSTEP = O
Input to subroutine PULSFIT
Card 1 LWT=lNOK = 1KTRM = 1IPRT = O
Card 2 IWANT = O
Repeat cards 1 and 2 for each energy group.
16
and
and
are
Examination of the results of pass No. 1 reveal that (a) groups 1, 2, 3,
10 appear converged and plots are smooth; (b) although groups 4, 5, 6, 7,
9 appear converged, plots show rather large reversals in shape; and (c) fits
not achieved by groups 8 and 11, as negative computed values occur between
fitted points. This run took 30 s on the CDC-7600 computer.
For the second pass, we keep the same input as pass No. 1, excepc we
set LWT = 3 for groups 4, 5, 6, 7, 8, and 9. As a result, all groups are appar-
ently fitted to within 1% except group 9, but plots are not smooth for groups
4, 5, 6, 7, 8, and 9 as illustrated in Fig. 8 for group 4. Note the apparent re-
verse of slope near a cooling time of 100 s, not indicated by the input data
points. Examination of the parameters for these indicates that there is a large
negative value of a in the sixth pair of parameters for each group. These pairs
of parameters are eliminated in the third pass. The running time for pass No. 2
was 25 s.
The input for pass No. 3 is the same as that for the second pass, except
for groups 4, 5, and 6 in subroutine PULSFIT. This is now as follows.
Card 1 LWT = 3NOK = 1KTRM = 1IPRT = O
Card 2 IWANT = 20
KCAL (J) = 1,2,3,4,5,7,8,9,10,11,12,13 ,14,15,16,17,18,19,20,21(note parameter number 6 is omitted)
The results of the third pass indicate that plots for groups 4, 5, 6, 7, and
9 are now smooth, as illustrated in Fig. 9 for group 4. The running time for pass
No. 3 was 31 s.
Smooth fits for groups 7, 8, and 9 were not obtained in the first three
runs, as shown in Fig. 10 for group 8. An additional run (run No. 4) was made
for these three groups in which the input was the same as that used in run No. 2
except that the option for selecting the points for the fit was used. This op-
tion is activated by setting the first characters of the title card to the word
“SELECT.” The input was set to remove the points at cooling-time steps of 0.5,
5, and 50 s. This effectively smoothed the fits for groups 7, 8, and 9, as
shown in Fig. 11 for group 8.
The FITPULS input for pass lJo. 5 is the same as for the previous passes
except NSTEP and NFINL are now both set to 1, and the card output from passes
No. 3 and 4 are added after card No. 3. No
suits of this run were that all groups were
running time. The fits extend to >30 yr of
additional input is needed. The re-
fitted to within 1% after 104 s of
cooling time. These aqe shown graph-
ically in Figs. 12-22, and a comparison of the parameters for group 4 from the
first run with those from the last run are given in Table V.
Note that these fits are not unique, and also that good fits can be ob-
tained by using smaller numbers of parameters. The subroutine TRMSEE can be
used to assist the user in reducing the number of parameters. It is called for
a particular group by making KKN the negative of the group number.
Parameters for selected incident energy-fissioning nuclide combinations
are given in Appendix C. The accuracy of these fits vary from about 2 to 5%,
and although closer fits could be obtained, the extra effort hardly seems worth-
while for ENDF/B-IV data. An indication of the accuracy of the ENDF/B-IV
fission-product decay and yield data can be obtained by comparison with another14
evaluated set, as is done in Figs. 23-26 , where the spectra are normalized to
the same total values. More important validations are the comparisons with ex-15
periment. The fits gjven in Appendix C are certainly as accurate as warranted
by the ENDF/B-IV data.
v. APPLICATION OF FITTED PULSE TO CALCULATION OF
EXTENDEII IRRADIATION
The fitted pulse can be folded with a reactor
DECAY-ENERGY SPECTRA AFTER
power history so that decay
spectra from irradiated fuel can be calculated as a function of cooling time.
Consider a reactor operated at variable power P(t’), O < t’ <T, for a time in-
terval T followed by a shutdown period t . In the following equations, givens
for a particular energy group,
t=
P(t’) =
K=
T =
t=s
H(t,T) =
L
time since fission pulse
power in watts at time t’
0.32042 X 1010
w-s/fission
total time at power
shutdown time of interest, measured from T, and
decay-energy release at time (T+ts) for some energy bin (MeV/s).
fc =x
ak<~kt , MeV/fiss-s,
k=l
(2)
18
o7’0 ~
410-1 101 103 105 107 109
Cooling Time (s)
Fig. 8.Fit for group 4 after second passthrough FITPULS.
Cooling Time (s)
Fig. 10.Fit for group 8 after second passthrough FITPULS.
04
‘c -.:?
\
Cooling Time (s)
Fig. 9.Fit for group 4 after final passthrough FITPULS.
Cooling Time (s)Fig. 11.
Fit for group 8 after final passthrough FITPULS.
19
\\
\
‘\“\
‘\\,‘.\
\
-- a
‘$’-hT’w-~10-1 10’ io3 105 m’ log
Cooling Time (s)
Fig. 12.Final fit for group 1.
Cooling Time (s)
Fig. 14.Final fit for group 3.
1’
1
-a-.= I—‘\
‘\
\
\
‘,,bA107 1
Cooling Time (s)
3°
Fig. 13.Final fit fcr group 2.
N
Cooling Time (s)
Fig, 15.Final fit for group 4.
20
y L0
Cooling Time (s)
Fig. 16.Final fit for group 5.
Cooling Time (s)
Fig. 18.Final fit for group 7.
~ ~~19 10-’ 10’ 103 103 107 10’
Q
Final
Cooling Time (s)
Fj.g, 17.fit for group 6.
Cooling Time (s)
Fig. 19.Final fit for group 8.
21
a7’ ~~
10-’ 10’ 103 105 m’ 1Cooling
Fig .
Time (s)
20.Final fit for group 9.
\
“~~v~,,,,,,q -,,,,5 ,-
10-’ 101 103 105Cooling Time (s)
Fig. 21.Final fit for group 10.
\1=1
Cooling Time (s)
Fig. 22,Final fit for group 11.
22
●
o
.......
%.t %,
; ... . . . ...%
c ...-\ -/ ....>U -..
. ...E -...
. . .
~%,.
x %..
2 %0...
>? ...
— TOBIAS.\
t% ..O------- [NDF/B-IV ..
T03-0.0
r I , ,1.0 2-0 3.0 50 6.0 7.0 6
ENERG; ‘(f’lEv)
Fig. 23.
D
ENDF/B-IV beta-spectra comparison with UK Data File, all
fission products, betas (cooling time 0.1 s).
-]LIM i — TOBIAS-------ENDF/B-IV
-1
:--10 t I
- 0.0,
1,0 2.0 S*O 4.0 5.0 6-0 3
ENERGY (MEV)
Fig. 24.ENDF/B-IV gamma-spectra comparisons with UK Data File,
o
all fission products, gammas (cooling time 0.1 s) .
23
‘o 1-0.0
, r ,1,0 2.0 3.0 4.0 90 too o
F.tlERGY(MEV)
Fig. 25,
ENDF/B-IY beta-spectra comparison with UKall fission products, betas (cooling time
Data File,1000 S).
?o
1
?-1- 0.0
1’.1
— TfJ~IAs------- ENDF/B-IV
ENERGY (MEV)
Fig. 26.
ENDF/B-IV gamma-spectra comparison with UK Data File,all fission products, gammas (cooling time 1000 s),
24
TABLE V
COMPARISON OF GROUP 4 PARAMETERS AFTER FIRST PASSWITH GROUP 4 PAIL4METERS AFTER LAST PASS
Group 4 Parameters Group 4 ParametersAfter First Pass After Last Pass
a
3.912 X 10-2
-1.119 x 10-1
1.408 X 10-1
-1.006 X 10-1
6.292 X 10-2
-1.505 x 10-2
6.710 X 10-3
4.864 X 10-4
5.344 x 10-5
4.883 X 10-5
2.318 X 10-6
7.550 x 10-6
6.540 X 10-7
-1.522 X 10-8
1.141 x 10-7
5.353 x 10-7
-5.628 X 10-7
-6.003 X 10-12
6.433 X 10-12
-1.140 x 10-13
2.535 X 10-16
1.152
5.760 X 10-1
3.301 x 10-1
1.329 X 10-1
6.460 X 10-2
2.611 X 10-2
1.383 X 10-2
5.507 x 10-3
1.287 X 10-3
3.279 X 10-4
1.804 X 10-4
6.440 X 10-5
3.068 X 10-5
1.722 X 10-6
5.725 X 10-7
1.656 X 10-2
-2.081 X 10-2
2.335 X 10-2
-9.164 X 10-3
9.333 x 10-3
2.427 X 10-3
5.633 X 10-4
5.195 x 10-5
4.965 X 10-5
1.624 X 10-6
7.552 X 10-6
6.660 x 10-7
-1.297 X 10-8
8.819 X 10-9
6.395 X 10-7
1.596 X 10-7
6.215 X 10-7
-8.615 X 10
1.127 X 10-7
7.535 x 1;;
2.710 X 10-3
5.539 x 10-12
1.903 x 10-8
4.687 X 10-13
4.419 x 10-10
2.295 X 10-16
1.297
6.712 X 10-1
3.606 X 10-1
1.415 x 10-1
6.486 X 10-2
1.366 X 10-2
5.521 X 10-3
1.283 X 10-3
3.271 X 10-4
1.568 X 10-4
6.466 X 10-5
3.037 x 10-5
2.343 X 10-6
5.688 X 10-6
6.395 X 10-7
6.216 X 10-7
1.617 X 10-7
2.705 X 10-8
2.437 X 10-8
3.424 X 10-lo
25
H(t~,T) is given by
\
T
l{(t~,T)=P(t’)— fc(T+ts-t’)dt’
K@eV/s)
o
(3)
or
H(t~,T) =[w&e-Ak(T+ts-t’)dt, ‘Mev/s) c ‘4)
Assume, for example, that the power history can be approximated by J histograms
with a power of P. at irradiation time T .J j
Then,
‘(ts9T)=~!~ak ~JAk(T+t:t’)dT ‘“eV/s) (5)j =1 k=l JT
j-1
or
H(ts,T) =~~~}~e-Ak(T+ts-Tj)-e-’k(T+ts-Tj-l~ (MeV/s). (~)
j=l k=l k
The above expressions, which are developed more generally in Appendix D,
do not include the effects of neutron absorption by the fission products that
become important for high flux levels and long cooling times (Figs. 27-29).
There are two effects of absorption; namely, the flux level can reduce the den-
sity of directly yielded products in the fission pulse, significant for those
nuclides having large cross sections and large yields; and nuclide coupling in
stable and long-lived nuclides tends to build up the concentration of more un-
stable nuclides.
Positive effects are to be expected from shielded nuclides such as134CS
9136C~
9 148’’’Pm,148Pm, and 154Eu and, indeed, an examination of the CINDER-10
output of the problems illustrated in Figs. 27-29 reveals that the very large
26
::
:;::
o
-12
Time (s)
Fig. 27.Per cent deviation of decay heatingdue to neutron absorption (235u ir-radiation for 20 000 h, no depletion
($ = 1013).
:;::::::::::::
z
1---‘;::
a) 100uL ,Total ;
L
,’~:
E.’
...
t?~------ , la ;,.
–loo
Time (s)
Fig. 28Per cent deviation of decay heatingdue to neutron absorption (235u ir-radiation for 20 000 h, no depletion($ = 1014).
70
60- ●
/;.;.,
c 50- ::0 ::::.“.4 ::.? 40-
::::::
8::!:
30- ;
z8 20-
&2 lo- ;
.“
o-
-10
Time (s)Fig. 29.
Per cent deviation of decay heating dueto neutron absorption (239Pu irradi tionfor 20 000 h, no depletion ($ = 3101 ).
27
effect at cooling times near 108 s is due to neutron absorption in the stable133
nuclide Cs, which produces the shielded nuclfde134CS
‘fherefore, it is“ 133 134CS
readily calculated by use of the simple two-nuclide chain Cs(n,y) .
Other reactions can be handled in a similar manner, and a list of the more im-
portant fission products contributing to absorption effects are given in Table
Yi . General equations are developed in Appendix D for approximating the effects
of absorption with two-nuclide chains.
These equations for the computation of fission-product decay-energy spectra
were incorporated into a code CALENDA (calculated decay energy spectra with ab-— — — —
sorption), which is useful for applying the fits to PEFPYD library data to ob-
tain decay spectra after shutdown for reactor fuel irradiated for extended times
at variable power. The present version of the code is limited to (a) a histo-
gram representation of the power history, (b) expression of the neutron flux and
cross-section data in two energy groups (fast and thermal), and (c) inclusion of
the absorption effects of only those two-nuclide chains shown in Table VI flagged
with an *.
In order to test the CALENDA code and, indeed, the practicability of apply-
ing the pulse fits to finite irradiation problems, calculations were made for a
20 000-h irradiation of235
u fuel with thermal neutrons at constant fluxes of
104 n/cm2/s (that is,14 2
negligible absorption) and 10 n/cm /s. Fission product
decay beta and gamma spectra were obtained in the n-group structure for both
cases, and these were compared with results obtained directly with the CINDER-10
code,
The parameters for the beta pulse fits used in the CALENDA calculation are
those given in Appendix C. The fits for the beta spectra were to within 1% of
the CINDER-10 pulse data for all groups except group 11, which was within 1.5%.
The beta-spectra comparisons with CINDER-10 results for several groups,as well
as the sum over all groups,are shown in Table VII for the 20 000-h irradiation4 2
at a constant flux of 10 n/cm /s (no absorption) case. Note in Table VII that,
in general, agreement is remarkably good, even for cooling times less than 0.1 s,
the minimum time for which the pulse was fit. Also note, however, the relatively
large deviation for group 10 at 100 s. This is due to the fact that the PEFPYD
data for the pulse is only given at two points in each cooling-time decade, and
thus is insufficient for a more accurate description of the spectra.
To obtain parameters for the gamma fits for the235
U thermal pulse, CINDER-10
data given at six points per decade are used as input to FITPULS. Although the
28
TABLE VI
FISSION PRODUCTS IMPORTANT IN DETERMINATION OFNEUTRON ABSORPTION EFFECTS ON DECAY POWERa
NUCLIDE PRECURSOR(s) COMMENTS
*90Y *89y *90sr
100TC 99T:
lo4Rh 103RU
lo5Rh 105RU
116In
1151n
130I
J34c~
*135xe
136ca
*140La
142pr
*144pr
147Nd
148pm
*1481?nl149pm
*150Pm
151Sul
*153sm
154Eu
156EU
1291 130m1
*133C;
*1351
135xe 135c~
*140B;*139~~
141pr
*144ce,*143pr
146Nd
147 147pmNd,*
147 147Nd,* pm
147Nd 147pm 148pm 148~m
147Nd’147pm’148pm’148, ~m, *14gpm
150 ‘ ‘Sm
*152sm
153Eu
155EU
Degree of importance (small) de-pends on uncertain branching frac-tions. Can be ignored based onENDF/B-IV data.
Very important at all shutdowntimes.
Major negative effect
(n,y) branching from147pm
0.53.
(n,y) branching from147pm
0.47.
29
aOnly the listed precursors must be considered in determination of theneutron absorption effect, but cross sections must be included forall nuclides.*Nuclides included in two-nuclide chains in CALENDA code as of June 1978.
TABLE VII
BETA ENERGY RELEASED FROP1FISSION-PRODUC’~ DECAY AFTER20 000 h THERMAL IRRADIATION OF 235U
(% difference between CTNDER-10 and approximate method calculations)
Flux = 104nicm2-s
Coo15.ng Group 2 Group 4 Group 6 GSOUp 8 Group 1.0 Total‘lV.me(s)0.4--0.9I.!cv 1.35-1.8>leV 2.2-2.6NeV 3.0-4.0rev 5.0-6.0;!eV ,\llGr~ups
1.0!$-041.OJ+O11.OK+OOI..OEKI11.OE-I-021.oE-l-031.0E4.041.OE-I-051.OE+-061.0)?+071.0K+081.OE-I-09
1.21.21.2S,41.92.11,92.22.92.7
- 6.9- 0.7
1.21.11.11.11.71.71.81.50.00.0
- 2.10.4
1.81.61.51.50.80.90.61.60.10.10.50.5
1.71.51.51.32.53.60.8
- 0.3- 0.3
0.01.13.5
2.82.52.43.5
11.54.11.20.50.63.1------
1.4
1.31.2
1.21.61.71.31.51.10.2
- 4.1- 0.1
fits could not be made as accurate as for the beta spectra fitted at two points
per decade as shown in Table VIII, the comparison with CINDER-10 for the 20 000-h4 2
irradiation at @ = 10 n/cm /s case is much better, as can be seen in Table IX.
In general, the deviation is less than that for the pulse fit for a particular
cooling time.
Comparison results for the case with a flux of 1014 2
n/cm /s, a case for
which the effects of neutron absorption are very significant, are shown in Table
X for the beta spectra and Table XI for the gamma spectra. As noted previously,
only the “two-chain” reactions flagged with an * in Table VI were included in
the CALENDA calculation. Note, however, from the total sum over the energy
groups that most of the important absorption effects have been included for both
the beta and gamma totals.
Some rather marked deviations of the approximate spectra from the CINDER-10
calculations can be seen for the individual beta and gamma spectra. For example,
group 10 at 107 s, may indicate an inconsistency in the way missing spectra were
constructed, but note that these large percentage differences are due to differ-
ences between very small numbers that contribute little to the total. Also note
significant differences in some of the other groups for several cooling times,
indicating a need for including additional two-nuclide chains.
It is interesting to compare spectral absorption effects graphically, that
is, as a per cent deviation from the case without absorption, as was done in
30
TABLE VIII
MAXIMUM PER CENT GAMMAS DIFFERENCE
Pulse 20 000-h Irr (104 flux)
GroupNo.
12345
6789
1011
Maximum% Dev
3.83.88.8
13.52.1
4.312.66.0
-2.1-2.44.7
CoolingTime
4.0+73.0+74.0+72.0+51.0+9
2. 0+71.5+51.5+51.0+74.0+52.0+2
Maximum% Dev
-2.02.0
-1.83.1
-3.5
2.43.52.23.61.33.2
CoolingTime
1.0+71.0+71.0+75.0+51.0+7
5.0+75.0+51.0+71.0+71.0+35.0+2
TABLE IX
GAMMA ENERGY RELEASED FROM FISSION PRODUC20 000-h THERMAL IRRADIATION OF
$3~:CAY AFTER
(% difference between CINDER-10 and approximate method calculations)
Flux = 104n/cn2-s
CoolingTime(s)
1.OE-041. OE-011. OJZ+OO1.OEW)l1. OE-1-021.0E+031. 0E+041. 0K+051. 0E+061. 0E+071.0E+081. 0E+09
Group 2
0.4-0.9 HeV
- 0.1- 0.1- 0.2- 0.3- 0.3- 0.2
0.00.40.62.0
- 0.6- 0.3
Group 4 Group 6 Group 8
1.35-1.8 bfeV 2.2-2.6 >leV 3.0-4.0 l!eV
0.10.1.0.10.20.20.40.91.72.3
- 1.3- 0.4
1.7
0.20.20.20.20.30.50.8
- 0.5- 1.9
1.11.40.6
0.40.40.40.50.70.91.40.3
- 0.82.2
- 0.40.5
Group 10
5.0-6.0 >!ev
0.30.30.40.60.91.3
- 0.60.4
- 0.71.1------
0.10.10.10.10.10.10.20.50.91.8
- 0.6- 0.3
TABLE X
BETA ENERGY RELEASED FROM FISSION PRODUCT DECAY AFTER20 000 h THERMAL IRRADIATION OF 235U
(% difference between CINDER-10 and approximate method calculations)
Flux = 1014n/cm2-s
Cooling Group 2 Group 4 Group 6 Group 8 Group 10 Total
U!Xi@ 0.4-0.9 }lCV 1.35-1.8 FfeV 2.2-2.6 MeV 3.0-4.0 XeV 5.0-6.0 MeV All ~rcu~s
1.OE-041.OE-011.OE+OO1.OE+O11.OE+021.0E+031.0E+041.0E+051.oE+061.0E+071.OE+081.0E+09
4.54.54.54.74.5
5.36.57.65.13.3
- 5.10.2
3.83.73.73.72.93.04.47.55.10.7
- 1.40.7
3.23.02.93.01.21.41.63.70.90.60.80.7
2.92.72.82.72.84.31.14.9
- 0.10.10.85.6
3.43.03.14.7
13.14.71.54.80.7
318.3------
TABLE XI
GAMMA ENERGY RELEASED FROM FISSION PRODUCT DECAY AFTER20 000 h THERMAL IRRADIATION OF 235U
(% difference between CINDER-10 and approximate method calculations)
Flux = 1014n/cm2-s
Cooling
~
1.OE-041.OE-011.OE+OO1. OE+O11. 0E+021. 0E+031,0K+041.0E+051.0E+061.0E+071. 0E+081.0E+09
Group 2
0.4-0.9 MeV
0.60.60.70.81.01.3L.51.22.11.0
- 0.62.0
Group 4
1. 35-1.8 NeV
0.60.60.70.81.01.42. 53.63.0
- 2.3- 2.817.1
Group 6 Group 8
2.2-2.6 WV 3.0-4.0 I+eV
0.40.40.50.50.61.02.15.54.0
13.3- 7.2
0.4
0.50.50.50.60.71.01.74.72.5
10.0- 8.7
0.1
Group 10
5.0-6.0 MeV
0.40.40.50.60.93.4
56.460.184.1
1161.4------
3.43.33.33.43.03.74.76.33.70.9
- 2.60.1
-rot&l
All ~YOUDS
0.90.91.01.11.52.13.13.76.11.0
- 0.82.0
32
Figs. 27-29. The comparisons for groups 1 and 2 of the beta spectra are shown
in Figs. 30 and 31; and groups 1, 2, 4, 5, of the gamma spectra are shown in
Figs. 32-35, respectively. Figure 36 shows the comparison for the total beta
release summed over all groups, and, finally, Fig. 37 gives the same for the
gammas. In all figures, the solid curve is the approximate CALENDA calculation
and the open circles are from CINDER-10. The large peaks at about 108s cooling
time occurring in beta groups 1 and 2 and in gamma group 2 are due to the133
Cs (n,y)134
Cs reaction. The very large peaks in gamma groups 3 and 4 are also
due to this reaction, but the large percentage differences seen are again due to
differences in small numbers, as practically all of the gamma energy is con-
tained in group 2. This is evident from Fig. 37, which shows that the sum over
all the groups in this cooling-time domain is about the same as for group 2.135
Figure 32 for group 1 gammas shows the negative effects of the Xe.
A large deviation of about 400% near a cooling time of 106 s is seen in group
5 (Fig. 35) for the CINDER-10 calculation that is not accounted for in the approx-
imate method. The precursor of the missing reaction would probably have a half-
life of about 1.5 x 106 s, and the product nuclide would emit relatively strong
gammas in the energy region from 1.8 to 2.2 MeV. As indicated by the other
figures, additional reactions could be included to increase the accuracy of the
approximate method.
VI. suMMARY
The results of the pulse calculations (10-4
s irradiation time) from the
CINDER-10 code have been collected and organized into a library of aggregate
fission-product release-energy spectra on a fine multigroup energy mesh. These
data are given for cooling times from 10-4 13
to 10 s at two steps per time decade.
This library of processed ~NDF/B-IV~ission ~roduct ~ield and~ecay data (PEFPYD)
contains spectral data for all ten yield sets given in ENDF/B-IV and is organ-
ized in an ENDF-like format. The library can be obtained from the National
Nuclear Data Center (NNDC) at Brookhaven National Library (BNL).
A method has been developed for using the PEFPYD data in approximate cal-
culations of fission-product decay-energy spectra resulting from nuclear fuels
irradiated for a finite time. The pulse data is first collapsed to a coarse-
group structure and the decay-energy vs cooling-time data points of the resulting
broad groups are fit with a sum of exponential. This is done with the FITPULS
code, which contains a nonlinear least-squares routine for making the fits.
33
8; o 1
?/i
of)-
00d ,.
1
Perfor
I
~
3’ 103 105 107 10°Coolinc Time (s)
Fig. 30.
cent deviation due to absorptiongroup 1 betas.
Cooling Time (s)
Fig. 32.Per cent deviation due to absorptionfor group 1 gammas.
34
o
00 II
i~
10’ 103 log 107 1
I
)“Cooling Time (s)
Fig. 31.
Per cent deviation due to absorptionfor group 2 betas.
)
t’
Perfor
Coding Time (s)
Fig. 33.cent deviation due to absorptiongroup 2 gammas.
210’ 103 10’ 107 1~
Cooling Time (s)
Fig. 34.Per cent deviation due to absorptionfor group 4 gammas.
— A roximate Methodf?o C DER
~I
103 105 107 10’Cooling Time (s)
Fig. 36.Per cent deviation due to absorption,total betas.
o
0
0
Cooling Time (s)
Fig. 35.Per cent deviation due to absorptionfor group 5 gammas.
l—10
A roximateN’C DER
Method
H4w+w7&A%%L10’ 103 105 10’ 1
Cooling Time
Fig. 37.Per cent deviation due tototal gammas.
(s)
absorption,
35
It is also worth noticing that FITPULS has the option of reducing data for a
finite irradiation time to a pulse. This option, which is not discussed in this
report, is useful for comparing different experiments run with different irradi-
ation times.
Finally, broad-group spectra for finite irradiation times can be generated
by simply folding the irradiation time into the analytic fits for the pulse
spectra. This is done using the CALENDA code, which also has an option for in-
cluding the effects of neutron absorption by approximating the more important
reactions with two-nuclide chains. Given the fits for the pulse groups, the
CALENDA calculation is very rapid, and thus the method provides an inexpensive
way of calculating fission-product decay-energy spectra for a variety of prob-
lems. Such a set of useful pulse fits are provided in this report.
ACKNOWLEDGMENTS
The authors are exceedingly grateful to J. C. Lewellen of the Division of
Reactor Research and Technology of the United States Department of Energy for
suggesting the need for the library of aggregate fission product spectral data
described in this report; to F. Schmittroth and R. Schenter of Hanford Engineer-
ing Development Laboratory for suggesting the fitting techniques used in this
worlc; and to D. Graham Foster, Jr., of Los Alamos Scientific Laboratory for im-
proving the FPSPEC code.
REFERENCES
1.
2.
3.
4.
Fission-Product Decay Library of the Evaluated Data File, Version IV(ENDF/B-IV). [Available from and maintained by the National Nuclear DataCenter (NNDC) at the Brookhaven National Laboratory; these data were com-piled by a two-year task force chaired by R. E. Schenter.,]
T. R. England and R. E. Schenter, “ENDF/B-IV Fission-Product Files: Sum-mary of Major Nuclide Data,” Los Alamos Scientific Laboratory reportLA-6116-MS (ENDF-223) (October 1975).
C. W. Reich, R. G. Helmer, and M. H. Putnam, “Radioactive-Nuclide DecayData for ENDF/B,” Aerojet Nuclear Company report ANCR=1157 (ENDF-120)(August 1974).
T. R. England, R. Wilczynski, and N. L. Whittemore, “CINDER-7: An InterimReport for Users,” Los Alamos Scientific Laboratory report LA-5885-MS(April 1975).
36
5.
6.
7.
8.
9.
10.
11.
12.
13.
14.
15.
M. G. Stamatelatos and T. R. England, “FPDCYS and FPSI’EC, Computer Programsfor Calculating Fission-Product Beta and Gamma Multigroup Spectra fromENDF/B IV Data,” Los Alamos Scientific Laboratory report LA-NUREG-6818-MS(May 1977).
T. R. England, M. G. Stamatelatos, and N. L. Whittemore in “Applied NuclearData Research and Development,” Los Alamos Scientific Laboratory reportLA-6472-PR (1976) p. 60, and “Applied Nuclear Data Research and Development,”Los Alamos Scientific Laboratory report LA-6266-PR (1976), p. 13.
W. B. Wilson, T. R. England, M. G. Stamatelatos, and R. J. LaBauve, “ENDF/B-IV Fission Product Cross Sections: Absorption Buildup in Thermal Reactors,”
Trans. Am. Nucl. Sot. ~, 592 (June 1977).
W. B. Wilson, T. R. England, and R. J. LaBauve, “Multigroup and Few-GroupCross Sections for ENDF/B-IV Fission Products; The TOAFEW Collapsing Codeand Data File of 154-Group Fission-Product Cross Sections,” Los AlamosScientific Laboratory report LA-7174-MS (March 1978).
R. E. MacFarlane and R. M. Boicourt, “NJOY: A Neutron and Photon CrossSection Processing System,” Trans. Am. Nucl. Sot. ~, 720 (November 1975).
E. Jurney, Los Alamos Scientific Laboratory, personal communication (1977).
D. Garber, C. Dunford , and S. Pearlstein, Eds. , “ENDF-102 Data Formats andProcedures for the Evaluated Nuclear Data File, ENDF,” Brookhaven NationalLaboratory report BNL-NCS-50496 (ENDF 102) (General Reactor Technology TID-4500) (October 1975).
R. J. LaBauve, T. R. England, M. G. Stamatelatos, and D. C. George, “Approx-imations to Summation Calculations of Delayed Energy and Spectra from FissionProducts,” Los Alamos Scientific Laboratory report LA-6684–MS (January 1977).
J. H. Burrill, Jr., “360-STEPIT, A User’s Manual,” Ohio University ResearchInstitute report TNP-1966-2 (May 1966).
M. Tobias, Central Electricity Generating Board, Berkeley Nuclear Labora-
tories> personal communication (1977).
T. R. England and M. G. Stamatelatos, “Comparisons of Calculated and Experi-mental Delayed Fission–Product Beta and Gamma Spectra from 235U ThermalFission,” Los Alamos Scientific Laboratory report LA-NuREG-6896-Ms (July 1977).
37
SAMPLE PEPPYD-LIB LISTING
U-233 (MA! ldbO) THERMAL 85fl-o -o9,2233E*04 d::104E*0z o 9
u o0
0U1260 1~~1
o 00
U1260 14510 1~1260 1451
92 U 233 ;AbL PROCESSED MARCH 78$ R.Jx LA&JvEJ D.C. %oRGE
THLRMAL BURST1?60 14511260 1451
U-2331269 1451
FISSIUIN PRODUCT oEcAY SPECTRA PROCESSED FROM ENUF/fl-IV 1260 1451IN 150 ENLRIJY GRoJPS 1?60 1431
12;0 1451
1 451
80 flu]1260 1451
1% 12611 1451
80 80? lZOR80
1?60 14518U3 1029 1260 1451
80 bl] 86680
1260 1451812 85R l?611 14bl
80 813 750 1?69 145180 He?] 793 1260 1451
fIo 82? 725 1260 1451
80 843 705 1260 14>1
8U 8.31 t31(, lzf,ll 14’J]
80 83? 817 1260 1451au 833 711 1260 1451
1?60 ~ O1260 0 0
9.2z33’i’04 2*~lo4E*02 o 0 0 Ul?6(J130fJuI
0. u: o 0 241?60f108ul24 (1 o c1 : u1260Ruf3111
o- 0? o () 1 15i1760au8ul151 1 0 L1 o u]76nnor3ul
f:~::~;: O J“~2841- y 5*0(7000- 2 3*22~30- H l“OnOOO- I 1*59743- 61z6rInOflUl1 i?.t9132- 7 2.()()()0()- 1 2“olJc!77- 7 ?*snoclo- 1 5~249uo- ?126nno13ul
3.(Joout)- 1 1“49303- 7 30’5fio00- 1 =t*19j94- 7 4cOnOo9- 1 /..572/3- ~126f)RUuUl
4’50130u- 1 1“79141- 6 fj.ooOoo- 1 3“13&50- 6 5°%rIUOO- 1 ~02fb9!J/- tIl?6G3i;Gu~6ooooOu- 1 10dt?391- 6 6.fjoooo- 1 2.~4~62- 7 7.0nUoo- I 5.019b7- (l?60ROaUl
7“5000u- i *“u2cj7u- 7 8.00000- ] fl”84blu- 6 R“!jnOOO- I 3C8MY2- ;lxl)qufiulY.oooou- 1 +*~3775- 7 9.=IOOOO- 1 7.17d63- 7 I.ofjooo+ o 4.4?81b- /l~611Q(J8U]
1.05001J+ o 5*~5547- 7 1.10000+” o~OI?OOOU. U 1.*b699- 6 1.25000+ O w::: $ ::$:;:: ; ;:$;;:: ‘l?~n~o~ulb126Ua08Ul
1.3=JoUU* U 0.24308- 7 1.4f1000+ O 1.372~Q- A 1.4%000* O 7.(>~~b6- 71?60n08u1
1.500UU” ti tl*f+03(,l- “1 1.55000+ O 7°5bJ2~- 7 lo6nOOO+ O 6G60b~?- /1?6nQu8ul1065nUU6 U 6!IbootJ- 7 ].70001J+ 1) 7*oYtJ80- 7 1.7=000’ o R*131~.?- (1?60RURU1
1*6(JOIJU” Q b:Mlfy7f+- 7 1.R5000+ O 7“6/>07- 7 l*9nUcn+ o 7.07U$7- /],76nq08ull,950UU+ U ti~t?~27t3- “1 I?oonooo+ U 7.69+55- 7 P.05U(IO+ o 7e3u83/- !12fIllR08Ul
2.1OOUU+ o /.91960- 7 2.15fIo0. o 7.33980- 7 2.70000+ o 7.74519- f121irIRo8u1
2.Z50UU’ u /:Y9570- 7 2.qnooo* 0 Rolb/3?- 7 2..3s000+ o 7.563/0- !176nqo8ul2.4130UU* 11 m.lJ9@u- 7 2,45000* o ]*UlbsU- b 2.50000+ o Fl=09945- !l?60Q08Ul
2.k1500u+ O Y’b8b~0- 7 2.6noo0” U fl*11417fl- 7 2*66UoO+ o 7.30b~0- I12604UIIUI2.700uu* U 9012319- 7 ?.75noo+ o R.llf71- “1 7.RnOoo* o 7.9~/44- (]26n80nuli?.b50Uu+ U fD95b23- / 20CJOOO0. u 7.3~ti?/- 7 7.9<uoo+ o 606Z1145- !l?6n8,1f3(J]
3,00U0U. U b;~577b- 7 3.05000. 0 fY,499?9- 7 Z,ln(loi)+ 0 6.56404- fl-hnnkl~dl
3.1500U* u bild*Ql?- 7 3opnn[)(l. O 5.$b’J42- 7 3.2s000. o %06’//U8- /l?A(18U13U1
3.JOOOIJ* o s,~tlhflt- 7 3.35000+ o 5.71U81- 7 3*4nu:Jo+ l-ls.~zbw)- i)?608uf3ul3.45000+ U b.U~4Q8- 7 3.50000+ 0 <.l1400_ 7 305%I)OO* o 4,72931- 712fjf)808Ul3.600UU” u 5“uu557- 7 306501)0* O 4~ftUZ59- 7 3.7nlJ13f)* o 40351[19- 71~Aon08Ul3*7500U* o *:14150- 7 3.flpooo* O 4*]9U5”T- 7 ~.a~oofj+ O 3061200- 71?60R08013*9000U* o ::5Jb50- 7 3.95000+ (1 3.33b14- 7 4.fjrlUfJO” 0 3.15213- !l?60q08Ul4*0500U+ u 3*98A22- 7 4*~nOOO* O 3°80571- 7 AoIKUOO’ o ?*71U14- f12fIIl17u8Ul4.200UU+ 0 <:9b22>- 7 40750130* () 3.97U22- 7 &e3nuo13* () p03zc!JtJ- !l.260908U14*35rJou* u i?*~o161” 7 f$*4@noo* o ?*34331- 7 6*4<UOO* (1 2.0HU+fJ- !]?60$lUf3til4.501JcU+ U <*U?252- 7 4,55000+ O ‘.7tiUl7-4.b5(lllu+ u lobd~(,~- 7 4,70noo* o i.5bdb’f- ; ::;:;;;; ; ;:<;= ;;;;;:;ii;
4.(’JOCUU* u 109J194- 7 6.I15nOo* O lc4Jbo3- 7 4.9nOoo* o 1.6405/- 71p6f)ad8Ul‘~>ug~- 7 ~eo~.~{)~+ o 1.4Rb~?- 7]?60q~8ul4,~5uUl)+ U 1.37%19- ? 5+OnIlf10. O 7.-.. . .. .
-o
12
:
56
789
1011
12
;:
1516
17
18
19
20
?122
2.324
25
2627
2829
303i32
39
4041
4243
44
4546474849
5051
52
53
5455
565758
59
:;
6263
38
5.1OOOU+ u 1.d’f3?l- “r5,d5~llu+ o 1.,1JQ45- 7
5.40UUU* u 1.14Rt79- 75.550011. @ 1.33kll- 7
5070(IOU* u Y.9U77Z- 85.fJ5~)llo+ u you5?”/4- 86,(J09utI* O 1.018s’4- 76.150utJ* u ~9°3372- 8bo30000+ U 4.ti3!71- 8
b,f+5(;uu* u +Olloqo- 8
6.6000U+ c <.d55?l- Hb07~~!Ju+ u d.Q.i31b- &
6.90uou* u i.~b579- H7.050UU+ 9 L*J/llY- m
7,20(JUU+ 0 d.t3)H8- 9
“r.3Fif)uu4 [1 ~:9rq111- 9
7050(]OU+ o U:uuooo+ o
0. l“ouoofi-oi151 i
5.)5000+
5,111000*5.45000+5.6nl-looo5.75(loo*S.o(l(lof)+
6.05000.60?~ooo*6,3600(3+
6CCjn~00+6CA5000+6.90000.
beQ5rlrJfJ+7,1flo(-)f)*
7.2500n*
7.4n7)~()*
0.00000”
5,?nooo*<.3=(JOO*
S.so(loo+5.66000+<.~fl(Joo*
5.9%000+
6.JnooO+~,i?~u(lo+
6.4nU00+
605\llo(146.7!lu(ln*A,fi=f!oo.
7.001)00+7.1’=UOO+7.3nU00+
7.LFup(i+f).ocboo+
o
0
000
000
0
000
000
0010
O.ttOoOi)+ O d*~~4?7- 9 5.00000- 2 3.0(!945- P l.onnou- I 1.351b6- &l?finfidHUll*sooLlu- 1 i.ilQ2r- 7 2000000- 1 1.H3d3R- 7 2.5GOO0- 1 4.8U459- 7126nQutJul3*lJo(Jou- 1 l..jl~qi?- 7 3=50C00- 1 4.71.$2Q.. 7 6,0mJ60- I 4,036b4- 71?611n08ul
4.ii(juQl!- 1 l.~~f!{+t?- b 5oon00G- 1 2,7//9>- h q=kfiUco- 1 l,9bUi5.. b),?tjoqOfiUl
6,000Uu- L 9.:d573- 7 A,5000u- 1 206&?d&9- 7 7.onUfio- 1 40571tf9- /]pfjoflUUU1
l.500ud- 1 ~.bb~~l- I R,ooooo- I 7.4’+’+15- b 8.5n000- I 3.44nGu- y176nQ’J8Ui
9,(lo(luu- 1 4.ZZ5P.8- 7 9.5noo0- i 6.b1400- 7 I.l)noljo+ o 3.97324- 11?60R08U1
1.USOUU* u 5*Ju50b- 7 l.lOOOO+ o l.06ull5- 6 1.15000+ o 3.87395- jl?60868ul1,2001Ju+ U l:~b7l9- h )e?5000* O 13.f34U27- “1 1.3mUOO+ O 90518*~- T1.?~oqU8ul
1.35(IUU+ u 5:b~9?5- 7 I*/$(loo(J+” (1 1.25~44- 6 ].4%UOO+ o 6.771’43- ~1260Roflyl1.5170uu* 0 7059Q74- 7 1.5500n* 0 6.}llhO~- 7 l.fI~OOO* 0 5.94b50- ‘l~finqo~ullob500u+ U 6.ub\14- 7 1,70000+ O 6.3b+77- 7 1.71i(Ioo+ O 7.311”2- ~l?AoRLJgul
1.HOUOJ+ u t.;lu3]>- 7 1.P5@oO+ O 6.8b~l~- 7 109nOOO+ O 6,33~j2- fl?6090~J?lo9soi)l/+ u /*4u153- 7 2.o~oo(J+ IJ %.87971- 7 7.o~uoo* o 6.515’f7- ;l?so~~uul
?.ioouu+ u 7*u~40:- 7 2015000+ u 6.!>’+507- 7 ?.?nUoo+ o 6.915~7- ~lZ60R08Ul2,~50(-jlJ+ u ?0143c,()- 7 2e3nooo. O 7.3u’+16- 7 7.3%uoO+ O 6.73448- f1260RIJ~Ul2.I+oouu. U “?.c!!J535- “I 2e45ui)[). O q.ud309- 7 2.5PUOO* O 7.2~5~4- !lP~(~qOO”~
2.55(JUU+ u ti*H~761.. 7 2.60000+” o 7,17f’io- 7 2.6<uoo+ o tj.fb’~zf~- !176nRof3yl
12.7cOUU* u d~b51fiZ- 7 207<000+ O 7.2’)565- 7 71.tlfiOOO* O 7.051b3- f1260qOf3Ul
d,M5flou* u /.lu762- 7 2.Qflfl(lfJ+ o 6.549Rl- 7 ?.9=IJ(JO* o 5.86/55- 71250QIJ8U1
3.UOOOU+ u 5!M1519- 7 30(350(30+ o 5*75fQ(l- 7 l~loooo” 0 5*919~4- !l?AoqtiHyl
3.15flUU+ U 3x*6h65- 7 3.?OOOO* O 5.19562- I 3.2~UOO* O 5.021U2- /l?60~u8ul3,3001Ju+ o b.u193u- 7 3.35000* () 5.0~~2’~- 7 3.4nUOO* O 4.90bJ9- g12~fiqu0u13.45fjOIJ+ u ~0~5334- 7 3.50000+ (1 4.S~535- 7 a.5<UOO+ O 6.0~356- /l?~Oqu8ul
3.6000u* O ~*4b248- 7 3.65noo+ O 3.8R/7fl- 7 3*7no130+ o 3.854s4- /l?6nqof3ul
307S[lUU+ U Job6f16Q- 7 3.$30000” 0 3.7d~68- 7 3*P~OOO+ O .3.1~UUO- ;1760B08U13.90(J(J(J* u +.,1<77U- 7 3.950011* o 2.9+tis2- 7 L.onooo+ o ?.7U4/9- ~17~091)Q~l4.u50uu+ U J.27{,02- 7 4,10000* O R.41b49- 7 6.1<1)00+ O 2.3~~d4- f1260qof3u1
4.dOCIIjV+ O L.3:P14- 7 4.?5000+ O 2S6St!7h- “1 4.31uOO+ O 2.0~H34- ‘]~hnqd~ol4.35(IIJU+ u d*dtIIs8- 7 4.~nnot;* O 2.0U(J2U- 7 /t.45!JOO+ o i.flS~H3- /l?f)Of100U1
4.Sonuv+ U i*/~l\94- 7 4.550()()* o l.[l~~>~- 7 4.f/PUOO+ o 2.0111J1- {l?f.fl)i[l!jul
4.t>’J~uLl* () Jc’14771- “/ 4.70Jo[)~ IJ 1.3’+Jfjo-4.~cllldu+ u l*12(l(lJ-
7 k.7~uf)(f* ~ l*35dlJ1- /)?tlllRuflol7 4.85000* (J 1.2/~i’~- 7 4.ClnUOo* o 1.4hO~b- fl?6(If10RUl
:~ 5r59- 7 5, 1.32343- 71Z6fIfiOf3U$:728$X t i.L&R9- 7 5,MM 8 ?:2:%:: ; :mm: 8 l*4Y5*3- tl?60A09U 15.250rJu+ U l~U;%O~- 7 5.3(1000* O l.16325- 7 5.3s000+ () 1.(lb*y8- flxonooul
5.4000U* u 1*u~971- 7 50fJ5000+ o 1oo5369- 7 5.5fiOOO+ O 9,30944- ~l?bO~OBUl50550UU+ v 10S637tj- 7 50fio~o~+ ~ 10ZC’046- 7 q065000+ 0 7.49/31- 81~AnHoOUl
5,70(,0b- u M.f3097H- 8 5075000. 0 6.9Js23- H G,RfllJoo* () 6.66’7+0- f31?60~oRulS.usuuu+ (J M;U4595- K 509f)oof3+ 0 8.:35U1O- 8 5.9~!Goo+ o 5.9?537- 81?60808U1
bOooOuu+ u Y.u4SS8- 8 6,05000+ o 5.41146- P 6.lnU(,o* o 7.?7049- Rl?60n08ulcl.ls~u(f+ (J !J:u16?9- H 6.?OOOO* O 5.11dlZ- 8 A.25uOO* o f4,555y7- M176013uf3ul
6.311r)uu+ U y*+Z%P-$- 8 6.3s00u. o 4.uy>b~- 8 6.4nuco* o 3.Rb5~~- 8)?60’?U8UIb,450(Ju+ o ~*b~701- 6 6Q5noon* o 3.41J~07- Q 6,5%o@o+ o 3.]R3u9- 81261)8U8U16.60nu(,+ u i!09b2?u- 8 6.65(100+ 0 ?*74J4n- Q lf+.7filJof3* o po5?ds7- 81p6f)8ut3ul
6,7SOUU+ o <xS13cd- ~ 6.80000+ O ?ol1409- 8 AO!3<UOO* () 1.91540- 817f5nf?oflul6.900uu+ U l./23?e- 6 6,95noo+ O 1.53B40- Q 7.OnUOO* o 1.361yf- R126080flUl
7.050[Ju* o 1.194?4- 8 7,10000+ O 100~287- 8 7.1<0S0+ O 8.9Hb~+- 91?60808u17.2onuu* ‘J 7~b23~h- 9 7,?5000* o 60?6d58- ~ 7.3nu(to+ o S.174’jfi- q1260808Ul
7.351)lJu* (j @.dL’7Hl- 9 7,4000u+ o 3.3J3?46- 0 7.4Guoo* o 2.728J3- 91760f+U8U1
64
65666768
6970
7172
73
7473
7677
7879
bo
81828384
85
86
87
Hti
89
90
91929394$JSY/j
9798Y9
100
101102103
104
105106
107LfJ810’3
110
111112
113
i14115
w118
119120121122
123L 24
L25
126127
1 ?8129
130
131
L3Z
39
70500u0. u u.Ullnr,Li+ u o,L)~ooO* (J fi.ol]oo(l+ O (l,onl)flo+ o f).o(lOUO* o126!lROf+Ul
0. ‘J.UU(JIIL-01 0 !! 1 15Jl?f,o’\u8ul
151 1O.OoOOU* O Z0630?/- Y 5000000- : 2.4/022- : l.OfiOOO- ~ 7.R11/4-
Ul?fyoa[)sul
l.500u(J-
712AonU8iJl1 Y.ll?$Y- 8 zef)~ooo- 1 1.42424- 7 ?O%flooo- 1 3071511j- (12611nl18ul
3.0000U- 1 9tU:a81- 8 3.5nnoo- 1 3.6Zd6u- 7 4,0nooo- I ?. TH9b3- ~1260nd8Ul4.5000u- I 1~ot!79z- 6 S.oOoOO- 1 1.~3354- ~ <.%qnoo- I ].292/2- b12AnR;~l~il!
6.(lqoou- 1 1.1Z655- 7 6.5@O(IO-7.soouu-”
1 2C05Z~51- 7 7.00000- 1 ,3.49438- !l?kOJIUflUl1 2;795s9- 7 f3.0noo@- 1 4.1892’+- h R.5nOo0- 1 ?.53794- flP60not3ul
9,1Jof)ou- 1 j!2~443- 7 9.ciOOOfi- 1 4.92d05- 7 l,oQ(Joo* o 20R97U3- 71~fioHl)9Ul
l.(jQnUU+ 0 3.yHOll- “? l.lOOO(?+ o n.llzo91- 7 1.l<IJOO* o .2.8fllcn- !1>5080$IL)1
l.~ooU,J* U b.~dr)~!- 7 1,?5000+ o 6.51911- 7 ].3nooo* o 702had~- ~l?!,n~[l[llll
10J5PUU+ (i !*u:h4b- “/ 1.4nno0+ O 9. f569*- 7 ].4~UOO* o 5.0491 ~- tl?h0qD8Llll.brj(jll(l+ U bs~bR13- 7 10~5000+ O 5.OdyzU- 7 1.6nUOO* 0 6..I%’JY’J- (1260RUSU1lo~~~~u+ (J 4*4(J911- 7 ~,7noo~+ (J 4.61J45H- 7 1.7GU6U* ~ 5.345+9- /17+04f)&LJ1
1.PI)OOJ’ u ;.J917z- 7 l.Rsnno* o 4.93tbl- 7 1.9nooO+ o k.<~~~~- f12fioR08Ul
I.Y!)f]ou+ (1 5.3M3q+- 7 200nooo+” o &.9d!z7- 7 2.o~UOO+ o 4.61b37- f)?6i/fiO~Ul
2,1O(I(JU+ u b.u!Q7y- 7 2015b00+ U 4.b~(’4?- 7 ?.2n000* o 6.9Z5~0- /l?60f4U8U1L.25[,UU* 0 5!luo21- 7 2.30r)oo+ !) 5.23134- 7 ?03<(JuO* O 4.74445- fl?c.nQO13ul
2.40L,CU+ U ~013710- 7 2c45qor)* IJ fj.3,?tl14- 7 >.5r,uOO* o 50159~4- 71?6f)q0.qUl#Cb50uU+ 0 6ob1948- 7 t?.~n(-)r)()+ U %.!19995- 7 2.6=.000+ o 4.536/4- ~1260qu~u]2.7noL,u+ u o.uyoK~- 7 2075000+ o tj.11’503- 7 ?.~qooo+ o 4.9[f430- f]?6(}Rt)qUl2.b5uuu+ O ~:ub3al- “1 ?O~fiooO+ O 4.6U~l~- 7 >.95UOO* o 4.059{9- !IXOnfJ8ul
3.UOOUU+ u ~.u3nl(j- 7 3,05fjfJo+ o 3.Ql(49- 7 ~.louor)+ () 6.031ut- 71260J71Joul
J.lSO(J(J* 1) J:!444s- ? 3epnooO+ O 3.57b03- 7 3.2KOGo* o 3,444/b- 7126f190R~l3.300tiu* U .i.~6412- 7 .3.35000+” u 3*5slH()- 7 ?.46U(10+ o 3.41514- ll~60RU8Ul3.45(]iJu* 0 3.u571(J- 7 3.%()!)()O* (1 -3.14559- 7 ?.5%[)00+ 1) /b.45dy13- fl~60flusu)3,600uu* (j d~1d349- 7 3,A5f)o(I+ O ?S65*16- ~ 3.7nOOO+ o 2.663U5- ~1260qUSU]
3.-I50(JU+ u L*3J5]5- 7 3.Rnnon* O Z.6UZ7U- I 3.d%uoo+ o 7,1Ho<3- /12fYoRu8u]3.9oood+ 0 Z.15051- ‘r 3.q5001J* () p*(Jc!d74- 7 A.ofioof)+ o 1,9089/- (126080SU14.(J500u* U <:by~~d- 7 40~nooo+ o ~.48b93- 7 &.lqooo. o ]065z16- /12AnRu8u1k.zoo~u+ (J l.b~~44- 7 4.2’5000+ O 1091boO- 7 4.3nuoo+ o 1.43’+24- f1760flu8ul4C35001j+ u ltfJ2P65- 7 40&OfIOO+ o I040U22- 7 fb.4=OoO* o 1031~f6- 71?609(18u1
4.501)00* b 1.z73f,t$- 7 4.55000+ o - 7 ~.~nooo+ o 1.44314- /l?6n808U14.bSnOu* u l*U:li7U- 7 4.70000+ O
p::;;”H &.7qooo+ o ~.669y0- 81?608081J1
408000u* O lq22s19- 7 4.fi50131)* () 9.]3387- H 4090UOO* I) 1.(14U*0- f]?6Pqu8Wl
4.95pLJu+ u 8./6978- 8 5.onooo* U 8.39u33- O 5005000+ o 9.4.3J.$6- rn126flJ3u8ul5*lof)(Ju+ u 7:t$9n<9- 8 5.15n00+ O 1.16959- 7 5.?nOoO’ o 1.06106- f1760~08Ul5C25011U+ U 7S<>074- 8 ~,~f),loo+ o R031Yz/- R ~03<(Joo+ o 7.57192- tl17&rIRu8Ul5.400(Jo* u “ID511?U- 6 5.&5noo+ o 7.48414- Q 7.5nuoo* o 6.”T%4U3- ~l?AnqUNUl
5.55{)(JU+ U ~sb600t~- 8 5.AflOOo+ IJ R.6&’Jjb- R q.f,cooo* o 5*32Hh4- Bl?F(lnopul
5.70fJUU+ U b:d4L~l2- @ 5c75n0,)+ o 4.Q<499- H KQf+qUUO+ o 40732.+H- H]?~(,/IuOUl
50Li51)UIJ* U 5069HI/- 5 SoQoof)!J+ u s.~ufob- 8 6095UOO* o 4o194&4- 81?60Ru~ul
6,brl(lou* u ~*3~7bl- 8 6005000+ o 1.flbd47- R A.lnUoo+ o 5.lZ’5C”+- 81?60RU13Ul6.150UU” U ~*~~1]1- A (j.~n,)uo+ (J q.h4!J6?- 8 6.P<[)oo* o 3.]v9L6- 81?6nPltf3Ul60JI)OUU’ Ij j,lJJ3.3j- 6 6.35coo+ O 7,Hb/o~.l- 8 6~4n[100* o 2.70Uf~- ul?A(1403ul6.450Uu+ U Z~~3607- 8 6.5nOOO+ O 3~37110- R 6.5q000* O 2.z0914- u1260Ru8”l
6.600UU+ u d*(J50p2- 8 6.A5000+ o ~.8yZ96- P 6.7nOoO* o 1.738b2- ~126nRo8ulb.7soou+ o 1.5~779- 8 6,8noo0+ U 1.4416H- 8 6.R~OOO* O 1.?y9b2- 81260R08ul
6.900uu* o 1.ib249- 8 6.q5000+ u 1.03u7fI- R 7.OnOoO* o ~.05254- 9126080su17.050UU* o f.~bz~ti- 9 7.1OOOO+ U 6C74C!9?- 9 7.1%000+ o S.704f9- 91?6nRlJ8ul7.Z!30UU+ 0 ‘++(49?8- 9 7.P5000+ O 3.8bJ49- 9 7.3nOOO+ O 3.1154fJ- 912Ao~08ul
7.3501)0+ o Z!4~09b- 9 7.4nooo* O 1.89511- ~ 7.4S000’ O 1*451+5- 912fi0n0Sul
7.5oollu’ u URUOOOO* u o.00000* u ti.uouon+ o n.onuoo+ o O.OOOUO+ y12fIofiu8ulu. . I=ou(lofi+ou o @ 1 15112fJOntJ8ul
151 1 0 0 0 u1260RO&3ul
O.UOOUU’ o Z.db4q2- 9 5.0nn~o- 2 2S15502- H l.OnOnO- 1 4.R4493- ~l?608u8ull.so[luu- I /.5bq?3- 8 2.0nuoo- 1 1.18797- 7 ?.5nu00- ] 3.0+9{2- f1260Rd8Ul3.0(l(JLlu- 1 7~?9345- d 3.%l)nfJo- 1 20qr~9~- 7 4*or-lot)o- 1 2*12U42- fl?60RlJ8yl
4.513f)(lo- L “l:47~q2_ 7 5oonooo- 1 1.4698%- 6 s.5nOoo- ] 9.404/1- /1260$lI)HU16.uoouu- 1 b:B~77f4- ? 60q00no- 1 ~.694’59- 7 7.0nUoO- 1 2.86716- !12617R08Ul7.501;utJ- 1 d.i?U52b- 7 F1.onooO- 1 P.4YYoU- b 9.5!IO00- 1 2.0Z’:~~4- fl?6nnU8ul9,u~l)(Ju- 1 d.ebn91- 7 90~nqoo- 1 6.OU~’i+- 7 I.onuoo+ o ?.%~ty~- f1260Ru~ul1.U5VUU* o ~.~lln8- 7 l,l~f)oo+ o 6.!5J~R7- 7 l*l~(Jl)()* () 2.2H254- l12floflo8ul
l.zOnOu* O 5.”/3030- 7 10F’5000+ 0 5.lf(60- 7 l,3nll(j~+ 0 5,97j3~- /]2fioRU8U1
1.J5UUIJ* u 3*l~79J- 7 1,40000+ o 8olly75- 7 1C4%UOCI+ (J 40()%5Y3- 11260R08u1
l,SLIOU()+ U 4.55502’- 7 l,55000+ o ~.0UZ87- 7 1.6nuoo+ o 3.453b7- (12hflqU8Ul
1.b5uuu+ u j.4b6~9- 7 107fi000+ o 3,6U27b- 7 ~07GUoo+ o 4.22214- 1126(181)f3u1
l,UOI-JOU* u J*41701- 7 10R500CJ+ o 30H+t!”f6- 7 IoQoU90* o 3052J31- fl?hO~fJt~Ul
133134
1:3513b13?13H~ ~y
140141142
143144145
146
i4714fl
149
150151
152
153154155
156
L57158
159
J60
lbl
162163
164165
166167
168169170
171172
173
174175
1761[7170179;::
Jf!2183184185lt!b187188189190191192193194195196197198199zoodo~
40
l.’.~y~ullll. (J +.~~.!?b- 7 2.00000+
2.1o(IOU* U J;Y3P()+- 7 2C15flo(J*
Z.i!5fiOu* u J.4.!734- f 2.qnflol~+2.400(JIJ+ U ~.yj~ati- 7 2,4500().
2,550Uu* U bol~fi?~- r 2,6n000*
i!.70000* f) 4.b’+?53- 7 2075000*2.850(Ju+ U ~oH916’)- ? 2oqnooo+
3.(JoolJut u J:u15fl/- 7 30(J50()()+3.1500U+ h <:(71QJ- 7 3.70000+”
3.3UOOU+ o d:3f!?7b- “/ 3.35000+3.450(JU* (J z.db613- 7 3,5fi~o~*
~.booULJ+ o tiojC~7C’- 7 3,f,~000+“3.7’j@llu* U l:uqLj[)4- 7 3.RcJOOO*
3.9000u* U 1.eO]4/- ? 3oq5no~*
6.050UU* o d.U45R/- 7 4,1nooo+4.e’13(Jou+ ~ 1;22564- 7 4,?500,1+4.3S(IUU. fJ 1.ZIQ49- 7 4a4f)of)(J*
*,5,)(JOU+ o 9.059=3- H 4.’55000+
4.b5fJulJ+ u U:U592Y- 8 4.70~oo+
4.f59(,lJu* u 9*5~3<z- 8 4.R5f)oo*
4.95(JOIJ* u !:f3u??4- 8 5.00000*
5,1ooO(J* u b:ll~59- 8 5015000.5.C:500U+ u 5.b8~9d- 8 =J*~(’)ooo*5,40(]UU* u 5.9’+46fJ- 8 5C4500()*
5.55uU11+ O /s4~7R1- 8 5.Anooo+5.70!IOU+ o +~H6s49- 8 S.7500n+
5.f1500U+ U +~4Z8?3- 8 509nooo+~.000Ul)* U 4~9451kI- 8 6005000+
60150UU* U r?o(~68b- 8 6.7(Iooo+6.3ooo(J* U <.j*lo/- 8 6.35000+6.45{jOLI+ u lqy6814- 8 6.50000+60600UU. u 1.56504- 8 6,fi5~~~+b.”/5(luu* IJ 1.+0170- 8 6.flllol)o+
6.~o(ILJU* U 506773{- 9 6oQ6000+
7.050Uu’ u ~Of’+n13- 9 7.lfIooo*
“f.zouou+ u +.:2824- 9 7,25000+7.3500U. U A.a?lf+u- 9 7Q4noOf)+70501)uu+ u u.UOooO* 0 ooonooo+u. 3,[ju~o~+()(J
0 3.tilfSLi- 7 900L;ljno+ o 3.53&bb- f17AfIR[)f3ulO 3.55+61- 7 ?.2nlloo* o 3.791~H- il?6(lflUqUl
o i.o’+’~43- 7 ?.3”!UOO* o 30613~4- fl?6r?oo9ulU 4.q1U4t{- 7 ?.~nuoo. o 3.Q74/9- /]?6nRU8U1
U 3.9L~42- 7 2.6%OOo* o 3.4?6+8- /]~60JiOt3tilo 3.9/j34- 7 2,Qn[)oo+ o 3,6H800- /)~60Suau1o q,49’~09- 7 7C9COO(). o 30031/1- )1?60RO$U1
IJ ?.9h(555- 7 ,1.ln(]oo+ o 3.01”/<9- /l~60q(JSul0 2*65/02- “/ 3,z’=(]uo+ o 2.5+153- t]?(,08uRol
O ?.~”~l~- 7 3.4nuno* o 2.5fIf~0- f1260quHu]o 20.]>t~l~- 7 a.5<uoo* o 3,53606- /l~(10f108Q1
(J loY5Yt)f_l- 7 3.7nOo0+ o 1,99UU9- 71260ROBU1O 109~b59- 7 308~fJoo+ o 1.612-9- /lZfIil$3U8U1(J 1.suJ72- 7 &.onoOo* o 1.41H1O- fl?60ROi3Ul
o l.y~l~~- 7 4.l<lJoo+ () 1.?37/3- “/126nno8ulo l*buz$)?- 7 L.3nooo* o 1.oH8yf- (12f51)llo8ul
o l*llyll- 7 &.4~ono* o 1.025b6- /126nlldaU1
(J Ro71uoo- q 406nOoO+ o l,13zb5- f12hnR09ul
o 707~5S1- R 4.7%uoo* o 7.5S13+- f31z6nf!08ul(J 7olb44/- R k.~nUoo* o 8.lZ?hhO- BI?6(JRu8u1O 6.5~b73- a %.05UOO+ o 7.37341- ~l?6[~J?O(lUl
o 9ol~173- H %.2nOOO* o fl.26(J/~- 812f,0f100Ulo 6.51<:36- H G.3<(Joo+ o %,90bc!0- Lfl?60nOf3ul
o 5*HJlo5- R q.%nuofj~ 0 5036TU6- 81?6f)~u8ul
O 60”14/61- R S.65000+ o 40150dl- f31?6n8Uf3ulo <.H4118- 8 5.@ouoo. o 3.6H9~!P f31?6nql)8ul
() 4.5H454- n %.9FOOO* o 3.262~0- Rl?AoRuf3iIl
o i?.9990b- R A.lnu90* o 3.96502- 81Z611(308U1
O PoH35sH- 8 fi.2FOOO+ o 2.472b3- 81?f>oROflUlo 2.2u964- Q 6.411uoo. o .20078c!!5- B1261)81)8u1o 1.81/9~- R 6.~5000+ o l,69Uti7- &ll?6nf108uI
o i.44l1H- I? fi.7mooo* o 103]9b9- R1260908u]o l.l)Mo51- 8 ~a~qu~o+ o 9,?511/- Y1?6081J8u1
f) 7.64/53- ~ 7.oqooo+ o 6066~dH- yl?60RIldulo 4.87u27- 9 7*iF(loo+ o 40065f$J- Yl?honu8(Jl(J Z,clbdqE1- 9 7.3plJoo+ o ~oo75/o- Y1?151181]HIJ1(J l.\sbp4- 9 7*4c(J(3f)* o R,33118-lu12AlJ80f3ul
O n.OUUOO* O n.OnOoO* o 0.000IJO* ul?6n8UP.Ul
o 0 1 lsil~honoaul
o 0 n U]?fiOHi)HUl
3g5nn00-
5of)~ooo-6.’+nO@n-
8.0nono-9.Snooo-
l.]noof)+1.?5noo+
1.4nlloo*].%5(100+
1.70009”
1.85000’2erJ(70130*
2’.1500IJ*”2ea~r)(lo+
2.45000+2,600004”2.75900+
2.~flr,-loo*30(j5fl(30*
3,2COOO*3,a500~+3.5rltlo!)*3065000*3.f7floo(J*3.95900+
4,1nn00+6,25000*
1 lo49e39-
1 5.5~b34-1 9.3361q-1 3osz332-1 l.99l42-
IJ 3*4113z-0 ?.J+b61-o 405b466-0 lc9J33/+-
o 1064fJO4-
U l*73f,?3-0 l.6Y/9c’-
U l*5uy3.3-U l*7’J~9’+-0 l.95fp6-o l.6b~\6u-
0 l.7zdo7-() l.’+bllnV-
0 y.lbl13-
0 l*oll77-(J l.lll7fJ-(J o.4fu13-0 703u3h7-
0 8.1zrH~-o 5.7b163-
0 9055U64-0 7.cld/55-
7
7e
-?7
77
777
;
7777-1
77
77n
RH
8
PP
4.0n000-
5.5nooo-7.0nOoo-
~05rluf)o-1.00000+
l.l~uoo’1.30000+
lo4<l)ot)*
1.6nUoo+lo7~uf)13+
l.~coo(-1+7.iJGo(Jo*
7.2!-lu(l(J*?*3~uiJo+2.5nUOO+?.6ROOO+3.Rn090+p.Qc(J(Jo+Io]n(loo+
?.?GO()(I*?.4fi[Ju~*3.5~()()G*
3.7nu(-11)*7,~KufJo*
4.OnUOO*
4.lSUOO*4.3nU00*
1
11
:
00
00
0
00
00
0(1
0
:0
00
000
0
0
8~6q2Y6-
3.042f4-l,4’36bo-1.0441J5-1*15bJ9-
l.12fti7-3.76+15-
2.1)].6d3-1.66b3W
lo997LT-~.5b{f~-
I,5ujY6-
l.63~dl-J.495Yb-
1.73091-lo3b9d9-10450d6-
lol701M-
J .lqj3/-9061i!46-
l.93*94-l./f>o15-7.t36/b6-6.0$;()&7-5,3qb57-
4.fJ37*o-
4.4(>143-
4.3C,0UU* U 6t1?371- a 4.4nooo* O 4.6s~ll- .P h.4KOOO+ o 4.5/’4/3- 84.300uu+ o 4.24,?[,3- 8 4.5500u+ o 3.81bo~- H L.611000+ o 5.1%dLo- f!
6065nOu* U d.6U~h4- 8 407nn00* O 7.’3UI_J5~- 8 4.7~(JOO* O 3.4#3t10- 8+.~ol)ou+ U 4.iy4YU- d &OR5000+ O 3.21/6$- 8 &.Qnboo+ o 3.%t1711- 8’
f4.95puu* u d~~d]4b- t! 5.~nn~~* u 2.94177- R %.o<OOo+ o 3.2h/37- 8
5.1OI)LIU* u d~!59?f- a 5.1s0004 o 4.0/517- 8 fi.7nuuu+ o 3.55Tc1- 85.Z5nUU+ u ti.bbl:j5- 8 5.3nnno+ O 2.9UC?bX- Q F5.31iUOO+ o ?.5’>OU1- R
s.7onou+ u d*lo7?-i- 8 5.7500cJ* O 1S4Y412- H %.~nO!.)0* O 1062510- R]260qodul5.85(JOU+ o l.9u8n3- a 5,~nl)00+ o 1096U51- R s.9~uoo* o 1.42H~5- ~l?6uaOSUl6.00n0u+ u Z.Uf3499- .3 6.n5floo* O 1.3(Jf38- R 6.lnIloO* o 1.6~1~5- f31?6nR08ulb.1’5fIUu+ U 1.1U700- 8 6.?o(IOO+ () l..jof?q- H A.zcuol)+ 0 l.llhadl- 81~6nnu8u]tl.jof)od+ u l..uu993- 8 6.~5000+ o 9049/8f5- q h.4nu00* o R.qo/+6- 912/yqqU8Ul
6.451)cu* o b.323?Y- 9 6.qnOon+ O 7.73’~91- 0 6.%%UOO* o ?olba$b- 9]?fi020~uib.60Gvu* o b.bOP7b- 9 6.AqOOO+ o 6.u5aTY- 9 A.7CIOOO+ o 5.Ij~439- 91~6nRU8u]b.751]i3u* o +.98B1M- 9 ~QRooo[). o 4.47H79- Q f..RKu00+ 0 3.9n505- 917A0808ul
6.9ooOU* u ~.3114b- Y 6,95000+ o 3.95797- Y ?Oofioon+ o p.6?7(5- 91z6nQu8Ul7.05nUu+ U ~.22250- 9 7.lnOOO* (1 1.@4427- 9 7.lCOoO+ o 1.49b+5- 91?60ROf3Ul702(-J~ulJ+ IJ lo181)l)l- 9 7.>5poo. o a.9bti~5-in 7,3no@o+ o 6.49j~5-l ~l?6011UlJu]
/.350Uu+ u +.Jyt\9b-lU 7.6nooo* U 2.7u’+6~-10 7.4~UOO+ O 1.43~db-1U17~(IQO~U1
lesonuu+ ~ OouOfjOu* u 0600000+ 0 0.00u09+ o o.OnOcO* o 0.000UO* Ul?6(lpofiul
o. 1.OUOOE+O1 n 1 1511260AIJflU11s1 1 : 0 0 ul,?60t3013ul
o.000ou$ o 1C14/+4~- 9 5.onnoo- 2 1.05553- n l.onooo- 1 4.11339- Rl?~n80qull.5000Ll- 1 2994744- d 2.nOooo- 1 4./1157- H ?.5no00- 1 9.219$1- u126nRU8Ul
3.00f)uu- 1 3sZf23’~- 8 3.%noOo- 1 9.39347- f{ 6.OnUoO- 1 4.9R31~- 81260QU~ul4,SoGUu- 1 1.U30]b- 7 5.nnnoo- 1 ~.6y~o;*- 7 5.5nUoo- ] ~.30296- /17(,nR[l$!U1
6.(JOUOU- 1 1.~7?A0- ‘? 6.5nooo- 1 6.59477- P 7.UnOOO- I 1.(JOU93- !1?61)RP8U17.50001J- 1 /.b7?ol- 8 R.fJnooO- 1 1.3H~OH- 7 A.snoflo- I 7.2s144- 812fjnRo8ul9.tJII(31jU- 1 90,YJ54b- 8 9.fi@()(J(J- 1 1.?/497- 7 ].ofl(Joo* () 7.Q74J1- dl?r%f)nu~ul
l.U%OulJ* O l:0122U- 7 lolnnno+ U 7..29~7~- 7 l.l~UO~+ o 7.%4811- fil;6:IRiltiul
l*t~oulJ+ U l.l~Rcd- “/ l,?!i,lof)+ (j l.~yU~~- ~ l.qoOOII* o ?cr?’~f~U- 71?15,1~lI}~tJ)
l.jL,,,lJuY U Y,YJ] ]lj- 13 ]$4~oOU+ o ~.2’11/l- 7 1.4%UI)U~ O l,3wlmh- /12cIo~fllIul
!::%::: : i%:;: T i:;::::: : ;:::;:;: 7 1“6’0007,.7.”,0:: t:.lwz WXw!1.8onOu* u ytf4555- 8 loa5000* O l.09962- 7 1.9nOoo+ o 9.1371j6- 81z60RU$3U11.950UU* U 1.<U%%7- “1 2.onOoo* U 1.Ub931- 7 ?.O<UoO* o 9.17?U4- H1?60RU13U12.1OI)UU* o l:loo?~- 7 2015000+ o 9.2-iu31- D 2.?nOoO+ o 1.009/2- fl?6nRofJul2.2511uIJ* u l.ud34d- 7 2Q3nOO(I. u I,133(J4- 7 ?.3GOOO* o 809Hj42- 81i?60$lUflUl2,400Ll(J* u 1.Ud19+- 7 ~045000. o 1.1</44- 7 ?.%nOoo* o 1.0R2Y1- f1261111Uf3Ul
2.550UU+ u l:9t1792- 7 ?06nn00* o Y.0<z3z- 7 7.6~uoo* o R.04~~S- ‘l?60Ru~ul2070(IUU+ U l*lj%lO- 7 ?.751700* O 1.05241- 7 2.RnOoO+ o 802aU13- a12bOnuf3ul
zc~s[lou’ o l*u3z3u- 7 2.9noo0+ o R.93452- R ?.9CUOO+ o 6.77~10- ti1260nU8u130UOI)UU* u b.tf071b- 8 3.05noo+ O 6.Tl~2~- q q.lquoo+ o 6.~34d8- U126nROfJUl3.150UU* u !J:’?554/- i! 30?ll(loo+ o 5083U92- a 3.?~c(Jo* o s.50~50- ~1260Ruoul3.30u~o+ o b.9~44u- a 3.35000* u 6.88ti2b- H 3.4nuoo* o fY.2R~U5- R12finRU~Ul
3,4501jtJ* o 4,’J47f+”/- tj 3,5nouo+ o 5069~14- R ~,~%()()o+ o 1.21+/1- f176nRl)f3Ulj,600uU. u 6~17n5Q- & 3.A5000. u 4005/5i- R a07nono+ o 4.61195- 51z6013LJ8U1
- H Sopnnou+ o 4.s/0./- P q.~<uoo+ o 3.31655- UIPSORufJul::4;:;:: ~ ::::;:}- 8 3, C)50,()+ , 3,, b,oo- R &Oonuoo+ o ?O’QO*<l- u1?60$3dt)ul
4.050UU* U ~:4459~- 8 4.Ifiof30+ o 6.29u13- H 4.l=OOo* O 2.5bMlS- UI?60RI)8U1
4.ZO(IUU+ u z*9u45l- a 4.?5000+ o 4.3bd83- a 4.3fiooo+ o 2.3fd~6- u12608U~Ul4,3S{1UU+ o s.U6109- a 40.in~oo* o 2.4j~5?- ~ ~.4%uoo* o 2.5sla3- 5~2Af7Hu~ul4,50(lUU+ u z.dboOb- 8 ~+o%%)OO* O 2.00d0l- R 4.6rIOOO* o 2.Rl~U9- U1?60R08U14.b501Ju* u lsdUoRb- 8 4.7fIooo* O 1.WW ~ 4.7%000+ O lo793d5- 812~0nUaul
4.bOIIOLI* U c.1149(J- 8 4085noo* o 1.b5b9Y- 8 h.qnUOO* O 1.R09Y9- ~l?6090Hul
40950(JU* u lob2305- 8 5000000+ O l.4y/56- R 5.O’=Ooo* o lo64U~l- 13]z6nR11Si:]5.1OIJOO* o l::9,?94- 8 5015000+ o ?.09s2q- n 5.2nOoo* o 1.729J9- ~1260~08ul
~.Z5no~+ u 1.3u3n4- b 5.3nooo* o 1.*~737- R %.3SUOO* o 1.z’s~46- ~1260QIJ~Ul504~{,gIJ+ u l:?6a3tl- 8 5045noo+ o 1.22HYH- R G.50(Jo13+ o 1.42~110- 81.260n(J801
S.5SOOU+ o l.~OOAO- M 5.finnoO+ O ;.35/5.3- R ~.6”UOO* O R.90U~5- Yl?~o~u8ul5.70~ob+ u l*uo54’/- 8 5.75noo+ o fl.15c!14- Q tj.Rnooo* o 7.Pu3’J9- 91260RUBU1
50~509J’ U Y~027&2- 9 ‘5.9floo(J* o ao2zd91- y <.9%not)* 1) 6.Ro8~3- yl?~f)~~~~l0000OUU* u 9./130d- <? 6.05000+ O 6.2Ubz?- Q 6.lnUf)O* O 7.855+1- ‘i?609d8ul0.15{]uu* u s.bd4A3- 9 6.?~rJoo* U 6.alul~- 0 6*2~UOO+ O 5.0’+7t\4- ‘l?69q(lqul
6.300UU+ U 4R!6393- 9 6.3500u4 U 4.48120- 9 6.40000+ O 4.1991/- ‘1261)QUa~l
b,4~oou+ o j~yzoz/- 9 60sn000* o 3.64Z21- (7 A.5500u* o 3.3b99~- Yl?F.13R(JillJl
tobof)ud+ o +olu3s2- 9 4,s5n00+ u z.8+u5R- Q ~07nu~o+ o 2C5S~*ti- Y]?60qlJgU]
42
b.75(]ud* (j 2ss3363- 9 6.Rn(loo+ IJ 2.o’9z09- ~ 6ofi~uocJ* o 1.R5Hb~- 912bof~J9LJl
b.bOOLJU+ u Lib~&38- 9 6a95noo* o T.4du23- ~ 7.001100+ o 1.217’+~- 9126080t3iJl
7,05300+ u 1.uz67~- ~ 7*l~[)oo+ (j 9.49/9’>-10 7.1C.000+ o A.n65bz-iU l?60q08ul7,zo9,)u+ (I 5.390f,d-l(J 7.25000+ O +.(J”~~19-10 7.3nUf)o+ o ?.q.?41J2-17J1?60nIJ~U1
7.35000+ JJ l:y3?9d-lu 7.*n1313f)+ o l.l~d~l-lo 7.4CG(3(J+ o 5.fiso(;o-ll 12$(lqof3ul
“le5000U+ o u.I)oooo* II O.OOOOO* u q.OUOOLI* o n.oouoo+ o o.ouUuO* UI?AOnU81Jl
0. 5:Uoo(]L*01 o 0 1. 151126nno8ul
151 1 0 0 0 u).2flflRuf3u]
Oooooou+ u 5.420}IU-lU 5.01’1000- ~ ~*lbloo- ~ l.~l~oo- ) ~.g~b”q- 9~76~8u~ul!.!iooou- 1 Y.9!J072- 9 ?,ononO- 1 1.47/26- R ?.5nO00- 1 1.~30U9- U12fI~R0f3013.0c(luJ- 1 1.de174- 8 3.soorIo- 1 1.~S069- H 6,0nooo- 1 1.552y0- Ml?6fJq08Ul$05000u- 1 d.UU74fi- tj 5.onooO- 1 2.8/334- R q.5nOo0- 1 2.44832- U1260ql18~Jlh.uoouu- 1 40077~2- 8 605noo0- 1 2,ZU~33- P 7.onooo- I 3.1u~~d- B1?60R08u17.so(juu- 1 Z{l’J07*- o 8.onnoo- 1 3.6/35”3- P f?.5nu00- I ?,606+5- R126nRu8Ul9.0fJ,joLl- I S.%2889- 8 9,%nono- 1 3.33a41- ~ l.onooo* c1 ?.~~~~1- 81?.61’JRC8U1
1.0500d+ O 4*/Lql+- u l.1.fiSIO(J’ O A*37603- R l.l~uOO* O .?.~~~y~- 812A08u81J1l.~oLJOLJ+ O ;.J4742- 8 1.25000+ o 2.B’~u13- q 1.3ni)OO* o 7.51516- 81?Ann0~Ullo350ud* () J.~L81/- ~ I.onooG+ o lold/23- 7 1.4<000+ o 3.99+~2- fl1260qo~ul1.500LIu* u y..f4t?6d- 8 1.s5noo* o 3.75Y32- u 1.6nOoo+ o 3*331d9- 8126(Jq~18ull,650uu* U d~046h5- u 1.7noo~* o ?.6su11- R 1.7CUOC* o 3.511”3- 8126~)q~8ulloEiooo(J* u t?s05~44- 8 1.R5000* O ;.8bb2~- 8 ],9qUOo* o 2.628/4- t]126118U81Jl1.950d[J* (J +:cJ2101- ~ 2.0001)0+ O >.q8d6C]- 8 ?.O~UOO* O ?.24~’b6- ~l?~l)qn~~l
Z.1OOUU* o d.d’~~oo- H 2’015000+ o ?c~j~oq- n ?~?n[loo+ o ?.53393- Rl?~~nqu8ulZ,Z’50JU* o c!.f5469z- ~ 2.3nooo+ IJ 3.0bd40- n 2.3RUOO+ o 2ooYb4r- q1269q08ulZ040(3L!U* fJ d.5!J?55- H p045,)oo+ o 2,0HcJ7S- R ?.501)00+ o ?,Hl+~5- Ml?fioROPUl
2.S5UUU+ (J b.:z~g>- 8 2.6noOO* 0 2.3+591- H 306<090+ o l,711~($b- m12111)rIOt!Ul
2.10fJLJU* U d*~~n34- 8 Z’075f300* O 2.99s6’1- P ?.EnUOo+ o ],6/0<!5- M1260qURUl2*H2:Juti* 0 rf*37hi’ti- d 2.’7oof-)rl+o 7$1’+t~/11- ~ >.(~’.,lloo’ () l*41~+J- Ul?fJo~~)f~~Jl3.00o0u* U 1.?~8R$- 8 3005000+ O l.4525~- R ~alnooo+ 0 1.55941- 81260ROOul
J.15nUU* o l=~lf)?~- 8 3.~onoo* O 1~21*83- ~ 7.?6000+ O 1.11+U~6- ~12~080f3u13.3onUu’ o 1.,~8078- 8 3.35000* u 2.01U80- ~ 3.4nOoO+ o 1.52M~b- M1?60R08u13.45[)UU” u l?u2132- 8 3.50000+ O l*5U/37- n 3.5qOOO* O 4.03640- 81260R09u13.eoood* o 1.59637- d 3065noo* 0 /.41u~?- 9 a.7nooo+ o 1.0?544- u1260nnalul
3.751)OU* o 90J37(Ju- 9 3oRnoo0+ O ~.l/134- H ~08~uoo* o 5.662UR- Q~?fIo13URU1
3.~oflou+ o b:’+Ci909- 9 3m9%ooo* o 5.3br82- Q 4.OnUoO* O 4.4~4U3” 917~flau~ul
4.u51JuCJ” u l*yc!lQr& 8 4010000+ U 2DU6~11- ~ 6.lSUOO’ o 3.57b{~0- 91260R08U1$.ZOuUU* o +.15n~9- 9 40p5000* o l.lt?bo~- R k.30000* o 3.272f~7- 91?60qUSul
4.35nUu+ U l~d547Z- fJ 4.40000+ O 7.7y’+29- ~ 4.4%(Joo+ o 4.39’+UO- 91?60q08Ul
&.50000* u d.tJ669- 9 40550no* o 2.?~tio%- ~ &.6nOoo* o 5.(J7i36- 91260~08u14.65{)(Ju* 0 l,YH~qb- 9 4070000+ O T*Hb44H- 9 .4.7+000* O l.Rlull- 91?608~)8ul40H710UU* u 1.!Of?9tJ- ~ 4cR50no+ o ~.5449H- 9 4.9nuoo+ o 1,4/8/1- yl?611POOUl4,95000+ (J l,(571t!- 9 50nnn00+ u 1.20bs6- ~ %.ocl)o~. o 1.4.?I?b8- yl?61)~08ul
5010nOu+ U l.UY471- 9 % lso~o+ () 5.fY4~85- 9 %O?OUOO* o 9.91~fo-lul?~oqo8ul5.Z%OOLJ* u l.z2~(-)2- 9 5:30nno+ u 1,4’+y.3j- q 5.3cooo+ o 7.29uy5-lu126041J8ul5,4000U+ u d.454z9- 9 5,45000. 0 6.lus73-in ~.5nuoo* o 2.5~356- 912~fJ909ul
5,550uuA (J 5.$~56+-10 5.6nnnn+ II 4.Q194?-10 5.6<000+ o 3.QOb+7-1U12f19Q09u 15.70(JI)U* (J ~:/~5Ku-lu 5.75000+ u s.l/Ubl]-ll) q.8nuoo* o ?.841’>j-~Ul?6(_lqu8ul
5.850uu+ u 2./5’581-10 5.qOOOO+ u i?.bbb93-in 5.9~ooo* o ?. 03012-101 ?A’)qURul6.0000IJ+ u t!.d6n3/-lo 6.05nno* o 1.65s71-10 6.1nUOO+ o 1.7H138-lu12f>fln1)8ulb.l%liuu+ u l*~ef4z3-lu 6.pnnoo+ u 8.>b~b5-10 h.2$iUnO+ O 1. 17591-10]?60Rd8u1
6.dunUu’ u 1.U901+-10 6.35000+ U 1.UUy42-in 6.40UOCJ’ O 9.30U~~-111?60~(lqu1°6.6sooU* o u.Si!5d7-~A 6.qnnO(]+ o 7.70tis3-11 rj.5’=.uoo* o 7. 038A6-l1126nqu8Ul
60600uu* u bo~343z-11 6065000+ o 5.6500/-l] 6.7n000+ o 5.00b’~7-l ll?60q!J8Ulfic75uou+ u 4oja~lJ-11 60FIoooo* u 3.8u184-11 60@5(JOO* o 3.25~~9-lLl?~f3qO~ul
b.909UU+ o ~~!~13d-11 6,q5000* o 7.2/114-11 7.onOOo+ o 1.134b~y-l ll?6;]qJHUl
/.O%OUU+ U 1.469[)2-11 7.lrIooo+ O 101*39U-11 7.lKOOo* o fl.746f6-lZl?60qJ8Ul7,2000u. U b.eu4fi3-12 7,z5000+ O 4,8r46[1- !2 7.30000* o 3.50bdS-ldl ?60nOllUl?,35uud+ u ZR~77H9-lZ 7040000* O l,4b42”f-li’ 7. 4%fJofJ* () 7.)31tJd8-lJl?6flnJGul7.50cou+ u LISUUOOO+ IJ o.00000* o O.OUUOO+ o o.onuoo+ o Ooooouo+ ul?hnqufiul
0. l!OOOOE’OZ o 0 1 15Ll?fiOfiU8Ul151 1 0 n o U1260R08U1
O.(JOCUU* u ~*bbo60-lu 5.0~ono- 2 i?.2’+d81?- Q l.OnOoO- I 2.75?~6- 91?60R08ul
lo50floLl- 1 5.3ti71b- 9 200fioo0- 1 fY.71tJ5”f- 9 ?.5nOoo- I Fj.69%bl- 91?f50q08Ul
3*o(louu- 1 l*a5%7~- 9 3.%rJ13t)o- 1 Q.obd48- Q 4.0nOr)O- 1 9.37811- 91?611q:)8Ul*05(l(joiJ- 1 1*<34153- t! 5.00000- 1 1.09917- R 6.5fio00- I 1.41351- tl1260R08ul6000(IUU”’ 1 d.d607d- U 6.50000- 1 1.18543- 8 7000ilo0- 1 1.7$17d2- 81260ql)8Ul7.5n~]uu- 1 l.l1777- 8 8.ont)~O- 1 ?.34~1.\- R R.5n000- 1 1.549LJ3- Rl?fJORuHul9ooouuu- 1 1.’~9FJ~9- 9 Qo50CJfIII- 1 1.8U!Y65- H l.OnOoO+ c 1.639/8- f31260R08ul
1.050ULJ+ u 1.47367- 8 l.lnooo+ O 2.7j~22- Q 1.lCOOO* O 1.1~610- Bl?bOnuqul
43
1.3~@OU+ U 1.~40;f- 8 1040000* o <.6~e69- R l*4~ooo4 () 1.95931- Hl)6fl~ooull.~(){]’JLI+ V li’jf.lk?- 8 101j50(J(j+ o 1.H1477- 8 1.6fl(Jo(l+ o lo~lt){?- tl]?~f)RI)8ull.hsooo+ o i*b~?61- 8 10791300* () 1.&’t’168- R 1.7q(lf30+ 0 10611JU7- 81?Ao~~~ul1.801)OU* u lo2Yl~>- /] l,H51qo[)+ (j 1.3>us9- H 1,9.IIof)e o lazllb6- U]?40RU8U11.$500u+ U lt/d~sz- 6 2.0[1000+ o 104/49’)- a ?.0%000+ o 1.05’+’+/3- M]?FIIIRCJQU12.lI)OOU* u l.+d419- 8 ?.150fIo* o 1.19U27- q >.2n(]oo+ o 1,2?199- 8]?6nRuf3ul2.25u0L)* U 1.3/9%2- 8 ze,~nooo+ o 1.4Jbla- O >03K000+ o looub)~- tj]?~~q~~ulZ.400uO* u 1.<(J2’50- 8 20k5000+ o 9.35u7$- Y 2.%nooo+ o 1.33/94- 131?AoRd~ul
2.551)UU* u 2.5111z- 8 ?Ofi@ooo+ o lolud51- q ?06Kooo+ o 7,fiRzo5- 91?60A0fjul
I?070COU* o Y.Yo4fio- 9 2.7<000+ O !.51087- 8 7.$nOOI)* o 7.Rs6ti.J- 91260R08U12.U%OOU+ u l.utJb54- fj ZC9CO(]O+ o 9.1idu3H- 9 2.9=Uoo* o 6.53593- 91?60J3UIIU1
3.00[]UU+ (1 /:J96Rl- 9 3005000+ o 6.73151>- Q 7.lnOoO+ o 7.R3+18- 91?%f)n08ul
3.l%UUU+ u b.:2115- 9 3c?oooo.” (J %.73U9Z- 9 3025f)lJ(_l+ (J 5.%7419- Y1?60R08U]
3.’JOOUIJ+ u tJ.j47n6-t
.3:35n(30* u lo2d44?- ~ 3.4~(JlJo+ o 7.11?+/- g)p~()$l()qlll3.b5n6u+-0 ““4.+J2Q6b- 3’,%nnOn+ o R.99<5s- 9 a.’i<(100+ o 1090H99- Bl,?6nqUOUl3.b(J(JuO+ ~ /.~~972- 9 Sofi<(ll)l)+ 0 3.5102~- Q 3=7nUoo* o 4.9Fj2/K- 917613Q081J13.75CUU+ o 4.s563J- ‘J .3.nnOOO+ O \.byb63- 9 ‘3.FIKOOO* o ?. 73207- ‘J12(.(JRU8(J1J.9(lf)ou* u J.139<2- 9 30~5000+ o 7.bl~92- ~ 4.oo(l(Io* o ?.07+Y4- 91?{>Pq08Ul4,c15f)olJ* u 9:lll15~m- 9 4.1oooO+ 0 1.2/004- n t,.l<u~r)+ 0 1.63/’Jl- 91~6nR0t3u]40ZI)[JOU+ (J l.tiO$+~b- 9 40?5~(]o* o 5,~’J>)(J- 9 A.3n(ll-J~* o 1.5’’(H’+1- yl?60qotiul4..i5(Jqu+ u Y*ulo14- 9 4.407)(lo* (J l*d3.$#5- Q 4.+C:UOO* O ~.l~lt>!~- ‘l?Ail.ntitibi40!5000u* u l*dU919- 9 405501)o* o QQ?7Su5-10 4.6fiooo* o ~.248/4- Yl?fj~808ul4.b~OUo* O ti.0287b-lo 407p@oo+ O R.05914-10 4.7<OoO+ o 7.fl?l/l-lU12fiOqo8Ul4,8000u+ O /.~!144-lo 40fl’5000+ o 6.54d60-lu 4.Qn[]oo+ o 6.145U1-1U1Z61ROOU]
4.950UU+ ~ U*0d8?5-10 5.00ooo+ O 502d~28-10 ~.O%OOo+ o 6.~5/+9-lti1260qUHUl5010,)uu+ u 40~9H5u-lu 50~5000+ u l.ribYlH- q q,pquoo+ o ~,8z8dH-11.j12608U8Ul
5.Z50UU+ u 6;40119-lJ 503nooo+ o B.?bsll-in %.3%000* o ?.Rol/3-lul?60808ul
‘J.~)o;)ull+ 1) l.o137tJ- 9 5.45000* U ~.2b’Jol-10 %.5riOOo+ o 1.230b2- Y126CQOPIJ15.55(JUU* V 1.6!J34*-lu 506n000. O 1.b.5)23-10 5.6<(Joo+ o 10394d0-lUlz60ql)8Ul
‘J.7onOti* n 1.Zb647-liJ 5.75iJoo* O ;.o~J7d-in %.RnOoo+ 0 9.44~’+5-ill;’60Q08Ul“S,M%UUU+ O b.4148u-11 5,0nf)oo* U 7.35289%14..% .9KOOO* (j 6.03f1’*4-] ll?A’3nIJ8Ul5.UOllUi~* c 3.b/51u-11 fi.o~noo+ o 4.49?75-11 6.lnuoo+ o 4.~4~f9-l l],~60qU8Ul
6.]50uu+ o d.4Y46u-1] 6,?ofioo* o 4.1JU*j3-in 6.2~(joo+ o ?. IIIJI?(18-111?60RU8U16.~o(jUu+ o d:57ZIiZ-1] fi.351)I)o* o 2.370?1-11 f..4fIu/)9+ o P0172b5-1112(.09,J8111604\,)uu. o 1.Y7Q7-{-11 6orjcoo9+ o lc79dfj5-11 6.~~ljoo+ o 1.609d/-l1l~6n9lj8ul
b.boolJd- u i~4d3”J5-11 6.65n00* u l.?~bll-ll A.7rIuor)” O 1.105/b-lll?60Q08ul6.751)UU’ u Yo>J~?4-12 6oR(lf)oo* o 8.lu~lb-12 A.S5000* c1 6*7/~35-lr?l?f31)aoaul
b.9onuu* u b.bbll~-l~ 60Qs000+ o 4,43f34-12 7.ofiooo* o 3.44bi3-lz1760q08Ul7.051)ou* U ri.bu5c)7-lZ 7olnooo+ o 1.80/49-1/ 7.1%UoO+ [) 1. 30UUZ-ld1260q08Ul
“?.zocuu* o tJ.db?ob-ls ?02500u* o %09893<-13 7.3n000* o 4.23uf2-l~lz6f)q,)8ul7.350uu+ u z.89030-13 7,~nnno* o 1.Hu+.jH-13 7.4ROOO+ o Q.91Ht7-l*lp6nq,19ul
“/*5flou.J* U u:uu1100* U O.onOoO+ O n*OOUOl)+ O o.OnUOO* o o.OUUUO* ul?60H08Ulo. 5.u(JouE*02 o 0 1 15i126nnu8ul
151 U1260R08U1
0.00(JU~J* U l*~l~4b-1~ S.OnooO- ~ ~*H~y81-L~ 1.OOOOO- y 4.7861/-1~126090~u1l.5u(luJ- 1 1.’+JJ3nJ- 9 20nnooo-3.uo[)olJ-
1 lolz33.?- ‘~ 7.55UO(J- 1 ?.13H57- 91269R08ul1 d.~+3~f- 9 3050000- 1 ,.bo?fj?- Q 4.onuoo- 1 2.63432- 91?Af,t\O$lUl
k.5uoou- 1 Ssby634- 9 5.0noOO- 1 7.~b~42- Q q.5f)(Joo- 1 4.16411- 91?60Qdt3ul
6.0(juuu- ] 2~b.j475- ‘> 6e5~ooo- 1 ~.Sd~93- Q 7.onOoo- 1 4.15~Ub- 91?60Q08UI?.50111Ju- 1 d.v.)~~b- 9 600001)0- 1 6.Iu<57- 9 q.5nOoo- 1 S.02i?91- 91?60RU13U19.OonUu- 1 b:04?4Z- 9 9,500fJo- 1 30~3196- 9 I.onuoo+ 0 50662d9- 91?613f?d8ul1.U5UOU* U s.lbh2Q- ~ 1.1OOOO+ O 30b~u26- 9 ~.~~l)oo+ o 2.411s4- 91z’6f’)no13ul
l.ZOUUu* u 5.Z~365- ~ 10?5000+ O 3.18<30- q 1.3nuoo+ o 3.185<7- 91?60fli)Hul
1.35(!LJU* c1 3./1343- 9 1040000* u L.42193- 9 1.4Fooo+ o Z0527UH- Y126~tlUf3Ul
L*50!JyiJ- u 3.10777- 9 1.55000* IJ 2.03=19- 9 1.6fIOOO* o 2.?19bb- ‘l?60q08U1
1.b5(~Ou* o 3*477?~- 9 1.70000* o ?.13397- Q l,7<lJuo+ o 2.?3!j3u8- 91?ho9U8U~
~.~Ool)!J* (J 2.1~q73- 9 lo850Qo* o 9.1t!/95- ~ 1.9nuoo* o ?.04u+9- 91260808ul
1.95UUU’ u 19fJ5141- 9 2oooI)oO+ u q0511b2- Q 7.O~UOO+ o 1.631b6- y)?601108Ul2olcl(-luu+ u d.u4~69- 9 2015000. 0 3.15492- 9 7.pOOOO+ o 1.94ZU3- ~lphfIRo8ul
20<5(3UO* u L:!~ll-)7- 9 203(lrJ1-Jlj+ () 1.4bzb8- 9 ?.3’=UO(J* () 2.02fl’~fJ- Y1260RU8U1
.?.4QoUU* u lt;??hb- ~ 2,45000+ o 1041115- q ?.5nOoo* o 1.73937- y]26fJao8Ul~.SbOUU+ o d~4~039- ~ 2.60000* O l.6b151- 4 7.6SUOo* o 10295y6- 91760808UI
2.’7O9UU+ o l:21Q9/- 9 ?07500f)+” o l.Yll$34- Q ?O~~UOC+ o 1.20bd7- 91?h0R~8u1
~.U50UU* O 1.26571- 9 ?,9n000+ O ‘A.H7b93-i0 ?.’?%000+ o R.916y3-lUl?60n’;UUiJ.UOL)OO+ o 1*11972- 9 3.05000+ o 7.7ot5b-lo 3.Iquoo+ o 1.29~~2- 91P60R08uI
3.15i)Ou* U 7*1’’3%u$-10 3.pnooo+ O 7.6b233-10 3.2KUoO+ o 7.98/*~-l~l?60RUC3Ul30J(J[)UU* u l.?17?b- 9 3.35000+ u ?.olYcl~- Q 3.41-1000* q 5.6t146H-lu12+oF?ofJu1
44
.3.45(1LJ0’ u b.bi4~~-io 3.5flooo+ o ].b1196- ~ 1.5%t)ou* o 1.031-$4- 9]260f108ul3.6001Ju* O 4.,/:5’2!-10 3065000* o 4.?9513-10 307nOo0+ 0 4.H+’Jly-lU12AOql)8Ul3,75001.J* o J.+07S1-lU 3CRno00+ o 4..34571-10 3.QKOOO+ o 3,00dt7-lu1260$lu8ul3.90cIuu+ o *:d~f31Cf-lIJ 3095000* O ?09007u-1(1 .4.OnUOO* o 1.R70/2-lul?6t)RuBul4,C150(JU+ (1 3.106HO-10 4.~f)[)ofJ* o l.3tltfh3- Q &.l%Uoo+ o 1.20916-l~1260H08ulo.zoLIou+ o 1.~06?u-lu 4oZ5000. o I.61H57-10 4.3nOoo* o 1.34d~.?-lul ?fIf)RUf3Ul4.J501JU+ u 10,527fl/- 9 4040000+” o 6.3//H8-ll 404~000+ o 1.43i40-lu 1260f10f3ul%c50(1Uu. o S.~13pl-11 4C55000. o 6.71>06-11 4.6n[)oO* o 4.n40~~-l~12AOROtlul
406500U* o +*<8664-11 4070000+ o 3.9Z590-11 4.7Fuoo* o 3038fjbl-l 1126nQ08ul4,uofl(jlJ* o 3.107.3/-!1 4oq5(7~lj+ o ;.8d955-11 fL,9f.oo(3+ o 205~?48-l ll)69P08ul
+.950ULl+ o /C2334~-11 500nooo+ o ?.1Ud54-11 500%Uf)(l* o 5.2h5y5-l LlZ60QOf_lUl
5.10iIuu+ u l~(Y9nZ-11 5015000+ u 7.51(J97-1o %O?nuoO+ o 1,45 ~~~0-lL1260QI19ul5,d5fiod. () 6091242-11 5,30000. rJ 1.odd5J3-111 G.3FIJOI)* (1 1.041~~-l ll?60quJ3ul
5.4C)OUU+ () l~~luq>-11 S0450(30+ (1 8.3b,@47-l/ 5.5n(Jf3~+ o ~.430sfl-] ll?&r3qot3ul
5,55(]0ti+ u ‘J./47hb-lz SOA”Of)O+ 0 5.9933f-l? S.f)=uoo+” O 502tii*3-11?]2A0~d8u15.70{)uu* u 4s!(JH’I;-12 5075~90* u 3.9b~69-I/ 6.RrOOO+ o 30.\’i~/5-ldl?60R08ulbc850UU+ u k!07y40/-12 5,Qoooo+ o 2.27089-1? %e9%ooo+ o lo79~*00-121260808ul
6.UOOOU* i l{3!30~-12 6.05000’ 0 l*OOblO-l? 6.lnOoo” o 7.009d5-131z60RO13Ul6.150uu* o ‘$.5509d-13 6,znooo+ o ?.7dZ33-lz 6.~Fooo* o 1.629@4-131z%oqflfl(flb.~oot)U+ U 1.Z18RY-13 6035000+ O 1.11 ~20-13 6.6fIUoo+ o 1.024dS91~l?6f18J8Ul6.450fJ{). u 9i331RIj-14 6e5nooo+ u 8.44295-14 6.5<UOO* o 7.5~2e~-1412608U8Ul6.6000u. u ?~14719-1.+ f6065000+ o S.9456?-14 6.7n000* o 5. 183JB-1’+1P608u8016.750uu* o ~.~5669-14-6.RnOOO* O 3.7~~31-1* 6.8~000+ o 3.13bb~-l+l?60q08Ul
b.~oouu. u Z.347A4-14 6oq5000+ o ?.0131jl-14 7.onuoo+ o 1,5.?/~B-l+1260808ul
7.(IC,00U+ u lilz37a-14 7olnoo[)* o “f.7/553-15 70151)oo* 0 5.02$147-131?60808017,200’JU+ U ~.U3695-15 7075000+ O l,7yb5e-15 7,3nOOO* o 1.2ZO~0-lbl?60t3U9Ul
7.350du* u b.34Qou-16 7,4nooo+ o 5.2ddo5-ih 7.4K[1130* o ?.Hfj159-lbl~6f)8UflUl7.5ooou* o u:uf.)I)ou* u fJ.0(1~()()* u 00IJOUI)U* fI f).orjIJtju* (I 0,00UUO+ Ul?6f)ROMUl
o* l:UOOOE+OJ o u 1151
15i1260n08ul1 0 n o ulp61)qo8u1
O.ol)oou+ () e.~401b-11 50(lf)()(lo- 2 1.9~/f7Ll-A!\ l.OnOOO- 1 ?.969d7-1u1 ?$f)f308U1l.’Jc(jou- 1 d::u07b-lU ?.OOOOO- 1 6009Z79-1(] ?05nOO0- 1 1.09*UZ- 9126fIaORUl3.00(jUu- 1 1~/~734- 9 3.%nooo- ~ II,~)Z+56-lo 4.opooo- 1 1.35z~>3- Yl?(joRO}]ul4.5ooOu- I l~9~001- 9 5oofl@oo- 1 1.15’+71- Q 5.5n(fo0- ] ~.051J/- 9]26nqu8u~
60000uu- 1 10s847+- 9 6oqn000- 1 1.%7il’/- 9 7.00000- J ].HUb’+b- 91760308u17.5flolJu- 1 I*f84k4- 9 8000001)- 1 p07J<4b- V R.5,~(IO~- 1 ~a91fJd~- Yl&f)f?OflUl9ooofJfju- 1 +0<990/- 9 9,5n00n- 1 ~,38d0fj- Y }ooq,!Joc+ o 3.792”/8- 9]7/+oI?l)f{lJ~
1.U5UUU+ u i047653- 9 lolflo(l(J+ II 1*9~354- ~ I.lGIIOI)* () 1,21403- Y126nRnHul
1.20000+ u d.<730z- 9 10?5000+ 0 1.6Jm35- Q 103noofI* o 1.397b2- 91?~nRu8ul1.350UU” u d:u76?/- 9 1.4qooo+ o 7.19U65- 9 10.ZFOoo* o lC141t0- 91?60ROH1!!
lo5flcluu+ u 19.939fl?- 9 1.q5~o13+ u 9*98L36-10 ].60(JOO* o l.ofiotfi- y12Aoqof3ul
l.bSoUU+ U 1*~1775- 9 ]070000+ O 1.05B11- Q 1.7%UOo+ o 1.5]805- Ylz6fiflU!3Ull.UoooU+ u 1.u~4’)b- ~ loR500n+ u i.13106- y l.Q~uoot o 1,0,].j~l- 9126fi808ull,~soou+ u /0’tlfi7ti-lU 200nooo+ o 1099505- Q ?coC.uOo+ o fa.09bJ9-lul ?60q08ul
2.louOU* U 90Uf3?3”~-lu 20150uo+ o 1.9.$069- 9 ?.2fIooo+ o 10ob//~- 91~6f)~I)8ul
2.Z500U* U 5.19399-lu 2.~nOOf)* (J fI.57+11~-10 ?.3<UOO+ () 1.21 fu3- 91?~rIf30Rul2.400ud* 0 5:51674-Iu 2.4%[)00* O b.79~19-lfI 7.5nOOO* o 8.4~+b3-l:l?60QUf3Ul
2.550uIJ+ u 1.~+7q9- 9 ?.6nooo+ o 8.3628%-10 ?.6~(100* o 6.050d6-lU1260Rf]BUl2.7oodLJ* o b.9U31i-lo 2075000. 0 6.4b~5’i-in p.Rqooo+ o 5c3N~C0-lUl?60ROLlUl2.85Quu* U +:~OR9b-l(j ~,QOOoo* o 3.6+b44-10 P.9sOOo* o 4.2~!Jd(J-~U12608013Ul
3.00UUU+ o <.45009-lu 3,05000+ u 3.21t!6u-in 3.lnOoO* o 4.f13rt10-1Ulp60J708Ul3,15[)OIJ* U ;.U091+8-lU 3.2fiooO* O 3033dOU-1,) 302<Uoo* o 3. l~flo6-lul?60q08ul
3..Ioouu+ u b.Zln89-lo 3.35000* u ~S90f15-lrI 3.4nuoo* o Z.294~H-lu1260808ul3045(10U+ O 2S374’55-lU 3.50000+ U ~0659S1-1(, 3.~<Ooo* o 4.21)81~7-lu 126i)q08ul
3.60uoo* U l*$d,]Hb-lU 3065000* u 1.bU52%-l!) ‘3.7Poo@+ o 1.5H515-1U1?60AO11U13.7500u+ o lilL!;(,o-]0 30Roooo+ o 1.?Q471-Ln 3.i3~(joo* o 1. 012~3-lti126080f3Ul
S,900UU* u <.12%39-10 3.c15000+ u ra.5L134-11 4.onOoo* o 6.(171tZ-l Ll?60RU8Ul4,05uUU+ o 7ofJE3511-11 4oloOOu. o ~.UjI?lfJ-111 6.l~Ooo+ o 3,4flb>7-111?60~080140~000u+ 0 4iY~17T-11 4.?5000. o 2.94U8.3-11 4.3nUOO+ o 2.73Sd4-l 112~Oq06Ul4,~5(1uu+ u d;U~51ti-lu 4Q401300+ O ~.399f34-11 4,4SUI)O+ o ?0.3f,dY8-l ll?60Qu8ul4.5obuu+ u 1.046S1-11 4.%5000+ 0 9.1’+324-lZ A.6nUOO* o 6.62f534-l l1260QdHUl4.fJSoUU+ u /.45355-12 4.7n000* o 7.57u35-12 .407c(100+ o s.2239z-1d126nRusLf14.bO~Uu* o 4..5774tPl2 4.85000* U 4*lbd9a-l? 4.90U00* f) 3.61915-1<l?60008U14.9500fJ. o ~ob?9R1-lz %60n000+ o 7.8322%-12 <oo%uoo+ o 60ROJtil-lZ1715f)H08Ul5.1ooOU* o d..lb099-12 5.15n00* O 3.2@’+3’*-11 5.20000* o 1.63~~3-lZl?60RUf3Ul5.i?5uOU4 u ti.U2679-12 5.3flnOO+ U 1.4U115-11 %.3~(Joo* O 1.139y~-1~12AO~U8Ul5.40[]UU+ () l~u’J473-lz 5.4511fJrJ* o ?.19491-13 S.%nuoo+ c1 8.~67do-131?fiof10tiul5.5s(jou* u /.+9563-13 506nfif)Q*.o fi.b~5f17-13 q.A<Ooo. o 5.R~~l~-lj12fsoRotlu~5.?130U0+ U 5.1+723-13 50750n0+”0 4.42Q9?-17 G.RnOoO+ o 3.74191-l~l?fI17f7U&Jl
+77+78479480
4814H~
48348441354s6
487
488
489
‘4qo
‘$91492
493
494495496497498499
500
50Abo~
503504
50sbob307508
!Jl)9510
511
45
5.850uu* IJ .I61011Z-13 5oQonoo*boOoO(JO* .u 104!C351J-13 6.0’5n00*
6ol~{)u,,* u +,u24?U-14 6.7 00,)*6CJOOUU+ O 2.s951)1-15 60#Ooo+bo4~)00d* u 1.H4rJ?4-15 1505nnnU+
b,ho~UU+ U 10~0542-15 6.fi!iOOO*
6. I%(IOU* o l~U0744-15 6.JIo@oo+
b.y9:)Uu+ (I b.byhRb-16 6.~5nun+
/oo51]uu* f) J*7b549-lb ?.l(lli{)o+
ou
i!
o
0
0uo
7.<OIIUU+ o
o.14?
O.UOOOU* o19501JOU- 1J.uo(lub- 1
4.5f)91J(J- 16.(JOOUV- 17.50~ul)- 1~). oonuu - 1
l.u’-illuu* ulDZI-II)OU* o
1.J5{IUIJ* o1.’2OQUU” u
!.L51jlJIJ+ Ol.fJOoUIJ* fl
1.*SOUU’ uZ.lnouu+ uz.z~~uu. ~
~.~n(lut}+ c
.2,5sljoLJ* u
2.700ufJ* u2.~~nUu* o3.00UUU* u
3.150UU* IJ3.31300U” u
3.4~oolJ+ U
J,poquil* u3./soL)d+ u
3,91JI)UU+ u
4.05r)lJu+ u+O?r-)(lud+ o
4.350UU+ u
4.5(J(IUU* (J
4.6%nuu* o
4elio,](Ju+ (J
6.9SU(JU* oS.l(Jf)lJ!J+ IJ
5.251)OU* u
5.4tJfjuu+ (j
5.5S(JUU* u
5.70r)tiU+ U
5.85i)uu+ o6.00r)ud* Ub.15[)Ut\+ o
6.30111JlJ+ o
5.4”5[IUU+ O
b.booUU* U
6.75(IUU* 0b.’~OuOd+ o7*I)50UU* o
7.zo(luu+ o
00147
0.00CJUU+ u1.50UUU- 13.IJCIQ(JLI- 1
4.sr)quu- 1
5e13~13~(3-2.0n000-3.5nn~o-5.0Qn00-
6.%oor)9-fl,ooOno-
905(1(11),1-
1.10000+1.?5000*
10(9[)00+1.%51-IO!)*
1.7ooofl*1.J15f)()(J*
2.00000+?.15000+”?.?noOO*
?.45noo+
2,60nno+?0 75non*2oof)r)ofj+
3.05n00+
3.?flp!30*3.35nou+
305nlloo+3.65(lo(l*3.8000n.
3.Q5000.
4.lrlnoo+~.25norj+
4.4n00n+
4.5qnoo+
~.7nooo*6oR5~~,,+
‘5,() .:lf)o+5.lSnoo*503n09n.
5.45(300+5.6nf)0\)*
5.7%(100+5.Qnnoo+
6.0500n+6.~nOol)+6.-45000+(,.<nfjoo+
6.65000+
6.qnoon*6.95000+7olf)(lor)*7C~5nQo+
o ()
o 02 3.34942-11 l.ofIOOo-1 1.12?92-1(1 ?.5nur)l)-1 1.2b397-lu 4.0nol)o-1 ,?*3513b2-in 5*5nooo-1 2.414f40-lo 7.0nonlJ-
1 7.3~Jb13-in P,so:ll)r3-
1 2.3d’tq9-lu 1.00[100+
u 3*1’J~2~-19 l.l<u(-lf)~
O 202~5QU-lo 1..3nU00’o 6. fJi4N-10 1.4<i)of)*
O l*+l’Jll-l~l 1.60000+
o lenJ~n3-lfl ].7GUOI)*o l*5ub77-11) 10QOOOO*
O 7.57b57-1,] P.(j6uoo+O 2.73747-111 7.2ri[)oo+U 6.71J931-11 2.3%UoO*(1 Q.33109-11 7.5nol)lJ*(I 1.4$><?C~-j{l 70hc;uoo+0 4.%+935-11 ?.RnOOn+
o 3.35/70-11 7.9~ool)*
O 3.11b95-11 3.lnO,oo*
u 4.3~~9z’-ll 302-UOO+o 7*6f302-11 106?000+
O ?,3Zb31-11 3.5%uoo+
O 104’~16q-11 3.7mooo*O 1.L/42~-11 3.8~oofJ+
O 1.06331-11 4.00U0o+o f.9ti4s9”l~ &,lqu(J()*
o ~.93yu%-1# 60311(JOO+
O 4.4uu86-l? 404SOOO+
o 3.14150-1? fA.6ouoo+o 2.51144-12 4.7GU()()+(1 1.32965-1< ~.9nuoo*
~ w:::~; ::~%:~~:
o 1*3~/79-1% %.sfl(jol)+o Y.I)<U37-1% ‘5.6<1100*
o 6.s011:3-16 %*Rlluoo+o -l*134Y25-16 q.95ulj13*O 1051~24-16 A.lfitioo+u 4.96/88-17 602%uon*o 7.5~49L)-lQ 6.40000+O %.bti~6.1-lq 6.5GOOO*O 3.9+<90-lQ 607n000+
u ?.4.?+04-14 6.85000+
o 1.c?u/2$-iQ 7.orlu!Jo+
d 3.73uH5-21J 7.lGIjo04
o 1.I)495JI-21 7.3nooo+
u u
o 05.n~o~o- 2 1054195-11 ~.~flo~iJ-
?.onooo- 1 5s80236-11 7’.51100@-
3.5n!loo- 1 %.~4~133-11 4.0nuoo-5.130000- i 1.11%59-10 %.5n(\ou-
0
0111111
0II
0
00
00
0
00
:
00
0
00
0
00
00
0
0
0
00
00
0
0(100
00000
00
00
1
011
1
1
2613$?U8U1
?60Ru8u1
01?60R08U17. 193~b-l 1126C!?UtiGiIo38837-l~1260ROt3Ul?0463d5-lU l?&OR0131Jl
?04?512-lu] 260~08ul
3.4Hb29- lU12AORi78Ul
6. 70dy7-lUl?AOfi08Ul
5.161s3-lu126nqdqul1.951io-lu] zAl)qoaul1.Hl’f/Y-llJ126nQdHul
?Ooo/90-lu1260nn!3ul]. 70!J39-101? 6CJ:?(J8U1
l,H6b{)U-lu] z4tln,)Bul
1.8~~yf-lU)26fIRl)8Ul
1.?Rlt9-l~l?$oR08ul
?.63b~2-lu ]2f50Roaul
4,Q70~.i-lUl? 60AU8Ul
~. Q24113- lu12AoniJRul
9. 77.3+9-111760QI181J1
~. Q5JL()-ll1760~u8ul
Q. 310+6- 111Z6(IR09U1
~.9?u31-l ll?6(lRo8ul
?05ti}J~4-l ll?60Ruflul?.s5r15-111?613nu13ul
1.Q3’J5cJ-l llpA[lJ30t3ul
]oQ?H14-ll lp6nnoi3ul1.5~L~3-lL12~OROflUlq0952~3-lcl ?60R08ul7.01’+5.3-ld12firIROf3Ul5,f}O~19-lc?12ftORUHUl3.97347-12126011U8Ul
2.QO(({-1?1260RU8U1lo759d]-121?6n~0aulQ.75bfl-lJl?A,)ni18ul
3.”)1 1(14-lJl?6i3auHul4.~>i!~+-161260q08ul
1.6H~~?-l~l?6nQlJf3ul1.29.?~7-l~l?6nqJ8ul8.675ZA-101?608U8U1
5.4~~~~-161260RU8Ul?.86be3-lblP6f3nd8Ul
1. 15045-lbl?60f108ul6.979u*-181?6nRoaul6.94595-19126f)~U8Ul
5.0Hb65-19176r1808Ul3,41)f/5-191?6nrl(18ul
1.QH112-191?60RUEIU1
R.H2~J/-2ul?6fI8o8ul10~5Z12-?til?61)9UBUl0.000uO+ ~l?fYoJ3u8ul
1471?60qu8ulu12fl(Jflo8ul
2.f3fi3+~-ll12608uauls.75f3/9-ill?.soJloflul1.qb611-lu 126nQdflul
lO15~~7-lU1260R08LJl
46
6*orJ[)tJd-l,5(JolJlJ-9.(lllo(jlJ-l.lJ’.rJud+
1.20CIUU*1.35(luu*1.5@oou*1.b5fiuu+~.nfjuuu+
1.950UU*
2olllfJuJ+2.C?SQUU*~040,,()”+
2,55[IutI.
2.?()(juLl*2.b5(lo~*
J.uo(,ou+~.l~l)ou+3.3ooIJu+J.45(juu*J.ho,)()(l+3,”f%,)(J~+3.9CJ(1(JU*
4.I]%OUU*
+.Z(J[)OU+
4.35(l(Jli*4.50fJou+”4,6Yti~4j+
~.6fJ()()(J+
4.95{,()()+
5.1O[)OU*S.tsf)ou+5,40,)(J(J+5.551)UU+
11
10
uu
0uuu
u
00u
u
u
uu
uu
nvu
u
u
0uu
uu
uuu0
1~/q.3Ry-lu 6,snno0-
1:40634-lU ~.ol-lf)oo-
1.H:<?l-lIJ 9,5fl(joo-”1.u~3tlu-llJ l.l(lOOO+”
7.59878-11 10~500fJ.
d.//$l610lO 1.4noo9+l:<~f)8~-lu 1.550(J!)*u.l~<?b-11 1.70000+
1*555R6-10 ]oR50p~+<./lo58-ll 2.nnooO*%<ZRA7-lJ 2015n00*
Z.y~30b-11 203nooo*<.51963-11 204S(100*
6.91?69-11 2,600no.
i;~6400-11 2.75noO+l.>ZROl-~1 ?OannOo+
J~l/131-11 3.~5noo*
1055502-11 3*7~()()f)+d.Si*94b-11 3.35noO*1.;173’)-11 3.5noof)*
f?.4!Jq99-11 3.fi5(joo*b.5’+lpt5-ld 3e~noo0+I*U4H94-11 3,05900*”
5.18p23-12 4.1nOuO+~+uf4s?~-lz 4025000+
::2~3?CA-lZ 4,4n000+
2.4z9~3-lz 4055f70rl+1.7196S-12 ~,7~no(t+
l~u81~b-12 40HFooo+5:31Z9U-13 5.~fiooo*”
1.141~5-13 5,]50130*5.2’Jb4d-15 5.3000[1*
J*1H643-17 5.4500(1+6~Zb5%9-17 fj,~nnoo+
1 1.3*~55-lu 7oorlool)-”
1 3.3d075-i(l q.5n(loo-
1 1.*115’/9f-l(l l.f)t)(lof)+u l*4~~40-in I.lf[lo(l+
O 1.lods5-in 1.30000.0 1.6561Z-10 104GOOO&
O 5.68Z5Q-11 1.6nuoo*(J 8.13/40-11 1.7~u(lf)+o 4.Ybt?~q-11 lcqqof)o+
0 1.06/37-in 2.05000+o I.2’J72R-10 2.?nooo*
o ?.58d4~-11 2.3%090+o a.39183-11 7.5nuoo+
o ?.77352-11 2.6%000+
() l*qq~O~-ll ?.fln(lf)()+
O i.4b/1~-Ll 7.qf.uO()+0 1.4U181-11 ?.lnofJo*
O l.~bt]~z-11 l,2tiuoo+
O 1.2(J~~O0-11 3.4n000*() 8.%9/26-12 ~.;<(Jo~*
(J 7.1s/?57-12 ?.7nl)()()+0 b.zbZ6”/-12 ?,8’+uoo+o 5.9$53%-12 (,.00000+
U 4~bdU91-12 401<(!oo+o 3.7b(J99-12 4.3nOofj*
o ?*’~J’~@~-lF! 4.4CUOI)*u ;.!~/23-12 /&.fl/)oo(J+o ?.59’+71-12 &.7<no~*
() ~07sL9]-13 4.9.UOO*
u 4.05/3u-i:3 <Oocuoo+(J 9.27846-14 tio?~uf)o.
u 4*4*/4~-lh 5.3s[109+u 30hbU9R-17 5.5nUoo*
O 5=1’~ti47-17 q.6=Ono*
11
:
0000no
0(1
o0
0
0
no
00000
0
0
0
:
:
000n
b15bftj
617Z;S
619
020b21b~2ci~3624e~5
b~6b27
bzHb2t]
~311b31b3~
b3.jb34
b35b~bt337
b38
b39
040b4104~
843044
b45b4be47
b48
cARDS 64Q To 23~L DELETED
****4}*********@*******6**o********o****4i* ***f.b**Lb*e****e*** ****4$*******+)***** 0s4$
128 1 0 u1?60ROHUZ 2+920.000UU* U i!q~26R7-2U 5.00000- 2 7.59349-2: l.OOOOO- : 1. 1132<d-19126r)R08U2 2493
l.500uLl- i l*~884b-19 2.OOOOO- 1 1064~37-lQ >.5nuo0- 1 1.638d4-19124(lQ08U2 2:943.or)oou- 1 1*4T%01-19 3.5(’)000- 1 1.19179-lQ 4.130!Jol)- 1 R.56247-2u1?608u8u2 2+95~.50(Jul.J- 1 bz/15?3-2(1 SOOOOOO- 1 4,b4Z09-2[) S.5nOoo- I 4.9R9y8-2til i?6nRoRu2 2~96b.OooUU- 1 b.5027Y-20 6050000- 1 5.99b56-Z() 7000000-7.5iJoou-
1 6.4bOj?-2Ul i?60R08U2 2<971 fJ.d9n34-Zu 8oonnoo- 1 7.2tJ’+2q-2n n.5nooo-
9.u(300u- 1 ?.’J’$3lb-Zu 90<nooo-1 7.63b~3-2ul ?60RU8U2 2~98
1 R.ZU473-20 J.OnOoo* o f1041913-2u1260n09U? 2~9a10U51JGLI. o M05(J344-2(J lclnOoo+ U 8.7d411-ZO lolqorjf)+ o 80R2190-2U1?60RU8U2 2+00
1.20GUU+ u ti~Hb8fi7-20 1.P500@+ o R.84/39-dn 1.3nUoo+ o 17.7!J~~6-2;l?60R08u2 2’+011.J50UU+ u 8.59763-2u lo6n~oo+ o 8.3bb5u-20 1.4cnoo+ o 8.obblo-2~126nRo8u2 2402!l.boouu* u ?06YJIPC!-2LI 105GOOO+ o 7.2bb89-Zq 1.6nuoo+ o 6.779JI-2(J 1?6080Bu2 2’+0S
1.650uu’ U @:~3R%5-2u lo”70000+ o %06!Y152-c?[) 1.7qooo+ o 5,0z9t+4-2u1260/lI)@u2 2+04l.fionuu* O ‘+?~8SO*-I?0 1.R5000+ O 3.72042-20 1.9nuoo* o 3.0f17~0-21Jl ?608U8U2 2’+051.950UU+ () c’.+277b-2U 2000000+ O 1.82263-?u 7.oFOOo+ o l,2?(lb9-2u126080H:2 2+06
2.1OOUU+ u /.y~Q3H-21 2,15n00* o 4.15/31-21 P.?niJOIJ. o 1.611’+7-211?6nRu8u2 2’+072.z51-Iuu* u ~S9Ul\[)U-22 203noo0+ u 4.7<H15f-Z? ?.3c.000+ o 4,4157u”T-2c?1 ?60R08u2 2+0820400uu+ u 4.z267H-zz ~Q45000+ o /.,0uuo6-z4 ?05nUuo+ o 3.780+R-2dlz60Ru13u2 2409
2.550tJu* O J~5b966-22 .?,6fIooo+ o ~.3bdzo-d2 9.6=000+ O 3. 17M~4-221260F10t3U2 2+10
2,70(IOIJ+ u d.99f19z-zd 2075000+ o p.133L9~)-2? ?.Rnooo+ o ?.6qc’35-22] ~60Huflu2 24112.fi500u+ u /.54542-22 2,90noo* u 2.41(J1H-2? 3.Y%OOO+ o P.292<1-??I Z608U8U? 2’+12~.oo(jl)d+ Ij ~<’lr’3nb-~~ 3,05000+ u ?,051JIj7.-2~ ~elnOoO+ 0 10940b0-2~l?~oRu~u2 2+~’3
3,1500u* o 10U2611-Zd 3,p0uoo+ u ;.71J7t~-Z? 7.2%1100+ o l,60Jyb-221 p6nRU8u2 2’+14
3*30(10U+ U lw~~q~~-2~ 3075000+ o l,4u013-Z2 q0411(joo+co l@30714-2~]p~OilURu2 ~+lb3.45flUo+ U 1.Z1927-2Z 3,5n~on+ u l.lj(o$-~? 3.5S(lu0. o 10059’+o-2Zl?60ROflU2 ?’+lb
3,bo(IUU+ U Y;U7862-23 306%000+ O 9.ZUj!7i-23 307noO(l+ Q R055’J’+4-231 ?{,0RU8U? 2’+17
307CI[)OU+ o /~yb074-23 3,P~~oo+ o 7.41d77-i!3 30RG[)I)(I* O 6.()]b~x-z~~?f!oROfiU% 2’+18
47
3.9000u+ O 60+6398-23 3;95000* O A.03d71-t?3 A.OnOoO* o s.6[1~9-231260J30t3U.? 2+19
4.05(IOU+ U 5~1904b-23 4.10000* O 4.7H405-?3 4.15000+ o A.3R8bl-2~l?6nR08U2 24?04.200U(J* O ‘$:00574-23 4.7’5000* O 3.63d91-d.{ &.3flUOO* o 3.29Z~l-2Sl?60J3U8U2 24Z’1~.j>oOU+ u Z..y~~60-Zj 4.knooo* o j.~bul~-t?~ 4.4~(Joo+ o ?.37~oy-2~l?61)~o~u2 2422t+e~”uuu+ 0 Z012~34-2~ 4055u00+ o 1.Sl//RI_)-~3 &O{,~O~O* 0 1.6ebY4-2sl?f,f)qu8u2 zQ23
4.bbouu+ o 1,’+30110-23 4070000+. I.I 1.2ZHUT-23 A.’7%uoo* o 1004UfJ3-2~l?60111JJlU2 2+24
4.Mo(jUU* o H:b1312Z-24 4.J25000+ U 7s1.?H134-24 &.~oUoO* o 5.70 f~9-2412613n(18U2 242540950UIJ+ u 4.+111s-24 5,00n00. o ~.2’+f21-d4 5.05uoo+ o ?.23b~2-2412608iJ8U2 2+Zb
5.1ocOU* o i.~937b-24 S.15000+ o 7.34174-2s %.zn(!oo+ o ?.770/8-2bI~60RuBu2 2+?~5.250UU+ U 3:y~661-26 ~O~O(lOO* 0. 1.7t?/21-Z9 <.3<000* o Ie54c?51-2Y] ?6011UU~2 2+28
5.4000u’ u lsd~06b-29 50450CO+ o 1.2446b-29 5.50000* o 1.1t/96-2yl?6nJJn8u2 2429S.55nl)u+ u 1.U15J3C!-29 5.6nouo* O 9.0~.?23-Jf~ %.6’iUOO* o 7.9(;bOH- 3ul?60nU8~l? .?4305.70(IuLJ+ () bey~6$I0-30 5075000+ O 5.9’4Z44-Sn 5.F?nooo+ o 5.0hb’+ 1-3U126UJ_IURU2 ?+.315,8513UU+ U 4,197’bM-30 soQflo@o* o a.3Md86-31) 5.9~UoO* o z.6*~~6-3u12~ofi08u? 2“32
b.Un@Ou+ U 1.y77t3b-31J 6.05fIoo* u 1.3$/39-3!3 fiolai)~n+ o ?. OtI~~4-311?6fJ~08U? ?*33b.15[~uu* u 5.1>o19-31 6,?nooo* o ?.28b92-JI A.~KUOO+ o 5.62Zeo-3dl?6nQu[\U2 2434
6,.jOoUu+ u 1.S57Z>-33 6e35000+ o U.UUUoo+ u n.ofiuoo+ o o.ooOUU+ U1?6081)8U2 Z$35.. .l?6rlMl) o 2’436
9.223~L*04 <:4104L”U2 o 0 0
00
Ul,?60FiVHtJ3 2’+37
u, o 0 1 241?6ml[JOu3 2438
24 0 0 l-l 0o* u.
U1P60QV8U3 ?+39o 0 1 1261?608U8U3 2(+40
12b 1 0 CJ IJ]~60QU8U3 2’+41
0.00i)UU* O 1.00275- 9 500nooo- 2 2.39~10- P I.onooo- t l.5R2(J9- 61?6nqoOu3 ?’!:>
l*5000u- 1 lsO~55b- 7 2.nnooo- 1 1067180- 7 ?.5no00- I 4.R10.?5- 71?60Fiu8u3 2*433.0i)oou- 1 9..04’31>- 8 305~(3(30- 1 A.4/b~l- 7 4.f)fio(3f3- 1 3.742/9- 71p6nRosu3 2~444.5!)f)uu- 1 1.~93?4- 6 5.00000- 1 ?..oZ414- ~ <.~nOOO- 1 ?.118J2- 61?60808u3 ?’+456.1)fJouu- 1 ~. f44n9- 7 60~noo0- 1 l.~bd~~- 7 7.ooooo- 1 3.143.13- /]26f)R08U3 2%46
7.50000- 1 1.94761- 7 Q.ooooo- 1 H.41bs6- S fl.5nOoo- 1 1.33535- !l?6nUU8u3 ?’+47
9.u(!oou- I 1.92602- 7 9.5n000- 1 4.23937- 7 l.On(JoO+ o 1.27350- !l?60f108u3 2+48l,u50uu+ u 2.4;R45- “/ ].lo~o!)+ u R.u’).259- ? Icl%UOO* o 4.747+4- tJ126fIRU8U3 2*49
].ZOOUU’ 1) l*Ub~73- 6 1.?5000* U >.54>97- 7 1.3nuou+ o ‘5.99311- T~761)RI.lRu3 2*5o
1.35uiJu” o i:b>368- 7 1.4np~~* o A08jd6?- Y ].4<uoo* o Z.3H?~9- f17hoRIJflu3 2451
l.bobull+ u +~lo59Y- 7 1055000+ u P.o/bs%- 7 1.6qooo* o ~0340~’j- M1?608U13U3 2’152
l.bq~o~+ u ysullso- 8 )07nooo+ u 1.(jtJu.41- 7 ~.7K110(J* o 1.95199- !~7fjoal)8U3 ?%5S
1.80(]uu+ U ‘+c:50(,8- 8 1,R5(IOO* () l.ZUU/,tl- 7 l.qfl~oo+ o 4.6Q/~H- Ml~fio13L)t\u3 2454
1.95(,uu+ u l,31J~~~- 7 2ooOooo+ [) 13,49M40- q ?.oquoo+ o 3.64497- M12AoRu13u3 ZI+55
.2.IO13UU* (J 8*8+5?z- 8 2.15000+ O ?.3b484- 8 >.?nUoo+ o 5.f121/l- H1260JlURlJ3 24S6.2.250UU+ ~ f*tJal?7- 9 2.lo130f3*” o 9.?4d7/- P 7,35(JOO* c1 30130445- M1?60QU8U3 24s7
2.4000U+ U ~O~s)]zU- 8 2e&5000+ U 2.H8~29- 7 >.50UOO+ o R.53~16- 81?40q08U3 2’+582.5SnUIJ+ o 2.Q~171- 7 ?o~qooo+ o 8.6~149- R 9.6500@+ o l.~ala%- 81?6013LIRu3 2’+592.713~u(J* (J d.cI/30ct- 7 2.7’iooo* O 10?U@6/- 7 ?.8nooo* o l.o~lb~- 71260Ru8u3 2+602.P51JOU* O 10L8c399- 7 2.c20000+ o !.0+/89- 8 >.9quoo+ o 9.35042- 91z60RU8U3 2*61~.(JOGOU+ u 1061RP4- ~ 3.05(_Ioo* u 2.5+s55- 8 3.lmuoo+ o 4.73117- I?1760HoHu3 2+623.1500u+ u <:~3R%3- 8 3.?n(loO* u l.oAuo?- P 1.2~ooG+ o 8.oo2’+b- ~I?60flU8U3 2’$633.3onuu+ U c2.~u~l17- 8 3035000* o /,,h4d~?- R 304nooo+ 0 4.4/zmJ3- 817,h0Rufiu3 ?+(J43.450UU* u 1:1819>- 8 3.5nooo+ O 3.blllfJ- Q 1.5<ouo+ o 2.14d~3- 7126fJRtl&lu3 2465.j.600uu* u bo?$41ft- 8 30~%noo+ o 1.51.?13- H ?.7nooo+ 0 ?Of1711~- 81260nunu3 2+66
3./5ut)u* o d.d+one- d 30R0000+ O 4.43083- M “!.8%oo0. o 1.5F?3’+0- Y1?60RuHu3 246730901)UIJ* o Y.4u?ol- 9 3095L)no+ U ~.613BF.- 9 4.o~UoU+ o 1.32300- 91z60JI08u3 2+b8
4,05(jiJU+ O 9.Y5371- 8 4olno00+ O Q.bc!bt32- 8 4.IcooI.3+ o Qo593b3-lU1260110&lU3 2+694.2000u. o U:~9530- 9 4025@oo+ O 5.39055- 8 4.3n000+ o 1.78~46- 91260R08U3 2*7o4.3S[)OU+ u d._1b458- 8 4.4n000. U 2.71/96- 8 4.4=uoo* o ].159L0- ~1260111Jt3U3 24714.SOOO()* U l.5bz79- 8 4.fj5000+ u 3.5Y493-10 A.6nuoo* o 5.q77f7- 81~6nnoqu3 24724.6500u* 0 1.41135-10 407n000+ O R.09U31-11 4.7c$ooo* o 5.020~7-lul?608UflU3 2’+73
4*~o(Juu’ u ?:5~343- 8 4,R50,]o+ o 1.Sdb13-13 h.q~ooo+ o ~042415- ~]760RJ8u3 2’+76
4.95[}U.J+ 0 l.54pot?- Y 50.0nooO+ U o.olll)olj+ o GooC(]oo+ o ?Oo4d0b- 8125fJQI)Ru3 ?4?55.looou* U UOUUooo+ o 5,15000+ [) 6.~!j125- il 5.?nUoo+ o 5,]5</3- 81z6fI13t)8U3 ?476502L50UU+ U l:18?60- 9 5.3(looo* o 2ol~161- fi q,3Liuo@. o 1,44++4- R126fJR08u3 2477
5.41301JO+ u l:+:18ki- 8 5a45~oo+ u p.0Eil13- 9 %.snuoo+ o Q.hf+5Jb- ~1760QO~U3 247135,55(IUU* 0 bof247Rd- 8 5.6000fJ+ o 5004117- n %.6<uoo+ O o.OIIOUU* u1260QOBU3 2’+795.7n00u* o l~fyllG<- 8 5.7SOOO+ o 0.00Uoo*” (1 ‘i.flnOoo+ o O.OUUUO+ U1260RI.J8U3 2+805.fi5t)OU+ o 1.ti4244- H !j.Ooooo* o 7.4btb/- H Lj.Qc.uuo+ o o.oul)uu+ U12RI)908U3 ?4t\~
600000u+ U ~a7?199- 8 6005000+ o OcoOooo+ o 6alnooo+ o 202B1d9- 812boR08U3 2U82
6.151)ou+ O O*UUooO’ o 6.2oooo+ o 3.45.399- Q 6.?qooo+ o o.000uo~ uI?rjo$lIJ8u3 241330. 1.0000:-01 0 1
120 1 ; o1261?6nqOOU3 24R4
o u1?60c4J8u3 ?485O.OoOOU* o 9D.~7900-lU 5.ooooo- 2 ~.24b06- R l.ofiooo- 1 ~.337b2- hlPrjcqI;%u~ 2%Li6J.500UU- 1 Y.qJ7R7- 8 200001)0- 1 1.!53U25- 7 ?05nU00- 1 404u2bT- 712601?L18U3 248?
48
3.00rJl)LJ-
4.500fJc-”e.tJ~~lJIJ-
7.5cJ()(Ju-
9.00(JotJ-1 .U5(]UU+1.2fj,)iJLJ*I,Jb(lo!J*
1.500LJLJ+
l.broou+l.bOf]LJu*1.95[)UV+
2*1O[)UU*
2.25(IfJu*2.401)LILJ*2.55fIOU*2.70(JIJU+
2.@50UU&
3.001JOU+30 ls(lfvu+
3.300UIJ*3*4”;t.2,,14~,bu~ou+
3.”/5(l(Ju*3.~onuO*
~.05nuu*4.2~(j(JlJ*
4*35(llJ!j*4@513Gou+4.C’5(JUU+
30513000-
5.0~i)lJl)-
605n@QO-t30fJf)(Joo-
9.%nnn9-
l.lnooo*1,750(30+”
1.60000.
l.%snoo*
1.70000+
1.85000’2.0[>000+2.1500()*
2.3nnon+2.45001)*
i?060noo*?.7500n*.2.o/Joo(]+
3.(35000*302(3(300+
3.35000+
3.5nnoo*
1 4.uRfJ85- 7
1 2.67428- fl
1 1.lb471- 71 7.?3/96- f.
1 3e87d7%- 7IJ 7.3/J!5rJ- 7(J 5,01CJ6’>- 70 8.1//0?- 7
(J 1.’7UYI)8- 7
Q 9*f3819.3- 8
0 ].09195- 7
0 7*~3u~lo- Hc1 ~.2.f[)9f$- R() 8.b*b9%- no 2.5!U!)b- 7
0 33*1C’103-Po 191ib49- 70 6.SS/~7- 8
0 203U595- Ho :.64Y40- Q
(j 4.39+~()- 6
(1 3.3H1O?- A
4.00000-
f5*5rlooo-7,0nUo(3-
Jlo5fllJf30-
1.00U0O+l.l~ooo+lo3nOOO*1.66000.
lc~fluoo+~.7coi313*!.cJn(JfJo*
?.(JGOI)O+
?.?OUCJO+7.3r.uoo*
2.5nooo+?*6~ooo*>*HOI)OO*?.9s000+
3.lfi(Joo*302~ol)cJ+
7043000+3.5GofJo*
1 3.2t3ZUO-1 :of1411J7-I 2e$37635-1 l.19bfti-
0 l.l3Q~l-fj 4.4fJti93-0 !5,’=10J*o-() ?,?()’++M-
0 R.740L3-
0 l.794i2-o 4.3H7-6-
0 3.300fJ-o 5.~20~O-0 p.7RJ*5-0 lJ.o17J8-
0 l.7flL’?4-0 ~.632u2-
(3 R./4b!Jl-o 6.2993Y-
o 7.30k’(J3-0 6.1sou?-
0 ?.olJ~o-
f12k(3~d13u3
01241)H08U3
71260RJ8U3/l~flf)Qo5u3
;12611RO!3U3U1?6(JJ3(J8U3/l?b~#f_J8u3/]2fjf)RLtt3u3
81?finnu8u3r17bORU8U3s]261)f3ijL3u3
M1260RU8U3dI?60R08u3
tJ126f)t301)u3
~li?br]QU8U3tJl~fioflo13u~
tI12hnq0i3u391?f,nqLJ9U3
81?6na09u391?6n308U3H1?()()R08U3
(126(JRu8u3
000
00
000
l.3~34b-
4.13’+3z’-4.32r91)-
9.133u~l-5.u”Tll(j-
7.42u44-3,37f54-7.59929-
~.8ou(jO+ U 4.u721.i- 8 4,R51’)~()+ o 1.45S34-13 &09nUoo+
.4.930UU* IJ 1.$96;1- ~ FOofl(lr)()+ o O.uuuoo+ u %.o~ooo*
~.loflob+ U f)ol)(Jl)~(J+ () 5015flo0+ o 5.629331- A 5.?nOOo*~.2~oou. o 1.133h$- 9 50~nQ00* O 1.95142- 8 q.3’.UOO+
5.4(Jo(JIJ* o 1.’c!~7Y?- U 5.45000* O 1.P21]b- H 5.~nOOo*5.55~ulJ+ 1) 5.5*737- 8 %06~~o[)+ o 4.67597- u %.66UO(J*5.7(jfJf)~* IJ i.39~q’)- 8 5.7500:)+ 0 O*OOUOO* o Soflflooo*
5.8500U’ U 1C~35fit- 8 ~,qflooo+ O 2.18914- II 5.9qUOO+b.(JOUUU* ~ ~:j4905- 8 6.05000* O n.OUUOO* O 6.lnUoo*601500u” O U*U~ooo+ u 6.20000* o 3026<3s- 9 fj.2Gooo*
0. 5:OUOI.?L-01 o 11120 1 0 fJ
O.OOoOu+ V M*151C0-lU 5.oonoo- 2 1.87991- R ].OnOOO-l.5l)oolJ- i 7.444[~b- 8 2oofioo0- 1 1.19118- 7 7.50000-
3oooouu- 1 5oy~fJ’32- 8 3e5n(J(J(J- 1 3014=’31- 7 4.011uoo-
4.5000(l- 1 9;p0545- 7 5.(3(30(J(J- 1 10~~542- 6 %05PIOOO-6ooou~u- ~ 6.114 0- 7 tjo;fi~~()- 1 9.2ui?74- n 7.0n~no-7.50rJou- ; G:q;f]: ; :.::::;: \ ;::::::- 6 fl.5.”(j~-9.(J1301)u- - 7 I.onljoo.
10U50ULJ. v iii~i$12- 7 l:lnn~~+ o q.t15/83- 7 I.lGOOI)*la~OOUU+ o a:4*q68- 7 1.~5000. () 3.74s54- 7 103nOO(I+
1.351-IOU* 0 ‘J9fJ14K4- 8 1.4flrl(3(_J* o fJ.5911)4- 7 ~.4<lln(J*1.50(JOu* o <cdbood- 7 lo55fJoo* o 1.5(J/06- 7 1.6fiOoo*
1065ouu’ U b:fct331- 8 1,70000* O 706/~H[)- H 107I3ooo+
l,&oo(lu* u J:/d471- 8 ~*l15000*” o R*3h0911- 9 ~.9rlo130+l.Y%OULI+ O 1.13419- 7 2.OnooO+ o 6.11+f74- R ?.oIiCOo*
<Oloouu+ U b,bb<~u- 8 ~a15000+ (J lo8/<~Y- fl ~02nooo+
~:f;$~t+ , b.21s9t3- 8 20 AgOOO+ O 1.82387- ? >. S6(300.+ o 5*9858?- & 2.3 oOo+ o 701bb89- 8 ?03’xooo+
2,5500u* 0 ~oU5992- 7 2e6nooo+ o 6.73c’oR- 9 ?Ob<(Joo+
2.700UU* o 10/5??33- 7 2.75000+ 0 R.96036- S 9.130000+20tISuuu* o Y.lbOS+- 8 2eQn~oo+ o 5.36bod- R ~.9SUOO*
J.IJO(IOU+ (1 l*33s31- 8 3a05noo+ o 1./5lo5- H 3.lnOOO+
J.l=OUIJ+ u 1*439R9- 8 3,p(ln(lfJ* o n.06f304- 9 3.2=lofJrJ+3.3000u* u 1.93771- 8 3.3SOOO+ u 3cf9060- Q 1.4nOoO*304500U* o 9,~9~7$- ~ 305n000+ o 2.8Zb51- q 305’jooo+
3$:OO!JU* o ?=~3!)t!8- d 306500U* 0 y*57t!53- 9 3.7~(Jo3)*
J*f500U* U l“’r?z?d- ~ 30R13000+ O q*4if96- H ?*8cUOo+j,90uuu+ o ~,44450- 9 3,95000+ o 3,63133- Q ~_O~f)~@+
o 2.15d~5- 61?613RO13U3 2~18
O 1.R18~2- :41?60RIJ9U3 2519
0 4*5’15ul- fll?bcfloou3 23200 1.2R2*9- 151260RuF3u3 2~21
o 9.110~9- 91260RORU3 25220 o.00000+ ul?6f)RORU3 2b23o OOOOOUO+ 01760qu8u3 2324
0 o.ououo” ul?6nRUt3u3 2h?5o 2.02b’Jl- 81260RUBU3 2b2!6o 0.00UIJO+ ylpfjnROBu3 2527
1 12bl?60ROHU3 25280 U126080t3U3 2329
1 707u253- 71?AfjnlJt3u3 2333J
] 3060r@3- 71260$308U3 .23311 20217z2- 71?60NU/3u3 2332
1 l.?()~~~- 6126fJR09u3 2333
1 2.231?oo- 71260S08U3 22341 fl.745~9- 812fjoRUflU3 25350 R.14t?Z7- 81?60808U3 2536
0 3.5f3/~0- Hl?6nROlJU3 22370 4,”3s6f2- 71?6f38i)8u3 2538
(J l.76ulo- (]760QLJHU3 2339
0 7.219fi8- ml?~fJROBlJ3 ?34(3
o ~.41’+~4- tl?6(Jn(l!)u3 2~~1
o 3.63$55- ~l?6fJQ08V,3 2542() 2.4’)ddl- ~l?6nnOflu3 2~43
6 4.44710- 51?60’?::;02 Z344
(j Z0251.+6- ~ E’6(1908u3 2~45O 6.743)fO- !8 260$loflU3 ?246o ].5#?J’fb- 81260R08u3 2547
0 6.86210- 812601308u3 ?348o 7.27~v3- 91260RnRu3 2B49() 3.27997- 81?fioRaf3u3 2350
0 5.67eb3- 91?60RO(31J3 25510 3.4H3.f3- til?6i)qlJ8u3 2>52
0 l.69l00- /l?60t408u3 25530 ?.054c5- 5]PA08(J8U3 2~!_14
o l.32’2f2- 9i76(J*L)f3u3 23550 l.ll42’fr- Y1?60Ruflu3 2s56
49
4.0%,,00+” (J l*yu%l4-
4.z~~i31J+ IJ o;ulp30-~,~%:}uu+ () <./u5H$-
4,51jouti+ u l.uz/,fiM-f$e(15[,()(j+ (J l.lio63-4,H~u~~* (J d.~740t3-
‘4.Y5(,01J* (j loztJs7~-5.1O(IUJ* u Uiuuof)o+
5.<50UU+ u l.ul7~u-
!J.413r)uu+ (J l.ul77J-
S.55(IOU* () :.yo640-5.?0(100+ 1) l.l24%o-5.ti51jou* o l*lbl~)~-
b.(JonOU* u Z~~5H31-b.]501)U* U l)ouuooO*
S 4,100004 0 7.60+58- Q (jOlc.(joo+ o 7,5Abl)4-lu
9 40?500(l+ o 4Qi?/353- R 4.3nfloo+ o l.Q~Uil- ~M 4m4noo0+ o l.72d6~- R 4.451joo* n 9.?43Z4- 9
3 40G50no. u >.t34b93-in 4.6not]O* o 3.71)3~2- 8
0 &.7coon* o 6.3H+34-L1 407%(100+ o 3.9~bul-lU8 ~,8sooo* U 1.2H/70-13 4.9mUOo* o 1.515mb- 89 soo~oo~. () 13.OUUOI1*” () q.o’=o~o+ o 1.29313- R0 5.15000+” u 4,ub441- q %.211000* o 3.22108- 89 5,~nn00+ o 1.4111%- R %e3%(Joo. o 9.03131- 9
8 5.650n0+ O 1.28~43- P q.5nUo0+ o 7.f104*d- ‘+M 5.finO()(l* U 3.1519n- Q 5.6<000+ o O.0(.JOUO* ud 5075(J(]()+ u O.IJOUOO* o ~.~~ol)l)+ 0 C1.lluouo+ u8 5.Qnono+ o ;.5+lb,j- R qo9c(joo* o OOO(JUUO+ (1
8 6,05noo* O R.00U0O+ o 6.IPUOO* o 1.42bJ5- 60 6,?oooo* O ;. T9+9q- q 6.?%UOO+ O 0.00UuO’ ~
0. 1OOI3O(-)E+IJO o @ 1lzb 1 0 0
O,UonOU+ u f.358s3-lu 5eOOIJOO- 2 ~.6’J+34- @ loOni30f)- I
l.5r)i)ou- 1 boJ773tj- 8 zoo~ooo- 1 9.94398- R 7.5qooo- ~
Jouof)!3u- 1 *0/U7S2- 8 3.50000- 1 ?.5t$d84- 7 &.OIIUOO- 14,500uu- 1 6.~i?07LI- 7 5oo~no~- I 1040b3u- A qo~~ooo- I
b,uooLlu-” 1 b:ol~qj- 7 6Q5~~n~- 1 7.7Y116- 8 7oofiooo- ]
7.5(joolJ- L l.l67H/- ~ ~*onooo-9.1Jo~(Jb-
1 ?..j7ba9- 6 R.5n(Joo- 11 l,c!z312- 7 9.501)oo- 1 2045959- 7 l.onuoo+ o
1.(J50UU* 0 l.’+511)l- / l,loooo+ o 4.611c)S- ? I.l%OOO+ O
1.2 (IOU* U ~.bb307-“(
7 ~.,?5000+ o 2.9YH22- 7 1.3nooo* 01.3 uUu* U 7:910A4- M 1.4nnoo+ o 5.04647- 7 1.45000* o
1.5ooUU+ o 1.904Rb- ? 1.G5fioo+ O 7.2~y10- 7 1.60uoo+ o1.6500u+ u 5:/717.+- 8 1.7 ooo+ u A.41u32- 8 107=,000* ol.tlllo(lu+ (j :.24}lQ4- C8 loll.~oo* IJ 6.~dl14- H 10QOUI)O+ o1,950UO+ u Y./tj978- b 2.nnoou+ o 5.2(159z- a ?.OGUoo+ o
2.10I)OU” u 5:7378z- 8 ~,]snoO* o 1.bh39f4- M 7.?nOOO+ O
2,d50uu. u bodl16Z- 8 2,3nooo+ O fS.2~>1*- H ?035u00* 0
d.400uu* u 3.dd~39- ~ 2.45000* U 1.41Z3b- 7 ?.5nOoO* o205500U* U l*boll~- T 2.60noo* u 5.86db6- f+ a.6%1)00* o2.70bOU* u 10J9131- ~ 2.7~noo* o 7.6b*6$- R ?.Roooo+ o~.$j%,)uu+ o 7.957Fj’a- 8 2oonooO+ o f.6515n- R ?.9Cun0+ o
3.(lotjou+ u l*18?Rf- 8 3.05(3(3(1+ o 1.44~155- H 3.1OOOO* o
3015UUO+ (j 1.05018- ~ 3.?onoo+ O !.llU1l- 9 3.?KUuO* o3.3fJouo+ u l*9i231- S 303<nno+ O ?.*Z<13- R ?.4nUo0+ o304500u* o M~;444~- ~ 3.5oooo* o 2.4Y~.92- 8 3.s<ooo* o3.600UU* U ~:09&361- 8 3,A5000* O 7.49L8q- Y ?.7n000* o3.75nO(j+ u l:bb9~b- 8 3,f10000+ O 2.9Mb17- 8 q.~%ooo+ o
3.9nuuu+ u 6.~0155- 9 3.CJ5(IOO+ o +.21UOJ- Q &.onrloo+ n4.U50UU* o fJ.yM&02- d 4.lnnon+ O A.73/39- R G.1cOO13* o4.ZOI)J(J+ u *~:d70& 9 4.?5000+” () 7.7U431- R /J.3fl(J()(3+ (j
4.35rJi)u*. u #2:~ul]/- 8 4,4nnoo+ o ].33ti27- 8 4.4Kooo+ n*.513(JOU+ o M.14649- 9 401j~nno+ o ~.bZ-$95-in 4.6nOO0’ O
4.650uu+ U 9*~1695-11 4.70000* u 506503c4-11 407c,)013+ o
4.H()()UU+ f’) t?0<l<71- 8 4.13S~no+ O 1.1y310-l,? &.QnUOo* o4.9>(JOIJ+ (J 1.1135.5- 9 5.noooo* o o.uuuud+ u %Oo”.uuo+ o
5040(IU!J+ u 9.98201- 9 5.45(300+ o5.$i50UU* U 4sO(j%21- 8 5.6nono* O5.70(JUJ+ o ~*5~154- 9 5.751300+ o!J.~Snuu* o @.u62~l- 9 5,90000* ob.000ou* o l.~l~?~- ~ 6.05000* Ob,lbouu+ u o.uo~oo+ () 607n0013* o
00 5.0000E+U: o12b o
Oo(lor)uu” u 5??1561-lU S.o(loflo- 2l.boouu- 1 J.sli74(J- * ~o~~~oo- 1
3.00fJou- 1 d.b4r-)~5- u 3.5n000- 14,5000u- 1 Z.112]K- 7 5.nnOoO- 1
6*IJ050U- 1 2.!)134+- 7 fl.s~(loo- 1
7.501)LliJ- I 5.YY754- 8 fl.(l~flf)(l- 1
9.00n011- 1 l*19Q7d- 8 9,<flnoo- 1A.OSI)UU* (j i.dd5%5- ~ 101OOOU* o
9.8e57tl-P.4d496-
o.oouon+l.lH>cJR-
ooOIJUOO*;.blu89-
17RQf4
0u
0n
:
7
7t?
777
%.5nOOO~%06<000’5.80000+”~.9G(Jf3rJ*
~.lPooo+6.2=000+”
l*orooo-?.5nL10P-
4.0nUOO-
%.5rooo-7.000gn-Q.5n(J(30-
l*ofiooo*lol~oou+
00000010
:1
111
00
120176maI!fIu3 2572
ul?I\OPl)OU3 25734.75335- ?]?1511QIJIIU3 251$
2.13034r- 7171s(lflo~lu3 ?3751.651bR- 71z6nqUt3u3 23760,{\79d5- 11?60RORU3 2~77l.l3si?15- /l~6nRoou3 2978
7.1J13so- b1260QO$JU3 2~7~6.4~6~J6- bl?60m18u3 2bR03.()’)t’tH- 81?6pnu8u3 ?~81
3.69399- 71%fi(lQl)8u3 2582l.49J4.2- 71260Q08U3 ?5M3
6.399u?- 15126n80f3u3 ?~M41.1931J9- tlP6nRu8u3 25853.lH~b2- ~l?6tlnU8U3 25~6~.04’3/3- 8126nQoflU3 2~B73.n(1391- 8)?6fJfa.JRIJ~ ~sbs
]o’+3ti/l- RlP6n~.JRu3 2589
Ij.c1539b- R17hnRu8u3 2~qul.349J9- 81260R913u3 25915.34911j- 81761~R118U3 2592I$.395111- 91~6nqo8u3 2393
?.70Bf!J- &3126fIFlL)Ru3 25944.7’+3t2- 91?6nJ7utiu3 ?~953.07b37- nlP60qotlu3 25961.503t13- l176nRuou3 2597
~.”t93**- 8126fI1308U3 ?398
l.?oci52- 91?1511Rof3u3 2599
q,2zZi3-luIZ~oqu}]u3 2boo
A.b94’+7-lfil ?f.0n08U3 i?bOll*33lu3- 9)76nR08U3 z@02
t3022ul9- 91z61)J7dHu3 ?bo3?.9r+19- R]2f,fjQrlnu3 ?t~l14
3*5?444-1U17608UBU3 ?tl(j5l.l6buo- U17611nOf3U3 .?bbbl,()(J’tllh- 81?61)AIJ13u3 2~131
Pa47~45- 81P6(IRoRu36,94”tuti- Y1?6(180(3U3 $:%
7.011f3- 91?bOR08U3 ?b10o.oouUo* u1?60Pu8u3 2311
o.ouuuo+ ~12AnRo8u3 25120.000UO* ul?fllj~ull(J3 ?fJ13
l.O~/sO- f31.?6nRo8u3 20140.000Jo* ul?6nno8u3 ?blb
12bl?Aq@IJlIu3 2b16~l?Aonuflu3 2b17
R.fi11b4- 81?6r)RI)9u3 ?blflle368l2- 7)?60808U3 2bl’J
6,1/bub- ti]?6nqoRu3 2b?0
2.6S3f9- /l?(,(launu3 2~219a7601fl- 51260R08U3 20?23.R14J2- til?bnqdflti~ 2923
3*52~~t- R126nQn13U3 2b24].919dl- 81?611RI)HU3 2bc?~
50
l*zf)[l(Ju*1*J5(JUU”1.513(JUU’1.65uuu”
l.tioou(.1+
1.9~!lulJ*
2*1O(IUU*2*25[IL)U*2.4”~(j(J+
I?.55[]UU*
z.7r)(]oL!*2.b5[]ou*3.o(J~oti’
3.150UU+3.3(JOU{,+
3045(3UO”
3.6ofJuu*J*75(JUU’3.9130(J~*
401J500U*40ZOOIJIJ+
4035(l!Ju+
1.75{):)()*
l*4rlrtol)+1.%5tl(J(J+
1.711nno*
1.H5000+?.n(lonu”
2.15000+2.7nooo+
2.650(Jo*i?06n000+
2.75000+2.9n000*3.05@(-lo*”
3.?0000+3.35000+3.50(70(]+
3.6%(lno+3.Rllo130*
3.9511131J’4.ln~f)o*
402500(3+4,40n(l(J*
o l“32940-(1 3e4dH2b-
0 7.1~u97-() 3*563tj4-
0 3.~.!ds9-o ?.lb/4h-
0 1*15451-0 4o13uol-
0 6ou~14Q-0 3.h~~ol-0 q.nz~9d-() 20’Jdso’4-() .q.5tiY5z-
IJ 4.73324-() 2.4bY53-
0 l.fu/l4-
o 3.5b+15-0 l.93/213-0 ;.16Y02-
(J 14*5d978-() 2os4441-
U 5.5b*?t-
1*.3f$uoo*~.f+qu(j~+106*100()*
1.7KUOO*
1*9110’-)O*?oo~uoo+
?.?nooll+?*3~floi)*
7.5nOo0+?.6r~lJoo+
>.HnolJo*?.9~uoo+3.1,3000+
3*2~uon*?.4nOoo+
305~ooo*
7.711UIJ13+3.8G(JO()*
4.cln(loo*
6.1%000+4*3nuoo*
k.4500fl+
?026
~bz”rzb~ti2b2Q
203U;>~n,,. .2cJ3z2033~bj42035
203626372038
2039?b40
2041
2042~b~s
~044
~b452b462647
4 %O(jUU+ u .f /7780- 9 4 55000+ O ] 70d]fJ-in 6 6noooe o 1 45bl17- 51260908U3 2b48
4:650UU+ U ~g~~064-11 4s7n0flo+ O 3SH%12’?-11 6s?%Of)o+ o ~s37/~1-lU126091)&lU3 2b494.800UU’ U 8R8~618- 9 4.F15000+ O C).93dS/+-14 A.9.uI)o+ o 4.61)841- 91?fi(IRu8U3 20504.950uu* u 6. f2073-lu 5oofiooO+ u ~.(ll)Uof)+ (j 5.Q%Ooo* o 4.17619- 91z60808u3 2651
~*lOrIOU+ O UOUUOOU+ U 5.15r?(JO+ U 1*40/t!5- fi 5.200110+ o q.795b2- 912rjoQ08U3 2b5Z‘5.2S1)00+ U 70d599&10 5.3nooo* U 5001u6A- Q %.3GOOO* o 2.74b’J2- qlpf)oq{)f?us %053
5.4001Ju* U b*y~919- 9 5.4%ooo* O 3.89’JPb- 9 5.51Tuoo* o 5.01u~5- Yl?6nno8u3 2b54
5a55f)u11’ u l!l~77~- 8 5.50000* O 9cbH~~8- 9 %.6GUOO* o OOOI)UUO+ u12613RUHU3 2b555.713(JUU+ (J J.41~41- 9 5.75(]QL)+ 0 ()*IJIJU()I.J* 0 ~.$lflol)fl+ (1 (1.oflubo+ L1?6(IRIJU03 2~sb
5.h5(JUU” U ~.bU?66- ‘J 5,Qn000+ o 4.68/45- ‘+ 5091iu00* o o.ouULJO+ til?b0RU8U3 2b5.’
b.(joouu+ u 7~17039- 9 6a05000+ o o.oUUoo* o ~olnuoo* o 4.33bY5- 91~60f10/?u3 2058
b.1500U* U O*UuooLl+ O 6.ZOOOO+ O 1.79+39- Q 6.2SIJOO* o o.ouOUo+ u]~60$31)8u3 2b59
o. l:UOOOL*O1 o (1 1 ~2bl?6nRoRu3 ~b60lzb 1 0 0 0 01?60RURU3 2061
0.000UU+ O ‘.54140-10 seO(lfloO- 2 R.3~129- Q l.OfIOOO-l.5000u- 1 .?.3+’i7!J- H 200n0no- 1 3.H9(J77-
I 3.711?>2- al?6i7Q08u3 25b2H ?.5fi(J00- ] ll,lbs~?- Hl?6(1RIlqU3 ?b63
3.000UU- 1 1.Y3673- H 3.5fIO00- ! 7.HZ~O’+- n 6.0nUoo- ] 3.15504- H]760SI)8U3 2~’1>4
4,5rJouu- 1 U.1903!J- 8 5.(Jol)(Jo-6.UrJOUU-
1 2.4’Jb47- 7 S.5n[)oo- 1 1.03+J5- 71P61-ISJRIJ3 25651 1:57465- r 6,rjoooo- 1 3.31992- ~ 7.0nOoO- I 6.4.1~14- U1?60R08U3 .2b66
7.513fJuu- J <:~~()~fj- 8 $laonooo- 1 9.64Y70- P R.5nooo- 1 2.78dlb- 8]ZAORUHU3 ~bhr
9.1jlJf)ou- L >,1/103- # 9,50001]- 1 7.69CJH2- P l’.o~ooo+ o ~.f)4036- 8]76rlHl)}1U3 ~b6b
l$(~~!J0U4 U 4*5177u- H 1,),)000+ o ~.71/~4- 7 ].lFooo* o ].4,i2t~H- M]?6f)llil/)u3 /b6Y
l.~oouu+ o b.427~.3- ~ 10~~noo+ o 7.3?56~- R l.~fiOoo+ o 1.~18y3- fl~~f)~()~u~ ~ti70
1035UOU* o J*uo44M- 8 l.~n~oo+ O 2.5S466- 7 1.4ciOOo* o 6.07769- FII?AORU13U3 2b”?l1.500UU* u ?.48124- 8 1.%5000. U fi.0dti49- 8 1.6nUoO* o 3.?97H9- ~l?60ROf31J3 2b7Z
1.~500LI” U Z*616Ri?- d 1.7nf)09+ O 2.421J3Y- 8 1.7c.OUO* o 6.[!9J~7- blz60QO13U3 2b”?31.HI)oOU+ U 1.b217b- 8 1.R5noO* O 2.ROti50- R 1.9nooo* o 1.62f~9- H1?60P.:!:V3 Z~~C+1.Y50UtJ* U ‘+o/667M- H 2.onOoO* o ~..j7boq- ~ ?.O’=000* O F10493U6- ‘Jl?60nUtiU3 2b752.luIIob’ U 4*b~047- 8 2.15noo* o 9.30C!79- q ?.2nuoo* o 1.833ds- UIZ~OR08U3 2b”/e2.<50UU+ f) Z:b221+- t) 2.30000* O ;O?UZ54- H ?.3=UOO+ o 9.124d2- Y1z60RUHU3 2b7”r2.400UU* o d..$drj(,2- fi 2045@oo* o ~.3tJY63- q 7.50uoo+ o 30050c!~- M1260RIJIIu3 2b7dZ*!Y!500U+ o 9*2133/- H 2,6n~o~+ (J d.6~*131- H 7.6%UOo+ o 6.19H’+3- 91261)RI)8U3 2079
2.70!Iuu+ U ~~Ob60’P 8 2.75000* O 3.b8/6t?- Q p.tjnuoo* o 1.30%J5- 81?60.R08U3 ?et?l)Z.R5[)OU+ u <0~13<5- H 2.q~@oo* U 2.2UI)97- q >.9GUOO+ o 3.26292- 91?fj080flU3 2bfll3.OgOUIJ* u p.Ub}lV3- Y 30~5n~o+ U 6.41Y23- 9 I.]0’UOO* o loo66c19- t3]?60R08U3 2df12
3.15.(Ju* u t?.y0803- 9 3.z@floo+ o 3.~9196- q s.~=ooo+ o 2.43595- 9]26(IRJ8u3 2b833,30;0u+ Q 9.14242- 9 3.3<1-J(313+ o 7.0c’d41- +1 3.4n000* o 1.6[)8+1- Mi2fjoq08U3 ~0843.450uu* U 3.45619- 9 3,<nooo* O i.33f43- R 3.515(Joo+ o 7c~71~b- 81F60808u3 2b85J.bo~rJ(J* o 2:1652b- 8 3065000* (J ;.24411- Q 3.7fioOo+ o 9.~bd’+1- 91260Qu8U3 ~0863.7500u* u d.ZMq9b- 9 3,ROOOO+ o 1.49128Z- R s.8GUoo+ o 7.542S5-1U] ?60808U3 2b873.9ooUu* 0 j.53!362- 9 3,Q5n00* u 1.7194’)- 9 4,0nUoo+ o 4,9?7i/-l~lz60qO@U 3 2b88
4.(J500U* O ~./U67~- 8 401n~oo* o A.6>d6H- 8 fb.l~[loo+ o 3,5b*10-lUl ~6f)R08U3 2bU94.200UU+ o 1.QZ150- 9 q.?~(_IOo* o >.oub43- 8 4.~flUOO+ o 7.97_/j2-lUl?611RU8U3 2b904,35uuu+ u 1,933<9- 8 404n[)oo* 0 ~07L<(]?- Q 4.4’=uoo+ 0 404b84ty- 912s0Ru~u3 2b%~
4.5oooIJ* (J 2~1~046- 9 4055000* o 103~oo2-lo &.hQOoo+ o 13.P]11J5- I)l~6f)8[)8u3 ~b924e650UG+ u b02’~4.74-11 407n000+ o +.ub117-11 4.7zooo+ o 1.$l!,/+’-J-lu176r)RUf3U3 2b93
51
+*Mof)ou* o 4*U4?4(J- ~ 4.175noo* (J
4oY5(luu+ o I.CJO47-10 5oclno(lo+ o5,113nou* (J u.yuol)()+ IJ 5.150f)(J* (1
5.Z5fIuu* 0 b.15t~54-lU 5.3n000* U
5.oooou+ o 5.9S971- 9 5.6c,n00+ O5.550(JU+ n 5.:144+- 9 5.60cl(jn+ o
5.10nUu+ o 1:~2’?qb- 9 5.75000+ O5.J350Uu* U 1.~67?u- 9 5.qnooo+ O
60UOOOU* o ::dOR29- ~ 6.n5rJOO+ O5.15000* U O:UOOOU+ U 6.?nooo* O
(J. !a:tiuoOE+Ol oizb 1
0.00oUU* U ZD5559!-lU 5.0n000- :
l,5fjouu- 1 /.b381t3- 9 ,2.0”0(30- 1
3,0fJoou- ~ “/.81’576- 9 3,5000(3-” 1
4.5(Jouu- 1 l*d4cl13- 8 5.00000- 1
6.000UU- 1 d.b48%b- 8 60<n~oo- 17,sooulJ- 1 mo7g7<& 9 8,()”000- 1
9.c)ofJlllJ- 1 1.YZ832- 8 9.5n000- 1
1.050UU+ o 1.UZ726- 8 l.lonoo+ o1.Z1301JU+ u 1.31043- H I.?’iooo+ o1.3!iouu* y 1.dtiz51- 8 lo4(l~ol)+ (J
1 500UO+l:h50UtJ*
I.HoooU+1.950UU+Z.lonuu+2.25(JUU+
2.4000u+20550uu+2e70000+
2.H513UU*
3,UO(-IOU’3.150(JU*3.300(IU*
3.45[)OU+
3.(IOOOIJ+307500U*
3.901-)00*4.05(IUJ+
4.200ULJ*4.35(JOU+
4.50UOU*40650L!C~*
4.Ho(JuiJ+
4,9Snuo*
S.loouu+5c<50uIJ*
5.40(](JlJ*
5.55P(JV+
5.700UU+5.J35(JUIJ*
bOoofJuu+6.150uu+
O*1 :
o.oooou-
l.501)uu-3.uoouu-405ncJu(J-6.(JooOu-
7.5000u-9ou(_)olJu-
1OO5UO(I*1.200UU*1.35(?OU*1.50(J(JII*l.bsoo~+
uu
iJ(Juu
u
0u
u
0u
0
0
n0
:
uu
0uu
uuu
uu
00
00
!6u
i1
1
1
0u
uuu
9.1*tJ2Y-16
nooouofl+ n7.51/31- ~~. 7’4/90- Y
1.744b+,- ~q.2hM~l- 9
O*OUUOO+ c7.(15/33- 9
O.(IOUOLJ+ (:1.41356- 9
0[)
?.24122- Y
1.lbd06- H1,3413M- R
2.01/61- R
~.09f26- R7.3<146- 8
1.81b32- P
li.631=’5:3- R9.b5s7f?- 99.31378- n
&.9nOOO*
~.o+ouo+5*?nUo(l+<.3’=UOI)+
‘=05qooo*=,.5ruoo+
5.Rnooo*5.9CU(J13*
6.lnuoo*6.2%000+
l.oflo@o-
2.5nUo0-&.onooo-
%.5nUoo-
7.0nUoO-R.51-lf)oo-
l*OOUOO*I.l<uoo+1s30000+1.4<UOO+
b; f200’+- 9 l.Rsooo* o 8.8bH35- 9 1.9nuoo+l;d7439- 8 2.(Icooo* o 9.56boo- y ?.O%UOO*
1*UI)47M- & 2.15noo+ O 6.6/390- q 7.211000+1:U+091- 8 2.3213013+ u 1.2~~82- ~ ?*35UI)O+b,~rnl$lb- 9 2oq5000+ o 4.20’+55- Y ~.500co*J./dl89- 8 2.6f)()()()+ 0 7.85551- Q 2.WUI)O*
709163/- 9 2.75fJfjiJ+ () 1.54C’44- R >.f3111Jl)o+
l;uu560- 8 20Qn000+ O H020004- y ?.~%l)oo.2~~5778- 9 3005900* u 7.53+93- 9 3.lnOoo*
l.u2(_l?cl- 9 30?no00* O 1.5<>1%- 9 3.2SOo0.b.lu109- 9 3.350130+ O 1.0L!517- R 7.411UOO+l*Mz773- 9 3.50000+ o 7*1U543- 9 3.5%000+
M.g1799- 9 S,A%oo[)+ O 6.fI~~~13-l(J 70711U130+d*3t5.Jl- 9 3.R(30(31)* II 15*ld~l’+- Q 1.8SUOO*
10b460b- 9 309sooo. o ~.o+b19-lo 4.0noco*lo527q~- 8 4010f)uo+ o 1.7U121- 1+ 4.l~OoO+5.56061-10” 4,?5000+” u fl.?~L38- ~ A.3nOo0+y;dbRnb- 9 404~no0+ o p.4u479-in @.4’+uoo.~.~j?~o-lu 4055(_jou. u q,2H19’1-11 /,.6~uoo+
2.45490-11 4.70rloo* o ].4T311-11 /..7%000+1..2/?74-lu 6aR5f)OI)+ o (.5U/92-lf4 L.QnOoo+
j,9H7?c?-lu 500nfio[)* O o.UUUOO* 6 5.0qoOO+
U.UOI)OU* o 5.15000+ (J 1.6JS22- Q %.PQOO()*3.f417f-lu 503nfloo+ o 6.67/ul;-11,1 5.3%ooo+<.u(J734- 9 5.&5000+ o 2.40d02-11 S.kino@o*?.:1645-11 506~1300+” o 5.Q0371-11 %.fi~ooo+
Z.10642-11 5.7snoo* O o.oouon+ o 6.HP(JoO+2!15760-11 5.af)()()o* o 208M115-11 5.QG(J130+4~~167u-11 6005000+ u oooUUoU+ 0 6.1oOOO+
O“UOOOO* U 6.20000+ o ‘/.28Ub6-lo 6a2Ruoo+l“ouooE+od o L1
1 0 01.8769~-lu 5.00000- 2 1.6L4u43- ‘~ l.onOoO-
d:Y1797- 9 2.IjnoOo- 1 4.75!JHM- Q 2.50uoo-4.(lf339- 9 3.%0000- 1 17.6d/29- ~ 4.0hUOO-t.9j~7~- 9 !joo~~oo- I ~clb519- Q ~05noo(l-l:pY?]H- 8 605nnnu- 1 5.7hy21- Q 7.Onf)oo..4.33?11- 9 80nn00u- 1 1,6~865- P P05quoo-
1:<1170- d 9050000- 1 9.8N408- Q 1.onOoo+0.U4R3U- 9 l,lnoon+ U i.~4-195- ~ l.l%OOO+;,+ll?q/- 9 1.?51-JOLI+ o 4*95U19- Q 1.3tlr)oo*f.Q3345-
~ lo~llooo ● o 4*7Z401- ~ 1.4<ljf)fJ*l.uo710- 8 10551101). U R.500YFI- 9 le6nooo+b.d~5nd- 9 1.7n000+ O 3.11H35- Q 1.7=(Ioo*
0 2.G51+h- Yl?6nnd8u3
0 2*03~~3- 9]?611f?08U3~ 403Hc!~c- 91P6nAqFJ63
0 l.22boh- 91~60flI18U3
1) 4.12’0”7- 91?611Rof3u3() ().000UO+ yl?6nRd8u3
O OSOOUUO+ ~1260J308u3o Oouoouo+ UI?60008U31) l.~40Yl- 91?60R08u3
O 0000OIJU+ ~l?6nAO~U3
1 12b176nnoRu3
0 UlPhOR00U31 5.~h9~4- 91261)Ri)t3u3
1 1.21u/7- 81?611~Juu31 8.74b*7- 91260ROnU3
I l.50bZ2- R126(IRU8U3
I ].9111?- UI?60808U31 lol18~o- 81?6nJ708u3
0 l.2lz5u- 81?6f19df3u3
O 50190/5- 9126(Ifl!lflU3o 5.Ao/”+b- 81260Qu6u3
o 2.01J3s3- 81?6nno8u3
00
000
0
000
0
000
0
0
0
i’00000
000
00
00
00
101
11
1
0
00
rl00
1.33<97- 81?60RU8U3 2/161.5~3hH- ~l?6nno8u3 ?(176069616- 9126nJ10Ru3 2/18
3.?9034- y12fYflRllf3u3 2/196.q7ddti- 91?honU8U3 2/203.5b9d2- y1260JIuf3u3 2/?1]al@zZ3- &]2~of30gu3 2/Zz
l.75ud3- Yl?Anquau3 2/23
2.s9tht3- Yl?60qoRu3 2/24
l,z9.3*4- y126nRl)Hu3 2/254.055*9- 91261-IRU$3U3 ?/?6
l.?~u~l- W1?60R08U3 2/276.4f2L()- yl?6nn{)nu3 :/28
3.?f309’)- 81Zf,oRf)flu> ?(29
3.90/+1}- 91~~nnttRu3 2/3u
4.33’)b.l-lu] ~AoG:;&u3 2isJ
2.?50fJ-lul?15nH08u3 21321.5ROU~-lUl?611RORU3 2/33
4.376U2-lUl ?60HUflU3 21341.967~b- 9)z6n$108u3 2/35
3.091U4- 91z6ni308u3 2/367.376f4-1!1?6rJ/3o13u3 2f37?.F13tl f2-lll?61-JRl)Ru3 2138
2.41~~0-lu126n9u8u3 2/396.033~H-ll 1760HIJ8u3 2/401.6”~1’+%-l ll?IsoRof3u3 ?/61
%.03J’)b- 9)26nnoUu3 2/42ooOUUUCJ+ u1?60F3U8U3 2f43
O.(Iouuo* iJl?6n$ll)8U3 2/44
OSOUolJU* ul?611J~ofiu3 2/4b2.671bwlil?6nnORU3 2(46
0000OuO* U1261)91)$IIJ3 2/4?12b126nRUJ3U3 2f48
u17AI)n08u3 2/49l.75*~l- 91?&oqdnu3 2/50
6.?44f’s- 9]?61)fll)8u3 ?/515,fbbg<~- 9126nqL18U3 2(’.2f30869u3- 91?6nno8u3 2153l.l40/8- 8]26nQu13u3 ?f547.94217- 91~6(lR(lflU3 2/bb
7.95#?e!3- y!760qoHu3 2/56
?.7?c?93- Y1260PU8U3 2/57
2.667b7- 0]7(i(IG08,J3 2/539.9~b4H- 9]76n9uRU3 2/59
6.5’ibL{9- 9126nRu8u3 2/606.f)15~2- 91?bnAUHu3 2/61
52
9 le$15000+ o 4.2bA73- 9 1.’)0000+ o 3.549~7-
9 2.ono~O* U 5.77~8?- 9 ?.o=ooo+ o l.6N4b4-9 2015noo* o 3.3U991- 9 702nooo+ o 3,77414-
9 2.30noo+ o 6.2~327- 9 2.35UOO* t) 2.c97*4-9 2.45(~oo+ o 1.izb~6- Q >05n(!co* o 5.92610-S 206n000+ o 7,91447- Q ?.6~000* o 9.27+5b-
9 2,75000+ o R.55y4b- ~ 2.8nuoo* o I.4?4y2-9 2oqnono+ () 3.741$3.3- Q ?.Q%O131)+ () 6,460Y7-
9 3.05noo+ O l.2iU$13- 9 .?Olflof)()+ 0 2051 ~’+4- 91~6~qollu3
(1 3.?nooO+ (1 ~.2Z/9$-10 3.?qUOO* o R.6459(>-1U1P60R09U39 3.35000+ (J 7.94194- 9 3.4fl(Joo+ IJ 3.01/18- 91?6f19ut3u3
u 3.5oooo* o 5.29d68- 9 ?.5%uoo+ ~ lo55tiuo- 81P60QUR.J39 3.65”;()+ o 4.(jlJ[\8-in 1.7~cl)f3+ o ;.o.15~7- Y1260908U3
9 3.170(1()()+ o 3*ltt441- 9 go8~ol)o* () 3.35531-lll17~~q:!:ti31) 3.Q5fiol)* o 5.34s”?5-10 A.().f)f-)o+ o 1.4373 ?-lul?A(lFto81J39 4.]0000+” o l.u539?- fl 4,1%(100+ fJ 9.5R5<3-1117(I(I!70HU3
4.260UU+ U ~./3937-10 4.25no()+4e3!jolj(j+ u /.8do?2- 9 4040000+
6050@iJu+ u <.015<!-10 4.55flor)+
4.h5n(Ju+ u 1.:2798-11 4.7n(30fl*408uoo0. o 40127n’J-11 4.85000*
4.950iJu+ u <.Y~36’+-lIy 5.onooO*
5.1CI(3UU* u U*OOOOO* u 5.151)O!)*5.25ijou* o ZOYU3O2-10 5.3(lr)(3(j+5.40uuI)+ (J 1:~2417- 9 5.451_)o04
5.%5n(lU* O d*Ulll/-l2 5e6~n00*5.7floo(J+ u d.3(j640-l/ 5,750”~*
5.b5:I(!U+ U <.j625Y-12 5.qnflO(}+
b.oo{)uu+ U 4;Md57/-l2 6e0500[)+6,15000+ u u,UOodO+ o 6,P0000+
(J. b:OIJOOE+02
12b 1(JeOOoUu+ U o.JO070-11 5.0niIoO-
600001JU- 1
7.5f)ouo- 19.00000- 1
1OU5(JOU4 o
1.2oll[Ju’ ul.~~nU!J* U
1.500UU* 0
1655!)(JU. o1.8ofJuu* U
1*951JO(J+ u2.1OI3UU+ u
Y1?60R08U3
917612qoRu39126(IP08u3
91?60RUF3U3Y12~nl?~81J3
01?617A08u3Y~?~nR(JRJ3
U1?60RU8U3
l*3b381- 9 6.50(-loo-1.4~s39- 9 fl.(ll-looo-5.11461- 9 9.5rr?oo-1:’J4734- 9 1,10000*:~b8,)(,7- ~ l,25000*eouyHlti- 9 l,4flfio(3*
1.43809- 9 10550()(’)*
l,uoc/2,2- 9 ~ 7nooo.5.75’-)U1-1IJ l:85~oo+
2.2’500U+2.400L)u+2.550ULI*207000U.2ob5u(JlJ*
300000U”3.150(J(J*3.30(300+3.45f)u(J+306000U+”
3.750ull*3.90()()(J*
4.050ULI+402(70UU*4.35!JOU+‘+.5(j[ou*
4.65UU(I*4.hqcu(l*
4,9’>(JI)IJ*
Ij 5.454F!(J-10 z.:~~oo.
o 2*d45~5-l(J 2.65000+(J 1.J977ti- 9 2.6nnoo*u <.bUR3+-~0 2,75000+o J.yh6!,()-IO 2,9000u*
() :.394fl/-lo 3.05000+
u J.~/IS4!J-11 3,?n000*
o 1*UJ444- 9 3e?5fl(JiJ+o b.o~lQo-11 3.5n{)o(j*tJ 9*J97Q1-11 3,650(30+
u +.4203~-11 3.HnOorl*o k!*16Q71-l(J 3.q500g*”
U l:(bo70-lo ~.I(IoI_)o+u 5./947M-ll’ 6075(1()()+U 1.+617f- 9 4,6nn00+(J do3d991-12 4,550(3(!+u .$:<U319-lZ 4.70000+u +.1583?-13 4.F15Qflo*~ ‘+.:b747-11 S.oolloo+
o00
uo
@
:0
:0
uu
o
II
2
1
q,9l’3~3- Q 4.3(Iuoo+l,o&126-in &04cofJo.2.5Z*44-11 &*6nooo*
1.00534-11 fbo?noocl+!011/07-14 6.~AIJoo+
!-l*oouoo* o 5eo~ooo*1.25fJt?9- 9 ~.~fl(joo*q*lbJ84-1(1 %.3’%0(30+2.62991-12 5.50000+
Ao46d99-17 q.6G[)oo+O.OOIIOC+ n 5,RfiIIoo+3.16101-1/ 5.9~ullr)*
0.00’’00+ 0 A.lfluoo+3.h9:5(J-lo 6.?C(J()()*
o
0
2.011~8H-10 leOOOOO-
1 l.l956L-
1 4.h4f6u-1 106t~90-U ?.05326-0 lO!JZlJ60-0 7.[+5H5-
0 3.8ds32-,
0
0(J00
0
u
:
0
0u
0(J0
0
00
0
0 3. z7~u8-lltl?6t-lFloHu3O 1.076ZZ- 91260QOBU3() ?.35uuB- 91260R08U3
o 3.q2b~9-l ll?Anf408u30 3.lo~J~l?-l~l?4.1808t~3
o 1.7~9/o-lu126LJRof3u3o 6060b*4-l~lP6nR06U3O 1085212-l~12Ar)R08U3o l.03lJ7- 91?60floi3u3
0 OOOOUUO+ {ll?60qudu3o 000IIUIJO* ul?fi’)R(Iflu3o o.ouOuo+ ul?6080nu3
o 2.Q2’31u-li126nnuou3
O 0.00000+ Ul?60qOHU3
1 12~l?6i?noRu3
n Ul?611$li18U3
1 1.63UYZ-1U1?AOHULIU3
q 7.0P(loo- I z.7A6y3- y1260i108U3
Q n.5nu00- 1 3.530~6- y126nROi3U39 l.OfIOoO* o 4.07574- 912hnR08u3
Q l.l~uoo+ o 7*b~9*3-lu12~~~~~u39 1.3fiooo* o 1.514f5- ~1.76n90uu3Q 1.4qlJ130+ (1 R.543Y8-ly12&oRu8u3
0 lo6nOOO* (1 5.W~*7-lUl?60RUtlU3
Q ?.051100* o Z.53bU7-lUl?60R08U39 ?O?eooo+ o 6.63M5’+-1OI26OROB(I3
7.49(90-19
p.95?65-in6.4u053-lo1,!34935- ~/,.74cHh-11
7.19b6S-Ll
~.14~34-in1.47031- Q1.lb47Fi- ~
8.1S-+?1-11
1.76MoI-lc1.081u5-lfl
l*260~5- 98.l)6Y/rJ-114,u~140-l?2.9411t3-Lx
2.t!>#?79-~7
7.9fbs2-14
().UUU()O+ u
53
5. 00UU+ (1 ~.0~000+ O 5. GOoO+ U . . )4H6R- O F. ~000*b.)51w* o “.9U7?7-11 5.3nnoo* 0 d.bbvltl-il S.$WJOO+%O$OOuue u ‘je43f36’J-12 5.4!jooo* o 1.23°96-15 %.5n000+5,>50UJ, u ;.~49c,f-15 50~oooo+ c 300<5H1-L% q.6cooo+
5.700UU+” f) 1*U7Q43-15 5.7511rJf)* o O.LIUU(JO+ 1) %.~nuoo+bobsOUO+ u 1.105Rb-i5 5.9n[]oo+ O 1.4MuoJ-1~ 5.’$coOO*6.000uu* f) I?O~640Z-liI 6005000* O 0.00U0O* O 6010000*
0.1’=$000+ u o.lJIJof)lJ+ (J fjo?~f)(jo+ f) 2044(7/-12 6.2<(Jor3*
u. “ 1000ooE+o3 o 0126 1 0 0
U.00C0U+ U Z.b?372-11 !500n000- .? 8.00~17-11 ].OnOOO-].50,)(JU- 1 5oY2973-llJ Z.of)ooo- 1 ~.b7171-lfi ~.5nuf)fj-
3,00(Jou- 1 Je:U14b- 9 3.50000- 1 3.b9M.38-10 4.00000-
*05011ulJ- 1 1.;2724- Y 5.00000- 1 %.19360-10 5.5nUoO-bOOOOOU- 1 u.Y6740-l[j 6a150000- 1 5.64274-10 7.0nuoo-
70kIOOOtJ- 1 120’4414- 9 8e00000- 1 1.9~b67- 9 fl.5nOOo-
9.(Joou.J- I ~.bi6fjb- s 9050000- 1 G.9+984-10 l.OnOoO*1005cOO* O 6:b6198-lo l.100oO+ O 1.01069- Q 101GOOO+1.?OOUU+ U 2::54fY5- 9 1.25(JoO+ O f3.1~~flQ-iu 1.3aooO*
1*3500U* o l*~5?%9- 9 1.6f)@ol)+ O 1.37667- ‘? 1.4%Uoo*1.5001Ju* U b.d&33?3-lU 1.5500u+ O 1.9>~00-lCI 1.6nt)00+10b51)uu+ 0 d033942-lu 1.7por)0+ O j.q413+-10 1.7~~~00*
i.booOu+ U j*4b2F5-lLI 1.R500u+ O A.2(141H-19 1.9nUoo+
1.95nUlI+ U /.13?53-11 2’oono@O+ O ].34+Y~- ~ ?.OqlloO*2.1ooOU* u z.~6721-lu 2.15000+ O i.34~1’+- y ?.?nUOO+
d.25uUU+ U if.b9771-lo 2.3f1000* o 1.l*b3’)-in 2.3quoo*
2,4000U” U 4. L612H-11 ?.45000+ O 1.H5~o~-111 ?>5nf)on+Z.5+UUU* u Y.!60112-lLI 2.6oono* o I*91ti41-1~1 2.6%IJoo+
2.700(Ju+ u 1?74318-10 2.75000* O 2*45417-L0 7=RnOoO+2.850UU+ o $J~77193-11 i?.Qf)ooo* O ‘i.00117-12 2.q<OOO+3.00f)OU* U l:l~?30-lu 3.0500cI+ O 4.5bti29-12 3.lnOOo*~.15[Ioo* U 10~’J954-11 3.20000+ O 6.llb26-Ll 3.2~000*3.300UU+ U 2.79ARJ-10 3.350(10* O 2.64YOZ-10 3.4nOOO*
3.450(Ju+ o 4*d045u-11 3.6n000* u >.Rbb63-Ln 3.5~uoo*J.61)(-)UIJ+ u 4:~50%’5-11 3.65(300+ 0 2.3’J472-11 a.7.aof)13+
30?5QUU+ u ~.05423-lZ 3onno00+ o 7.1’!YU93-L1 7.Rquoo*3.9ooL)IJ* U 1.~800Z-lo 3.q5000* U 5.U4d2’~-11 ~.On(IOO+4.0500U+ o z.99783-11 401000fi+ o 1.64u12-Lo 4.ICOOO+40<00uo+ u 20<6812-11 4C?5000+ u 7.41382-17 A.3nOoO*4,35UOU+ u l.SZRCJO-lU 40t+nnoo+ U 5.lb~16-1~ 4.4~OnO+
4050nUu+ o <.1!J7cU-14 4.’55I)ou+ O a.9Ud67-lr> 6.6q’000+
4*550UU* u 5:29/lR3-13 4.700uo+ U l*5b173-l? 4*7~UOO*4.t3000u+ U 5.12154-15 40n’5noo+ U 9051.?99-lQ 4.90000+4,950u(J+ o 0.~67pM-12 500nooo+ O o.OUOOO* U 6.O~UOO*
5, Oouu+ u
5.J50UU+ o
504130ULJ* o!?.5SI)ULJ+ 0
s.7n(l(Ji)+ u~.h~oo~+ ()
b*UOoU(J* U6.150U(J+ o
0.12b
O.oor)ou+ u
1.5000(J- 13*OOOUU- L4.51)OOU- 1
6.UO(IOtJ- 17.5000(J- 1
9.UOOOU- 1
1.(J50UG* U1*2000(J” u
1.35000+ o
105OOUU+ u1.65(JolJ+ u
l.aoouu+ u1.9541uu+ o
U:uooclo+ u 5. ~n(-)i)+lo+9?~u-12 5.J;OOO*
/.4sf)al-14 5.45000*l~!5320-lb 5.f!nnOO+
5:04H1U-17 5.75000+5.171?4-1/ 5oCl(lf)()(l+
llU~R7+-lb 6005000’
00UoooO* o 6.2nooo+b:uo(JOL+(j3
1.26W1-1: 5*o(3f)oo-
1*OU61Z-10 2.(l13(30u-1.b61?9-~o 30~no~n-Z~~143*-10 500n000-
2sUb4b6-10 6.5nooo-#?ob13445-lu 8oo~()~lJ-
:.Y3~sl-lu 9.5(looo-
1.U<764-lo ~.lnnoo*lozfJ~\l-llJ lo75floo*
+:Y6~2Y-lu 10&O(lo@+
Z:23397-lU 1.55non*m.+bo36-11 1.7nooO*
l*i914b-llJ 1.85000+
l*o~lO~-ll 200nooo*
07“’]Y66Wx%:o 1.2/35/
o 5975b77-17 q.5rlooo+”O lS4148b-lA 3.96=(Joo*
o O=oouo(l+ o 5*J7nooo+u 6.QZd72-17 G.9G(Joo*
O 0*U04100+ O 6*1oOOO*o 109S<14-14 6.2<UOO*
o 00 n2 Ro9~f40-12 1.ooOoo-1 4.41blz-1] 205q000-1 3.11586-11 4.0nooo-
1 1.2+b57-in 5.5nuoo-
1 l*12~S~-in 7.0n000-I %09H761-10 JI.~nUoO-1 q,5db61-11 ].on900+
u lo78t!44-in 1.lGOOO*O 9*21M13.2-11 ].3nOoo+
o F04Jr5Q-1(1 1..4CII(J(I*U 2.2.?341-11 106nooo+
u 7.6~dH2-11 1.7<uoo*u 5.8UZ55-1] 1.911UO()+
o 1.78M60-111 7.C151JOI)*
o0
00
000
01
01111
11
0
00
00
00
00
0
;
:000
00
000
00
0
00(1
Mwxwfw6.835~Z-ldl?60QtJ/)U3
0.000UO* u1760R03u3
CJ*OOUUU+ U1260R0’3U30.000UO* bl?60RU8U3103h906-l~1260nf18u3
0000UUU* u126!)Ru8u31261?60A08u3
U1?60130HU31. 06750-1UI?6(IROUU36. R37+r-lul~60q09u37.86714-1U1 ?60R09U3l,392Y5- 9126n$luflu3
1.16200- Ylp(301qoSlJ3
?e141~l- Y126nRo8u3
?,991u5- Y1?60n09U34.5f30b6-lU12611R118U35. 74b*2-lU1260qOf3U3
30232~6-1 ul?6f)~118u32oRP9/4-lUlZ608UflU3
7.711Jl-lul?6(lnoRu330 ]3.?+d-lu12AnRJ9u3
~079J(J3-lu126clfluJ3u34.913fo-lCll ?fIi)nu9u3
6.o07*2-lul?60J3uOu3
3.71/~3-iul?fonl)&]u31. 745b’J-101 ?hOHIJ[{U31.s1756-luI?60f70flu37.9b4d9-ll 12150s108u31.613113-1U1?{$OQU8U35.R2113-l~1260f30f3u31.887/7-lLl~6nRnRl13
?.644u5-1u1?60QoRu33.%Ri2/o-lll?60n08U3
10593’+O-111?60RU8U350327/8-121?60QU803
?.373~b-121?6f)fiUJ3U3
13,93317-121 ?6nRo8u3
101H35?-1117AORI)8U3
5.832LJ4-111 ?60R08U3
50562s7-lbl?/1oql)13u3
6.Ro-4~o-l/176finl)8u34.3?Jdl-ldl?fl(JRu8u3
0 .4q6j9- 0 ~6!-181)f3u3
O /005~f9-]7knUHU3
o 50395~6-1’+l?60P08U3o r).l)i)uuu’ u126r1808u3
o O.ouuuo+ :l;6(lf3u8u3() O.(JOI)UO* 01?60RU33U3
o 606u240-171?60f10flu3
o OOOOOUO+ u12611RO13U3
1 1261260RuHu3
o U]Z69R08U3
1 3. 13sue-111?60nuBu3] 5a~12J5-l ll?6fJ8uRu3] lo439~0-llJl?f,0qUAU31 1.ZSUb9-l~12AO~U~U3
1 2. 1s+~5-lul?AnRd8u3I 5.29+U~-l~l?611R9J3U3
o 3072bo+-luli?60n08u3
o so61~~y- li1260quf3u30 4. 7tleJ6- lll~floQo8u3
o 7.4/lJH-lll?60qof3u3
1) ‘5.4H~33-l l1260Jlof3u3
o 33.4435?-111?60RORU3o 9.5?Ob3-l L12kOROtiU3
(-J 5.34dJl-ll 12~oqo8u3
54
2s1 o(J(J* O ~S?O@~-ll 2’.15ooo+ 0 >.obb.jA-in ?.?oUO()* o 1.0a/dH-lU1260Q()~1U32.Z$OUU+ b to~~fill-11 203nfioo+ o ~.15y07-lZ 7.3<(J130* 0 4.41 ”r9f-lUI?61J~fJ8U3
~,*ooULJ. (J b.$4715-12 2’045(_IOCI+ L) 4,28~54-11 ?05nuor3+ o 10443U2-1U1Z6080FIU32.5500u+ O i:~+041?-lCI ?,&oooo+ 0 1.u54Z9-10 2.6%uoo+ o 5.5’+2~4-1f 1?608011U3
2.7000(). U 1,119</-11 2.75000+ o 7.4/287-1? >.8f1000+ o 3.31’)4°-111 PSOR08U3°2.8500u. u <.057s3-13 2090000+ II 3.8dr03-l.3 P09?<O00. o 60141d0-l L12611qIJRU3~O(JOOOU. u ~:92572-11 3,0>,,,lo+ o 2,+ld41-12 qalfiooo+ o 1.904bY-l<1240qoBu3
3.150UU* o 7:J5739-12 3070000* O lo8bl%9-11 7.?<000+ o 2,8~b”H-121 zfioR08u3303(!fJ01J+ 0 <*7999fJ-11 3,3500u* o ;06d78b-11 ?.~$Uo(I+ o 6.~3$~1-1212/+rJq(JIlU3
3.450(Ju* o ~.41q”{9-12 3,5 f)of)+ (J 6.3’3297-1? 3.5SUOO+ o 3.475’+7-1Z1 ?60808U3c306000b+ o :*dMqo~-ll 3.6 (loo+ (J 40?1307-13 7.70(Joo* o 6. 164Y?-I<]?60R08U3
3,7500U+ u 1.u6561-l.j 309fICOO+ o 2.27.?65-1? ~.8%oo0+ o 4040534-1<1?6(7F108U3
~OyOOU(J* u Z.93J343-11 30q5000+ (J l.111~~-i? 4.onoGo+ o lC054j8-~21?60q09u34.(150UU+ lj d.l~40M-12 401n0no+ o 3.17903-13 k.lcof)o+ o 4003400-151?6fj1308U3
4.2f3”(J~. (j J018Q%b-14 40?5~oo* o ‘*c!>7,J-14 4.3qIjOO+ 0 1,5’).j~9-1’*l ~6nQoqu34.359uo+ o 3~5JC~04-13 4.&nOoO& O A: YW4V-,6 4.4=,,(,0+ () p**,.ll”-,+, p6”R(,”u34,50LIUu* o b.ljbsl{>-1~ 4,55000+ r) 6,4b>ql-lR A.6~()[)fl+ o l,4z5</-l3]?/iIIfiO8U3
4ob50uo+ u 9.00929-]6 407n00n+ t) 104Yu53-12 4,7ccI09+ o 9003U16-lY1260RLJf3U3
40800Uu. 0 f+;c’.2~ob-17 408$inn0+ o l.l~u?’+-lq L.9flooo+ o 1077397-171761)n0S[]3
4095fl(JO” O 1.16875-14 5.OnnOo+ o o.oUUOO+ (J q.ocUofJ* o 7094t\19-131?61_IqOflU35.100(J(J+ o U.UUI)oU’ o 5,15nQo+ o 5.fYU~:{S-lh 5.2n(Joo* o 3.771bb-lfl?6nR,18\135e<50uu+ u 1,J56QJ-1+ 5,30floo+ o 2,gddn0-14 5.3K(J(JU+ o 1.0S~15:lfl?~O~V&l~~
5,4001JIJ+ U 9i~9198-17 5,450@04 O 1,50164-17 14.5nOO04 o 607?9bl-l fl?60808u35*550U(J+ U *?51p1b-1/ 5.fiOfJO()+ o qob8’J54-17 q.6RUUO+ o o.O!JOUIJ+ Ul?6nQU8U35.7ooUu* U 1..$lfI4b-l7 5e75noo+ O o.oUUorJ* f) 5.Rnuoo* o (1.olJOUu+ iJlz60R08U3b.H%oULI* I.I 1.34875-]7 50c2~n~~* o 7.tJO*97-17 q.QqUoo* o o.ooUUO* ‘.J1260R081J3
6SOOOUO+ o d.f6001-l/ 6.0fino~* O n.I)UUoO+ u 6.lnOoo* o 1.669>1-17] ?6Q}10J3U3b.15G(Jo* u U.OUOoU+ u b.2nnoo+ u 7.4Uy9S-1~ 6.2GOOO* o o.O(IUJO* ~12bi]RO~lJ3
u. l:oor)(JE*u4 1) 12b1250no/ju3l.?b 1 :
10 (l ul%fjoflo/3u3
O.OooUU+ (J 30d5375-13 5,00000- 2 2.7(dol-i? l.ocOoo- ] R. 11549-l~126fJF!uRu31.50(31JU- 1 4.yuolf4-11 ?.fjnnOO-
3*(JolJod-
I ;.3hb9q-11 2.511uoo-
1 ti*~6995-11 3,500!)o-1 1.f119~9- lLl>6[)HiJ9u3
1 l,Q(135”/-l7 &.ofi~(Jo- ] 5.1i7bl l-lll?6f)r’lof3u3
4*5000b- 1 ‘$.?Z55U-11 5000fJO(J- 1 b.20~89-11 cj.5nOo0- 1 6033b+7-l L1760qOt7U36.uoouu- 1 1;<4284-10 6,%ofIoo- 1 7.7/346-11 7005000- 1 1.0C’6U 7-1U12AO130H(13
7,5(j(J(Ju- 1 YOU7049-11 8.oonoo- 1 2.?l.?41-llj n.5nuorj- ] 20?fi?~9-lU1761)Q081J39*lJ(Jo(j~- 1 1.Zb6f18-lo 9.%nnnn- 1 4.39150-11 l.f)not)o. n 1. 112+2-lu]2AoRof2u31.US6UU* (J +:41570-:1
1.20(JUU* o 1902539-11103S[,UO+ 0 J*d1444-1~
1.5CJOUIJ+ U /.>6RA9-11i.b=j”[)u+ (J 3;43622-11
1.MooUU* o 1.L470/-lu10950UU* u C!022Q79-12
.2.lonOU* U 1.37H19-11Z.250!JU* (J 403J354-1~
2.4onU0. O -i.dU4?4-l?
2,550uu* c 4096?64-112,700UU+ U 1.4ZLP1-12
Z.tis,)ud+ (J I*U69’?4-14
3*00(J0d* Ij l*:drJ4Y-~1
S.15(JUU+ u ~.9u’571-lz
3.300UJ+ O 10~556~-113.45uuu+ U 40671t+4-lz
3.600(!J+ u 1.~413.i-113,75fju(J* 0 l~ff451-153.9ouoo+ u ‘+.~6924-124.U5(JIJU+ u d*?~-j70-13
4020nOG$ U 5.Z5Z22-15
4.3%OUIJ+ o 60U6(-JG4-154.50(loo+ u L.17zfi9-l/
4.6500ij* u 1.52744-17qeboouu+ u <.<9496-1/
4.9500U* w Z.Uo46b-lb5.1O{)OU* o O.uu(lrju+ u
5.Z5(JU(I* u z~+c!35d-lb5.400uu+ U 7.66s65-18
5.55(-IOU* o ~::!8(Jb-11
l:lni;i+lo25n00+l,4nooo+
1.55000+l,TnnOo*
loR50fJo+?.fJflnoo+?.15000+”2.30noo+
2.45noo+
L?.Annfi(J*2.75r~o*
2oQnn00*
3.05000+
30?0000”
3.35000”3.511(l(J(J+30A5(J(-113*
3.80000+3.95000+4olf)(lfJ(J4402s000+
::;2:;::
4,7~(J(j(J+
4.R5000+5oonooo+
5.15000+5.30n00*
50451_JofJ+
5*6(1000+
o
:u
u
o
00IJo
:
000
0uo
0000
00
IJo
00
0
R.5d77v-li
5.2’J>73-11
1.10.f82-in6.o?~5Q-l?.S,(>J042-11
].0//91-11‘/,37>51-11
9.7(*5Jl-~1;.Hl’$o*-l?
:.2!ff5’4-11
1090<39-1:3.4!326-12
ri,”fr~ub-.b1.18558-127.6u3F>Z-12
206+155-1?l,Llboo5-13,.5Yt’80-14
4.51U41-155.45336-137.98L+41-15
2.51981-lfJ
3.41U33-17702d124-1~
1.09~09-1290?4dz2-14
n.00U0O* OI,(J1U89-1%4.14’+6[3-16
1.47U7*-173,61J62-17
i.isuiia+1.31100(J*1.4<000+].60000+”
107<(J(J(J+
1.96UOO+
7oo~ooo+
7.?lluoo+203S000*
?.snooo+
?.6~;uoo+?Sqouoo+
Y*9~ofJo*
3*ln(foo*3.2%000+
ao4fl(J(J$)+3.5<000+-4.7(IUI)13+3.85000+
&.ono~lJ*
4015000+4.3’7000+
4.4CO(JO+4.6nooo*
4.7GIJ(30+
4.9nU00+
5.OFOOO*%.?nOOO*G.3~uo(J+
5.SFOOO*5.6<000+
io0
0
0
00
000
00
000
000
0
00
0
00
00
000
00
~*6”/1+4-lll?613R(J%u3
1.01965-1 LI?6!7Q08U3300bS/1-lLl?60RlJf3U3
?,3*149-l A1769n09u33.56=oo-l l126nquHu3
4093~~/-lll?6oRLJQu3?ot,’+’JcJ/-lAl?6nFll.lJ31J3
4.-/:35*lLl?6[)R03U3U3
?* 7S~Uf)- ]Ul?~IOPOSU37.745/S-lll?f>oqi)8u3
3026H93-l ll?6CJRrJ9U3],399Z3-111260R09U3
302ti5~4-l l1260~lJ9u3s.H26+8-141~6n80Ru3
1.21312-lL12f>oqLJ8u3
3*02~4~-l~l?6fJROfiU32. ].4U~~-l+12Anqu8u33,] 9ba8-ldlz60R08U3
2.35~e5-ldl?6fJRU9U3
5.QuJub-l;l?60n09u36085$Jy4-l fl?60R~8U320719’+7-101?60qOBU3
3.f15z~7-lbl?60qcJ8{)32.Roy~9-l+l~61)Ro8(J3
4*51Z13-191?60$138U310~3/’+b-lf12A081J8U3
105003U-1P1?60$I08U33.694LJ4-l/l?6rlf?oHu31.fJ35J9-l f126(JRQ9!J25,54HftI-181?60R08U3
(l*ooourJ+ U126(JR08U3
55
5070rJuu* u - I q.7fj000+ O 0.00U0O* 6’ ~.RnOOO* O 0.000UO+ u 760F108u508500U* u ~~<;~~~-17 5eQ0000+ o y.7blH3-17 q.9K(joo+ o OoOGOOo+ U{?60RO~U~ ~~~~
60UOOUU+ o d./(J4]o-l/ 6005000+ o fi.00000. (J AOlf)ooo* o 1063515-l }1260i10RU3 ,?Y666.15u0U+ U O.OUooU* 1) 6020000+ O 1.9tJt30-lR 60ZKUOI)+ o o,ooOJo+ Ul~60q08U3 z’Y67
o. 500UOi3E+04 o (1 1 l?&1?fiOR08U3 2y68
126 1 0 IJl~60RUIjU3 ~q6~
O.ol)oou+ u 1.1s111-13 50(l(looo- .2 3.65418-1~ l.onooo- f p.06Bj5-l~l>61)q08u3 2y70
1.5ooOU- 1 Z.45341-lZ 2.00noo- 1 1.49089-11 7.5nOoo-3ooclooLJ- 1 1.’J~65/-l2 3.50000- 1 lo9-l~f39-l? 4.0nUoo-
1 5.31112-l.?1260SIJtiU3 %971
4.5n(lrjlJ-1 ?. 11$61-lZl?6nqo8u3 2’+72
1 2:U2422-12 5.00000- 1 .9.4~134-11 %.5no13(j-6.0uoou- I 4:4?314-12 6.Ii(I(_too- 1 a.ql/2’~-11 7.0nOOo-
I ].7i?ll l-111?60qoFIu3 2y73
7051Jf)oLl-1 3.b79~4”l ll?fifJnoElu3 .2’.J7*
1 101~~9u-11 8,00000- 1 8,5u514-l? Q.5n000-
9.00f)uu- 1 le25~?l-11 9,500(70-
1 5.4hj31-lLl?6nqo8u3 2975
1 4.14341-1? l.onuuo+ o 2. IH3Y$J-11]?AIIRI)J3u3 .?$j76
1.050UU+ O 6:u740b-13 101f?(loo+ O 1.40/78-11 l.lGIJoo. o l,038~/-l?l?6nqlJ!lu3 2’j77
i.dooUIJ+ O d.(ls~~~-1~ 10?5noo+ o 1.4bdl?-11 1.3nOf)O+ o 7,9?b~b-1Jl?60R0tlU3 ?qr~
1.35000” ~ d*l~l&7tt-11 l,4~ooo+ (J 5.()()>/3-12 ~041ioolj+” o 40%*’+’~2-ld] 7flllnuulJ3 i?’~79
t:~~ci~~ O ~:;$;;~:i$ l:;;ggl: 8 $:~~;;;~!$ I:;ct!ll: g ;:$$Wzti{$:ll;$;t$ $zifl.booOJ* u P;427%3-li? 1085000+ O 6.11*61-13 1.9nOoo. o 2.291~1-1212601+08u3 29821e950LJu’ o Z:430]M-14 2.o(Iooo* O 3.4~t)2H-12 ?.oqOoo* o 3.0q?J2-l~1260qOf’)U3 2983
2.1OOUO+ U ~c13668-13 2.1500()+ O 4./<105-17 >.2nOf)o+ o 1.0%934-121?6fJR08U3 2984Z.25f)OU+ U L~fJ14~5-13 2.30noo* 0 4.35S9Y-16 ?.3%ooo* o 1.21214-l l1260q09U3 29S52.4001J!J* O 50~0~31-14 2.45000+ o &.15ti3S-14 ?.5nlJoo* o 8.72.?d9-l:1?60QU8u3 298fJ
2.5500u+ o 2.1/t!n9-13 2,60000+ o 7.3du39-1% 2.6cooo+ o 1.054yf3-1z1260R08u3 29H72.700uu* o ~oL)7938-14 2.75fIoo+ o 7.21b47-14 ?.RrI(J(_Jo* o q.P!;’/+O-l+l?fioq08U3 291tf3
2.h50uo* U d.u47%b-15 2e900fIO* O $3.72974-17 7.9%uI)o* o ?.?6Z~l-l$l~bOQ,.19U3 2yB93.UooOU* U <0557%f-13 3.05000+ O 7.H4019-ls 3.lnOOO+ o R.5H5*l-lcJl?60FiOfIU3 2990
3.1501J(J+ u d.Od~~b-1+ 3.?noOo+ o 1.Hud88-13 3.?<uoo* o 1.0Q5d6-l+l?fiORtJ8U3 2991
3.39nOu+ U U*U946H-14 3.35000’ 0 601130R-lG 3.4fIOoo* o 2.01B’*b-l*l ~6nn0qu3 ?9923.4500U+ O 1.()$73+-13 30%ooo0. o 3.6?u74-1% 3.5<OOo+ o 3.1735R-1bl~fIOROqU3 2993
3.6bO(JIJ+ u l~Z1074-13 3.65000+ O 4.33<79-17 ?.7nunn* o ~.207”+1- 141?fjoqOBU3 2*963.750UO+ U 2.~yQlo-1~ 3,Roooo* O 8.09167-l”T q.f!=OOo* o 1.6?8*9-1+1?6(IR08u3 2y95
30900UU” U sofd8R&16 3.q5000* o 7.04140-1% &.onOoo* o 9.61U~3-15126nq08U3 2y964.05bou+ o 1edOF19j-1.5 401f1000* (J 5.0<M~3-16 AOl<oon+ o 5,~/i/i+9-181?60RU8U3 299”?4.2oooIj* u <.91~17-17 40?5000+ (j 4.7416%-17 &.3fiOoo+ o ~.3n5jl-l f1260q118U3 ?998
6*35uUU* U 5.31021-16 4.4(-)ooo+ o 1.(lyOl?-17 A04qooo+ o 3.5b9~2-l (l?60~08u3 2999
4C5000U+ O l*U41i71-1/ 4.s5000* O P.56777-19 &.6n(J00$ o 1.~9Y/7-lS12/,0q08U3 ~UOO4.tJ50ULJ+ u 1oI<5?;3-18 4.7n000+ O 7.12183-14 6.7<000* o 3.5Ab~2-ly12bOq08U3 3u01
4.~oouu+ u J;0240c!-17 40$15000+ u %.35+37-15 4.9nooo+ o 1.S’)(J*-i/l?60ROi3u3 3U024,9%{)ou+ o 1.M5641-17 5000000+ o o.ooUoo* o 5.o’51Joo+. o 20536 ~T-171?60q1)8u3 “11J03
5,10uuu+ u U;UOOu(J+ o 5,15000+ o 1.26/9H-16 5020000+ o 3030b2fi-l1126nno8u3 3U045.25nou+ o 4.lL211y-17 5030000+ o 4.94+6”1-l’/ ‘sj.3%000+ o q,520d4-IU126080$3U3 3u05
b,~OU(JO+ U bi/6641-18 5045noo+ o le33dj5-17 S.~OOOo+ o 4.89Hy2-181 ?AgqOflU3 3U065.!J50dJ. 0 4i1175c?-1/ 5,~Qnoo+ O 3,3<269-17 q.6Kuo0. o OOOUOIJO. ul?60qJ3U3 3tJ07
5.700uu* u 1.ltJ5<5-L~ 5,75000* U U.uOUoU+ o 5.8nooo* o (,.l)fJUUO+ 01?6(JROUU3 .~U085.8500U+ U 1e_d14b5-1”/ 5e9f)ooo+ o ~.6da5J-l/ 5.9Kooo+ o oeooof)l)+ U]~bOROljU3 3U09
b.OoOuu+ U <.4d6&o-11 60f)5Q00. o o.of)uoo+ o b.lnOoO+ o 10S0349-171261)RJ8U3 3U1O
6.150Uti* O U.UOOOU* O 6.~oooo* O y.7b’+59-la 6.2<UOO+ O 0.000UO+ u1?60R08U3 3u11u. l!i)lJor-JE*(15 o 0 1 1261~60FIuf3u3 3U12
12(3 1 u o 0 ul~fion0803 3u13O.OooOU. O 9.94728-14 5000f)oo- i? 3.4~076-13 l.onOoo-
l.50(Juu-1 1.96bf4-l~l?6qnogu3 3u14
1 :.31173-13 ?,(If)OOO- 1 E1.7~~37-l? ?.50000- 1 3.326y3-121260a08u3 3U1!Y3.00autJ- 1 /.~d4Ab-l.3 3.s~ooo- 1 1.39379-1? 4.0nooo- ] 5.653C15-1.312601!OBU3 3U164.500uu- 1 1.19552-12 5.00000- 1 1.4dd27-11 ~.5pooo-6.000uu- 1 <*Z’J5R5-12 6.%oooo- 1 2*3~U06-11 7.0nOoO-
1 6. 110~7-lcf’126nm08u3 3u17
7.501)uu-] 1.9429fl-lll?60q08u3 3(J18
1 Y011J843-12 8.00000- 1 ?.25038-12 R.5nooo- ] 2,44~Z1-l<l~Aoqo8u3 31J199.(J900U- I Z.52%8U-12 9.50(Io0- 1 1099413-l? I.(lnOOO+. o 7.579~3-l<1260$IU8U3 3U201.U500U+ U ~*’+9RP5-13 l.l@ooO+ O 405t!+33-12 lel<Ooo+ o Z.954)0-1:1260R08U3 30?1
l.~O(IUu* O 10Uy790-lt? 1.?5000+ o 4.36/6S-12 1.3nooo+ o 1.n8916-ldlp608U8u3 3U221035(JUU+ o 2S~?747-12 l.Af’)ooo* O 8.71/7N-1~ 1.45000* o 101t?9y5-ld1269q08U3 3U2!31.50000+ O 2./~351-13 l,%5noo* O 2.71027-12 1.6nUoo+ o 1.34615-1S1?60R08U3 31J24
1*6SOUU* U 1*~932c-12 1.7nooo* O 6.1ZY45-13 ls7c,ooo* o 1.551/5-ldlP60q08U3 3U2tilo@OoUb+ u ~.lZ76U-J3 1.FI!5000* O 2.63+30-13 1.9fiooo+ o 8.83’+/?-lJ1260J10803 3U261.95nuO+ o d.4~%KLI-15 2.ooooo+ o 6.77356-13 2.o<(Joo+ o 8.466+8-1$1260R08u3 3u27
Z.looUd* o l~b32n4-lf+ ?.]5000* o 3.9U175-13 ao2nooo+ o 7.63’+’+0-lq1260q08U3 3U28
2*251jol)” O 3’+354b-l’+ 2*30000+ O 3°14~81-14 ~*313uoo* o 4e4~142-131?6nRogU3 3u~9
2,400uu+ u 1.8~933-ls 2.45000+ u 1.01z7+-14 2.50000+ o 1.6oZu&l+l?6nf108U3 3u302.550uU. U ~~ll?2p-lS 2,6nooo+ U 4.711~0-lb 7.6<000+ o 3.099b7-141?fYf)RO13U3 3U31
2.700i)u* b Z.Z8751-]5 2,75000+ o 2.5ud55-15 2.8nOoo+ o 1.86db8-lbl~60QOt3u3 3u32
56
z!>8%uou’ O ~*1’+772-15 2.QooofJ* O 6.hlJ47-17 709S(Joo* o 6. 0YSz7-lbl~60n(J8U3 3U33~.l)OfJOU* O 5?459Ab-lij 3.05000* O 4.99307-17 3.ln07J13+ o 1.24’Jf~-15126f)R08U3 3U34
3.1~oUtJ+ O 1.141At~-lb 3.Pnooo* 0 5.11d45-1~ ?.2GOOO* o 3. 364bl-lbl~60QORu3 3U3b~.~oot)~+ 1) **U”l]HJ-lb 3.35000+ O I,tll+o[)-lc 3.4rOOO* o 9.53U~b-l !1?61j8011U3 3u36
3*45(TUJ” u ~*ul?13-15 3.5(,o13~+ u :*(JC?}~9%-16 I.sKuf)fJ+. ~ ?.91Z5.18-] 0176080))U3 3U3?3,60cUU+ U ~.Y4t17Z-lb 3065000+ o ~.8<Ul”r-1”/ 1.7iIfJfIo+ o 1, 1L;155-101?6(IQOHU3 3U38
3.750u~” U L~d~.?4b-17 3.8fi(loo* U 7Q7Z~U9-l? .3.i3sooo* o 6.4ji?U.]-l (l?60$ld9U3 2u3y3.YocIJO+ o b./b/+~b-l7 3,Q5n00+ O ].6347?-16 4.OnOOO* o ?. lqlu?-lbl?6nQudu3 3d40+.l)~olld+ /l 9.293U4-1~ f$elfI~OO* () 4.Hdu?l-lA &ol<U07f+$o SeOf>O~6-lUl?60QU8U3 3u414,/u(]uu+ u ri,f~H~tJ-1/ ~,?~ooo+ ~ 4.5tltJ35-17 fI,3flu[)o+ () ?OZ1’+U/-l/l?60q[)qU3 3u42
4.351JtJu* (J 5.Z9190-16 404f)~oo* o 1.82675-17 4.4%000+ o 3.41919-171260808U3 3U434.500UU* L! 1.U0731-17 6.55000+ O >.4b/98-19 A.6qOOo* (I ?.445j0-161zfinR08u3 3U444.65001J+ U 1.Uu(192-18 607fIOf)O* o ?.3i?062-lci 6.7<000* o 3.4461H-191?bfJqoFJu3 3U454,800(Ju* u <.~).424-l/ 40R5000+ o 1.7*U7H-16 4.9nOoo* o 1.53958-171?60R08U3 3U46
4.4~0fJ(J* u 1,/8?/39-17 500nooo+ o OOOOUOO* o ~OoqOoo+ o 7,4401jl-1/~?60qQ9 ~:; 3u475.100UU+ U O.UUoO(J* U 5,15000* O ~.ZlY03-16 ~.2n000+ o 3.27Jd6-l flZ60Fi09U3 3fJ485,1?5(juu+ u /*u2Q1/-l7 ‘3.300(30.” 0 4.75s17-17 5,3600/)+ 0 9, 174Y1-lti]p6nRoqu3 3U49
5.4000fJ* U 9*50440-lJ3 5.45000* O 1.3033r)-L7 505rIOOO* (J 4.70V~0-lt31?60R08U3 3d505.5500u* U ~.~fJ817-17 506nooo+ O 3.2U215-17 5.6KUOO+ o o.00UUO* U1.26Uf103U3 3U51bo7000J* o 1.1:~5>-17 5e7500Q+ O O.oUOou+ [) 5.Finooo* o 0.ooOUO* 0]~6fJf10CU3 3U52
5,H50UU. o 101~06u-17 5 gnfloo. o 105bb55-17 5C9GCoo. o ooouOl)O+ Ul?60qU8U3 3U53
b*ufJuoiJ+ u doJ~6%2-17 6:0500U+ o n.oouo!)+ (1 fl.in’uoo+ o 1.448’J5-171?60RO[IU3 3J54
b.150uo* 1! OmUOooo+ U 6,~f’)ooo* o ;.6~bb4-lR fi,~qoo~+ o o,oouuo+ o17boRo8u3 3U5!Yo. 5.ouonE.05 o 0 1
1261261260ROBU3 3u56
1 0 0 0 01?60R09U3 3U57UOUCIoUU* U 5.<164.?-14 5,0n~on- .2 2.1db53-1.i l.OnOOO- I 6oL72~8-131 ?6flfJo8u3 3U58l.5~~,(J”- 1 :*!U’5(,5-14 2.0fl(Jl)f)- 1 7.2<+32-13 ?.5nuno- ) 3.443@6-131?6qR08u3 3u593,013(’Juu- 1 Z.813nZ-13 3,5noo0- 1 7.5~165-13 4.OnOOO- ] 1.41419-l~l ?60RJ8U3 3!J60
4.!JoooiJ- 1 9*U’+7qt$-13 ~oonOOo- 1 101 fjQ3-12 %.5Poo0- ] 1.244J9-1+1260Hus3u3 3u61b.Oouuu- 1 ~:167?/-13 605n000- 1 i?.8bbz8-12 7.0nooo-“?.50(J(Ju-
1 10041+5-1~1 ?6(Jf408U3 306%1 d.yhl~b-1~ 8onn000- 1 U.55U?3-13 R.5q901)- ] Z.851S1-131Z61)R09U3 3U63
9.00ufJ’J- 1 d~?<~30-lj 90~n000- 1 6.1fj/5-13 ~.onooo+ o 7,8’/~yO-141~60fI(JRL13 3U64
1.05fluU+ U 1~~56qb-lIt lolooOo* U 2.8ci5Rl-l? l.lR(Joo+ o 40748U5-141?611HO?U3 3u65l.dooOU+ U b*yZq78-14 1.?5000. u ~.6HdIb-13 1.3nooo* o l,31b<2-~*l~~nRunu3 3u661.:+50u\)* u 4.05J3PI-13 l,4nooo+ o 7.39/53-16 1.4<000+ o 1.0u911-l*17fjn80f3u3 3~J67
1.50000+ u i.u64nl-15 1,55000+ o 4.96u26-l? l.finooo+ o R.[]9/23-131261)qo8(i3 3u68
I,b50uu+ o b~-:jn2<-lb lo7n000+ u RoJlt>~u-lG l,7f:u00* o q,hll&~-l>i~~~G08U3 3U6’;
10800UU+ 0 2.40757-!b loH5(loo+ () 1,1S1>/-14 lo9fi(loo+ o 100~358-l~]~6nRo3u3 3U70
1.9511(J()+ U b*l~651-lh 2oonoof)+ O 1.34E53-13 2.o<OoO+ o z.9tlb~4-141260RllHu3 3u71.2.10{)U.J+ o ~.(1213-lb 2.15000* o 3.45287-14 7.2.(Joo+ o ].671y8-141 ?{>fiR08U3 307.?2.250uu* () d.~~?Qd-L5 ?03nooo+ o <.75bll-16 >.3<OoOa o z.64iU3-l’*lPbfJFiUFJU3 3U732.400uo* o 1.368q4-lb 204sooo* o Z.1553Z-lA >.5nooo+ o 2.5Vzttl-l<LZ60RU8U3 3u74
205S[)UU* u ~.5yssl-16 ~06nf)(jo+ o 109ZU57-1FI ~06cuoo+ o l10fJIOZ/-lf12~~f103U3 3u75
207000J” u 10/6775-16 2.750no+ O 3.UH195-lA ?.~nooo+ o 1.3?9y3-lhl?AOR08U3 3u7~2.850UU* O 5:!2!312-1S 209f)fioO* O 7.16781-17 p.9<ooO* o 2. ~6YU6-l!]?bOROIlU2 3U77
~.UOOUU+ (1 5.fJ6414-17 3005000+ U T.6b+77-17 3.1oOOO. 0 2. lk419-15] p60T{LJtlu3 3u78
3.150(JiJ* o d=425R/-ll 30>nf)~o+ o ?.64u41-17 3.2KOoO+ o 4.7[~Olo-171p6nRUNu3 3U793.3000u+ u tioUlf)Q3-Jb 3C151100+ o 3.54347-16 3.4nooo+ o 2.s~~btl-ll17AoRfJRu3 3uG03.+500U* u Z~d996Z-i7 305no~~+ o ~.6Md5b-16 :j.5~000* o 2.oRO/,?-lb124nROtJu3 3u81
J.600uu. o <0/0798-17 3065fioo+ o ?,6H*81-17 3070000. 0 h,!i4bd9-171~6[lRutlu3 31J923.75nOU+ u l~blo3b-17 3.t30000+ O 5.3”/173-17 q.fj%UOO+ o 1.691Jy-l/lz60RiJf3U3 3u833,90~ou* u ~:124152-17 30Q5n~o+ o 2,4bJ~4-17 4ooRooo* o 6, 094h9-~81?6nRu8u3 3Ufi4
4,(JSoUU* u 6.h50ns-17 4010000* o 302Md83-14 4.l<ooo+ o 3.4393h-1131~6(lR08U3 3(IH54.2onUb* u 1.Y4067-17 4.75000* U A.245%’3-17 4.3POOO* o 1.4Gb19-l/l?6nQUtlu3 3u864.3EI(Juu+ u d.5h1309-16 4.6nnno* O 1.43/22-17 &.4Kuoo* o p.a3853-lflz6nno8u3 3UR7&.bIIOUU* u “/.~!J6~b-l8 4.155009+ o 1.7t!Uo9-lU 4.6qLJoo. o ].3f)91J5-lb] ~69HU8U3 3UfJ8
4.6~[Iuu+ o ~~dd59S-19 A.7nnoo* o q.o~tJl13-lQ 4.7<oo9+ o ?,4H5bS-191p60RU8U3 3UH94.Urj[IuO+ u G!.~1167-1”/ 40R50~@+ o 3.75s9s3-21) A09,n~o+ o ;e22Z@l-171?6nqu$Ju3 31J90
4.95uULJ. U 1.2U.371-11 50~nfioo+ O o.UOUOO+ O 5.OrUoO. O 1,795~3-1712AoR09U3 3U915.1ooUIJ* U U.UUO~L)* (J 5.15000+ O 8.6bu59-17 5.2nOoo+ o ?.59~L5-l/lz60t30f3u3 3u92
5.25000+ o i~~b8nb-17 5.30000+ O 3035bo.3-17 q.31iuoo+ o 7,z8’J15-l~126rJR08U3 3U93
5.400uo+ u *.17474-18 5045G00. o i.os486-17 1505qOGO+ o 3.456s8-181260R08u3 3u945.55LUU+ O :.ib(lq4-l”? s06flf)oo* O ;.54Z61-i7 <.6GOGO+ o oeooU(JO+ Ul~6(JFlo8U3 3U955.7~3uu* f) Y.O”fZl/-~Lj !jo75~no+ 0 o.oouoo+ n qQ~n(JoO+ 0 ooo~oof)+ 012AOQIJAW3 3u905.85CIUU* U 9.294’71-18 50qnooo+ o ;.24S89-17 %.9C!Jt)o+ o ooooULlo. Cl176~RURU3 3U97
60tJO~tJIJ+ o 10yUZ{./-j? 6.05(,ou* u Osubooo+ o 6.Inooo* o ].1’,o>i-171261t9u}3u3 3u98b.15quu* u U:lJUoOo* u 6.?oooo+ o 1.2S~JlJ-lfI 15.2c090* o o.uoOllo+ Ul?t,fJAlJ8U3 3U99
57
o. 1.UOonE+06 o 0 1126
1261?60POHU3 31091 u u (3 u17f,llQuau3 3101
O*IJOOUU+ (1 C*Ub4%9-]4 5.f)fIOOO- 2 ].0b009-l? ].o.o(jO-
l*500uJ-
1 ?* !$s:H-1.31?fsrla.lnl13 3102
1 3.bb71/-l4 zof)~flofl- 1 1.YQ1’,?-17 7.~!n(ln(l-
3euucluu- I 1.9rn45/-1~ 3.5noon-
1 r..qL,~fj-l*/>&f)},l)l{ul 3103
1 L.*1506-13 4*oII(joo- 1 C),Z1/d~-l+lPAti;J”;Uj 3L~44.500UU- 1 b.t14343-13 5000fIOO- 1 40511d5n-13 5.5qOoo- 1 306?8b0-1bl?60R08U3 310560(JOOUU- 1 lS 18368-13 6.~nono- 1 7075U34-13 7.0nooo-7*51)(Ju(J-
1 3.R5M49-131?6fIRUf303 31061 1*15?’>5-12 f?,ooooo-” 1 5.41130-13 R05qooc-
9,ucllJuu- 1 Ci:3u95b-13 9.5flooo-1 l*?3~91-131i?6rlf3ufJu3 3107
1 1.7bS8R-13 l.o~ooo+ o 4.009fI/-141?6nR08U3 31081.1J50Ud+ U ~.~~~’jl-lb l.lnoOo+ U 6.19641-14 l.l%(loo+ o 1.40f~/-l+l?6nf!ubu3 31091.2000,J+ U l*bl%65-14 1.25non* o 403U/2a-14 1.3nOOO* o 2. f117S3-151?60QUaU3 311Ol*J”ILUU* u 1*:~411-13 I.lil-lof)lj+ o 7015180-14 1.4=1)00+ o 3. .35i?l3-l!Jl?6oflor3u3 3111
105OOUU” U d=*lR?4-lh 1.55000* O 4000’+43-17 ~06flUoo+ o 4.164~/-101?608U8U3 3112l.b!j(ulj. O S.U<l~~-lb lG700no. u 2043>oS-1% le7%i)00. o 301432LJ-161?60auau3 31]3lo~od(ju+ u 1.<h9]l-ltJ 10R5n00+ o ~05d47~-16 l.qfiofjo. o ?094u>0-14126(jRotl(13 3114
1.95f)UU* U 30!Uq7f-lb ?,on!Ioo+ O 3.55/47-14 2.o<OOO+ o /3,56b+7-151260RU8U3 31152.lnnOu+ u 1.Z5qO~-16 ?.15noo+ u 1.1304+-lG p.2nono+ o 4.710~4-15] 26nROtlu3 3116
2*<3n(ltJ+ !I 3*b~f,f,4-lb ?030~oo+ O 4.6450b-16 2.3’=001)* o 7. 768+2-151?t,nRUflu3 31172.4(]00u+ u 9*!Y44/?5-l/ ?,45f)oo* o 1.4db61-lh >.q,ooo* o ~,05~>~-ld12~1)80~][J3 3118
Z.b5nUlJ+ U C*lti3q6-lb 2.60n00+ u 1.1b/5R-16 2.6c!Juo* o 4.293<4-l/l~60ROHU3 3119
c?070uULJ* U 1~1939’j-10 ?.75000+ O lo8~UY.?-16 >.8oo(Io* o 7.515”j9-l f1260ROHU3 3120
Z ~5nOu. n 4,’59f123-lb 2 90noo+ O 5,1Z(J67-17 z 96uo0. o 1 2,14yH-l(lz60ROSu3 31213;OnoUu* u b~U?3i\.?-l/ 3~f)5noo+ O 1.1dlo5-l”f ~~lnOoo* o ~~723-$6-151?(.nR13f3U3 3122
.3.151)UU+ o 1.b,)795-17 3,?onoo+ o 1.SZ005-17 a.?<ooo* o ?.t3+.3+9-l/I?60QoHu3 31233.dO~UIJ* U 1.ld76b-16 3,35n00* U >.O~f?#-16 7,4n000* o 1.669~ftt-l/]?60RO13u3 31243e+>fiuu+ O 1.+c!]A1-17 3Cqn000+ o 1.%}J67(J-1$ ?.5c.(Joo. o 102Y.?J9-101 ?60R(JHU3 3L25
j.6uOUU+ O <.~40QJ-17 3,65000+ u 1.67ti53-17 3,7nOOO+ o ~07b4b4-1/l?AOqORU3 3126
3.750UU+ U 1.U204U-17 3.RfIooo+ O 3,3<UH1-17 1.8~.UOo+ o 90919/3-181~60R08U3 3127
3.~oouIJ+ u 2:’$51+0-17 3,95tjoo+ o 1.45H07-17 4.00000* o 3.597d6-113] ?6nnof3u3 31284cU5UUU” U 4*116]tJ-17 4.lPooo* o 1.95HH1-16 ti.l%[loo+ o ?e050/O-lR12AOR08U3 31294.200uu* u l:lyo71-1/ 4.?5000+ O ;.oti485-17 &.3fiUOO+ o 13.821b5-lHl?6011U9U3 31304035UOU* o 2.lUolo-lb 4e4nn00+ o 1.0ti30ti-17 6.4<UO0. o 1.4oYol-171?AnRJHu3 3131
4*50(JUU+ o 5sbHf364-lH 4.55n~~* o 1.1bol.3-19 4.4nuoo* o fI.0!Y~9-l/IZAOPUIlU3 31324.b50Ul)+ u +0346hb-19 4.7n0uo+ o ._+.713°r-l% 4.7<000+ o 1.fj?8~5-lyl?f.0RI)tlU3 3133
*.8~~UU- O 1.O/lfj4-lf 4oaFnof)* 0 Y.b41~~-21 ,i.9rIUoo* o R0846f5-lMl?60sOnU3 3134
4.9%ouu* u /oIoooI+-18 5000000* u 11.ouoo13* u <.n,:uuo+ o 1. 1t)141-1f1 ?611q08J3.3J355.1ooU(J* O U.UUnnu* O 5.15000+ O 5.49d57-17 502.uo0. o 1.a811y4-l ll?60q9Ru3 3136
‘Y.dsgUU* o d.lJ!JQQ4-lf\ s,~nnoo+ o 2.109?1-17 K.3~ooo+ o 5.272u9-1M1z 60QJSU3 3137
5.’*OIIULI* u j.21444-18 5045000. 0 7.4690$-1P. G.5nocJ3+ o ?03?~~2-181P60RO$7U3 3J385.550UU+ O ~.ZMU;9-11 5c6nnoo+ o 1.84u02-17 fi.6coo0. o OCOOI)UO. u1260HL18U3 313Y
5,?ooou+ o b.’Jb532-ld 5075noo+ o nOOUIJOO+ CI SeRn{)OOt o o,uOUUo+ u1260f10}lU3 3140
5,E5nU0. o 6. f2651-lil 5eQnOOO. o 900U171+-lR Ij09COOO+ o OOUOOUO+ ~176fIPORU3 314)fJ.000oIJ. u l.~fAQci-l/ 6005000. 0 ~ooouou+ o 601nuoo. o 8032SY9-181260qI)8U3 3142
6.l!JoOU* U 00U0IIOO* O 60zfiooo+ O 8.33932-19 6.pFOoo+ o o.oOUUO+ u1260R08u3 314~
o. 5:OI)I)OE+06 o 9126 1 0 i
120 ?6CIQUIIU3 ,31440 iU 260RO13U3 3145
0.000UU* U 5.S5033-15 ~ooopoo- 2 1.45324-1% l.onOoo- ] 3.66U~3-141F6fIRO~tj3 ~i461.50001J- 1 d.U:Ii~)2-15 2000000- 1 5.54Z74-16 p.5ncIoo- 1 1OO7955-15126OPOJ3U3 31473.UOUOU- 1 1~55333-14 3.50000- 1 7.93376-15 &.ofiooo- I 6.951/8-lb1260Rof3u3 31484.50000- 1 1.Ofllql-13 5.00000- 1 2.5bU83-1~ q.5nOoo- I 70499U6-lbl?60813tlU3 31496.6cloulJ- A b.25P50-15 6050000- 1 6.64<59-15 7.000oo- 1 le352~8-lSl?6nQOPU3 3150
705L)()(jlJ- I 4.?4244-13 aoOOOOo- 1 3.’/9b916l6 n05n[J~0- ] 80579~0-13]? 61)R(113U3 31519.600uO- 1 1.92Q?7-14 90%oooo- 1 3.B1H27-17 1.011000* o .?!.R3590-151260RCIRU3 3152
1.050Uu+ U ~.039nZ-1~ l.lnoOo* O ].1UU34-16 l.l~Uoo* o 7.96U94-l/l?60ROf3113 31531.20@OIJ+ u ZW14Rr>b-15 1.?5000+ O 4.69553-17 1.3nooo* o 1.737f8-l/l?Ann6Ru3 3154le350uU. o 3.1~445-17 ]04noo0. o 3.blu49-17 1.4rooo. o 50113/a-lblp6nt10Hu3 315!I10500uu+ u Ye~<R~M-lH 1,55000+ o 3c~z>5tI-13 lo6nooo+ “ 30n J.jt?3-lMl?Anqofju3 3156
1.650UU* o “t*M7044-18 1.7nooo* O 4.1bb64-lR 1.7’iOOO+ o 1.3+>US-1717AnAtlRU3 3157l,800uu. u .i.58570-llt l,R<ooO+ o 1.89742-17 1.9.Ono. o ?02flob 7-171?60Q,]t3u3 31581.950uu. o G.190<1-17 2000000+ o A,~dhljh-17 >.O~UOO. n 4.142i)6-~/12hnR0tlt13 315q
2.]ooUb* U 6~f197d-18 2,15000* O 1.9*05?-15 >.?nOf)o+ n 3.2(,bU0-lb17hnR9~li13 3L6U
2.250uu* o 1.’?U024-17 2.3iInou* o 7./3’)92-1s ?.3LUOO* o 6.06+41-lf31?6nROnu3 3161Z.~OuOU+ O 4.86??2-lU 2.4’ifIoo* O 9.14!Jo%-l~\ ?.~n@oo+ o 1.f13153-141 ?60Qi31]U3 3162
2.5kiouu’ U /.dc!420-18 ?.6n000+ O P.90-$55-lD P.6%UOO* o R. HU348-191?6nROflU3 .3163
d.7001Ju+ U d.~15qs-lH ?.75r!n0* 1) 6./t,yl(l-lH ?.Sn(lOo+ o 3,7/lliJJl-l})]?611SJ},U3 .?164
2.b5~UU+ u ~*t~b8u4-lb 2.9nnoo* u l.bddlS-lP P.QF.LIOO* o 3.z(lo/3-l’)l?f,nt\utJu3 3L5!J
58
3.o@(JIJ(J*3.1590L)+3.300UU+
3.4513(lu*3.bo(!llu+3.75[]Gu+3.90000+4.(J5~ou+
40200(JU+4035L)UIJ+4*500UU.4.65(Jod+
+Ob~@ou+
(J Y.87f3Q3-19U 1oU1227-18o d.192fi3-la
U 3.670i12-19u 1.ug57t?-ltJU 4.J29s9-19U 4.Y4074-19(J l;q5f141j-18
u S.bY971-19() 3.’Jl)239-l8o +.J4H65-lYu 5.4ti%@d-zl
U 1.:7s86-18
3*050(JO+3.ZOI-JIJ()*3.35000+
3.’3nooo*3.65000+3.n(31-J(J13*3.95n90+401n000*
4.~5f300*
~.6(looo’4,55@13~44.70000+
4.85(700.
o 6*9by36-19 ~olnof)o*o 3.74+00-lQ 3.2FOOO*o q.7do16-ltl 7.4no130*
o ?.9t~51-lR 3.’3<000+”u 6.27+QR-IQ q.7nuoo+
o 1.ld58R-lH ~,8%ooo*O 9.8~+3fi-lQ /4.ofilJoo+o 4.2ZZ6H-lR 6.I<uoo.O 9.80ati4-lQ 4.3c[]60*
o 8.of441-19 6.4=13(30*o 6.2+i31-i?l 1..6oooo+(j o.19<p5-i?l 6,75000+
o -+*3’+~6@-d? 4.9.000+”
1.3.?7f6-lb126r)QoRu3509%3do-19126nRn8u3R. 130f6-lY1260RU8U3
4.6oSdo-l~176nR0f3u38.0?Ob9-lyl?6080f3U31.6Hb’+b-191?60808u37025U13-2U! P60POdU34,36*b7-2; l~60!a08[)3
l,5*~lo-191?60Rn9u33.551~6-lyl ?~IJRoau32045dL14-l@] Z6qRUf3U380715+H-211 ?6(]8uHu3
7.3P9d3-lyl ?hllRo[iti3
316631673t4e
31693170317131723i73
31743175
31163L7r
31”78
4.95(julj* u l:z’t3(lJ-19 5.fJniJoij+5.1OOOU’ o O.UOOOO* u 5.15(-)00+5.2SnOu’ u 1.33R48-19 5.30000*
5.4oouu+ u 2.UU741-19 5.45non*
5.55(lou’ U 1:~9391-ld ‘3.6nooo*5.7nouu* u a.*2430-]~ 5.75000+
5.8SoOu” u 5.55748-19 5.911noo+6,(IOOLILJ+ u 1.137AZ-18 6005000+
6.151juu+ U UOUUoOO* O 6.POOoO+
?6nnutiu3 3179?fIoRd8u3 31f30
261)QOflU3 3181?60RURU3 3182?f.(ls40RiJ3 3183
?6nROHU3 3184
?6flqunu3 31R5260RORU3 3186
?61)8LJ8U3 31&i7
o, 1.00(JOE*U7 o 0 1126
1261?6fisGilu3 31881 0 I-1
O.OOoUU+ o 1*8M730-15 5oonooo-u1z60f408u3 3ie9
2 2.41y57-16 l.onooo- ~ 1. 15304-l~I?A(IRoMu3 31901e509uL1- i 9.73419-17 2.0(_)ooo- 1 1.9<965-16 P.sfiooo-3.uo(Juu-
] 7*6rl~3-1/l?AllRu8u3 31911 b. f15?9-16 3.’iooi3o- 1 6.39968-17 f+.onooo- 1 4.!32i?14-151?soi108U3 3192
4.50fjou- 1 d*dTo02-14 5000000-6.0Clo(l(J-
1 1.5Z1359-15 %.5nuoo- 1 ~.3i++b9-l~]?6n~u8u3 31931 Z.11OII7-15 605n(loo- 1 4.58879-1% 7.0nooO-
705(300u- 1 3.394s6-13 F!OonooO-1 7.2fl~3-l*l?6(IRo8u3 3194
1 1.70*711-15 R.bnljl)o- 1 3,8/3Cb-lb]?AO$1013U3 3L$59ou(Joou- I 7iob364-lb 905nooo- 1 2.45/24-18 l.OnOoo+ o ~.l@ld7-lbl?60,ROflU3 3196
1.U50(IU* O 5~543i?j-17 l,lnooo+ O 4.olU4q-17 l.l~ooo+ o 9,34.”//8-l5l?6ond8u3 3197
1.ZOO(JLJ’ U 6*S75R5-16 1.?5000+ O 4.635zb-L8 1.3nooo* o 4.043u2-lY12fIoRo9u3 3198i.3~oUd+ O dIa4451-18 l,40000+ O a.7Yb35-lH 104GlJo0* f) 4.3f+d$i/-161P60R081J3 3199
105000U+ U j*aJ412-19 l,5~noo+ O 1s”3+’J95-14 1.6nUoo* o P.3:)702-191?60~oRU3 3~001,650LJu+ u 4.s52?1-19 1.7nooo+ u i?.05Jo”/-l9 1.7<000+ o 5.111.b’j*-1812fioRuIIu3 3tol
1.800ULI* O 1.yd379-19 ]OR50017+ o 1.lb373-lR ~.9nOoo+ o 2.4:)25b-181260ROHIJ3 3d021.950UU+ 0 **~92Q7-l& 2.()(,()00} o 2.8zb3Y-lu ?Oo=uoo+ o 2.8S1<3-:8]260R08U3 3d133
2.lor3uu+ u :.196?7-]fj 2015000+ o 106zY53-15 ?OZnOOO. o R.4j’8b~-2ulPAoRofju3 3t!04
2..25uUu+ U b*y’+557-19 2.3000()* O Y.b3383-1~ ?.~<(loo+ o z.89003-l~1760ROl)U3 3i?052.4000u+ u 1.:~041-ltl ?045n00+ o +,~dti/2-19 7.5n(too+ o 7,1034/-l6]26nqO8u3 3/06
2.550UO* U ~+~2CI?l-1’) 2.6Pnoo+ O 7..?lj93-dn ?.6%000+ o 3.4flblb-2U126fIR08U3 3~072.7000u* u &*<JQ40-19 2.750011+ O 1.23y2%-19 a.f3rIOOO+ o 1.51JJl-19126nRuf3u3 3d06
2,M50uU+ U 1.5Uf30EI-17 2,90noo+ o ;.250P7-19 709quoo+ o 10q40f9-2iJ12~oR’3f+U3 3doY3.000tIU+ U d.08317-2u 3.05noo* O 2098U2fI-2f! 3.1oOOO+ o 5,720$6-lf3126naO&U3 3~103.1500u+ o ~03~q93-2u 3opnooo. o ].23_i5P-21) 3.~qOOo+ o 1.1],0/2-2ul?Anno8U3 3<113.300uu+ o ~.~09Y3-2U 3.35000+ o 4.5tiU13-20 3.4nu00+ o 3.p36bb-2cJ1760J3tJHu3 3<12J.4500d+ U i.-i3480-20 3050(IOO+ O 400uM66-Z0 7.51i(100+ o 1.543U6-191?60808U3 ~~1~
3.bo13Uu* o 4.46371-%u 3065noo* O 2.1b+37-20 s.7n(loo* o P..351’=14-?U] 2A080J3U3 3Z143.7SOUU* o 10597R1-PO 3.QnOoo+ o 3.65U03-Zll l.R~IJoo+ o 2. 128+4-21126nqO13~3 3<15
3.900UU* u b.~tiflll-2i 3095noo+ O 4.6ZUZ6-21 6.onlJoo+ o 10436U8-2A1?60RO13U3 3<164.050UU+ U /~U137S-2U 4,1nooo+ O 8.2yu97-2t) 4.lFOOo* o 8.37ZL8-2d12bnROf3U3 3<174,ZooUO+ u 1.124d2-2u 4,?5000+ o 3.79u14-2fj 4.3nooo+ o 10792b6..2j l~6nno8u3 32184.350ULI* u 3~d7f179-zo 4040non+ o ~.b442%-%n 4.4%uoo+ o n.77Z/6-21126nq(leu3 .3d194,500LIu+ IJ 1.Y5”?3b-2u 4055000+ o 2.53415-22 ~.6n[}oo* o 7035547-2u] ?6uqut{u3 3d20
4.650Uu. u 1.+S5]b-22 407nooo. o 1.4b142-dl 6.7ciuoo+ o 3.5.38 f8-221?6f)RoRu3 3c214.&loolJJ’” U b:<bbP4-20 4,Q5000+ U 1.04186-<? 4.9nOoo+ o 3.331c’b-2u1260ROBU3 3Z224.550uo* U 1~’+3044-21 ~OoOnoo+ o fIoooooo+ u %.o<uoo+ o 207f!5u1-2u~z608u8u3 3<23
~.10cUb* U U.UUOO(J+ u 5e15000+ o 8.49(>9{J-2(J q.2nOoo* o 7.0H2b9-2Ul?60ROilU3 32?45.2501ju* u 1:2+396-21 50~nfioo* o ?.9jUUI)-20 5.3cooo* o 1.9[i5dl-?ul~6nnoRu3 3c!?5
5,40n(ju* u b.~bf,65-zl s,45000+ o 2.8C!UO(I-20 s.5nofio+ o 6.1t)4/4-2117hnlloHu3 3d?fI5.550(lut U u:b~f,()/-Z(J 506~ooo* (J 6.9Z~lb2-dfj 506K,ooo+ o (),OoUUu+ Ul~fjoliutjU3 3<27
7-*U ;:7::::: : ::W::Z; g’.9%(Joo* o o.ooiJul)* ul?&)fv3au3 3d293:::;;;: ; x:;; -20.8n000* o o.000uo+ ol? 0R0f3U3 3<i?8
6.000UU* U 5*18479-2U 6.05000* O o*UUUo{)* o 6.lnuoo* o 3. 13515-2u12fion08U3 3d306.150UU-* u l.)~OoOoO+ o 60~oooo* O ?,218&4-dl 6.2<000* o 0.000UO* l)1260f!08U3 3~31
59
o. 5.uoooE+07 (1 o
J
126 ?6nRo~u3 2d3-l~b 1 0 n 10 ?6nRiJRu3 3L3 $
O.OOOOtJ+ u 1*U2264-17 5tOOOOO- 2 7015870-17 I.onooo- 1 5~03y ’2-161?hnnotju3 3d34l.50C)o(J- 1 8.163s7-18 2,00000- 1 2.29Z41-lR ?.5nOoo- I 1.69f*7-2U12AOntInU~ 34.’j53.0001JU- 1 ~oMb132-lq 3,5n000- 1 3.~ZZ24-lR &.ont)otj- I 9.621L4-171?f,nRuHu3 3c!36
4.50000-” 1 4~027H9-17 5.00000- 1 P.1ZU65-16 fi.15noo0- 1 1. 13717-lRl?6nnodu3 3<376.000011- 1 L0~572b-16 6.5000@- ] 30Zb/7H-i% 7*OnOoO- 1 %.t3AZl?-l bl?60QuAU3 3<38
7.51J90u- J 3* f67H.$-l!5 Rsonooo- 1 R02’1/37-19 P.50!)oo-9,013~l.llj- 1 ;.zlspt)-z(i 9m5~~oo-
1 7. 17554-loll ?6rlnuJ3u3 3<39
1 8.0U024-d? l.OnOoO+ o 3.45Zcl-l ~176tlRo:3u3 3d40
1.05aud* U +.d36RZ-19 l.lnnoo+ (i 9.79.$6Z-lU 1.1%000* o 1.qtJb@b-lHl?6080aU3 3~411..2oot)J4 U ~.7”;L3U-18 1075000* U ?.0L!037-19 ].~.lJOO+ o 3, 192~H-2dl?6t38UR!J3 3/421.3souJ* o .3s0’J;lf\-19 1.4n000* o 4.5bZ89-i21 1.4%000+ o ],511’jo-lC; 7hnR08U3 3Z/.3
l.~OnUO’ O 10~ohof-21 1.55C(IO+ O ‘=*f19’400-lfl I*hn(Joo+ o 606251J 1-2Ul?60nUfJU3 3<441,6500J+ o ?.LU913-ZZ lo70n00* o S.4/4.~4-Z2 1.7<ooO* o 2. l]6u3-lJj]~6(}Roou3 3Z45
l.tJ{IrJUtJ* U 10U5169-?1 1.R5(too+ O 3.2+1U2-Z2 1.9P,0!)0’ o 4. 745dZ-191?6!391)8U3 3~4h
le95PIJO+ o yc(Hoo3-19 2.~nOOO+ o 101*113-Z1 2.0<000+ o 493~7ul-2~12~nn0H03 3d472.1OOOU* u lS~dS75-lB 2~l%noo* O 5.~2y57-lf. ?.2nOo0’ o 1.4Hd(fj-211 ?6nRu8u3 3Z482..250UU+ tl 1.y:071-2Z 2.,30000* O 5./bt~4h-1q ?.3~ooo* o 1. lh91b-lt$l?6nRoHu3 3<492.40(jUU* u 7.9<().’.7-19 2.45000* (J 2.51273-22 7.50UOO+ o 1.3421J3-191?AOf106U3 3~50
.Z.55(JUU. U 1.061/>-19 20~n000+ O fI.2617?-42 ?.6<OOo* o z.901uY-221 ?60qOHu3 3~512,7000u+ u Z~d?PRY-19 2.7500@* O 3.495’7%-2.3 ?.RnOno+ o 1.7]0~~-2~l?f!OJ~08u3 3~5~!
2.u5f)l)u’ u b.46106-2z P.qoooo+ o 1.1Y515-lQ 9.9Aooo+ o 3.319JS-2Z] ?6n90F3U3 3d533.00130u+ u 10’J1748-ZZ 3.05000+ u 1.3~’$lA-Z3 3.lnOoo* o z.4644%-221?60q08u3 3d54
J 15(loll* U ‘4 U2115-23 3 “?nn~f)+ (1 ~ 49b77-d3 3 .2qooo+ o 1 541/y-23176tlflu8u3 3d553:300(Ju’ u i~!9631-22 3:35000’ 0 Rs25bl?-23 3s4nOoo+ o 3~MQ5”’o-2317f~nRoBu3 3d5b3,4500u+ u 40437q~-2~ 305rqoo+ o 7.7b590-23 7.~%(Joo* o 1.P69JZ-231?60FIOqU3 3d57
3.60001J* O 1~@U7S~-22 3.h5ioo+ (I 7.t?H187-24 3.7nOoo+ o 3.40/+3-2d1260Q013U3 3d58
3.75[)OIJ+ o 4*7U994-25 3.Rnooo+ u q.6YfS8-25 ‘+.RE(Joo” o ?. 3?9*B-231?6nnOqLJ3 3d59
3.900uu* o I*u?6t39-Z2 3.q5000+ o 5.71fn5-d4 ~.onooo+ o 5D5R6+7-241?60q03U3 3d60
4* Us(jot)+ O y*5/56/-2~ 40]0000* O 6*41552-C!6 4.16(100* o fjo98751-3Ul?60f10tlU3 3Z61
4.2!OOOJ+ O i.5i741-27 4.?%ooo+ O 1040tJ90-ZB &.3nOoo+ o 6.52Yb/-2Yl26nflll8U3 3c62403500b* u L.Y4R11-27 4,4n000+ (I L.45676-30 fL.4%(JOO* o 100Z4L4-2H1760R08U3 3d63
4.500UO* U 5;b774d-3LJ 4055000* O o.O(JOOO* o 6.6nooo+ o 1.678Y8-2bl?60J108u3 3<64~.fY~oud* U u*UOoou* u 4.7iy900* o 6.9Y339-z4 &.74fJoo+ o 0.000LIIJ* :~?6080au3 3d65
40800Ub+ U I)”tioooo+” (J 40R5000* O 5*2~~2Q-25 4*90000* O O*Ot)OOO+ u1260H08u3 326b~O~5nou+ o ~:>4R18-29 SOoooGo+ o 0.00u0u* (I q.oc(Joo+ o 4.43~*o-291?finqo8u3 3~67
5.looOu* o O*UOunu+ u 5.1500n+ o 3*15?3~l-~$1 5.2fiiJoo’ o o.OOUUO+ ~l?hf7Q08u3 3~495.250(JU+ o f*4’3fj]b-2Y 5.30000+ o l*?9e3*-2R 15.3c(Ioo+ o O.OIJUUO+ Ul?t3nR08U3 3d695.40000+ u d:~906i-z9 5,45000+ o OOUOUOO+ o 5.5fiuoo+ o 1.803b1-291760noHu3 3~70
5.550uo+ u U.UOOOO+ u 5.6nooo+ o ;.00u0o+ o 5.6COOO+ o o.000no+ u1260R08u3 3~71
5.”/091jtJ+ u U:UOOOO+ o 5.75nn0* o ;.UOUOO+ o %.ftnnoo+ o 0.000(JO* u1Z60$309U3 3c725.850UU* t? O.UOOOO* O 5.9nooo+ 1) X.UOUOO+ o b.QSOoo+ o 0.00UUO+ u1260RO13U3 3~736.0000u+ o u:uuooo+ u 6005000+ o oOou(Joo+ o ~Olfl,)oo+ o o,onouo+ u12fioP.g8U3 3<74
6,150uu+ u 0000ooo. 0 602nnoo. o 6.4’sY59-Jo 6.~G(Joo+ o OCOOOdO+ U]?6GRUFJU3 3<75
0. 1SOOOI)E+08 o u 1lIJM 1 0 0
10H126oRO8U3 3d76u126f)qoHu3 3<77
0.000ou+ u ;*U0495-lB 5.00000-l.5clooci- 1 5S66S31-18 2.00000-
.2 1.~o~91)-17 1.00000- : 1.27Hd6-16126rJJluf3u3 3<70
3.0000b-1 =.6s499-19 ?.50000- 1 5.6Rfb~-2z] 26nRofju3 347Y
1 6*67376-19 3.50000- 1 2.64M23-19 ~.onooo- I 5.919y6-l/I?60Pu8u3 3~H04.5(JfJolJ- 1 d:d1892-17 5,0f)()()o- 1 7.5JU31-17 %.5nOoo- 1 6.415b3-l’J17f10nn%u3 3dfJl600000u- 1 1.449+4-16 6.5nnoo- 1 ?.’+~j929-l% “?.onuoo- ] 1.465Z5-151?6(IQU9U3 3c!~27.5rJfJotl- 1 1.</6:)4-1/ 8.09000- 1 4.0b1342-lq R.5ncIoo- 1 2.503Un-la] 260n08u3 3d839.1Joouo- 1 440uU3S0-21 ‘?.5nQoO- 1 5,cj6~46-C!? 1.O.7)oo+ o 1.208d0-l f126fInORU3 3d8410(J50UU* O 1.~7904-19 l,lo~oo+ O ?.4c’U61-18 l.lFOOo+ o 7041)519-1Y]76QR09U3 3d8b
1.2011uu+ u 4056A6:.-Z1 1.75000+ u 7.2ti594-Z0 l.sn[)~o+ o 3.27d~M-2/Iz60Rodu3 3<861.3SOOU+ o 20/5/!]4-19 l,40000+ o 4.37’482-21 1.4r.ooO+ o 308{2yl-1/]~60q013U3° 3dH7
L.~ooOIJ+ o 1.~/440-21 l,55000+ o 1.fJUh79-lli l.hnuoo. o ?034Z51-t?U]F60qOtjU3 3dflU
1.650UU+ O 5.5~035-22 1,70000* O &.9+~93-Z2 1.7ROOO+ o 7,39342-191260R08U3 3d139
108000u+ O 9*dU3R0-22 1.p5000* o 2.79182-22 1090000* o 1.66050-191Z60R08U3 3d901.9500U+ O 3t~~567-19 2.of)7toO+ O 1.00481-21 7.0~1)00’ o 3. 13M~H-2212{,1)80803 3~912.1OOOU+ U 4:63937-19 2.15000* O 1.4d*23-lfi ?.2nOoO* o 1.52~~7-211z60R08U3 3~92
2.25nUO* U ~R~5323-22 2.30000+ O ?.9Yu02-19 ?.3SUOO+ o 4.095~Y-191760608U3 3Z932.40uUU* O d*~b64b-19 2.45000* O ~.59&43-2? ?.5nooo* o 3.H?614-2u1260J3u13u3 3dY42.550UU* U :./46qb-2u ?.fJOooo* U 805/947-2? 2.6~000* o Z.R36b6-2~I ?60R08U3 3.4952.700uu+ o /:/67z3-2u 2.75000+ o 3.5u’J5FI-23 ?.Rnoon+ o 10756/O-2d126fJRU8U3 3c!96
2.P5nUb+ U 2.db7~9-23 209nooo* O 4.1/493-/0 7.9%ooo+ o ~,a98~2-22] ?6nnuf3u3 3<97~.tJooiIu* O <.U071(I-22 3005noo+ O 1.4.?G7H-Z3 3.lfiooo* o 2.33H~+-231?6rIR013U3 3d98
3.15110u* o +.11871-23 3.?nOOo+ o 5.S1802-23 3.25000* n 1.S7/t~4-231?60RU$3U3 3d99
60
3. ~LJoUij+ u 1.~37f)4-2Z 3035000* o R.5t~<70-23 “?.4n1300+ o 3. Q50*l-231?b!)RilRlJ3 3-$CO
3045nUb* O **41q?l-?3 3.CiOOOO’ O i?oHb/z/-c?3 70s%lJo0’ o 1.941 L4-2-f12f,0R08U3 3~01
3,bonuU+ u 1.tJ517~-22 3065noo+ o ?.3b9H3-dQ 2.7nUofj* () 3.4Y100-2~l?fIOf3tJ9U3 3doZ3./5900+ () ~.8Yl]J-25 3“n~~(-)o* (1 9003/19-25 ?.RSOOO+ o ?.4:3~-~5-2J l?6nQo9u3 3303
3.9000u* o l:liq4(J-Z2 3,q5000+ O 50n0/2?-Z4 1+.00000” o 5.628~7-2~126[)R~)8U3 3304
4CL15UOU+ u 1.ud5bz-z3 4.IrIfIorJ+ o fi.b+uo~-zfi fi.lxocn+ o 5, 19.2 fz-3u1260R08u3 3jo’J4.2001Ju* o 1:880?4-27 4.,?50(Jo+ O 506Z/57-2q 403nOOO* o 6.0H~~3-2y1260R(J8U3 3~06
4,35(IUU+ o 1.~5?~b-27 4.6 000+ o O.OUUOO* n L.4cuoo* o P.24716-2Y1?60R08u3 3~07240bo(,uu+ U tJ.UoI)ou+ (J ~,5 (lof)+ O o,uOOou+ (1 406n(JoO* O 1.4~~~1-2~l?60RuHu3 ~~OU
4.65L1UU* u UOuooou+ o 4,7p[loo* o 901U917-8?4 4,7%U!)O* o f).000uo+ ol?60Bo~u3 3309
4.borJuti+ u u.uoo@(J* u 4.R50()(J+ o 4*59445-~% 4.~r!ooo* () 0000000+ ul?60~o~u3 3+104,qS;)0J. o 6i1385f)-Z9 5000noo+ u ooouUoo. u qco<uoo+ o 401703/-2$)126)R03u3 .l~!l
5.lnoOU+ U U:OOOOO+ U 5015000+ O ?.9H10~-ZR 5.20000+ o 0,000uO+ :l?608tJhU3 :~~lZ5.2SO(JU+ u f.1~.35M-2~ 5,30000+ (I 1.2<tJ25-2n %03<000. o OOO(JU!JO+ u12601?09u3 3~13
0. !YouuooE+u8 n o 1 lot+l~6tjR(Jt!U3 3.$14I(JU ““ 1 0 (J o Ul?f.9HOHU3 3~15
O.(JOOLJU* o ~IYboICJ-Zu 5.00000- 2 3.30/4H-Z2 l.onooo- 1 3055u*~-2~l?60R08u3 3J16
l.50(Juu- 1 <.2452.3-19 2000000- 1 z.24J61-20 ?.5nuoo- I 4.~bbZ4-2~126hRO~U~ 3s173.JJooou- 1 2i!66?4-2u 3.50000- I 7.04~63-1~ 6.0nuoo- 1 2.34Uu~-lUl ?~oqU9u3 3Jl~
40500uu- 1 8.78449-19 5ooonoo- 1 n.t33059-lU 505n000- 1 9.8H3*0-211?6flq08U3 3~lQ6.uo(l(ju- 1 3.mj79u-lf3 6.%nooo- 1 ?.12583-lq 7.0nO@O- I 3.725~1-2A 1760nOfJU3 3J20
7.500UU- 1 5~(5267-ZU 8.00000- 1 9.7Z16~-21 R.5nOo0- 1 4.300+5-21126fIRoBu3 33219,(Jl)orJ(J- 1 +~297uo-21 90S600n- i 5.P7b23-d2 1.000oo+ o 5017(Jy 7-211?6(]RU13U3 3~22
~OU5UUU+ o 8.11)66b-~Z 10IOooO. u 1.81S50-21 10IKoOo+ o 1.94305-211z60R08u3 :jj?~
1.200UO* O 6“~5557~-2Z 1.?5000+ O 6.3b~~7-~2 1030000+ O 3..232j6-2~l2f>oRU~u3 3:241.35[1(Ju* O ~~gbf,61-21 10LoooO+ U 4031H49-21 1.4GOOO+ o 1.G80d~-211260Rl)8U3 3~%5
1,500UU. u 1.3b7n5-21 loq5noo* o 5.54952-21 ~.6nooo+ o 4.33/bb-221?60Rl)8(J3 3j2f,1,650UO+ u 2.4bRI19-z2 ]070000+ o 4.88/40-22 ].75(Joo+ o 6.R35+1-221?6t)RU8U3 3J27
1.800Uu* G 9~b7992-22 1.85000* o 2.74+35-2? l.~nooo+ o 5.6391”?-221?6(IRURU3 3J281.95uuo+ u 1.15295-ZZ 2ooooou+ o Y08y16t)-Z2 700~000* o 3.0A*~6-221?60R0~u3 33292.1OOOU+ U 2*yo4nii-22 2.15000+ o 2.~zb59-?l P.?nooo+ o 1.5u9~H-211?Aon08u3 3330
i!od50uu’ (1 1R?z250-z2 2.3fllloo” o 1.5~c!6n-z? ?.3=000+ o ?.16Z”b-2i l?fJOQd8u3 3331
204000U’ u b“dl~RO-Z3 2045noo+ o p*5bb6b-d? 2050000* o 10055d2-2L l?601+OHU3 33322.550uu+ o ~.U266B-22 Z’.fjOOoO+ o J3.4/12%-ci.2 2.65000* o ?.J+uo/5-22126n8u8u3 3J332e7nouu+ u 7.u17]4-~3 7075n00+ o 3.4b135-d3 7,8cIooo+ o 1.7:i4b+-2~I?60R08u3 3334
2.~50uo+ o 5.945%2-2* 2,9nnoo+ o q.75ZZ9-Z4 ?.9cooo+ o 3,355*4-2Zl ?6nliofJ03 3J353.UOUUU+ o 1.9fi17f-22 3.05noo* o 1.4uZHh-23 ?.lnuoo+ o 1.719b7-23] ?A[)Q118u3 3s~63.15n0u+ o ~~u6675-23 3.70000* u R.41u54-Z3 3.2FUOO+ o 1.5b/y4-231?~oRu8u3 3~373,30uo(J* u 10517f+~-22 3035000* u 8.4fJ46’j-2.+ 3.QnOoO* o 3.9uUb*-231P6nRu8u3 33383.4500u. u 40.j6255-~j 30~Ooon+ o ?.83111-23 3055000+ o 109~bb5-23~26,)R,)8U3 3J39
306000U+ o l~~2R35-22 3065noo* o 2.3~~9’$-2’$ 7070000+ o 3.4Q755-231?60ROSU3 3340
30750uu+ u 4.62CJ44-2S 30R0000+ o (3.91H26-Z% 3.fl%ooo+ o ?.4nbbl-231?6090Hu3 33413.9000U+ u J:A0430-22 3095000. 0 5.~339~-24 6.0nooo* o 5.55/~~-2~12~Oq08U3 3+42
4.(J5ni)u* u l,u126~-23 ~olnoOo+ O 6.5Sb2H-d6 4.lKooo+ o 5. lZbJ7-3ul?60R09U3 3~434eZOOULI+ u 1.d56%2-27 4oP5nuo+ o 5.S5381-29 403nuoo+ o fieoll*?-2Ylp60$lt)8u3 3J44
4035uuu. o 1.fiP872-Zl 4,4 ooo+ o O.UOUOO* n 4.4c(Joo+ o .%, 14dd7-2!J1260qIl13Li3 3d45t4.500UU+ u U.UUOOO+ u 6.s 000+ o ;.ouuoo* () ~06nooo+ o l,4Q~b7-2~lz6080tiu3 3446
4,65n(ju+ 0 U.U;OoU* o 4.7 OoO+ o 6.03197-c!~ 4.7cooo+ o o.oIIOUO+ U17SOROQU3 3~47t4080uu~+ u o:uooo(J+ u 40R oOo+ o 4.53b39-d5 4,9fiuoo+ o o,o(ju(J(j+ 01?61).I=t18U3 3~48
4.95(JOO+ o b.u6n79-29 5e0nn00+ u n.oouou+ o %,o=uoO+ 0 40 ]lff9-2$lz6cF!oJ3u3 3349
bOio,)Ub+ U U.!:~(]I)u+ (J 5,15000+ o ;.y*),J’’,-dQ q.?nllo~+ o o.000~)0+ UIXOL~O}~U~ ~~~(1
5.Z500U+ o 7004331-29 5,30009. u 1.2idlL-dn K.35UOO+ o 0,00u0o+ u1260R08u3 3j51
o. 1:UOOOE*09 0 1lotJ 1
10B126OF4O8U3 3~52: Ulz6040803 3953
O.OoOOU’ U ~*4231~-22 5:of)ooO- 2 1.06u75-z~ l.onooo- ~ 1.?91+4-2~l?6(’?R08U3 3~54
1.50000- 1 $.63098-21 i?.~~(30f3- 1 7.6zzo7-z7 ?.5poo0- ] &.6f,Sbl-241260ROBU3 3~55
3.0rJoou- 1 1.u357U-21 3eGiOOO0- 1 2.1~~11-21 4.0nOnf3- I 4.2919”~-2ul ?60RORU3 3-$564.5000U- 1 lsy799y-2U 5.00000- 1 3013f3q-1’+ %.50000- 1 100L2Z3-211~60808u3 3s576.uoOUU- L 6.Y971itJ-20 6.%nooo- 1 1*47f2~-1’5 7.0nOoO- 1 3.72~~9-211 ~fIIlRJ8U3 3s587*509uu- I 9.~4160-21 8.00noo-
9ooorjuu-1 4.7W436-Z1 f4*5no(Jlj- ] 3.8Rt07-211260RtJi)U3 3~59
I 3:29s5>-21 9e~n0no- 1 <.F17443-d? l.onOoo” (1 20*u*3b-2A l?AnRotlu3 3J60
1.U5UUU” U /odZ76b-22 l.1000o* O 10?4d68-Zl 1.15UOo* o 3.216~4-2dl i?60R08u3 3~f11
l.ZonOu* u t)*354HtJ-Zt? 1.?5noo+ O 6*2Q~36-2Z ].30000+ o 3.?31yZ-2~l?60Roqu3 3d6~1035(Juu+ O d.~8C,89-21 1040000* O 40.jl/91-Z1 le~qOOO* @ E.5~U’J3-~Zl?~nnu~u3 3Jb3
1.50UUU* u 1.S5AR7-21 l.<snno+ o 5.25-$42-2) I.AfiUOO+ o ~.?qYlo-2Zl ?A0Rubu3 3sh41005uou+ u !?.4!)[]15-~z 1.70000+ o 4.fjt!b/4-ZZ 1.7cuoo* o rj.61i?’+5-2<I?6080f!U3 3365
l*tionOu* U 9.5!861-22 l.~sn~o” () 7.7439M-27 1.9f30~~* o 5.3bb13-22126fIROnU3 3sf,61.95uou+ u b.9d926-23 2.oncoO* O 9sH9026-Z2 ?.o~ono” o 3.063m4-2717~CJRO8U3 3~67
61
2.1 OUIJ+ O Z.1U494-Z? 2,15fJoc*?2.2 (:[lI./* (1 l.~d??u-zz ?Cqnflf)(]+
2.’+cf)ou+ u J!b5flF1-23 ?.45fJ()()+
2.551(jou+ rJ ~.~b’*:)1-2/ ?.fln(l~fj+?,7000,1+ o 50(+uJ$8-23 2,7500()*
,?6t.511UU+ o b.y447fJ-24 2.9nn0f)+
3.u(j9ulJ* u 1:’J81=1-2Z 3.05000+3.15(11j~* u 4.U66~0-23 30?n000+
3.3000LJ* o l:bL74w-22 ~.3booo*3,4501),,+ o 4.:Olob-23 3050000*J.6ooob+” () 1.82all-dz 3.650~()*S.~5fluU+ o 40tf2R7tI-2!5 3.RoooO+
3.QI)COU’ u 1.10615-22 3.Q5~oo+4005(-J(lb* 1) 1.01253-23 40]fJ~oo*4.2ooUO* u l~b562b-27 4C?5000+
4.35r)(J()* O 1.b2844-27 4.4nooo+4.5nnOu’ 0 0000000+” () 4.550f)(]*
+.6~1)011+ O U.00000+ U 4.7f)oo()*
4,H9(JOU* o U.uufjoo+ () 4.85(lorJ+4.95000+ IJ 9:U5QR1-ZY 5,0000(1+5.10(,00+” (J U.(JO()()(J+ f) 5*15(f(_)(l+
5,250UU+ o /.u42?4-z9 5e3nO00.
0, 5.(Joof)E.f)9
108 1
O.lJOoOU+ U l* f2n?0-22 5.0n000-l.5000u- L 6.Ld94/-2< 200n000-
3.001j(Jll- I l~db;l?f-21 3.%OI)OO-
4.501juu- 1 ~.lJ7q7-21 5.0~f)of)-b.(Jol)lju- 1 ~.’+l7~b-Zl 6050000-
7.50rJul)- 1 9:~99?5-21 8.00fIO(J-9*uorluu- 1 s:d9?25-pl 9.5n(lf)o-
1=051J0u* U 70d19n~-22 10]oooO*
1*201)OU* u b*b4J\~2-2~ 1.?5000’1.350UIJ* (J 2*7681J-21 1.4fl(l(jf)*
1.5(3r-)Llu+ 0 1.J55~l-21 1.55f)(-lo*1.6500U* o 5?45?A9-22 1.7(l~(J(l+l,800uU+ o 9!~b8q3-zz lCR50no+
1095(JUU+ u b:9g?65-23 ?.nOoOo*~.loolld+ U ~ol!274-22 2015(IOO+
2.25uuu+ u 1.b20k~-22 ?.snno@*z’4oooll* f.1 +.~*535-23 ?.45000+
2e5500b+ u ~.y~~n3-22 ?.6oonn+
2,7000(J+ u 5.!.2HII0-23 2075(100*
2.~~f)UU* U 5:y3/17b-?4 2.qnnOo+3.(jonlJU+ U lsylVR2-Z2 3.O+noU+
J.15~u(J+ u ‘$.(lb21J-23 3.~~f)J)()+
3.JOOOU+ u 1.’J+b9J-2z 3,35000+
3*4500U’ Q 49.$376 -# 23 3.5(?000”3.600(JJ+ U 1.U<62 -22 3065000+3,7500u+ II f~M~39b-25 3.fIpooo+
3.9ooolJ* O 1:1U3P4-22 ~oQ~offO*4oOSOb(J* U 1.U11S4-23 401nooO+
*.2000U” o 1oU544O-27 4.75000*
4.35uUU+ O 1.:2645-27 4.4fIouo*4.!J131301J+ o U*UUOO(J+ u 4.55f)(-J1344.65u@u+ o 1.1461 ~-30 4.700r)O+4.Hi3(juu* 0 U.uuoou+ (J 4.F15~f)()*4e9500u* u ~oU~32b-~9 soo@oOf)+
S.loflou* u 0.UOrJoO* u 5.16noo+5.25(julj+ 0 !:U36%5-29 5.3flr)oo*
o* 1:OUOOE*1O108 1
0.000UU+ O 1.(1458-22 500(IfJOO-l.5lJolj(j- 1 6.1°9?2-22 2.0nnoo-
3.00nUU- 1 1:J?881-21 3.5f)(30(j-
4.501)ou- 1 ~*ll?433-zl 5ocJnnoo-6.uor)ou- 1 1.911?8-21 60cj”ooo-
705fjfjou- 1 Y~Jbfl=2-21 fi.OnoqO-
9.uoolllJ-” 1 3:ds~6d-21 9.5177)oo-
0 ~.osF.23-dl =.?nOorj+ o 1.5:)CJI ~-21:76nqufJlJ3 3~68(j ,022’+.3,)-Z2 ?.3’.000+” g 7. pwbd6”211?6naultl13 3J69
O ?o~b~sl-~z 2.5noo04 o I,01}9U5-2A 1Z6(IR09L13 3370
0 8.~fuIf)-d? 706ROUfI. o ?Of40cS7-2el ?6nR08u3 3S?1o ~of+fJuEfq-d3 2.~/I(Jf)()+ O )07’J*JO-2<1Z61)QI)8U3 3j12
O 2.fi5ho~-Z4 2.9~(JOO* o 3.35b’’H-2Zl?6llSOhu3 3J13O 1.{*Ud6~-dI ?.lP(Joo* o 1.71’~’+3-2sl ?f.nROJ3u3 33740 M.4UY40-23 3.2Guoo+ o 1.5~/f3-2s]26nnt<9~:2 3::5
0 6*45J54-Z3 ‘1.4n600* o 3.9f_JU ll-2~1760R08U3 3JlfIo 2,83u72-?3 3.5’%ooo+ o 1.91b3+-2dl?60su8u3 3j77
O 2.33962-24 3.7nOoo’ 0 3.44?0B-2Jl?6,qqoH(13 33780 U.91106-7C “?.flGuoo+ p 20&n5dY-2Sl ?6nq08u3 3379
0 5*7331R-d4 A.OnOoO+ o 5.55b~l-2~l ?AnRo8u3 3s80u 6.5b~j9-2~ A.l%oon* o 5. 12b*l-3ul?60ROHU3 3J~lO 5.5’JZti9-Zq 1..3nUoo+ o 6.01Uuf+-2~lP60RIlflu3 3-$820 ooouuoo+ o L.4GUOO+ o 8. 14u~’k29i26nau8u3 3s53
(1 O.OOOOU+ () 4.bnOoo* o 1.44H4?-251?61)JIO!IU3 3~flftO 6.03115-~4 4.7~.UoO* o o.OIJUUO* Ul~69PI)HU3 3Jti5o 4.53’37fi-d5 4.9nn0f)+ o OOOO(JOO+ 0]~60R.l~us 3S86
U 00U0OOU+ !, ‘+.(l<lloOt o 401171/-29]2h@RURU3 3Jf17
O ?.94t’~U-~P 5.2n000+ o o.@oUUO+ Ul?Af)q08U3 3~H8
O To21~52-ZP %.36(Joo+ o OOoOUOO. t176fIQOBU3 33890 n 1 loh1760qu8u3 3~90
o n (1 U1?6UROBU3 3391
2 1.05952-<? I.ooooc- I 7.62105-2dl ?6nJiouu3 33921 ?.66452-2? a.5nOoo- ] 4.660y4-2~l ?60f~u8U3 33931 3*14/34-z2 &or).ooo- 1 l*07+~~-211?6nRotiu3 33941 1*Qou64-%1 %05fiooo- I 9.982d2-221?60AOf3U3 3~951 7.’J7f*24-l7 7.00000- I 3.”/zl(J~-211?60nOYU3 3J96
1 4*7~559-Zl R.500no- 1 3.RR3f3-211?6030i3U3 33971 %.Ht~b55-Z? l.onooo+ o ?.3’J794-2Jl?6(]Ruqu3 33980 1.24736-21 l.l%OOO+ o 3.13’JZ/-2cl76nHu8o3 3~99
o 6.23yoY-d? 1.3nooo+ o 3.22Ht~9-2dl ?6nRt)flu3 3*OOo 4.31JS9-2] 1.4=uoo* o %.54*~J~-2<l?60ROtlU3 3+01
U 5.24~13-dl 1.6nooo* o 4.?+~/9-2Zl?6fJRIJJ3U3 3+02u 4=f3~185-t?? 1.7GOOO* o 5.6U2L5-221Z611RL16U3 3403
0 2.7412~-2Z l.~nooo+ o 5.359/3-2dI?6nR08u3 3’Jo4O 2.~MU3h-~? 2.05UOO+ o 3.06t)/7-2tl?6LJR08u3 3*o5O 1.03fOf-~1 2.211UOO+ o 1.5of~6-211?6n808u3 3’+06
(I 1.2z30+-Z? a.3qono* o ?.o~3J6-211 ?AnRo[lu3 3+07O 7.~6~14-2? 7.5?UOO+ o 1.04~111-211?60RlJHlJ3 3*08o R.4b16.2-22 P.6co(Io+ () z.19~=7-2zlz60NoAu3 3+!)~
0304b7t+1-dj 2.RGOOO+ o 1,/32bb-2d126nnnnu3 3:10
0 2.A5447-Z4 209rooo* o 3.3521z-2d176nfill}lu3 3’+11
O l*~Ul?7-2~ 3.lnOIIO* O 1.?l//l-2~1261JRUJ3U3 3*12o 8.+uu9j1-27 a.2CUOO+ o 1,5’i617-23176nnuAv3 3*13
O /].44>00-2~ T.4(Iuuot o 3,RYbdG-?J12h[lf{U~U3 .3414
0 2.82789-23 3.55000* o0 2033/2H-Z4 a.7qUOO* O 4::W:WKW mO 8.9uu13-Z~ 3.fl%UoO+ o 20402~8-2$l?60J10803 34170 5.7d744-24 4.omooo+ o 5.551u4-2*] ?6nqu8u3 3’$18
0 6.S4~81-d~ 4.l=ooc+ o 5.llti/’/-3u]?6nnnnll2 3-i9o 5.54b45-2Q &.3JIooo* o 6.003ff?-2YI ?6nQuf3u3 3420
0 1.uB587-30 6.4=000+ o B. 131bH-2yl?6fiR08U3 3+21U o.OUUOO’ h 4.6nooo’ o 1.44 fU.?-2blZ611ROUU3 34220 600Z>11-ZQ &.-/<()(Jf)+ (1 Oo(_joljLlo+ (J176~J?of3u3 3+?3
o ~*b~124-d% 4.911000* o O.OOOUO+ lJl?60qUEiU3 3+2%() O=OUUOO* o %.OKUOO* o 4. 112bf+-2Ul?6nP08u3 3*25
o 2.94b5q-2Ji q.?ouoo+ o o.uoouo+ ul?6ndof3u3 34760 1.21120-~P %03~suoo* o 0000UUO* yl?hl)RoRt’3 3?27
o n 10
10R1?6ORUIIU3 3+?8(J o yl?60ROf3LJ3 3*29
2 1.o~bo4-Z2 l.ofIOoo- ] 7.596 f2-221?6nQu8u3 343o1 a.6bd53-z/ ?,50000- I 4,b$b~9-22126n901Ju3 34311 3.1~lo4-c?Z &.onOoo- 1 1.071(/7-211?6J)qd8U3 3~32
1 1030’j51-21 ‘3.5puoo-1 ?.0MU19-18 7.OnOoo”
1 9.949bl-2212r308nou3 3+331 3. 7G~y0-211?66HfJflS3 ?+34
1 /,.7J+U03-21 8.5nOoo- 1 3* f371u3-2112Af7fiu8u3 3’+35
1 5*~4y35-2? l.OnOoO* o ?.390U9-211?60JII)8U3 3436
lCl!~LlufJ+ 0l.< QutJiJ* uloa’YL)(J~+ o
lesofiuo+” u1.65(,(J(J+ u
l.~o~(j(j+ IJ1.Y5@(J~+ u
?. 10000+ u
2.25uu(J’ u%.40”fJJ* o
z.ssnuu+ (1
2.70000+ fJ
2.b501Jil+ U3oofjf)ulJ4 (J3.15ffuu+ u
3.30r)(Ju+ u3045”(JU+ (f
3,6000,)+ u
3.7srJuJ+ u3.9o13b9+ o+. U5(IIJU* u4.21JnuL’* u4.35(li),j* O4.5COIJO* f)4.650UIJ* u
4.h(lrftlJ* o4.95(lou* (!
5olouoti+ oSozsouu+ y
9.223X+060.
~+o.
151O.o(loou+ o1.50(,IJU- 13,0fJ(jolj- 14,50(ffJ11- 1
60UOOOLI- 17050fJofj- J
9,00fJoL)- 11.fJ5(Jou+ u
1.20000+ u1.350UU” u
1*500UU’ u1.b50uu* o1.80000+ u
1.9sl)uu+ u2.100UU+ 62.z50iJu+ u
2.4flf)ob* uz055rf(JlJ+ u
2*70(]L)U+ o.2.H50(JIJ+ 0
3*oo(lou+ u
3.15110U+ u3.3r)rfoo+ u
3045(JUU+ o3.6oloiJL)* v3.750(J~* fJ3.9fJ~ou* o
40(J5(f(Ju* u
40200jJ+ U4.35~!Jl)* ()
4.5oooti* u4,650do+ (f
+.80000+ u
l.lnooo*1.?5000+lo4nooo.
lo55noo+l,70f3~f)+
1.85nnn*2.onoffO+?.]5000+”
?.3n000*20451)OIJ*?.finno(f+
?.75nno+
i?.qnnon+3.n5nQ0+30~nooo*
3.3Ein(ff)*3.5flrJi)o+3.65(700+
3.Rr,(-lf)o*3.Q51,0r3+401n00fj*40~5fJf)()*
4.4nooo+~+.55000*”
4.7ono0+qof)sool)+5,0n00f)*
S.lsfloo+5.3nno0*
5.0f)f)oo-2.0nonO-
3.5tlf-foo-5oof)o~f)-
605noflo-8.nnnffo-
9.9noo0-lolno(lf)+1.?5(300’
l.bnoof)”
1.55noo’1.7flooo+1.f35nno*
2oonoo0*2.15000+
2.3nrfoO*
?04Snoo*2.6nnoff*2.75000+2.CJot)f3f)*
3.0500n+
3.?0000+3035000+
3,5noOO+3.A513(lfJ+308noo0.3.Q5noo*4olf-l!30(l+
4025n00+404f)(_forJ+
40’551Jflo*4,7~,)(3ff*4.$35000+”
uu0
0u
0
00
0u0
u
0(J0
u0()
00u0u0(J
0t)
00
10
00
00.
u
00
0
00
00
0
0000
00
0
00
000
o0
:
0~.63f64- 0&.47894- 8
9.79193- 84.40281- 74,52109- q
6,1rd3*- 7
1oo7766- 7po48u91- 71.41403- 7
;e2r425- 7
N::+: ;Q.SJ334+- R
q.7btifa2- 88.3fJ3bb- 8
l*ou~40- 71.4tib~6- 77.0U6~M- 7~005’)69- 7&.”/hf9u- q
7e49h6”l- R
6.72H5f3- Q6*Vbtif3b- 8
6.19124- PS.2dU5f3- Pq,23A(f3- 84.09U90- 8
5.9U834- 6
4.uT+52- R3.1L227- 82.4b46[3- 92.1’4U51- 8;.93672- R
]*l%(JOO*1.3~”o(fo+1.4’iuoo*
l.~nOnO*1.7%ofJ13*
l*9nuofl”
7.o~oflo*2.2n000*
?*35UOO*7.5n(Joo*2.6=000+>.P,fl(jl)()+
7.9=uon+3.lnlJoO+3*?~rlflo+
3.4.fJffo*7.5500fJ*a.7r,o”o+
3.n50flo*~.onooo+4.150C)13+&.3nUu0A4.4%ofJo*4.6n900*
fb.7G3(fD~40~noo(l+
S.f)sooo+
50200fJo+qo~G(JfJo;
l.oflooo->.5nf)oo-4.0no(Jf)-
5.5nOr)O-7cOnOOO-
a,5flooo-
l.Onooo*1.lFOOO*l*3nOOO*1.4%o(ffJ*
].6nOoo*1.7%000+le9nuoo+
?.OGOOO*?.?nooo+>.3q(JOO+
?.5nooo*2.6’if)(Jo+
?*Rnooo*>ooqoofJ*
>.lnuoo+?.?5000+1.40(Jf)fJ+
7.5%000+3.70000+3.R50fJ()+koOnOOO+
4.16UOO+
4.3n000*4.4%cf(J()*
4.6nOoo+fJ.7<lJ@n*&.~’looo+
o 3012yU0-2d1260ROtJU3 ~’3”fo ‘i.21?~l/-?dl?6nRuHu3 34380 5,52b~4-2<126nqo803 3439
0 4,?R0/*-22)260ROf3(f3 34400 5s5ft3n?-221 ?60Qd8u3 3441
0 5034d~0-221 ?6(fR~J8U3 3+42o 3.050 f6-221?6f)QOflU3 3443
0 1.51iZ/~-211?60808u3 3+44
o ?.oHf5~l-211 ?6:)Qti3u3 344sO l=04+~H-2L 176npi]8U3 34460 2. 788*2-2<l~f.n808U3 3447
0 107Z6’)0-2d) P60R\]3U3 3*4Hf) 3.34114-2d12AnHtfRu3 3+49o 1.”rldu9-231260R08u3 34S0o 1055iua-2~l ?6ff9uf3u3 3451
0 3c~R3+~-2~] ?6fJqOflU3 3+52o 1.9f)ddl-2317f>nqofJu3 3!53
o 3.43dd7-2~l?6nRuf3u3 2454
0 ?.395!J2-2Sl Z6nq08U3 34550 5.53ZO$J-2+1760R08U3 3+561) 5010114-3u12 flono9u3 3*57o s.9H~(3-291?6rIf?of3u3 3’458
0 fl.lU4/n-2Yi?6qRUtiU3 3+59o 1.442d9-231260QfJfJu3 3*b0
O 0.00ouO+ u12AOQu@U3 3461
0 COOUouO* U1760RCJ8U3 3+62o 4.09900-291z6rIRogu3 3463
0 ooOOUuO+ U1260Q08U3 3Q64O O.OnouO* ~12611ROf3U3 3~6,EI
126na0 ‘2 3+66
o U1Z60Q0811 3467
1 2+l?FioRof311 3+48
(1 u126nRof311 3*691 1511?60F70811 3970
n u]75r3ql181] 7Q711 1.544d9- 71?6090811 3q/21 9.37117- Rl?6nqof3il 34731 6,1JF1493- 81?6nRIJ~lll 3’~:41 2054~05- /l~6f)qc8J1 3+75
1 f30l4’+ul- Hl?6n801Jli 3’$76
1 6.0uO+2- Hl?6nQo!:!l 3*??
0 6.69+3M- 8126nnoflil 3*7Bo 90923U4- Ml?~qqoQll 34?9
o 2.03938- 7\?6f)’3ufJll 3480
0 10151317- 7126f’fqflf311 348:
0 8.6013-$2- fll?6ffQ0811 3*8Z() 1.225’?’5- flzfi(lnonll 3VH2
o u.6f$9LJ5- dl?~f)RuuJl 3484
0 8.7H8b6- M1?60RUR11 341150 9.~fft197- M]213~R0811 3’$H6
f) R.8?4u7- M1260R0811 3*H7
() Q.fj7r52- Ml~~nqOUll 34H8
o R.3?/d4- f$176f)R0811 34H9
o 9.2’-4~Z2- 61?60ROf311 3+90
() 7*481uo- 81P6(IRU011 3’+91o 7.79d+o- M126n80811 34920 605,)3d~- 81?6nn(lfJ!~ 349.3
0 6*610~~- M]p%oRuHll 3494
0 9.12745- 8126nR0811 3+95,e 5.33239- 81?60R(J811 3496() 4.3/093- f31?60~oflll 3*97O 3.~511R- 81260ROH11 3+98(1 3.399’Jo- f3126nf30f311 3499
0 3.030~l- 8126nROf3Ll 33000 z.~t?fb- 81260R0811 3501
0 3.151/7- 81?6nnof311 35020 ?.111’+6- 81?6081)S11 3~03o 2.17203- L31?60RV811 3304
63
cr
cc
cc
ccc
Gcc.
cccc
cccccc
:
ccc
cc
cccc
ccc
cc
APPENDIX BLASL Identification
No. LP-0847
PROGRAM FITPULS (TAPE5tTApE60TApE70TAPE100 I,APE20) FIT 21PIT 31
THTS VUOGUAM fickEPTS FIbsION-PRnDUCT DATA (HFTA ANn GAMMA) IN FIT 41
{JNrT3 OC LKJ~~bY /~ISS[@CV *PIC}I +,1~ i+t}:N LNcHGY /jlNNE~) INT1> Pll$k FIr 5)
GROUFS(150)FOK A NLJMFjER 0} cOOLINb TIMt STCPS OERIyELJ AS FoLLUMS- Fli 01
YILLL) IjATA ~ROM ENDF UAS FIRsT PROCESSLIJ MY TtiF FPcYS cntyk TO FIT 71
SUFPLy fINE GRO(lP IN~:T FOR ThE FPSPEC coDEo FPsPKC ALSll FIT 81
REuuINE~ (JUTP(JT FRoM THL CIN~FR-lA COOL. FINALLY THE oUTPul 0~ FIT 91
FPswliC *AS PRoCESSED By THE FOTOELF CO(JE wHICH P(JTS THE DA!A IN FIT 101AN LN[)F-LIKE FURMAT ~rlICll IS THL INPUT DATA LIRRARY FoR TMIS FIT l\l
cOuL(FITPULs) . FIT 121FIT 131
FTTPULS RERINS THIS OA!A INTO A USER CHOSEN BROAII GROUP sTRUclUl?~ FIT 141(NOTC IHAT THIS RE81NN1NG CHANGES UNITS To LNEI?Gv/FISSION-SkGo~. FIT 151
ANO riTS !HE DATA FOR EACH GNOUP WITH A LINEAR COMRINATTON u~ FIT lbl
FUNCI1ONS AS POLLDWS -- FIT 171FIT 181
GXC(AOK) =sUM*ALF(L~K) ~(EXP(-ALA4(LSKl *T(I) )JSUM OVER L=19KTNM$ FIT ]91NHERE KTRV IS THE NUMBER OF PAIRS OF PARAMETERS (ALE* FIT ?01
ALAM) F(JR GROUP K. FIT 211FIT ?21
GXC(LQK)=~NERtiY(MEV)/FISS-SEC FoR GROUP K ANO COOLING TIME T~I)o FIT ?31MAX.ALLOWLO VALUL FOR KIRMIKTR(K))? NO. UF pARA~. PAINs/GP=50~. FIT 241
MAX.fiLLOHED NV, OF RRnAU GROUPS.NLRG=25. - FIT ?51MAX, ALLCJiEU No. OF IN~uT COOLING TIME sTEPScITSP=70. FIT ?61
FIT ??1
THIS LODE IS USUALLY RUN IN SEVERAL PASSES. TfiE REASON FOR !HIS” FIT ?81
IS TnaT ON THE INITIAL PASSES~SINL+LE PANAMtTER(ALF) FITS ARL FIT ?91
MADE FOX !HE SIJFCTRA ANO ON FINAL PASSES,PATS ANF MADE MORE FIT 301
ACCUMATL dy FITTING BOTH PA~AMETEKS. AN EACEPTInN IS THE CASL FIT 311
WHERL GOOU FITS H“AVE sR$VIOIJSLY BLEN OBTAIIUiD FUI? A PARTIcIJLAR FIT 321
GROUP STR~CTUKE FOR ONC NUCLIDE ANO FITS AKL OESTREO FOR ANU!HER FIT 331NUcLIUE IN THL SAME GRUUP STRUCTURE. THENQTHE FTRST SET OF FIT 341PARAMLILRS CAN BE APPLILO OIRECTLY TO THE ~LCOND PROBLEM, FIT 3’JI—
FIT 361
THE L.UUE A’LSO HAS AN op~ION OF ~EllUCING EXPERI~E~ITAL DATA FUM FIT 371
A FINITE IHHAuIATION TIME TO A PULSE ANU ~dTAININ(3 A FIT FnM IHE FIT 381EQUIVALLN~ PULSE. FOR !HIS OPTION <ET IHAU=l. FIT jgl
FIT 401
COMMUN /PULSIN/ ALA~10A(50)0 FA(?OO)Q T(40119 KTRM* IISPO IP~uBs fIT 611
1 NIN~ NOU! ~IT 421
COMMON /PjLSDAT/ NOTQ ~tJ(Z5)S Gx(d5!400)9 NERG? ALF(2595u)Q ALAM(dFIT 431
1 595UI FIT 441COMMWN /PULSCAL/ A(5095U)$ fl150.1) FIT 451
COMMUN /P:LSOuT/ ALpH~(50)9 FXC(1OO)S PCT(1OO) FIT 461
COMhfUN /MANI/ WX(loo), ~ITL(8)o KTR(50)s NS[1O)J KKN(25), OJELIM FIT 471OIME!W>lON” TC(1OI)I* LXX(20)? TMN(2U)* TMJ((i?u) FIT 481
cOMMUri /ENDF/ MAT* MFs MTv RUNTIM* NPUN FIT 691COMMUN /TI?MOT/ TL(10)* LTM(50)o LT FIT 501
COMMUN /FINNAu/ IRnDo N~OMsO RAnT(200)9 UE~T(200) FIT 511
64
c
cc
c
c
cc
ccc
cc
ccccccc
:
ccc
cccc
cc
cc
c
ccc
:ccc
cc
c
hJ:rd=!J
N(lUTZe
NnT=LuRFAD (NIN~170J NpIJN,IRAU~NcoRs
FITFIT
FIT
FITFIT
FIT
SET I’WJN=7 HERE IF RERLNNLD DATA CARDS WAN!EDoO~HERtiISE NPUN=20. FIT
IRAD=u$FEGULAR PULSE Fll REQUESTEUO =lsFIT FOR FINIYE IRRADIATION FIT
TIME DAIA wANTEO. FIT
NCOR=U$CALL CORSHIN* =l$NO CALL. FITFIT
IF (NLONS.LE.0) CALL CUHSMIN FITFIT
SEE LuWSdIN FUR MATIoMF1oMT1 INpUTo FIT
FIT
READ ININ*1501 (TITL(I)91=l~8) FITfl~
TITLGEL:I1llY c~ARAcTEQ (~{uLLERITH) IITLE. i’ii
FIr
TITL(I)=CMARACTFH FOR CALLING S!JBNOUTINE StLECT TO CHOOSE DA!A FIT
TO LIE UStD IN ~1,1. IF TITL(I)= SkLtCT ,SEL SU13ROul INE FIT
SLLECT F.OR INPu!. FITI; T’ITL(l)= DO NcT GOCPI+OGRAM STtJPS. dSFI) \/tfEN JUSr FIT
&~RINNED DATA U~slRED, FIT
FIT
IF (I ATI.(1).EQ.lLJH SELECT ) CALL sELECT FIT
WQITL INOUT!160) (T1TL(I)sI=1$8) FIT
IF (IITL(l)oEQ,IOH DO NOT Go) STOP FIT
REAO (NINs170) IPROF3,NTUTLN,NPUN*NSTEP*NF INL FITFIT
IPRDM = PHOBLkM NO. MAKE NEGATTvt IF FIT IS MADF IN SEGMENTS. FIT
NTOTLR . tLAG To DENOTL SPkC. OR TOTAL CALC.S=OQcODE REAoS SPkCT~ FIT
LATA FROM TAPE FILE.=l,cL)DF REAOS TOTAL’ nAYA FROM CARDSO FITNPIJN = F’LAG FUR pUNCIi,=/*PUNCH IILPtiAS ANO I-*MDASV=PO* NO PUN~n* - FITNSTEV = FLtIG TO CALL DHFIT RolJTINE WHICH FITs ROTH ALpHAS AfqU FIT
LA$lDAb,=U,ROUTIdE NOT C4LLE130=lsR0uT1NE fALLEn. 140U!INE FI1
U>(JALLY NoT CALLELI lJNTI!. A cOUPLL UP PAs<F5 ARE MAOt. Tu FIT
AtiJUSl TME PARAMETERS wITH THE SIN~LE FIT AL.UNEO SLL FITs~qROUT[h~. PuLs~IT wHERF POINTS AI?Ii SELLCTEn FOR FIT. FIT
NFINL ~ FLAG FOR NEAOING ALL PA~?AMATERS FRuM PREVInLJS PRORO1.LOS FIT
PuLSFLT WILL NO! BE CALLLU FOR ANY tiRO\jP,=O,NO EFFIEC!S=IO FIT
S:E READ sTATEM~NTS BELOW. FIT
FIT
IF (!*IQTEKOGTOO) CALL HUNTOTS FIT
REAO (NINs180J DIFLIM,~UNT IMCTMTNrTMAX!tiAMIN FIT
FIT
DIFLLM = MAX* PEMCENT ~oINTwISE oLVIATIQN ALLo~En IN sTEPIT* Flr
USUALLY SET HISH ON INITIAL PASSE> ANO TTGHTENED UP IN FIT
S}JljSEQIJLNT PA>sEs. FIT
RUNTLM = kUNNING TIME. MAKE FRLCT, OF SECUNO LESS TtiAN THAI usEU FIT(JN CONTROL CARIJ To GET PUNCHED CAMI)S FOR SU13SEQUENT NUN. FIT
TMIN = LOWEST COOLING TIME OESIMEU. FIT
TMAX = HIbHESl COOLING !IME DESIRtD. FIT
GXMII~ = MINIMuM ALLOWED VALUE OF G~(IsK)* THIS SHOULD Rli ski. FIT
SO NO FIT IS ATTEHPTLO OVkf? MORE THAN ASnlJT 15 DLCAu~5, FIT
FIT
NP=I isP FIT
IF (1(1) .LE.000) T(l)=l.E-4 FITIF (I INP).LE.OOO) NP=Np-1 FIT
DO lU N=l?NP FIT
Tc(NJ=T(N) FIT
in CONTINUK FIT
NE=NtHG FIT
NqOS=NE+l FIT
EB(NuuS1=7.5 FITFIT
f)ol
+,11
621631/$41
651
6bl
671f!dl6);
71J1
?11721
731741751
761771
781791
801
811R21831
841851R61
Rrl
R81R91
~ol911921Q31941qs~
961Q71
961Qgl
1001
10111(121
10311041
105110611(171
108110911101
1111112111311141
115111011171
65
cc
cc
c
c
c
c
2n
3n
c,cc
c
c
c
40
%0
fif)
66
KKtU = tLAb FOR CALLING STLPIT BY tiROUPS=OtNO C4LLOXGUOUP NO.*STEpIT KOUTINE cALLtD?=NEGAllVE uNOUP NOO$TRMSEE ROUTiNtCALLFU, NOTE IF NsTEP =O,KKN NOT ACrIVITATFn,
READ (NlNst70) (KKN(K)JK=l$NEHG)
OIITPUI CARDS FRoM PREVIUUS PROBLEM ARE REAO HERE IF NFINL=l@
IF (l~PINLoNE.1) GO To 30READ ININ~150) (T1TL(I)s1=19R)
READ (NIN*?20) C1.,C2,NUL*NLU,NUL!NER6
DO ?U K=lJNENbREAD IN1N!?20) EM [K) .EB(K+l )~NuL!NULSNULSKl~G
READ (NIN*?20) TMN(K)9TMx (K) *NUL~NUL~NULsK IN(K)KTRw=KTN(~)
L?FAO (NINt?301 [A! F(K,L)* A1.A~(K.L)$L=l *KTRM)KKX=hNN(K)IF (RKX.LT,O) CALL TRMSLE (K*lI
IF (~KxcL1.0) CALL TRM>LE (K,o)
KTR!R)=KTNMCONTANUEGo Tu lUI)
cONTINUE
D(l 9U K=l$NERU
FIT ]IblFIT 1]91
FIT ]201
F1r 1?11
FIT 12?1
FIT ]?31
FIT 17!61
FIT 1251FIT 1?61FIT 1271
FIT I?81FIT 1?91FIT 1301FIT 1311
FIT 1321Fir :7JIFlr 1341FIT 1351FIT l?bl
FIT 1371FIT 1s81
FIT 1?91FIT 1401
FIT 1411.FIT 16<1
THIS PORTION UF ROUTINE ALLOWS FIT IN SEVERAL sEGMENTs. To FIT 1431
ACTIVATE? SET IP~o13 NE~ATIVE. NOTE - INPUr NEEOFfT FOR EA. GNUUP: FIT 1441
FIT 14>1
NSFG = NUMQER OF SEGMEl~!S ● 1 FIT 1461
NS = UMFAKPLIINTS OF SEGMENTS. FIT 1471
FIT 1681
NSEG=.Z FIT 1491
NS(l)=l FIT 1<01
IF (iPROB.LT.0) READ (N1N!170) tvSkG9(NS (Lxl*LX=2,NSEG) FIT 1511FIT 1%21
IF (IYsLG.LE.2) NS(2)=NP FIT 1531
NSEGl=NSEti-1LTRM-u
FIT 1541FIT 1%51
KTR(NI=O FIT 1%61
oO 6U N=lsMSEG1 FIT 1571
NIsNaIN) FIT 1581
N?xM=[N*l) FIT ]%91
ITP=I#d-Nl+l FIT )601
ITSP=U FIT 1611
IX=fl FIT ]621
IF (IMINoLT.Tc(ll) TMIN=TC~l) FIT 1631
IF (IMAX.LEOOOO) TWAX=T~lNp) FIT ]641
IF (lMAX.@ToTc(NP)) TMAX=TC(NP) FIT 1651
DO 4U I=l*ITp FIT l~bl
NN=NL*l-l FIT 1671
IF (uA(K?NN). LToGxMIN) GO To 40 FIT 1681
IF (1(.(NN).LT.TMIN) GO TO 40 FIT )691
IF (lL(NN}, .6T~TMAX) GO !0 40IX=IA*l
FIT 1701FIT 1711
ITSP=lA FIT 1721
LXX(N)=IX FIT 1731
FX(IAI=GX(KSNN) FIT 17+1
T(IX)=T~(~N) FIT 1751
CONTINUk FIT 1761
CALL PULS:IT (K) FIT 17?1
IF (N.NL.NsEG1) KTRM=KTHM-1 FIT 17Ml
00 5U J=l~KTRM FIr 1791
LTRM=LTRM+I FIT ]PO1
ALF(ficLTHM) =B(J,l) FIT lR1l
ALAM(K!l T~U)=ALAMDA(J) FIT IRt?l
IF (MLAML)A [KTRM).GT.ALAMOA (KTRM-1)) KTI?M=KIW4-1 FIT lR31
CONTLNLJL FIT lR$l
KTI?(n) =KT4(K)*KTRM FIT 1R51
CONTAmUk FIT 1861
KTRM=RTK(K) FIT lfi71
70
Fln9fl
iO o
110
12(!
13n
14n
c15n
160
T)o 7V J=lvKTRM
ALAMuA(Jl =ALAk4fK0J)
f3(J*lJ=AL~(K9:)CONTLNUk
WPITL (NOUTtlyO) KQEE3(K)oEH(K*1)OCI BU J=l?KTRM
WRITL (NouT,200) J~ALAMOAtJ)9B(JSl)CONTiNUEcnNTl~Utcf)NTA,*dL
DO 1*u K=l,NE~GIX=()
IF (IMIv.L1.TCI1)) TMIN=TC(l)
IF IIMAXOLF.O.0). TMAX=TCfNp)IF (iMAx.6T.TC(NP)) TMAX=TC(NP)00 1A(J I=~,N~
IF (oA(K~l)oL!oGXMINl Go TO 110IF (lL(l}~LT, !MIN) GO !U 110
.IF (IL(I) oGTo!MAX) 60 !0 11OIx=IA*lITSP=lALxx(nl=IxFX(IA)=GX(I($I)
T(:x)=TP(~)CONTLNULKTRM=KTK(K)DO l<U L=l.KTHMALAMUA(L) =4LAM(K!L)
R(L9A)=AL~(KSL)
CT)NTANULKKl=~hN(fo
KKz=-NKN(K)IF (hK2.EdOK) KK1=K
IF (R.NE.KI(l) GO TO 130IF (NsTLP!LEto) 60 TO 130WRITt (NOtJTtlbo) ,(TITL(I)oI=1?8)tiRITL (NOUT,21O) KKTRM=KTR (A)
IF (“srt~.~1.o) CALL PHIIT (K)KTRlm)=KT4M
CONT&NUE ,CALL ?INECHK (K)CONTINUEIF (INPuN,~Oo7) CALL PCHUUT (LXX)STOP
FORM*I (8Alo)
FORM*I (1H191OX$8A1O)
FIT ]nt41
FIT 1R91FIT IC)OIFIT 1011
FIT 1921
FIT 1931
FIT 1941F’Ir ]951fry lob~
T 1.)/1
Fil 1Q81
FIT 1c191
FIT 2001FIT ZO1lFIT 2021
FIT 2(I31FIT 2041FIT 2051FIT 2061FIT 2071FIT 20dlFIT 2091
FIT 2101FIT 2111FIT 2121FIT 2)31FIT 2141FIT 2151
FIT 2]bl
FIT 2171FIT 2181
FIT 2191
FIT 2?01
FIT 2?11FIT 2?21
FIT 2?31FIT 2241
FIT 2?51FIT 2261FIT 2?71FIT 278]FIT 2?91FIT ?701FIT 2311FIT ?321
FIT 2331FIT 2341
FIT 23S1
170 FORM~l (l<Ib) FIT ?3bl
190 FORMAT (b~12.5) FIT 2371lqo FoRMAl (JHI024H RESULTS FOP GRoUP NO. ●13911H E-LoWER = ,lPk12.~~FIT 2381
1 17H MEV. E-uPPLR = ,1PE12.5*5H MEV.) FIT 2391
2nfi FoRMAI [lt10*6H J =.13.9~ ALAMDA =tlPE12.5s$H 9 =OIPEIP.5) FIT 2601
21n FOR~Ml (lfloo3bH STEPIT HAS BEEN CALLEO FON GROUIJ .13) FIT 2411
i??n FOI?MAI (2L11.Q.4111 ,14*12$13,15) FIT 2421
230 FnRMMl (bCllo4) FIT 243]
Et.111 FIT ?441
SIJRRUUTIN: SELECT SliL
c SEL io
THIS ROUTINE USED FOR SELECTING A SUaSET OF THE nATA l’O BE FIT. SEL 20
: SEL 30
COMMUN /P~LSIN/ ALAMDA(50),9 FX(?OO)* T(401)0 KTRM9 ITSPO IPW13S SkL 40
1 NIN* NOUTCOMMUN /P~JLSDAT/
1 595U)
COMMUN /puLSC~L/
StL 50NoTt ~t5(Z5), GK(?59400)t NkRG, ALF(25,50), ALAM(dStL 60
SLL 70A(5fl,!5U)s R(5091) SEL 80
67
cOMM~l~ /M~NI/ wx(100)c TITl_(fI), IPT(50)* N~(lO)c KKN(?5), I)lFLIM SLL 90
c SLL ]00
READ tNIN*%rv) ITS, (IPT(A)SI=l,ITS) SkL 110
c SkL 120
c ITs=,*u OF TIML %TFPS DLSI~tO. ;, 1, 1 30
c IPT=LNULXLS OF [)LsI!?ED TIMt STEPS. -IL. ]*I)
c SLL 1s0
00 .?u K=lsNERb SLL ) 60
on IU I=l*ITS SkL ]70
Il=Irl (I) SLL ]80
ALAMuJV(I)=T(I~) SEL 190
A(K,I]=GXIK!IL) SFL ?00
10 CONT$NuL2(I COAJTJNUE
SkL ?10SEL 220
00 4U K=I!NERb StL ?30
cvfr 3U I=lsITSGx(K,IJzA(KsI)
SEL ?40SLL ?50
T(I)=ALAMdA(x) SEL ?611
30 CONTINUE SLL ?70
WI?TTL (NoUTS60) ([~T(I) sGX(KtI),I=191TS) SEL F80
4n CONTLNUE SEL ?90
ITsP=lTS stL 300
RETU~N SEL 310
c SLL 320
%0 FORMAl (1216) SLL 33o
60 FoRMMI (4H 1=,13,3H T=P1E12.5?4H GX=?1E1205) SL1. 360
END SLL Sbrl
slJRRuUTINt TRMSEL (LKQKKX) TRM
lUM
; THIS NOUTANE IS CALLED IF KKN IS SET NEGAT1.VE F~Q A GROUP. TRM
c ROUTANk PH1N7~ OUT TERM 13Y TERM CALCULATIUN OF Fx FOR Ust IN ruki
c ADJUSIING FITTING pARAMLTLRS. THIS DONL FJY CHANGING ANI)/OR TRM
c REI.IOVINti parameter%. THM
c rw
COMMUN /MANI/ WX(IOO)O TITL(8)s KTR(50), NS(Io)o KKN(?S), OLP.LIM TKM
COMMWN /P!LSIN? ALAMOA(50)9 Fx(?oO)i T(401)0 K!RMQ ITSP~ IpKuw* TRM
j NTN~ NOU1 rHM
C(IMMUN /P<LSOAT/ NDTs kB(25)3 Gx(Z5~400)S NtRG, ALF(2%*50), ALAM(drRM1 695(JI rRM
COMMUN /PdLScAL/ TRM(5u*50)s TP~T 150) rnM
CQMMUN /FINNAU/ IRAD. NCOHS* RAOT(200)* 0ELT(200) TI?M
COMMUN /TkMOT/ TL(10), LTM(50)0 LT TRM
c T’RM
K=LK TKM
KTRM=fiTN(KJ TRM
TLll)=lOtlORIGiNAL D TRM
TI. (2)=1oHAQAMATRS FTL(3Js1OHJQ GKOIJP
TKM
IF (hhX.E2.0) G(l TO 10
Tl?Mrnfl
WRITt (NOJT*lbO) (TL{I)*I=l~3)oK lKM
wmTc (NOST*1OO) (L,AL~(KSL) gALAM(KOL) OL=lSKIRw) rHM
In IF (KKX.GT,O) GO TO qO rnM
DO 40 I=l\ITSP lNM
Fx(I)=O. rnM
Do 3U L=l$KTRM TUM
TR14(LoL) =ALF(K)LJ *EXP(-ALAM (KtL)*T(Il) rRM
IF ($KAO.LE,O) GO TO 20 lb.:
IF (lKM(I~L).LT.O.) TRM(I!LI=O. rk,l
COFF=AL~ (~tL1/DELTfI)/A~AMfKqL) o*2 1)+.,
xPolaJ,-EAP (-ALAM(K,L)*RADT (I)) TN:t
XP02=1.-EAP (-ALAMIK*L) *UELT(I)) TN:’
XPn3=CXP (-ALAM(KSL)* (T(I)-DELT(I)/z.)) TR*I
20 CONTJNUk ru~.
IF (JMAussQol) TRM(I*L) =COFF*KPOleXP02*xp03 rhs
LTwfLl=L rl...
FX(Il=FX (I)*TNt-V(I,L)
1020304950
60
7080
1::110120]3014rl)50160
170lBO
190?00?10?2n730
?40?50
?bll?70?80
?Yo
300710?Z()
330?40350760?rfl
“+60
68
30 CONTLN~L60 CONTLI’+UL
K]=l
50 K2=KA**
IF (A<*GToKTRM) K2=KTRMWI?TTC (NOLJT*lIO) (LTM(L),lL=KI*K?)[)0 su 1=1oTTSPWQITC (NOUT$180) T(l),ti~(Ko I)*(TRM(ItL) *L=K1$K2)
60 .CONTJIMUEK]=Kz*lI!= (N1oLEoKTRM) GO TO 50DO RU I=IoITSP
PCTDbP=U.IF (oA(K$l)oLti.001 GO TO 70PCTDJP= fGA(K$~)-FX(I)) /6x(KoI)*)OOo
7fi cn~7iwuF.WRTTt (NoLlT!190) I*T(I)?GX (K, I),FA(I)sPCTDIF
8n CONTLNUL
IF (NNX.LL.0) RETIJRN00 cQNrllrnuL
RITAD IN1N9?101 MLTIF (MLT.Ld.0) GO TO 110
DO luu MM=I*MLTREA13 (NTN~200) t.t ALF(KsL)sALAM(K*L)
100 CONTANUL
lln CONTANU~RFAD ININ!21O) LT*(LTM (JJ)cJJ=I,LT)
cc MLT=NU OF 9ARAMETEQS TO BE CHANGEI)
c LT = NUMHllR OF TLRMS TO BE’ REM~vEU,c = “l~UM NOs. OF TLRMS TO ME REMOVED.I.TM(L) -
cIF (LI.EQ.0) RETURNLTx=uLL=lKTRM=KTR(K)
DO lJU L=l,Kl~M
IF (LIM(LL).Ew.L) GO TO 120LTX=LIX*l
TRM(IcLTX)=ALP (K*L)TRM(C,LTX ).=ALAM(K,L)Go TV 130
1?0 coNTll\uELL=l L*A
13n COMTANUEKTQM=LTX
Dn 1*u L=l,KTKMALF(~tL)=!RM(l,L)ALAM(N!I )=TRM(?*L)
14n CONTINUL
TLol=JOHHEVIsETI PATL(2I=1OHRAME!ERS FKTR(A)=KT*M
TL(3)~lUHUR GNouP
WRITL (NOUT*150) (TL(r)~I=l~3)~K
WRITL (NOUTslbO) (L*AL~(K~L)*ALAM(K~L) ?L=lsKTRM)RETURN
c15~ FoRM*I (]H]05xs3A10s13) rlisl 9?9
160 FORMWI (i?in.3H L=.X3.10H 4LF(K~L)=*lPEl 106JilH ALAM(KsL)=~ lPcli.*l TRM 9M()
17n F(31?MMI (1~0*.2bH COUL TIME Gx*5115) TKH Q)()
lHn FORM*I (1P7E13.S)TNP ln~()
lq” FOQMMI (lfl(l,sfi ~=,1303tl T=,1E]2.5,4H 13X=Q1L1?,594H FX=,1E1205*8H ‘rH” ~fll(l
lc7nIr=01ti2.5) T}{ ; . ,1
zoo FOQMAI (Ib,2El?.~) m,! ;1 1(1
21o FORMA! (ldIb) T’Krl 11140
(IND TWM 1050
69
cc
cc
c
cccccc
cc
c
c
c
c
ccc
cc
cc
70
SURRUUTIN~ COHSF!IN
RoIJTJNk F(JI?MS cOARSE GRUUPS FROM t’
FOR4A1 .
COMMuN. /P~LsIN/ Ao(50)r Fx1200), T1 unul
C(Mcow 10
NE QHOUP OATA IN ENoF-LIKL Col{ Z()
cow 30C(JR 40
401)s KCO ITSP, IPRoP, NINo Cl)u 50COH 00
“coiWWN /PULSOAT/ NDF, ~tf(25), Gf\(25,400)s NERG, Fo(200), 0UM(70)J CON 70
] 107(50) con no
COMMUN /ENr)F/ MATi~ MFIS MTIc R,JNTIMS NPUN Coti 90
READ lNW~ C(JU lUORFAD (NIN*90) MA1l*MF1$MT1 C(JU ]10
con lZO
MATI=MA1 No, OF FISSIONING NUCLII)L ULSIR~O. CON 130MF1=IJAT TYPE VES1QED9MfL=t)n=F.p.DATA FOR TflkRMAL PULSE$MF1=M1= Coti ]40
- POP. L)ATA FOR FAST ~ULSF*t’TC. C(lii 150
MTI=l YPk OF F.P. WANTEO*MT1 =801=L)ATA FOR BETA- Pt.us GAMMA*M11=802=COK 160WATA FOR GAMMA 0NLY$MT1=R03=OATA FOR HcTA- OM~y,ETCO
SEARLn kNOF TAPE F09 DkSIHtD OATA.
10 CONTINUEREAD [NDFsIoO) (An lI)t 1=1 S7)SMATtMFfMTSNSEUIF (mtsEQ,-0) MF=ROIF (IIAr.EfJ,-1) WRITE (NUUTOI1O1 MAT,NDf
IF (mA1.Ed’.-l) SlopIF IMAT.LI,MAT1) 00 TO lo
IF (mfi!.Ed.MATr) 60 Tn 20
WRITt (NO~TSllO) MATl,NuFSTOP
?(I CONTLNUE
IF (MF.LT:MF1) GO TO 10IF (~FoEtJ~wFl) GO To 30WQTTE (NOUTSldf)l MFloNU~STOP
>0 CONJTLNUEIF (M).LT~MTl) GO TO 10
IF (ml~fiQ:MTIJ (W TO 40wPITC (NOUTSISO) MTIsNuPSTOP
40 CONTLNUFREqO (WF!140) NTRl!ArI (NrJF~qO) NICHT
ITsP=rJT
RFAD (NIN$90) NE
REAO (NINs1501 (kR(N)CN=l!NE)
NE*NU OF dQOAU (iHC)UPS PLUS ONE,
E13=ENLnGY qO~JNOS INcLIJu~NG UPPLw ANO LOwER BOUNOS IN MEWNEzNt-1NEI?G=NE
DO 7U IT=ltNTREA13 (NUFS1601 T(IT),KL
RFItD (Nf)Fsoo) NICHTRFAD (N:IF$}50) (Lil(K) !FA(K)~K=l.Kt)
I(E1=RE*l
Eo(KcL) =(Eo(KL)-Lo(KE-1 ))*to(KE)
THE PuLLING Ll)Op CHANGLs UNITS TO MEV/SEC, THE TIME OUI?ATIONOF Tnt PuLsE 1S AsSUMEU TO BE 1.E-4 SEC.
DO 5U K=l!KEFX(K)=Ff(K)/1.E-4
%0 cONTiNUkCALL HLHrN
00 6U [L=L,NE
C(JN 170
CUH Ido
CUM I 90C(JH ?00
cr)N 710Cu}t ?20Cuu ?30
clJn ?40CON 250C(JH 76oCllu 7T0Cl)ti ZdoCOH 791’ICON 100
c(lt4 310Clllt ?.?0cut< 130C(JR 7*OCUN ?50Cuu ?60C1.lu 370Cuti ?80l;llH 390-f)~ 600,; ,~ l.inc{ .20:(.1/ 630
CON L40CIJU 450CON f,boc(lt4 6 ff)
con 480
CON 490con %00Cl)u 510CUK 520CUH G.30
Coti %+0COR %50C(JU Gfll’)CUM %;(I
cUK Gdo
COR %90
con ~ooCON AloC(3H f*I?o
COK (.30c@w 640CI)N 65(ICO}) f.b(lCON A70
COH 680
wRITc (NP~N09U) NF,NT
WRITt [NPJAJ*lYo) IE,ER(IEW12rTL (NP~N*190) (IT9T(LT
80 CCJNTINU~QEWINU 10RETURN
c9q FORM*I [6111)
lno FORMAI i6:10$A6~14s12,1J!15)
11o FORM*I (1H1s13H SOR2Y! MAT z ,14s13H NOT UN TAPE ,13)
lzo FO?~~Al (lm*14H SORRY* MF = 014c13H NO! ON TApE ~13)13n FORMMI (lrnlol~H SORQY* MT = s14s13H NOT 01~ TAPE ,13)lQO FORM*I (55J, Iii)1%0 FORM*1 (6E11c4)A60 FORMHI (l Jx, lLL1.4Q33XQ111)
CcieCuuCOHC(IUCcuCURCoucud
codCLJRCOHCUMccl+
CORCUMCO04
C(JUCON
C(,c1 $,
~(!.
Coti170 FnRMAl (1~0,1/H ENERGY 13iN NO. ,13,6H PROM ,lPEl~05,FlH MEV !U ,~#CUN
I E12.b*bH MLV.) Ctid
180-FORMMI (If’i Sl~H TTME <TLP = ,13,16H cOOLINW TIME = ,lPE12.5*61i FA cOti
1= *1VC12.’3) cod190 FORM*I (z(Ill??E1104)) Coti
END Coti
SiJnRWUT[NE I?Et51N Rk+
c tikdc RnlJTLNk F()$I BNOAIJ GRoup BINNING. BOUNOA~ILs 00 hlnT HAVE TO *Es
c COINl,il)t WITH FINE GRoUP BOUNDAQItS. WPITlkN dY GRAHAM Ntl-1
c FOSTt-Ktl.ASLo 1975.c CH&NUtU OCTC 1977, LASLt II. GEOi+Gt
cCOMMUN /PdLSIN/ Ao[50)scOMMuti /P~~SUAT/ N(jT,’
1)SLIM1=SUM2=0.NUj=Iiu+l
NXI=WA*l
DO lu I~J=ltNUl10 V[lUI=O*
DO %U Ix=i,NxSUM1=SUM1*Y(IA)
.?() CONTINUtC FIND THt. FIRST RIN
~o 3U lX=A,NX
If (AIIx).EQ,U(il) GO.3n IF (AI IA).GT,UI})) GO
WRTTL INOUT!11O)
PFTU~N
.~l) V(1) =7 (IX-I)*(XIXX)-U50 IX=IA*l
DO 8U IIJ=A,NU6n IF (A IIX)OGTOUIIU+l))
V(IU)=V (IU)+Y(IX-l)IF (JAoGToNX) GO TO 9(Ix=IA+l
‘GO Tu 60
u
TU soru 40
.i))/(x[Ix)-xfIx-1))
GO TO 70
7n V(llJl=V IIU)*y(IX-I)*(U fIu*l)-X(TX-l))/(X(I~) -X(1X-I))
f3n CONT41’JIJE90 IF (A(NxII .GT.u(NIJII) wHITE (NO11TS120) x(NAl)cU(NIJl)
0(3 luu [u=IsNUAno suM2*buM2*v(Iu\
h9(l
70071072073fl
7*O750
7bd
77n
Tt30790
noonloP~fJfi~~
~4(1
630fsboh7Q
F80A’lo
fjoo~lo92(IQ30
940~;o060
1020
304(I5 [j
0070d [)
9rJ
100
1101.?0
1 30]40150
lbO
170180190
?00.10-do23(I
?40
?50
760?70zdo
?90
.700
7107203307$0
-450360
EURD=UOOOA k:
IF (Am~(S~M2-~UMl ),GT.EKRDe5UM1 ) WRITE (NOuTQ130) SUM1OSUM2 #t *
RETU~lW *L .
c I’/: .
llo Ff3RMMl (29H CANT FIND FIRST ENEuGY BOUND) *t *Lao FoRM-1 (1/Ho*oo** LAST UAIUt-4Elo.3t271i EXTENUS REYoNO ENo OF tiRI[)kl~ts~
SIJRRUUTINL RUNTOTS I{IJ ~,
c d....
c RouTINE To REAo TOTALSO I.E.oGX(KsI) sUMMtO OVER FNERGY. Nu’w
c UuvCONMuN /pLJLsIN/ ALAMDA(~o)s Fx(?OO)s T(401)* K~RM, ITsPO IpRuU~ NIJN
I NINs NOU~ HUQ
cOMMUN /PJLSI)AT/ NOTt tM(25)~ Gx(Z50400)$ NERG* ALF(25$50)* ALAM(2HUN
cccccc
c
10
2n
c3n40
50
Ec
E
1-5,5UI -CCIMMUN /PULSCAL/ A(5fI,50)c R(50,1)
COWMuN /PJLSOuT/ ALPHA[50)s FXC(lUO)o PCT(1OOJCOMMUN /FINRAU/ IRAD, NCONSC RAI~T(200)s 0ELT(200)
THIS subroutine IS llSEU FOR I?EAI)ING EXpERII~kNTAL OATA.lJIJFOKIUNA!ELY! THIS cAN ~t RFCEIVLD IN A VAKIEly OF FORMATS*~u
THIS HOIJTINL MuST 8E CONTINUALLY cHANGED To ACCOMAI)ATE wHATkvtnFORMMI TH> DAIA IS IN. THE FUNNY LOOKING >lATEMFNTs t3ELOW AKL
FOR NcAr)INS SOME ORNL uATA IN Tfit WHITTEMOXt JUNK FOHMAT.
DIMENsION HOR(F3)
RFAD ININ$301 NPrNE,NH~
On lU L=l~NtiORFAD ININ$50) (HUR(I),I=IS8)
un17c (NO~T*50) (HOR(I)*I=108)
CONTANUEDO 2U 1=1*NP
IF (LoLE.’4EI kB(I)=o.oRIZAO [NINt40) (GA(K,I)oK=1O*15)WRITL (NO~T!40) (GX(K*1)CK=1OO1%)RAnT(l)=Gx(looI)TII)=GX (11*II+GX(12*I )z~.o
DZLT~l~=100
GX(191) =(UX(l~SI)+OX(14 lI))*6x(lo*I)/GX(12QI)CONTINUITSP=NP
NF=lNERGniI?FTUNN
FORMA rFoRMMIFOI?MA1
ENn
sUqRUUTIN~ LIHFIT (K)
RoUTLNE wITH SUaNOUTINES FUNK ANO STEPI? PLRFORM TWO FJARAMEILN
FITSCI.E. ROTI+ ALF AND fiLAM. ADAPTATION OF STEPTT CODE BY
M.Go=l AMA]ALA!Os~LASLC ly76~FOR THIS APPLIcATION,
CO~MUN /PbJLSIN/ ALAMDA(50)Q oH(?oO)* 1(100)9 NERSQ PERDIF(1OU)B
lfl20
3040
50607080
90100
110
1201301+0
150160170
1s0l%
?00
?10?20?30740
250?60
??0?80?90aoo
310720330
7*O~>o360310
380
--490400
l+ur” 410
Dlil 60
1 CALL[lI_JO)o W(1OO), KTqM, ITSP9 IPROB9 NINC NOUTC(IMMWJ /PUI_SDAT/ Nf)T. LB(25), HOLD(25,1OO)Q NV~ NTRACF, MASK170)$ DH~ 80
1 X(7U)S X~iiX(70)s XMIN(fO)s bELTAai70i* 0ELMIN(70)s DuMMY* MAf~IX$~H~ 90? EQR(tO*7U), ctiISo, RSAV(1OO)* VEL(70)* TRLAL(70), xsAVE(70~9 CHI(DHf_ 100
72
3 70)9 sEC3W(Z,?), 0LDvCC(70), %ALVO170), ~OSC[70,1!3), cri10SL(i5),0H~ 1104 PllMlbafJ)t NERG, ALF(?ZS50)* ALAM(.fcj?50) ~MF 120
COMMUN /M~’JI/ TC(1OO), TITL(13)9 KTR(50)9 N~(10)9 KKN(?5)Q Dl~LIM Dtif 130
It-l
2fl
4fl
50
C(IMVVN /El~nF/ MAT, MF~ Ml+ RuNTJMs NPUNCOMMUN /FINNAu/ IRAc)~ NCO~Ss RAnT(200)9 DELT(200)DIMEIYsIUN TTLIIO)* XLL (10)9 YLL(10)
Do lU KK=l.KTNMIr=2*l!K-1IJ=2VhK
X(III=ALF(K9KK)
X( rJ)=ALA~,(K*KI()cONTINULNV=2*RTRMIF (NVOLE.70) GO TO 20
WRITL ( 10dT*l~o) NVRFT(IKNCf)NTINuEon 30 I=l~r.Jvt2XMIN(l)=X(I)*~tll!= (A(I) .LT.O.) XMIN(I)ZIIO.~X~I~
XMAX(1I=X(T)*1O.IF (A(I).~~.o,) XMAX(I)=X(I)OO.I
xMIN(L*l )=o.5@x(I*l)XM4X11*1) =Z.0*X(I01)CONTINUk
wI?lTc [NOuT~lbn)
MWTTL [NO~T*llO) (X(1) 91=19NV)tiQrTc (NOJT,l#jO)
WRITC (NO~T91(fI) (XMIN(l)OI=]SNV]WRITr. (N05JT*191))
WRITC (NOLJT~170) !XMAX(I)*I=l~NV)00 4u I=lIN’JOFLTAA(l)=O. l*X(I)
DFI.MA”lw( I)=0.00I0XII)
MASK(l)=O
NERS=ITSPDO 5U l=19NERbQW=l*
W(Il=ll./DH(Il)**Q4CHS(J=U.
Dn luu I=lcNE~sCALC(l)=OOD(Y 9U J=1?NV9Z
IF (lRAD.LF.0) GO TO 60COFF=A(J)/DELj(I)/XIJ* !)**?
XPOl=j O-EAP(-X(J*l)@RAOT (I))X002=I.-EAP (-X(J+l)@OEL 1(1))
XP(13~txP (-X(J*l)*(T(I) -qELT(I)/?.))CALC:l)=C~Lc(I) @COFF*X~UI*XP02@XP03GO TU 90
TEMPaAIJ*l)*T(I)IF (*Bs(TCMP)*LF.6oo) tiU TO 70)(Pn=u.
GO TU 80
XPCI=A( Jl*&XP(-TEMp)
CALCI1) =CALCII)*XPOCONTINUL
PEROl?f l)=1000*(cALC( 1)/DH(I)-l.)CHSO=LHSQ* (CALC(I)-OH( I) }O(CALC (I)-O~(I))~*f I)@w{T)
WRTTC ~NOUT9200) CHSQ
WQITL (NoIJT~210)wRITc (NO~T02dO)WRITL (NO~T$~~O) fT(I)*uH (I )ocALC(I)9PERDIF (I)~I=lQNERS)CALL >TEPITDfl ~du I=loNENs
CALC(J)=OODO lCU J=i.Nv92
IF (LMAO.LE.0) GO TO 110cfiFF=A(J)/nELT(I)/XIJ* 1)**?
OIIFDtiF
OtlFoHt
OItf~hi0}4,
oh+
DtihoHFOHF’
UHF[)HF
OHFI.)HFl]llfUHF
[)HF(IMP
UHFL)HFoiiF
,Itit)1$$
,;}.,
oh-OF’:”[)}..()),1(),,;
Llrll-I.)HFOHFOHF
i)HFOHFOtiF
L)tiiDHFOtiFol+FOHF
DtiF
OHFDtiFDtIFOHF
DHFotiFDHF
DMFOHFUHF
OHF
l.)tiFOMF
(IHF
UHFUHFllnF
I.)MFOliFOtiFoHF
OHFOHF
140150
160
170180
190?00
?10220
?30240750
26(Ipro
T80790
300~lo32n
7303403!Jll
3603103*n3+IJ
600410
420
430440450
460670480
490%00
510F20
530C+o~bo
<60570
%80~Yo600
610620630
640A50
660
670Ado690700
?10720730
740750760770
,780790
73
XPOI=I,-LAP [-X(J+l)ORAUT (I))xPcI?=I o-EAP(-A(J*I)*nEL~ (I))
XPn7=LXP (-X(J*I)*(T(I )-UELTII)/>,))
CALCtl) =CALC(I )+COFF*XPUl*XPOi?~XP03GO TU 120
11o TFMP=A(J+l)*T(I)
IF (MBs[TL~P) .GT.601’)) Gu TO 120CALC{l) =CALC(l).X(J)UEXP (-TEMP)
120 CONTiNUk
DO lJu l=l,NEKs13o PFQDIF( I)=IOO,*(CALC (1)/Dti(I]-l.)
WRITL (NuUTt2Zo)
WQITL (NOUTS230) (T (I) JUH(I),CALC (I) OPERDIF (I)oIs19NERS)
ENcOUt. (3f,d40,TTL(I)) KENCOUL (20,i?5U,XLL)EI.cOUL (2u,?6U,YLL)
c CALL kLOTY (TsPERnIFS-l!LRS~l~o,n$ U.sl,~J.~[TL$34,XLLo20 .YLLtdO)r)rl 1*u J=L,RTRM
I1=?VJ-IIJ=2*J
ALF(~tJ)=A(II)AL4MIF*J)=X(IJ)
lLCI COFJTINULR:~,j~~
c15n FORMAI [24H0 TOO MANY TERMS. NV =,13)
16n FfIRMAl (lHo*lOX, 1RMINITIAL Parameters,/)~70 FOQHMI IIH v20x,6E12.4)lqo FORM*T (l? ?1OX,1?HLOWLR LIMITS,/)
190 FORMAI (ld *lUX,12HuPPtR LIMITS,/)
ZOO FOI?MMI (1A 010X,36HCHI-SC)UARE WITH 0RIGIN4L GUESSES IS OEI?.*)21o Ff)RMMl (l~iooloX.31HCOMPARlSON WITH INITIAL UUESSFS,/)
Z?n FORMMI [lmo,//,QAslHT,4oXo2HDHsQX* 4HCALC$?As6HOtRD~F*/)~?IY FOJ?MMI (1M ,4F1?04)200 FORNMl (32HPENcENT I)EVLATION Fok GROUP NO. *12)
2%(I FOQMUI (2UH TIME IN SkCONoS )
260 FrlRqMl (21JH PE~CF.VT DkVIATION )EIJn
SIIRRUUTINL FUNK
COMMUN /PyLSIN/.ALAMDA(bO)9 DH(?OO)* T(1oo)9 NERs, PEROIF(lUU)O
1 CAL~(lfIO), N(lOo)O KTXM~ ITSPo IPROBQ NIN! NOUT
L)HFoUF
OHFon~DnF
OUFonfl)hF
l)hFlltiF@tiF
DHF
DHFDhF
oHFUHF
onFL)HF
OHFUHFDHF-
On+I)t\fL)rlF
UHF
I)tiF
OtiFUHF
OtIFOh.
l)t-.Dt-
l)bohDH~OHI
Dt+tDHF
FUN
FUNFUN
fioi)
$I1OrldoR3fiR40
850A60R70
R&o890
000
Qlo
920930
940qfJo
9609ro
Q80q+o
lnOO
ln10lr12n1030
10401(350
lf1601070
lntio\f)90
1]00
11101~20l\31)1140
1150]]60Ilrl)
1020
COMMUN /PJLSOAT/ NOT, E~(i?5), HOLU(25,1OO)? NV* NTRACE, MASK(70)$ FUN 30I X(7u)* XMAX(fO)$ XMIN[tO), DELTA, 0ELMIN(7fI). UUM4Y. MAIRIAsFUN 40
? FRR1/0t70)* ~HIb13, f3SAv(100)o VEC(70)S TRlAL(70) ;-X5AVE171))P LH1[FUN3 70)s xECDNU(~,2), 0LDVEC(70), qALVO(70), AOSC(70,1S), cH[05L115), FUN4 f111Mlb86)t NEKG, ALF(2~*sO), ALAM[d5$so) FuN
COWMVN /M~NI/ Tclloo), lITLIR)$ KrR{SO)s N>(10)! KKN(?%)s oI~LIM FUN
cfJMMUN. /LNr)F/ MAl# MF, MT* TLIMIIs NPtiN F UN
COI.iMUN /FINRAU/ IRAIJ, NCOKS, N41)1(zcIo)$ UELT(200)
DIMEI!SIUN LxX(20)
FUNFUN
CHISU=OO FUN
00 5W I=l!NER~ FUN
CALC(i~=O. FUN
Do 4U J=lsNV~L FuN
IF (lKALI.LE.01 GO To 10 FUN
Cf)FF=X(J)/nt’LT(I)/X(J. 1)**? FuNxPol=I.-EAP (-x(J*1)*RAI)? (1)) FUN
XP02=1.-EXP [-X(J+I)*DELT (1)) FUN
XP03=cXP (-X(J+l)*(T(l )-qELT(I)/~.)) FUNCALCl I)=CALC (I) +COFF*xPOl*XP02.xP03
GO TU 40
FUN
FUN
10 TEMp=A(J+l)*T(I) FUN
IF [MMS(TLMp) .LE.AOO,) bo To 20 FUN
XPI-)=U.GO TU 30
FUNFUN
?() XPO=A(J) *~XP(-TEMP) FUN
5060
70ao9n
:;:
].20
130140
)s0]60
170180
190
?00?10
220230?40
?50?60?ro I
74
7(Y6~
50
6n
70
RO
c9fi
100lln1201701.4 IYlsn
CALC(l) =CA~C(l)+xPOCONTINUL
RShV(l) =($ALC(!)-nH(I ))*W(I)
CHIs~=~riI?O+BS&V (I)*RSAV (1)DTFMMA=(J.
nn 6U 1=19wEH3
PEQDiFI I)=lOo.*(CALC( 1TSTLIM=QB~(PERCJl~ (1))IF (uIF~AX.LTOTSTLIM)
cONTLNuFIF (UIFMAXOLEODIFLIM)
CALL StrO~D (TYM)IF (ILIMI1.LT.1) TLIM’IF (IYM.LIOTLIMIT) GO
WNTTLw~lTCwh’~TL
4nTT~WRITLWIJITCW12TTL
DO 7U fih=l,NERGLXX(RA)=IISPcONTINuk
)/DH(I)-l.)
LJIFMAX=TSTLIM
ctllSQ=I,E-2U
T=2Y9.51(J 80
FUNFUNFIJN
FUNFUN
FUN
FUNF lJii
FUN
FUNFuNFUNFUN
FUNF(JN
CALL P~HOUT (LXX)
CfJt4T1NuERETUKN
FOI?MAI (1P4E11.4).
FIIN
(X(I),lnl,NV) FIJN
X(1)$ I=l!NV) Fb!,
FIJN
fUN
(T (I )*OHIII *CALC(I)SPEKD: F(I) ~I=IsNERs) FUNFUN
FUNFUNFUN
FUNFUNFurl
FUN
l=OQ&41+1 (lHotllJx,22HTIME LIMIT W8S REACHEO,/) FUI,
FORM*1 (lti C1UX,30HTHE LAST SET OF PARAMLTLKS wA%s/) FU’
FflRMAl (lrn *20X,6E1?,4) FU:
Ff)QMAl (lrn sIUX;ZQ*COMPARIsON ,AT expiration TIME*z) FUP
FOQMMl (lIIn,//,qA,lIiT,lUX*?HDHS Qxs4HC4Lct7A06HpLPnIF*/ ) Fu’
FnF?MMl (17 *4L]?04) FU-...
ENIT P v 4’:
suRRuuTIN~ STkPIl ST?
cOMMUN /P~LSIN/ ALAMOA(5O)* DH(i?OU)O T(1OO)S NERs9 PEROIF(IOU)t ST.’
1 CALb(100),t w(100)s KT~Mt ITSPS I~ROBq NIN* NOUT ST:
COMMVN /P!LSOAT/ NDTS ~8(25)s HnLD(25,100)0 NVS NJTRACES MASK(/o)S sT’
1’ X(7U)0 XMAX(70)$ XMIN(/0)9 DELTAA(70)~ UELMIN(70)0 UUMMY, MATKIA*STt.
2 ERQ(10*7U)* CH15Q* RSAV(1OO)* VEL(70)0 TR1AL(70), XsAVE(70)S cHI(sTt
3 70)$ >EC~NDl~,2), OLOvLC(?O)S SALV0(70)t Aosc(7n,15), cH105$(15)*sTL
4 I_N1M(b~6)9 NERG, ALF(?~$50)t ALAM(dS150) sTE
cOMMuN /M~NI/ ox (1001* TITL(~)~ KTR~50)* Nb(lO)Q KKN(~5)* OIFLIM STE
NVMAA=?o STE
MfTsouL=15 STE
Ku=& STt
RATIU=lo.o STE
COL7N=0099 sTF.
Nc0MF=5 STE
ACK=C.O STE
SIGNL~=ZoLfI STE
HIJGE=l.L3(IF (Nv) 1J1O*131O*1O
SIESTL
in NACTIV=O STt
Do 9U 1=1*NV STE
IF (MAsK(I)) 90~~0990 STF.
2n IF (ucLTAK(I)) ISO~30s60 STC.
an IF (A(I)) 509409’30 ST;
40 DELTAA(I)=O.O1 STt
GO TU 60 ST:
%n OELT*A( T)=O.OAOX(II sTr.
6(I IF (AMAx(I)-XMIN(I)) 7Ut70S8TI ST:
70 XMAXIJ)=HJGE STF
XMTN(ll=-~\JGE sT{.
?s0~+o
?00310320
330740
350q6rJ
3703do
390400
410
420430440
*bI-l460
470460490
500
<10fii?o
%3054n%50
660
%70~8n<90~oo
fin620
630
1020
30
405060
70M(Y90
100110
120130140150160!70]80
‘]YG
?00?10220?30
?+0
250?60770?80p90
75
an NAcTIv=NA~TIV*I ST? 300X(l) =AMAXl(XMIN (I)tAMINi (XMAX(I)SA(I)))
9f) cCIVTLNUk
s:, 31rl51. 720
Cf)MPAK=O.(1 ~.. 330IF (txACTIV-1) lolJ,l~o,lZO ~..
100 00 llu J=l,NV340
,3,. 350lln MASK(J)=•
Go Tu 10
ST, 360
l?fI A=NAbl Iv
s’ 3’105 3H0
sljq=z.U/(A-l.u) s 391)
P=?.u*(loO/SQRT(A)/(1 .0-0050*SUA)-1.0) s 600c0wpA~=4M1V1 (0999,4Rs(~ 10-( l.-c[)LIN) **sU8)0(l. ●PO(~o-coLIN) )))
130 Ch[tL PUN4
s.: 610ST.
NF=l620
IF (l~V) 131O*13]O,14O
Srt 6.30
140 DO l=Ju I=l,NVSTL f440
150 Dx(I)=ULLIAX(l)SIL 4s0
STL 460cHIol_u=.HlslJ SIE 4?0Noscsu STL 680
160 NCIPb=O SIL 690
N71P=U STf %00
c MAIN UU LOOP FOR cYcLING THROUGH THE VARIAtiLESO Slc Slo
c FIRSI TRIAL SrEP WITH EACH VARIABLF IS sEpARATf-. STt. 520
17fI NAC~=U STL %.30
no q*u I=l,NV STL %40
OLnVCC(I)=VEC(I) STE %50
VFC(l)=O.U sTk %bo
TQTAL1l)=U.O sT~ 6“ro
IF (MASK(1)) 180t190*150 Slk %dll
18fI VEC(l)=-O.O STL 590
GO TU 940 STL 600
l_90 NACK=NACK*l STL 610
XSAVL(l)=X(I) sTE 620
IF (31GNIFoABS (DX(I))-A8s(X (I))) 3400340$2U0 STt 630
ZOO x( I)=ASAVL(l)+DX(I) srt. ~60
NFLAu=l STL 650
IF (A([)-XqIN(I)) 22O,21OO21O Srt 660
210.IF (A(II-AF4AX(I)) 230,230,220
2?(I NFLAu=NFLAG*3
Slf. 610STL 680
GO TU 2*O ~T~ 690
230 CALL PUNK SIL 700
NF=N* ● 1 SIF. 710cHTML=C&41SCJ STL 720
IF (Lti15(A-cHIULD) 3Er0,240,250
24n NFLAe=NFLAG*l
Sit. 730511. 7*O
250 X( T)=ASAVL(l)-DX(I) STL
IF (x(I)-A41N(I)) 350,2bOt260
750STL 760
2A0 IF (A(l)-ALiAX(I)) 270$~70S3S0 STL 770
270 CALL PUNK STt 7M0NF=NP+l STL 790
IF (LnISQ-CHIULD) 370,280$290280 NFLAu=NFL~G+l
Sit. R(IOSTt. nlo
29n IF (NFLAG-3) 300t340t350 STC R20
300 TRIAL II) =~X(1~*O*5* (CH15Q-CHIME) /(CHIME-2.0*CHIUI.D*CMISO) 5Tt R30
IF (INIAL( [)) 3100350,310 STE R40
310 VECI1)=lRL.4L(l)/AHS(Dx (1))X( T) =ASAVE( l)*TI?IAL(I)
STL R5frSTL n60
CAl_L FUNKNF=Nrol
STK R1OsTE Rflr-r
IF (WiIsti-fhIQLn) 320,-330s330 >Ik f19rl
3?0 CHIOLiJ=cHISd STE Q(IO
GO TU 360 Slt 910
33o T$?IAL(II=O.O sTL 920VFC(L)=OOO STL
GO TU 350
QAO
STE Q*O
34n VFC(II=-O.O STL 950
35o X(I)=ASAVL(l) STE. q60360 NCIRL=NCI~C*l STE q70
IF (NLIWC-NAClIV) 450s950s950 STL qdo370 nx(I)=-oX[l) STE Q90
76
c A LOnt N VALUE HAS 13EEN FOUNO.
38(Y NCTRL=O
DFL=uA(l)
39n CHTML=CI+IULDcHTOLU=~tiIS~
VFC(L]=IJEC(I)*OFL/ARS(oX (I))TPILL(l )=!RIAL(I)+oEL
13EL=MLK*l)~L
XSAvL(l)=R(I)X(I)=ASAVL[l)*OEL
IF (A(I)-XWIN(I}) 440J4UO$400400 IF (AI1)-AMAX(I)) 610.~10!460
410 CALL “FUNK
NF=NP+l
t{ENcE THIS VARIABLE WILI. cHANbk. Sfk If-1ooSTE 101o
srt 1020s’1 1030s-i 11-140‘> . lrlbflS.:. lnhoS L 1070
s.:. lfitll)s-l 109I)
S’F 1100\“l. llAOsnL 1)20fjl~ 1]30
IF (L.MISQ-CHIULD) 390s420$420 srE 1140
4%0 cINOCM=O.5/ACK*(ACK*~2*~HI ME- (ACK**2-1.0 )*CMIOLD-CHI SQ)/(AC~’’CHIYL\lL 1150
I -(ALK+100)*cHInL D+cHI?Q) ilk 1160
4.30
4R()490
51)fJ
510
520
590
591-Jbon
cc
x( T) =ASAVL( l)*CINDER~D!LCALL ?ONKNF=N?*l
IF (uni5(J-cHIuLD) +30,440s440CtiTOLU=CtilSti “TNIAL(l) =TQIAL( I)+C]NDLR6ULLVEc(AJ=ULc(I)*cTN[)EROo~\/ASs (OX(I))
G(T TU 450XII)=A5AVL(l)
IF (wLIP-I! 9309460,460IF (Ab5(vLC(I~)-ACKI 49u~470r47n
OK (I )=~LK~ABs(Ox(I))
VFC(ll=~EC(I)~ACKOLnVLLII)=OLDvEC(I)/ACKOn 4MU J=l,MO~OllL
ERQ(ltJ)=LRR(l,J)/ACKS(lvo=u.o
SUMV=U*ODO 5UU J=l,NV
stJMo=5u~o+oLovEc(J)~~2
SllMV=SUqV+VEC (J)0*2IF (suMu*51JMv) 930,930$510SIJMO=SUNT($UMU)SUMVZbtiNTISLJMV)COSINL=O,O
00 5.2u l=l,NvcnSINL=C051NE*OLOVEC (J)/SUMO*VEC (J)/SUMv
IF (NLIp-1) 9~O*530SS40IF (NACK-VACTIV) 930,5bu,560
IF (I~ACU-X4CT1V) 560s55U,550IF (NLIP-NcOMP) b60,570~570IF (~uSIN~-CUMPAR) 930,570$570SIMON SAY5, TAKE AS MANY blANT sTEPS AS PObS18LE...
NG~AIwl=O
NTRY=UNRETmY=Ll
KL=lNll$c=NOSC+’I
IF (NuSC-MOSQuE) 600,60U,580N05C=MOSQI+F00 5YU K=$,M05GUt
CHIO>L(K-l )=CmIOSC(K)DO 5YU J=l,NV
XOSC(J?K-l) =XOSC(J!K)ERR(J,K-l )=ERR(J*K)
00 6AU J=l,NvXOSC(J$NO>C)=A(J)ERR(J,NUsC)=vkc(J)/s(JMv
CHIO~L(NOSC) =~HIoLoIF (NUsC-J) b70!b20,620SEARUM F02 A ~RFVIOIJS SUCCESSFUL GIANT sTEP IN A
NFARLY ~AtiALLLL TO THE OIKLCTIO~J OF THE PRu~OSEil
!jl~. 1170
STL llan‘>TL 1190
Slt 1?00sTE 1?10>Tt. 1?20STt 12J(I
STR 1?40STE l?bOSTE ]?60STE 1?70Slk l?tJO
STE 1?90STL 1300STE lqlo
SIE 1?20STE 1330
STL 1340STE 1350
STL 1’360STF. 1370STL ln80sTE la%STE 1400STE 1610
STE 1420STE lt+~OSTE 1440sTE 1450STE 1460
sTt 1470STE 14d051E 1490STE 1~00
77
c IMMF.UIAILLY PNEV1OLIS oNL.
6,?0 Cf)x,cufil=rl.u00 6JU I=l,NV
630 COXCUM=LUACOM*ERR (J,NOSC) ‘EI+R(JoNUSC-l)tNAH=muSC-d
b6n NTRY=UDO 6ou K=KL*NAH
NRETKY=NAH-KCOSINL=O.U
00 62u J=l,NV650 COsINL=CObrNE*ERR (J,NosC) *ERR(J,K)
IF (buSIN~-COXCOM) 660J960t680660 CONTINUk670 cHIfJAK=CH1 (I)
Gfl TU 700
680 NTQY=LK1=I(*IDn 6VU J=A,NV
SALVUIJ)=IQIAL(J)6qo TQTAL(J) =(X(J)-Xl)SC(JSK ))/ACK
CHIRAK=CHIOLo* (CHICSC(K) -CHIOLO)/ACK700 Dn 7ZU J=l~NV
XSAVLIJ)=A(J)
TRIAL (J)=ACK*lRTAL(JIIF (IIASKIJ)) 720$710?720
710 X(J) =AMAX1(AMIN1 (X(J) +]NIAL (J) *XMAX(J))$XMIN (J))7?0 C@NTLNUk
CALL PUNKNF=Nr*l
IF (LmI’3Q-CHIULDl 730s1+0s740?30 cHIfjAK=CHIOLO
CHIOLU=CHISQNGIANl=NGI&NT*I”
GO TU 700/4fl IF (NRLIRY) 760$/60,750?%fT IF (l*QIANT] 81O*81OO76O?60 CTNDLH=O.5/ACKO(ACKe020\HIRAK- (AcKi$02-1 .o)eCHIOLn-cHIsQ~ /(ACK
1 {>CHibAK- (4CK*loO) t$cHIOLD*CHIsQ)
nO 7nu J=l,NVIF (MASK(J)) rRO*770t7BIjX(J) =AMAX1(AMTN1(XSAVE (J) +cINDER*TRIAL (J) tAMAX (J)) oXMIN(J))
CONTJNULCALL FUtJKNF=Nt ●1
IF fI.HISfJ-CHIULD) 890, 7Yo$790IF (NuIAN1) 8Jo,Bno,830IF (NIRv) 810s83U081n
oo R<(l J=l,NVTRTALtJ)=S,ALVUIJ)
X(J)=AS5VL(J)GO TU e50DO 8*U J=l,NVTRIAL(J)=lRIAL(J)/AcKX(J)=ASAVL(J)IF (NbInNl) Pb(I,M60,900IF (NHETRY! 8100870c6/,UIF (wINY) R80J9?098floNTI?Y=u
GO TU b70CMTDLU=CHIS(J
IF (NINY) 910*16U~Q10NOSC=U
GO TU 160NO%C=MAXO(NLJSC-I $0)cHI(ll=CtilnLD
CONTINUEANOTI!LR CYCLE THROUGH TtiE VAI?IAtlLkS IIAS tlEcN cOMPLETLD.
PRINI ANoIHER LINE OF IKACES.
NzTP=NLIP+I
“}. ]A9fl!“L )700
!t. 171!1:;IL 17.?0‘.TE 17JfI
>TL 1740STE 1750
STL 17b0
STE ]770STE 17R0STF. 1790
STL lfiOOSTk lR]O
STE ln20STL lp~o
STL 1940ST.E IR5fISTE 1A60Slk 1870
Slil 1R80SIE. IR90
STE 1900
STt. lqlo
STE IQ20STL Iqj(l
STE 19405TE lq50
STE 1960STL lQT(>
STE 1Q80STE 1990STE 2oO0STE ?nloSTE 2020STE ?oJOSTE 204fJSTE 2(I5O
STL ?060STE Z070
STli ~ntio
STE 2090STL ~100srE 211O
STE 21.20srk 2130STE Z140STE ?I!JO
STE ,?lbO
STL ?170STL 218(1STL 2190srE 7?00STE 2?1oSTE 2?20STE ?p30
STL ?240CTE z?50
sTL ?260
sTL ~?[oSTL 2~80
STE 2?%STL 2300
STE 23111
STL ?320SIL ~730
STL ??40
STL 23’JnSTL 2?60
SIE 2770
78
60 ru 170 STE ?a8nc A L!INIMUM HAS 13ELN FOUNV. PRINT THE REMAINING TRAcES. STE 2390
9%(I NOSC=U Srt 2400
I)o 90U I=1ONV STE 2610
c STFPLI 4.b *s* STEPIT WITH OSCILLATION SEAuCH9 MATR!X INVEKSIONt STE 2420
c AND AuToMAIIC STEP SIZE ADJUSTMENT. cr+hNVLtR d~STE 2.430
IF (AMAX1[VEC (I)*SIGN(1O 00VECI:)))I 970*96U~970
960 CONTANUE
GO TU 101U970 NGATL=l
DO luufl I=l*~vIF (MASK(1)) ifIflOC ’?f313Clo(l(l
Yf?o IF (HBblOA (I) l-AdS(OELMIN (1))1 IOO0,990999U
99fl NGAft=Olol)ll DX(Il=DX(l)/RATIO
IF (NbA7El 160,1bos101ij
1010 CHISu=C~~IOLOIF (LAHs(MATR1x-loO) -5O) 1020,1020s1310
IU?O IF (NACTIv-Nv) lJ)O~lOJu*l~10
c cnwPulk TME S!ANUARP EMHoRS ANO TtIE Correlations.
l(l?n F4C=m~T10@~} (MATRIX-10n )
ESUM=UOUor) lu% I=IJNVIF (utLMIN(I)), 1060s105091040
104o OX (I I=AQS(FACVOELMIN (I)IGO TU “106O
105n OX II i=A~S~FAc*Ux(I))
106o IF (uAII)) 1310*131001070107o XSAVL(!)=X(I)
DO lUMO J=],?X( I)=ASAVL(I)*DX(I)
CALL FUNKNF=NF*l
SECONIJ(l *J)=C~ISQIORO DX(II=-ux(T)
EQR(l~l )= (sEcONO (l, l)-20-O*CHIOL[)*SECOND (ltd))/Da(I)**2
1090 EsuM=csLJM”Ads (ER~(191) )OO lL<O I=?*NvIM=I-i
DO l~do J=l$IMDO 1110 K=],?X( I)=ASAV\(I)*OXII)DO lAuO L=],2
X(J) =ASAVE(J)*OX(J)CALL FUNKNF=N? +L
SFCONU(K*L)=CMtSUX(.j)=ASIV~(J)
11OO DX(J)=-UXIJ1
X(T)=ASAVE(I)
llln Ox(I)=-l~xiT)ERa(LtJ) =0,25*(SkCOND( l?l)-sEco~D(192)-sEcuNo (2sl)*s~c0u~(2*~))
1 /A13>lUX(i)@DX(J))ESUM=LSUM+ tI!3S(FRH(I,J) )
1120 EQR(~sl)=EQR(l,J)RRAAtiA=Adb(kSUM)/FLOAT (NV)**?
NGRAFL=[)
DO 1A*O I=lsNvDO 1$*U J=I,NVlF (LRK(I,J)) I140,1130t]140
ll?n NGRArt=l1160 ERR(i,J)=Et?R(I,J)/9RAAAK
OFT=A*U
DO 1130 J=lQNV1150 SALVUIJ)=l.O
r)o lAUU I=ItNv
BIGA~J=O.O
STL 2440
STt 2450
STE 2460STL 2470STE 2&ti0STE 7490>Tt ?<00
SIE ?510sTE 2F20sTL ?qJO
STE 2%*O
STE ?c,50STk z%60STE 2K?0
sTE z5un
STE z5Y0STL 2AU0sTk .2610STL ~620STE ~630
STE 2640
STE 26S0STE 26bf)
STE 2670STL ?680STE ?690
STL .?700STE 2710STL 2720STL 2730STE 2740
STL 2750
STE 276oSTE 27111STE ?780STL 2790STE 2800STE 2810STE 2F120STE 2R30
STE 2940
STt 2P50STE ZR60
STE ?s70STE 2RM0STE zR90
STt 29(JO
STE ?910STL 2Q2nSTE 2Q30
STE .?~40STE 2Q50STE 2Q60
STF. ?q7fTSlf- 29dl)STL Z9Y0
STt 3nOo
STE 3nl.o
srt 3n20STE 3n30STE 304fl
79
11601170
Ilqn
119(7
lc?n(’)
1210
13no
1310
c13201330134~13’50
00 1150 J=I$NV
IF l~ALvu~Jl) 116n.llRU*l160IF (AtIs[E~Q IJJJ))-RIGAJJ) l180tllHOOl170RIGAJ.J=Atib (ERR(J$J) )K=JC(3NTLNUE
IF (MIGAJJ) 1200s1190,1ZO0fJET=u*oGO TU 1310SALVVIK)=U.ODET=ucT*L~R(KoKI
TPIAL(K)=l.O/LNR(K,K)ERR(n*K)=uoo
XSAVLIK)=lOOM=K-iIF (MI 1240,1240c1210
DO IZSO J=l?MXSAVc(J)=tQR(K,J)TNIAL(J) =LQR(K,J)*TRIAL(K )
IF (sALvO~J)) ll~fi~1230s1220TQTALIJJ =-TRIAL(J)
ERP(~*Jl=UoOMZK+L
IF (M-NV) 125u,12SO01290DO lc@O J=M*NVXSAVC{J)=EQF?(J,K)
IF (=ALvO(J)) 119(I,1260?Iz70XSAVC(J)=-XSAVC(JITRIAL (J) =-ERR(J,K)*TRIAL (K)
ERR(JtK)=U.OfTfJ lJUO J=I,NV
on lJUU K=J,NVERR (R*J)=~F?R (K,J)+XSAVL[J) *TRIAL(K)
CALL kUI’JKWRITC (NOLJT?1320)
WRITC (NCJUTt1330) (X(I) $I=lSNV)
IF f~nlsIJ.GT*l.E-?o) WRITE 1NOuTs1340) CHI~QIF (LHIb(J.LE.l.F-?O) WKITE (NOUT,1350) OIFLIMRETUmN
FnRMAl (//,lX$d2H FINAL VALiJES (]F X(I))FOC?MMI (lX,lOti X = QloE1204/(lox*loEldo 4)}FORMMI (///lXs~3HFINAL VALUE OF CtiIsQ = .E15,8///)FORhi~l (1Mos1Y$,1OH OIFLIM = EIS.8)ENn
SURRuUTINL FINEcHK (I(L)
cc F?oUTlrit CALCULATES INTLHMLDIATE PIIINTS AND CHECK% FOM
c REASUNAtJL~kJLS5.
c
COMMuN /PuLsIN/ ALAMOA(50)$ FX(200)0 T(401)s KTRM, ITSP, IpHuHs1 NTN, NOUI
STE 3n5fJ
STE 3n60STk 3n70
STE SnHnslk 309n5TE 3100
STL 311nsTE ~12n
STE 3130STL’ 3140
sTL 3150STL 31b0sTt 31/0
STE 3100STE 3190STE 3700
STE 3?10
STE 3?20ST}. 3?3n
STt 3?40STL 3250STE s?bOSTE 3??0
STL 3?80STE 37%STL 33OOSTL 3110
sTL 33tnSTL 3330STE 3340
STL 33!J0
STE 3360STE 3770
Srfi 3380
STE 339oSlk 34oo
STE 3410sTt_ 3/,~()STE 343o
STE 34$(ISTE ~45n
STL 3460STt 34/0STE 348o
StE 349fl
FIN
FIN 10FIN zoFIN .3[1FIN 40FIN bll
FIN 60cnMMoN /P:LSUAT/ NOT, ktJ(25). Gf(Z5,400)t NERG. ALF(25,so), ALAM(<FIw
1 %,5U) FIN
COMMUN /PJLSCAL/ A(50*5u)~ B(so,l) Fl:l
COMMUN /MANI/ rc(100)t TITL(8)t KTR(50)$ N~~lO)! KKN(25)0 nltLIM FIN
CnMMUN /FJNRAD/ lRAo, NCOHSC RA13T(200)s DELT (200) FIN
DIMENsION FXp1700), TP(joo)c TI(lU)s XL[lU)~ YL(;o)s TPF(700) FIN
I(=KL FIN
ENCOIJk (27,170,TI (1)) K FIN
ENcoLJL (20,190,XL) FIN
ENCOIJL (1U,200,YL) FIN
XLI2)=1OH SECUNCIS, FIN
FXMIN=Pf (l) FIN
00 ~u I=I,TTSP FIN
IF (~A(I)oLT.FXMIN) FXMINI=FX(I) FIN
80
DFLF=u.~=~
TPll)=r(l)
OFC=I(lIrPK!TINUt.L=L+l
OELF=UELF+l.tJ
TP(L)=l)ELFoDECIF (I P(L) oGE.T(~rSP)) 6U TO 30
IF ((lP(L)/DEcl.6E.ltl.o) DELF=l.OIF (tlP(L)/OLC)obE,lO.U) Ukc=OEc*10.O
GO TU 20CONTANUL“NK=L
THIS LOOP IS TO INcREAst TIME MF.SH BY FACTuR OF FIVE.
NPF=lTPF(Nt’F)=TP(l)
no 5U N=2!NKIF (NPP.G?,700) GO TO 50
DELF=(IP(N)-TP(N-1))/5.000 4U NJrl,bNPF=NPt*lTPF(Nw)) =TPF(NPF-1) +oELF
CONTANULcONTAmukIF (ly~P.6r0700~ wRITE (NouT,140) TPF(NPFI
NK=NFt00 6U N=lsNK
TP(N)=T~F(N)CONTLNLJFWRITC (NOUT*lMO) KD(l 9V N=1oNK
FXD(N)=[I.
KTRM=nrN(*’1DO flu J=I*KTRM
IF ($~AI)oLCOo) Go TO 70XPO=HL~ !Ks J) *LxP(PALAM(K*J)*TP (N))
COFF=AL~ (K*J;/DFLT(N)/ALAM(K-J) **ZXPOl~L.-LAP (-ALhM(K.J! *HAUT(N))XP02=1.-!.AP (-ALAMIK!J) *OELT(N))
XPn3~tX;’ (-flLAM(K9J) 0(TiN)-@tLT(N)/2.))FXP(N)=FXP (N)+COFF*XPO1 *XP02*~03
GO TU 8nTEMP=ALAM (<,J)*TP(N)
IF (AtsS(T~<P) oGT.hOO) GU TO HoFxP(NI=I xP(N)*ALP(K,J) *~xP(-TEMP)CONTINUkcclNTINuLwRITL (N(JUT*21(I) (N.TP(N) sFXP(NISN=l $NK)
TEST ?u~ ~OINl OLVIATIUN ANn sL(IPL HEVEHSAI..
NFLG=uLFLG=UNKl=!wh-I
wRITE lNOUTo130) K
D(I lAU N=d,NKl
IF (FAP(N),GToo.1 GO TO 100
NFLG=mPLLjil
GO TU 110CONTINUEIF (F A~(N-l) OLE.O.O.OR.FXP (N*l).LL.o.o) 60 TO lln
AVLG=l ALOG(FXP (N-l) )*ALUG (PXp(N*l))l/2.oFAvG=LY.P(AVLGI
Ff)lF=AuS ((FXP(N)-FAVG) /~XPIN))
FIN 210FIN ?20FIN 730
FIN 740
FIN ?50FIN ?f,r)
FIN ?70FIN ?doFIN ?90
FIN 300FIN 310FIN 320FIN 330FIN 74f3
FIN 350FIN 7b0FIN q’/oFIN 381)
FIN 39t)
FIN 400FIN 410FIN /,20FIN 430FIN Jb40FIN 450FIN 460FIN &70FIN 480FIN 490FltJ 600FIN SloFIN 620;;; 530
%40FIN <50FIN 5boF I N 670FIN q8cJFIN 590FIN 600FIN hlf)FIN h~I)FIN 630~IPJ 640FIN f>!lfl
FIN 660FIN 670
FIN 680FIN h90FIN 701J
FIN 710PIN 720Flru 730
FIN 7+0FIN 750
FIN 76!lFIN 770FIN 780FIN 799FIN ROO
FIN 810
FIN R2nFIN R311
FIN 1340FIN U50FIN Rho
FIN R70FIN RbO
81
TF (ru IF. yF. l*o) lFLG=L~LG*l FIN R90IF (rul}. GE. l.o) wRITE lNUUT~23n) N FIN Qoo
IF [tul~.oF.O.1) WRITE (NOUT$22n) NsFDIF FIN 910
IF (r AP~N).GT.FXP (N-1)) UNITE (NOUT*1601 N FIN Qzo
lltl CONTLNuL FIN 930
IF (rAP(ll,LE.o.) NFLG=NFLG*l
IF (rAP(Nfi).LE.O.) NFL~=NFLG*l
FIN Q40
FIN Q’JO
IF (NFL(~.LO.01 GU TO l~u FIN 9ho
kI?TTL (IIOIJT*240) NFLG FIN QIO
.RF TURN FIN ~tio
120 CONTLNUL FIN ~91-1
IF (1-PL~.t-f3.0) Go TO 1~(1 FIN 1000WRITt .(NOIJTJ250) LFLG FIN Inlo
130 CONTiNULNK=l-NK
FIN I(I2O
FIN in-i(l
c CALL rLOTM (Tp9FXP9r~K$-l*O?O!Oan~ 10UolOOtTl s30sX1.S?OsYL9 10) FIN 10+0
cc CALL rLOT~ (T*FX$-ITSPo-10-19-47t0, $1.0* 1.UsTI*3n,xL~?o, YL*lU) FIN lnbl)
RETUIXN FIN ln60
c FIN ~fl?l)
140 FORMUI (ltioslMH PLOTS cuT AT TP =lpE12.59215H sEc 4S PoINl LIMIT KLFxN 1080
lACHEU.) FIN 109I)
150 FORMA! (33I+O POTNT OEvIATIoN cHrCK FoR 6NouPo13//%IH NOTE - uNLY vFIN llofi
1ALUE3 GKEATER THAN TEN PERCENT FoLLoI’f) FIN 1110
16n FOUMAI (311Ho FUNCTION RISING AT POINT NO..13) FIN 1]20~7n FCIRMMl (23HFINE CHECK ~UR GROUP NO. c12) FIN 1130
lRO FOQMAI (2bti FINF cHEcK FOR GROUP No, $12) FIN 1140lqn FORMAI (~ljti TIME IN S~CUNOS ) FIN ~l!Jo
2nn FOI?MAI (lUH F%(I) ) FIN l16n
Zlfl FORMAI (4 (?X014,2X$F10.3.~X, E1O.3]) FIN 11/0
2?n Ff)RMAl (1’~HO AT POINT NIIMHF.R ,13*13H FOIF = 9F6.3) FIN 118(3
23n FnQMAI 1221i0 CHLCK POl\~T NUMflE* s13) FIN 119024~ FOI?MMI (ldyo IHFHE ARE S13,30H NEb FXP vALdtS. FIT NO GOOD.) FIN l?IJO
2%() FOQMAI I?lHO ~IT ~ATHFR PUOR AT ,13,21H PnLNTso cHECK PLOT.) FIN l?ln
FNn FIN 1?20
cc
cccc
cc
ccc
c
ccc
SUHRUUTINL PULSFIT LKKF) @UL
PULTHIS ROUTINE PROVIDFS A SINGIE PARAMETER FIT FOR A CUM131NAT1UN PUL
OF LINLAR FUNCTIUNS OF THF FORM ‘- F-UL
PUL
rA(T)=SISUM+ALPHA (K) #txP(-ALAMDA(K)*T( l))tsUM OVtN K=l,~!~M, PuLTIIE NUqHER UF TERMS USED To UEPRESLNT FX. PUL
PULGIvEN A SLT O} ALA~DAS*(SLE COMMENTS BELOW) *THIS RnuTINE SOLvkS PuL
FOR MLHPAS. PUL
IT Is AUVISAHLE 10 MAKk A SINGL} PARAMLTLR IIT WITH PIILSFIT DEFOMLPULMAKING A lwU PARAMETER ~IT wITH SIFPITC VIJL
j>lJ L
COMMVN /pdLSIN/ ALAMDA(50)$ FX(,JOU)9 T(401)s KTKM, ITSP, IPRuB* PUL
1 NTNs NUU1 PUL
COMMUN /PdLSCAL/ A(50t50)? H(50c11 PUL
CfIMMUN /PdLSOUT/ ALPHA FXC(1OO)! PCT(1OO) PUL
cOMMUN /MANJI/ W(loo)j 11TL(8)* KTK(50)J NS(10)$ KKN(25)Q DIhLxM PUL
COMMuN /FINRAu/ IRAD, NCONs9 NADT(200)~ UELT(200) PUL
OIMENaIUN KCAL(71)
ITs=L
PULPUL
IPRO=KKF PUL
RFAD ININ$?30) LWTtNOKcKTRMtIPRT PUL~UL
LwT=nl FCN UESIQL[),=n~W=l~=l~w=l /FX*X2sW=l/FX*~2.z3$W=1/FX**l .s. PUL
NOK=PLA6 FrIR ALAMDA PfiU2MLTt’$~ SFLtCTIoN P(JL
UTRM=NO. OF ALA~UbS USt-U IN FIT. PULNUK=O?K TRN=KIRVQREAO (ALAMUd (K)*K=lsKTHM} s THTS OPTION ~ul.
U3EIJ FON INTTIAL II~~UT ~FOR LXAMPLE$TwLJ ALAMnA% PLR TIMk PUL
ut~Jl@ -- 1.0*o.%9~:l *o*05*Qoul *o*ofJ~*~rc* PULIYuKxl!KT~M=ItALAM~A~ CAL CULLTLI) FROM SLUPES AT EVERY pAl~ PIJL
ut P(JINTS, PUL
10203040
5060
7080
9n
100
110
1211
130140
150
16rI
170
180
190
?O(l?10?20?3n?40
?5n
?bfl?70?80?91)
3U0310
82
cc
c
cc
c
ccc
c
!~uK=l,KrRM=K.TU~.REAU IN (KCAL(Ll !L=2tKlKM)(lZIA) *WHICH SLLEC!>PULlnUSE POINTS Tn HE uSLO IN THL CALCULATION Or THE ALAMnA>. ou~
~ult. -- KLAL ALSO U>ELJ TO ELIMINATE UNWANTED PARAMETEQ% lN PUL
>UU$EUIJLNT QUNS. SLE HFLOW. PUL(wuK=~*KTi4M=l,REA[) KIRM(55X*T11) ANO H(A*]), A( AM[)A(K),K=l$KTRM PUL
(u(K,l)=ALPHA(K)) (b~ll.4) fNU~l PNEVIUIJ~ PROHLEM. TdIS u~lIoN PUL1> l.JSLn WHEN FTT FOR THIS G~(JUP IS NOW HEING DONE IN STtPIT. PUL
IPRT=ljPRINT A-MATQIX,=OSNO PRIATQ ~ul-
NOTE --- BYPASS IW~NT READ J3t-LOii If N~K=?o PUL
IF (NUK,NLo2) G(l TCI loPULPUL
RFA(I (NIN?7501 KTRv pUL
READ (N1N$?60) (tJ(K, l),ALAMDA(K)sK=l sKTNM) PUL
RFTuHN PULIII CONTINUL PUL
IF (NuK.LL,O) GO TO 60 PULc KTRM IS N(J OF INPIIT ALAMOAS,ITsP IS NO OF IIME STEPS USED IN ~IT. PUL-.cc L.OCJp IU CALCuLATL ALAMoA FOR SELECTED sTEP~.c
NOK=L ISP
DO 2U L=l$NOKKCALIL)=L
20 CnNTINuEIF (n(R!!,lin.11 GO TO 30
KCAL(lI=IREAD lNIN$730) (KCAL(L)SL=?OKIRM)
3n Cf2NTlNUL
IF (LoL~.aO) GO TO 40WI?TTL (IJOIJT*22(T) L
sTnP4n CONTLNUL
IF (RIRM.GT.?) KTRM=KTMM-1IF (nlk!M.cQ,lJ KTRq=NfTK-lAL4MJJJ!(l)=l/T(l)@lo5Do FU K=ItKTRM
KI=KLAL(K)K?=KLAL(K”l )TST=(1(K2)-T(K]))
IF (IST.EJ.O.0) 60 To 50ALAMuA(K.l )=ALOGIFX(K1 )/FX(K?))/(T(K2)-T(Kl) )
K+l).LE.o.) ALAMnA(K. l)=ALAMuA(K) /2.
1) .LF.ALAMLJA(2)) ALA*OA( I}=ALAMUA(?)*> ,
1) .6T. (ALAMUA(?I*?.)) ALAMOA(l)=ALAunfi (?)~2,,
KTKM)oGT.(1./T(ITSp) )) ALAMUA(K IRM)S1.<T(ITSP)
All CCJNTLNUL
RFAD .(N1N!Z40) (ALAMDA (K)$K=l$KTRM)
70 CONTINUL
cc SFLEGI ALAMOAS WANTFO.EO.G. LEAVF OUT ONE op. A ISJ~LTCATEO pAl~Oc IwANI=NO. OF nLAMOAS KCPTO SET=O IF ALL ARc KEp~.
c KcAL(L)=ALAMofIs wANTEr3~ NOTE - IwANT USUALLY SET TO ZEQO ON
c INITIAL RUNs,Al~i3 KCAL(L) NOT READ.
c ALSO NOTE “-- IHTS INPijT NLtDED FOR EACH SEUMENT.
cRFAD iN1Nt?30) ;WANTO(KCAL IL)~L=lOXWANT)
IF (LwA(J1.LE.0)DO 8U L=l,IWANT
LL=KbAL(LlALPHAIL)=ALAMUA
f10 CONT~NULKTQM=lWANIDO 9U K=l;KTRM
ALAMuA(K)=ALPMAQfi C(3NTANUL
100 CONT$NUk
GO TO lUO
LL)
K)
3203,40
~4fJ
350
7tiojrl)
380
~’Jo
400
410
41?0.430440
450
4606?0480
PUL 49QPUL 500pUL 510PUL ‘G21-JPUL 63a?UL 640
PUL KboPUL 660PIJL %/0PIJL 6H0PuL 59iJP(JL 600PIJL 6A0P(JL 4>20PIIL 63nP(JL 640VuL 650PUL 6611PUL 610PUL 68nPUL 690@uL 700PUL ?10P~JL 7.?0PUL 730PUL 7404(11. 75(JP(JL 760#uL 710pUL 7dflP(JL 790
PUL RooPULPLJL
PULPUL
P(JL
pULPUL?UL
pUL9LJLPULPULPULPtJLpuL
Pul-PULPuLPUL
PUL
Alfl
820
R30
$40950
Q60RIOCJA()Ja90
QooQlo
920Q30’34095n960Q70
‘aJ30990
1000
83
c PUL 1010
c WRITC OUT INPUT FoR DEUUG PLIL ln~~
lfl?ITL .(NOUT~2~o) (K9ALAmDA (K) sKcAL(K)tKCAL (K*l)~KxltKTRW) #UL lo31)
WQITC (NO+Ts~80) (I tT(1)9Fx (1)91=1$1T5P) PuL ln+n
00 Iiu I=l,IT~P PUL 1050
W(I)=IO/FX(1)~02 PUL 1060
IF (LwT.Ea.3) w(I)=l./FX(I)**l.% PuL lnTO
IF ILwT.EQ.1) wII)=10/~.x(II PUL lodll
IF (LW1.LL.LJ) W(I)=l. PUL 1090
11o CONTINut puL 1100
WRITL (NL)dTs290] LwT puL 1110
c PUL 11~(1
c CALCULATk R MATRIx PUL 1~30
c PUL 1140
DO 1*u K=l,KTRM PUL 1150
H(Kol)=o. Pul_ 1]60
DO ~JU ?=l, ITSP PUL 1]711
IF (LRAU.LE.0) GO” TO 120 PUL IIdO
XDl=LAP (-~LAMnA(K)*RA13T [I)) puL 1190
XP?=LAP (-ALAMUA(K)*DELT (I)) PUL 1?00
XP3=LAP [-AL4MOA(K)*(T (J)-uELT(I)/2.)) PUL 1?10
B(Ktl)=Hlfi,,l)+FX(I)*l./DELT (l)/ilLAMDA(K)**Z*(l.-%PI )*(1.-XP2)*XPJ PUL 1?20
ll?(l
130140
c
cc
]%n
160
17nlRfi
l.q n
cc
c
20021f)
c
GO TU 130CONTIINuEB(Ksl]=H (K*l)+FX(!)*EXP (-ALAMOA (K)@T(I))*W(I)
CONTINULCONTIIWE
CALCuLATE A MATRIX
DO ]=u l=i,KTHM
no 13u J=1oKTNM
A(T,dJ=fl.cnNTl!vUtDO lYU K=l,KTRM
A1-hhi=ALAMu4(K)
00 10U L=l,KTRMDnlfu I=l,ITSP
IF (iHAU.LEOO) GO TO 16UXPf)l=l .-EAP(-ALAMITA(K) “HAIJT(I))XP02=l.-EX~ (-ALAMDA(L) dRAIJT(I))
XPn3=10-EAP (-ALAMOA(K)UUELT (1))XP04=l.-EXP [-ALAMDA(L)~UELT (1))XPO%=LXP (-ALAMOA(K)*(T (1)-DELT(I)/2.)1XPn6~LXp (-ALAMDA(L)*(T (1)-OELT(Tl/2.J)
COFF=l.10~LT (1)/ALAMl)A(K)**2.COFT=l./ULLT(l]/ALdML)A [L)**2A(KsL)=A (K*L)”CO~F*COFT*XPOl *XPn2*Xp03*XPOID*XP050XP06*W (I)GO TU 170
coNT1lwhA(K,I-) =LxP(-(ALAM*ALAMuA (L) )*T(I)) *W(I) *A(K9L)coWTAIVuk
cnNTLlvuECovTllvUt
PRyNl A MATRIX
IF (1PNT.L101) GO TO 210WI?ITL (NOUTS300) TPPOR
DO 2UU K=l,KT~MWI?ITL (NOUT,31O) (A(K,L)~L=loKTRMlCoNTAINukCONT&NUk.WQTTL (NlJUTo320) 7SRr)RWRfTL (NOUTS31O) (f3(l(, l)oK=19KTQM)
S(JFIRUUTINE LSS SULVES THE SET OF LINEAR LQuATIoN’3 AAXR
CALL LSS (KTRM, I!50QA,B90$DET)
WQTTL (NOUTt3ZO) IPROq
pUL 1230pUL 1?41YpUL 1?>0pUL 1?60PUL 121il
PUL l?#O~lJL l?qf)
‘~L 1300
‘UL 1310~uL 1320PUL 1730
puL 1340‘UL 13b0PUL 1?60plJL 13?0UIJL 17A(I
~uL 1390puL 1400”
puL 1410FUL 1420
pUL 1430PUL 1640pUL 1450PUL 1460PUL 141OPUL 14d0
PUL 14~0PUL 1500
PLJL 151OPIJL 1~~~
PUL 1530P(JL ]540PUL lqbn
PuL 1560pUL 1%70PUL Iridn?~L l%~iT
PuL ]600PuL 1610
pUL 1620puL 1630
PUL 1640PUL 16’50
PUL 1660puL 1670PUL lhdl)
Pul- ]690
84
WPITC (NOJT~31()) (R(KC1)*K=lSKTPM) PUL 1700
L=I’I ~ul- j7iocALL 5LFFIT (lPROOL)RFTUnN
pUL 1720PUL 1730
c PUL ~740270 FOQMMr [1111,45H ONLY FIFTY TERMS ALLOWEO AN FIT. YOU WANT 13) pUL 1750ZIO FORMRI (ld16) PUL 1760240 FOPMAI (3[11X!E]1,4)) PUL 17?02%0 F’OQMAI (5>X!11~) UuL 17ijo
26(I Ff)RMAl (lP$Ell,/J) PUL 1790270 FO~MAl (3d K=913911H ALAMUA( K)=,1PE12.!509H KCAL(K)zo13,11H KLAL(K+~UL ]1300
ll)=*lJ)2Q0 FOQMAI (4d I=,T3,6H T(1)=,1PE12.5,7H FX(1)=,1PE12.5)290 FOQMAI [lIi0,6fi LwT=,13)300 FOL?MUI [16Ho A-MATRIX ~OR 916)~ln FOQMM1 (2X,1OL1?.3)
3?0 FORMAI (l~HO H-MATRIX ~ONO16)
ENfl
SUQRUUTIAI~ SELFIT (IP9L?)
c
c ROljTINt COkiPAl?ES FIT WL,lH ORIGIFJAL vAl,.UEs.
c
COMMuN /P~LsIN/ ALAMDAlbo)o Fx(?ou), T(401~c KTRM, ITSP, IP~UMt1 NINS PJUU1
10
20
3Q
6Q
50
CnMMul~ /P~LSCAL/ A(50950)0 R(SO,lIcOt-iMuN /PdLSOYT1 ALPHA(5o), FXCf100)9 pCT13kF(100)
cOMMUN /Fi,NRAu/ Il+&ll* NuoKS, ~Al)T(200)* DELT(200)nTMEw>Inh TII1O)* XL(lO)_O YL(IO)
00 3U l=]j ITSUPcT1.)lr([]=tl.FxC{A)=O.o() .2u K=I*uIRM
IF (l-ALAqnA (K) *TlT))CGT,300.) ALAMOA(K)=-3UoO0/TII)IF (AwAO.LE.0) GO To 10
Cr)FF=u(K)/DELl (T)/ALAMUA(K)6*2XPnl-l.-EAP (-&LAMOA(K) *HAUT(I))XPn2=l.-EkD (-ALAMDA(K) *UELT(I) )
XP03=LAJ (-4LAMOA(KI*(T (1)-OELT(I)/2.))
Fxc(L)=FXC (I )*CoPFQXPOl*XPO?*xpn3
GO TU i?flCONTLWUCFXC(l)=FXC (I)*B(K1OEXP (-ALAMOA(K)*T(I))
ALPt4AlA) =~(K)*EXP(-ALAMOA (lo*T(I))
cgNTINUEPCTI)JF (I)=(FX(I)-FXC (1))/FX(I)*
IF (LP.LE.n) SO TQ 30WRTTL (NOUT090) 1sT(I)WRITG (NO<T?1OO) (K~ALPHA(K)!K=’CONTANUL
IPRo=lPWRYTL (NoUTollO) IPRO
000
!I(TRM)
WR~TL (NOUT~120) (19T(I) sFX(I)~FXC (I} OpcTOIF (I)~I=IsITSP)Fl!-fs=u.
00 4U I=lsITSPl?Ms=NMs.PCTDl~ (1)*92
CONTINUL
RMs=nMs**o.5WP7TL (NOUT0130) RMS
AR1=u.AR?=U.00 su l=2tITSPAR1=AK1+ (FX(I)+FX(I-1) )/2.o*[T(I)-T(I-11)
AR7=MKZ* (FXCll)*fXClI-1) )/2.0*lT(l)-T(l-1))
cONTINUtAPOIP=(AtfA-AR2)/ARl*100 ●
WRITG (NoUTt1401 AR1$AK2$AR(’)IF
?uL 1810pUL 18/0PIJL 1R30PUL 1$740PuL )R51)
PUL lRtIOPUL ]F!7fl
SkE
SEt
SEE
SklzSEL
SEEStkSEEsk~SLk
sEt
~LESLLSLL
SLESEEskLSLEstE
SEE
skE
SEESEESEE
SEE
SEESEE
SEESEESEE
SlikSEE
SEE’SEESLE
SEESLESLE
SEESEESEE
SEESEESCESEESEESEESEE
10i?!)30
*O>060708090
\oo110l??,]130]4015016017rlltio190
?00
?10?20230?40
?50?60p70280
p90
300
310320330
340
350360
370
380390/+00
410420430
440450660
470
85
FXMIN=FX(l)DO 6U I=l!ITSPIF IPA(I).LE.O.0) FX(I)=FX(I-l)/lO.
IF (tA(7)*LT.FXMIN) FxM~N=Fx(I)60 CONTANUE
DO 7U I=lsITSP
IF (rAcfI).LT~FXMIN) Fx$(I)=FxMIN70 CONTANUC
ENCOUL (4U01509T1(1))
ENCOUL (lO*l~O*XL(l))ENCOIJL (IU,17u,YL(I))ITS=IISP
1s=1IF ([Px(l)/FX(ITSP-I))OLTO 1000) GO TO 80ITS=-lTSP
SEESLESEL
SLESEESEE
sEESEESEE
SLESELSEE
SEEskESEE
ISX-L80 CONTINUE
SEESEE
c CALL rLOTM (T$FX!ITS~ ISOO!OtOOtl.0 1. wTIt40JXLo10 tYL$10) SEE
c CALL PLuTM (T~FXCQITS*~=~-lS-47SO~ cl*oIc$TLoQooxLolO~yL~ 10)RFTUnN
SEESEE
c SEE
90 FrJRMAl (18H TERMS FOR STEP Q1398H T(I) = olpEl>.q) SEE
lrJO FnQM*l (6(2X? X302XtlPE10.3)) SLt
lln FORMAI (107H1 STLP NO. TIME uRIGINAL VALUE CUMPufSEE
IEO V$iLUE PENcENT oIFFtRLNCE IPRnt3=,131 SEE
l?n FORMMI (Ib,lP4FltJ.5) SLt
l?o FORMMI (?lHo RonT-M~AN-sQuARE=lPElz.5) SEE
l~fl FORM*I (lJHO (JRIG INT =,lPt1295$14ti FITTLU IN[= sIPE1?.5*15H p~~st-t
lCENT ul~F =sIPEl~.5) SEE
lso FORMNI (*OHCOMPANISON UF C)RIGIN4L WITH FITILO DATA.) SEE
16n FORMA1 (lOH~IME(SEC) )
170 FORMMI (lUII FxII) )
SEESLL
ENO SEE
SURRUUTINE PCNO(JT (LXX) PCH
c PcH
c ROIJ71NE PgNcHEs 01J7 PARAMETERS IN ENOF-LIKL FONt4A7. PCH
c PCH
COMMUN /pJLSIN,’”ALAMOA(sO)* FX(i?oo)* T(401JQ KTRM, IlsPt IPtiUtJt PCH
1 NTN, NOUi Pctl
COMMUN /PjLSDAT/ NOT, EtJ(25)s Gx(k!5~40010 l~tRG~ ALF(25s50)s ALAM(~pCH
680490
5(JO510%20%30540
550560
570qdllq90600610620h30640
650IS611A70680690700
710
72n730
74rJ
7507b07rlj
7do790
800
102030405060
1 5,5U)COMMUN /M~NI/ TC(1OO)S TITL(8)s KTR(50)t N~(lO)* KKN(?5)~ DIPLIMCOMMuN /EN~F/ MAT, MF9 MTs RUNTIM~ NPUNDIME1w310N F(10), P(lolt L(10), 1.XX(20)
NPuN= I
ClsnoNIII.=UNS:QU1WRITE (NOuT930) (TITL(I) cI=lt7),MAT~MF ,MToNSEQ
WRTTC INPUN03U) lTITL(l) ~I=lt7)QMAT*MFtNT cNSE12—NSE(lZNSEQ~IWRTTC (NodTs40,) CItCl,NuL9NULsN(11.*NERGoMATOMF~ M~,NSEU
WRTTL lNPyN~4U) CIoCloNUL*NULoNt)LsNERG*”MAT!MF oMl,NsEfJDO 2U K=1sKJER6NPX=nlR(K)LPX=LAX(K)
ER1=LL$(K)EB?=cu(K*l)CALL LX~P IEB1,F( l),P(l) *L(I))CALL cx~P (EBLsF(2) oP(2)cL(2))NSEQ=NSLQ*IwRIT= (NOLJTS50) ((F(I) sP(I)sL(I)91=l t2)sNULsNULsNULoK9MATOMF ~MT
1 ,NSLU)WRITL (NPLJAJt50) l(F(IIop(I )tLfI)oI=l t2)oNULsNULPN1JL0K.MATCMF SMT
1 ,NSLLJ)ERI=I (l)ER?=I ILPX)
PCH 7(’IPcli 80
PCH 90PCH 100PCH 110PcIi 120PCH 130PCH ~40PCH 150Pcti 160Pcu ~11)PcH 180PCH 190Pcu ?00PCH ?10Pet’i ?20PCH ?30
Pcn ?40
PCH ?50PCH ?60Pcfl ?70Pctl ?80PCH ?90PcH 300Pcti 310PCH “ai!oPCH -?30
86
C4LL LxFP (E8AcF( 1)!P(1),L(1)) PCH
CALL LAFP (EP2,F(2),P (2),L(?)) Qcn
NSEQZIXSLQ{!l PCH
WRTTS (flo~T,501 ((F (I) sP(I)~L(I)sI=l.2) *NUkONUL9NUL$NpX*MAT~M~ ~M! ‘CH
1 ,Nscb) Pcll
WRITt (NPJN,5U) ((F II )*P(Il,L (I )sI=l?21sNuk~NuL ~NIJLONpX*MAT $M~~M! ‘Cti
1 ,NSLUI Pcti
ALF(h.NPX*l)=O. Pcti
A1.F(n$N~’X*71=U. PCH
ALhMl~*’f9A*lj=f). P(..i
ALAw(r. ~NPA*2)=(). P1:4
J]=l Pet’i
10 CONTLIMUE Pcti
EI=ALF(K,JII Pcfi
E?=AI.?(KsJI*l) PcH
E2=AL? (~sJl+?) Pcli
FXI=ALAM(6,J11 PCH
Fx2=*LAM(fi,Jl*l) PCH
Fx7=MLAMIK*J1*2) Pcli
N5FQ=tiSkQ*I P(H
C&I.L LxPP !El*F(l)sP(l)*L(l)~ ~cH
CfiLL La?P (Fxl*F(2),P (210L(2)) Pzq
C.ALL Lx~P (EZ!F(3) tP[3J?L(3)) Pctf
CALL LxFP (FxZ~F(4),P (4J,L(4)) PCn
CALL CA~P fE3$F(b),P (5) *L(S)) Pct4
CALL LA~p (FX3?F(6),P (6) OL(61) Pcli
WQITG (.,oUTf6LJ) (F (I ),P(I)*L(I), I=1*6) 9MAT~f4Fo~10NSE~ Pcti
WRITL INPUN,60) (F (I )*P(I)9L(I)c1=I *6) tMAT*MFsM~,NSEQ iJctl
TF ((.)I*?).6E.NPx) GO TIJ .?n Pcti
J1sJI*3 PCH
GO TU 10 Pcl+
%0 coNTll~u~ Pcti
MllTl=u Pcu
MFI=u Pcli
MTI=U (JCH
MEND=-1 PCM
NSFQ~iNSEQ*l PCH
WR:TL (NOUT97U) MAT,MFcMT1?NSEQ PCH
WRITC (NPUN*70) MAT,MF$MT1*NSEQ Pcti
N5FQ=NSEQ+I Pcli
WRITL (NOUTt7U) MATsMF!~MTl*NSEIl Pcli
WRITL (NP$JNt70) MAT~MFloMTl~NSEO PCH
NSEQ=IWSEQ*l PCH
wPITc (NOUT*70) MATl~MFlsMTl$NSFQ Pcd
WRITL (NP<N*701 MATl~MFA ~MT1.$NSFLl PCn
WRTTC (NO:TS7U) MEVD PCH
WQITL (NiJLJNJ7fI] MENO PCH
STflp Pcn
c Pcti
30 FORM~l (b~lo*A6t14t12s13t15) Pcti
Go Fnt2MAT (l~2E11,5*4111, 1*o120 13s151 ?Cri
50 Fm?MMl (2 iF9.~,Al, 12),4111,14t I?s13s15) Pctl
AO Fflf?MAl (6(F8.59A1*I?)*1491?$13! 15) Pcti
7(I FORf4Al (bbX*I@,~2*13t15) Pcti
ENP PCH
i CONVLuT X FOR PUl~CdING *CAF
c X - PLOAT1N6 pOINT NUMtit-R = F*ln.O**N *cXF
c ~ - u~qg9~95 LE F LT 9e~9Y995 *cXF
c aAGN (HOLLERITII + ON -) OF EXPONENT cXF
c N- LApoNkf.JT *cXFr *OO**V****@V****ou*{}**@*@***O**O**************~***O***************CAF
10.?0304050
6070
af)
90
87
F=n*u cXF 100
5=5P CXF 110
N=n CXF 120
QF711mN CXF ]30
In N=ALuulo(ARs(X)) cxf- 14n
IF (a”S(X)C1.0) 40,~(),20 c.) l>n
20 FzX/AUOO~*N CA} 100
s=~P CXF 1 ?0
IF (KuslF)-9.999995) 70*30Q30 CAF Id,)
30 F=F/iUO’l c~f 190
N=N*l CXF ?00
60 Tu ~0 cXF ?11)
40 N=l-1~ CXF 220
F=x*lu,o*@N CXF ?.3fl
s=~M cAF ?411
IF (Abs(F)-9,999995) 7o050050 CXF 7’JO
%0 F=F/lu.O CXF 76a
N=N-l Cxt ?rll
IF (N] 60s60~~0
An S=sP
CA} ?Ao
CXF ?911
70 CIINTLNUt cXF 300
RETURN CXF 310
ENn cXF 720
SUnRUuTINL LSS (N,voIcA~RcO*DET) LSS
DIMEIxsIUN A(I$N), 9(I,M), COM2(%)? cOM3(5)! ()(N) LSS 10
f)OURLt <1* S2* 130TpR0 LSS Zn
nATA [CUM2(J)*J=1,5) /5(lHLSS SINGULAR SYSTtM. INPIIT DESTitOYtU. N l-ss 30
lx / LsS 40
DATA 1COM3(J19J=lt5) /bOHLSS CALLtO WIIH N.LE.O nR N.GT.1* NLSS bo
lx / Lbs bll
c LSS 7n
c LIQM~LJ IS ONLY FOR LASL STATISTICS L5s dn
c CALL LIBMSG (loH R LSS ) LS5 90
c 10 Pul NE~SAGL IN SYSTEM DAYFILF L5S 100
c Lss 110NM=N LSS 12n
IF (NN.LEOO.OR.NN.OTo I) GO TO 140
14MXM
I.ss 130LSS ~40
SN=l ● LSS 150
DO Qu J=lsNN Lss 160
L=J-1 LSS 1 ?n
IF fJ.(iu,NN) b(l TO 70 LSS 18nT=ABs(A(J$J)) LSS 190
M1=J Lss ?00
M?=J*J LSS 210
DO lU K=M2,NN LSS 720
x=AB3[A(K)J)] LSS ?30
IF (AoLC.T) GO TO 10 LSS ?40
Tzx LSS 250
Ml=l( LSS ?60
10 CONTINUE LSS ?70
IF (IIL.k(JoJ) GO To 40 LSS >do
DO 2U K=ltNN LSS ?90
T=A(JsK) LSS aon
A(J,A)=A(M1*KI LSS -+ln
2TI A(M1*K)=TsN=-3N
LSS 0320LSS ?30
IF (MM.LEoo) GO TO 40 LSS 340
DO 3U I(=l*MM L5S 750
T=R(JcK) LSS 360
R(Jsm)=N(MI!K)3n Fl(Ml!N)=T
LS5 ?70LSS 3d0
4TI IF (M(J*J).EfJoo.) GO lo 130 LSS 390
DO 6U K=M2,NN LSS Lon
!jI=rj.
S?=O*
LSS 410
IF (L.LU,U) GU TU 50
LSS 42nl-s\ /,Ju
SI=DUIPNO IL*A(J,lIII*A (loK) *I) Lh!j 44n
88
A(J~n)=(A(JtK)-Si)/A (J*J)
S?=OUIPRO iJ$A(K,l),ItA (loM2),l)A(K*N<)=A(K,Md) -S?IF (PIM,I-E.0) b~ TO qO
IF (M(J,J).EQ.o.) GO T() 130oo RU K=l!MM
S1=O*IF (L.LQ.U) Go TO Rfl
S1=OUIPRU I[.!A(J,l)*I*B (loK) $1)FJ(,J,R)=(h(:j*K)-Sl)/A( JSJ)cOAITJNU~
oFT=~(l*l)*SNIF (ULI.LJOOO) GO TO lJO
IF (N.EQ.1) GO 10 150
00 luu J=d,NNI)ET=uLT*A(J.*J)
IF (ULT.Ed.0,), 60 To 130r~ lMM.~(!.O\ 60 lo l~fI
M3=Nfw-1
On lcu J=l,MM
nfl 110 L=AtM3
M1=NN-LSIso.M2=Mi*iK=NN-f.lZ*l
sl=DuIPHO (KSA(M1OM2),I *B(M2,J)sI)B($41!JI =B(M1*J)-SI
CONT*NUtGn TU 1<0
cALL LAHR1 (I$COM?$N)
I)FT=U.
GO TU lboCAIJ. LABRT (1?COM3SN)
oET=U.RETURN
Lss 450LSS 660Lss 470
LSS 480LSS 490LSS %00LSS 610LS’i %20LSS 5.3 [)LsS 54nLss 550LSS %bl)(.ss 6?0LSS %Ro
LSS %90
LSS 600
LSS 610LSS 620LS5 630
LSS 640LSS 650LSS 660LSS 670LSS 680LSS 690LSS 700LSs 710LsS 720LSS 730
LSS 740L!JS 7’JO
Lss 700L5S 710LSS 780LSS 790
ENll LSS Roo
*iOT*DOTPRU* IS A FURTNAN CoMPArIHLE FUNcTION-TYPE SU@PROGUAM UOOT
*OUT
CALLTNO bE(JUENCL z = IJoTPRO(N, A, Ix, Y, IY) *DOT*L)OT
titlE:~-x- &No ‘Y- ARE RtAL VEcT(JUS EACU cONIAING *DOT
-tJ- ELEMENTS, DOT-lx- ANO ‘IY- ARE TtIE SPACINti fjETWFEtJ Sl)CCESSIvL 9L)UT
ELENENTS OF ‘X- AND ..Y- 14ESPEcTIVLLY *I)OT*OOT
THE RE~uLT NETuRNEU aY *UUTrRO* IS THE INNtR ~~OOuCT (XQY) OF !~k ’001
VkclnRS -X- ANQ ‘y-. I.E. THE suM OF A(I)*Y(T) FOR 1=1 lo N*OOTSbui
fHr QESULT IS 00UBLk P14EcTSION BLIT Wll I at U$E!~ AS 3L ;~-~ +00 r
PRECISION UNLESS ‘ouTPFIOO IS OLCLANCO TO dF nOIJ~lLE fl~ol
PNECISIIJN lN THE CALLING pROGRAMo *l)or*DO r
TtiE RESULT IS ZERIJ IF N = O* lNFINITL IF N .LT. O *DOT*uor
4151617181
91101
111121131141151101I?l181191?01?11?21
89
t40n
Tw(l
d],HU,FINISHUl)tin
kinonu.LuoP
UPPLR PRuD X*Y 00 r
Our
LOWtR PROI) XrY l)OT
FETcH NEXT ELEMENT up -x- IIOT
OUTFETcH NEXT ELEMENT OF -y- 00 r
Do r
DOTDo r
DO r
Do r
DO rUPPLR PROD XSY 00 T
00 TLOWLR PROD X*Y 00 r
FETcH NEXT ELEMENT UP -X- DO r
DOT
FETCH NExT ELEMENT OF -Y- UOT[)0 T
OUTDECREMENT LLEMENT COUNTER RI D(ll
DorourDOT
LOUP BACK IF MORE TIIAN P ELEMLNTS sTiLL 00TREMLIN TO HE PFi(lcESSFfj W 1
BRANcH IF LAST 2 LLtMENTS A~.I?LADY PQUGkSSLOOUr~El?(J oUT -IX- ANO -lY- F(JW ?NU SEr (lt 00 r
FETCHES TO ELIMINAIE ACrF’5S OIJT of HANGL DOTLOOP BACN TO PRUCES3 LAST ? ELEMENTS 01) r
90
Iwt.
t \J
zkf?~ LI3A ?MAb
CLI
IN~ MAT
mA6
LL’
tN()
ti~.tit,NunL$II,AU,[.:JOP
ti}!Hn, TN1’Ido
o
dn9Ru,f)oTPRo
11
i3fi9fllJ,DUTPR0
BR4NCW XL -tJ- .tu, 1t!QANcH lo PQOCF5S 2 LLFME?lTSHRANCH IL -tJ- .LT. O
IF N = II
NE5ULT = ZEROFIETUNN TO CALLING PROGRAM
IF N .LT. 1)RESULT = INFINIT&
NETUHN TO CALLING PROGRAM
SURRUUTINL LAURT (ISW,LEOLCINX)DIMENsION LHOL(5)Lf)GILAL PS9 T>
IF (( lSw.Lr200J .OFf. (ISW.GT.5) ) RFTURNGO TU (10?20,30,40950)9 ISWOATA NP /10/$ PS /.TRuEo/s 7s /.FALsE.Y
10 IF (rs.Al*O. (NP.Gl.o)) PRINT 60, LHOL*INXND=Nr-1
IF (1>) S1OPRFTUMN
?rI Ps=.~ALSE,
RFTuflN
30 Ps=. lliut.NP=INARETUm,y
4fI TS=. IKUL.RFTUNN
5n TS=.rALcE.RETUNN
c6n FORMAI (lt10c9x.5A10.3XS(J6)
ENn
ENO
I)(J T Q?l[)(JT OM1
l)uT Q91I)u! lol)l
I.)(JT lnll
IJllr 1021UOT 103IDOT 10+1IJUT 1051oo~ 1~~1
LA@
LAtJ 10
I-A9 20
Lit;; :0LAK +0LAB 50LA}) 60
LAH /0
I-AI) 80LAH 90
LAH 100LAH 110LAH 121)LAH ~30
LAH 140LAB 15(-IL&H 160LAH IinLAH lHOLAB 190LAH ?00LAH ?10LAB ?10
APPENDIX C
SOME USEFUL FITS OF THE PULSE DATA
This appendix contains a listing (Table IC) of the parameters for 11 energy
group pulse fits for 5 ENDF/B-IV fission-yield sets. The parameters for the fits,233 235U
given in Table IC, are in an ENDF/B-like format and are for U thermal,238U fast 239
thermal, Pu thermal, and232
9 Th fast neutron incident energy for
both beta- and gamma-decay energy spectra.
In the ENDF-like format, columns 66-70 contain the “MAT-No.” that is used
to identify the target nucleus, The MAT-Nos. used in Table IC are the same
as those used in ENDl?/BT-IVand a~e as follows,
MAT No. Target Nucleus MAT No. Target Nucleus
1260233U
1264239PU
1261235U
1296232Th
1262238U
91
A zero in column 70 signifies the end of the
columns, 71 and 72, are used for the MF-No.,
incident neutron. Here only two numbers are
neutrons, and MF=81 denotes “fast” neutrons.
end of the data for that MF.
data for that MAT. The next two
which identifies the energy of the
used; MF=80 denotes “thermal”
A zero in column 72 signifies the
Columns 73-75 contain the MT-Nos. that are used here to identify whether the
parameters are for a fit for the beta decay energy spectrum (MT=802) or a fit
for the~amma decay energy spectrum (MT=803). A zero in column 75 signifies
the end of the data for that MT.
The data for a particular MAT, MF, MT combination are given in field widths
of 11 and are organized as follows.
1.
2.
3.
4.
The sixth field on the first data card (number 11 in this case) gives thenumber of broad-energy groups for which the pulse fits are given.
On the next card, the first two fields give the energy bounds for thegroup in MeV; 0.1 to 0.9 MeV for group 1, for example. The sixth fieldgives the group number; 1, 2, 3, 4, etc.
The first two fields on the third data card give the cooling-time range
in s over which the fit was made; 0.1 to 1 x 109 s for group 1, for ex-ample. The sixth field gives the number of pairs of parameters used inthe fit; 16 for group 1, for example.
Next follows a number of cards containing the a< and A. used for the pulseL J.
fit .16
Y a e-~~tFor example, for group 1, fc(t) = ~ , so six cards are needed to~’
contain the sixteen parameters needed for the fit.
TABLE IC
USEFUL FITS IN 11 GROUPS
92
131415
:;18
;:2122.232425262728293ti
313233:~
3536373839Uti414243444546U7
48
495051
:;545s565?5859606162636U
6566
676869
;:7273747576777879
8P
93
@l82B3fln
858657&3fl
899k391929394959b979899
1 i) i!
lbl1U21V3ldold5lk16lk)71U8l;3y
110
illllI?11$llU
115Ilk
117ttfl1191(?0121122123!t?fl!2s
l~b12712812913L!
13113213315U
1551301371581 5Q1411
lU11Q2143]~a145146
14711J8JU9
94
15W
151152153
15415s
156157
1551s916L!
Ibllbi?
ib3lb4
lbslbb
12311
56709
1011
i2!314151617
1819l?ti
2122
Z32425c?b27282930313?33Jll
35
363738
39u f{
U142
Q3Ua(J5
,4b474849ikl
5152
95
535455565?5859
6k461b~b~b465b6b768697d7!72
737Ufs
7b
77787960818?8>8/J
858687888Q
909192939U9596
979899
ldtiltill~lz
1KY3lIOQ
1051 @6l’d71(18
lk49110111112113114115116117118119
123
96
li?i122123!2fJ12512b12112812913fi151132133!3413513b13713H! :0
14tilU11U214314U1451U6
1U71u81491s0!s11’,215315U1’55156157158159lb$flbl162163lbUlb5lbblb?108169i7tilrl1?2173
:3
:67a9lq111213141516
97
l,h’ill!-1~ 2.J(.3??- fl7,57.229-!2 7,93br!7-lk33,uJP@fd+ 2 a,Afi’d@$tn12b2blf!V2Qo.Jd”Arip-1 lo5.i,)pp+v a r’1 d 31?b?~!t)@(?l.vt~cda- I 1.ar3fdr+ q [4 l/l?b?~18?27,33?39- 2 1.71121+ a 3,?IJ98V- ; 3,76559- 1 \,2782Q- ; 9,176?7- 21r?bZ81aJ2U,5bld?W ~ 1.97:11~-2 IJ,333U7- IJU,6?7U7- 3 1.fJ3?55- U 1,55Q?5- 31Zb~918PZ4,45339- 5 u.77fi93- ~ 1,38751- s 1.8RQ38- Q 2.25079- 0 b,U0013- bl/bc?9!!j021.39J3i_J- ~ 2.Ii6j:!I- 5 I,u3!)u\- 7 7,4325,1- b 1,39$!110- 8 l,1477b,l- hl,?br?31si!2?*F2~11- 9 3.9~$v5- 7 1.6399?- 9 .2.318?;:- 7 7,151k~9-ik~5,79491- dlt?b~~lokl~?,h!!7ti5-lt) ,?eIlr1t>29- fl i3e9573’?-J~ 70/@b98..l$\ 0,Llfli)IIt4+ 4 o,4r)tIiA+ ill?hc?y~t!.l?IQsj;<;,$l+ J lc~.l(l”~lt+ ?
J ;1 d fJ1.?b?518n2~.?t.i,iti- 1 Ie;f,f,!,’kii 9 3 3),156JQ-
d 171?b~?lfi@2I l,7rI;tIfi+a 5,521’49- ~ 3,7!12qI- 1 1,71bu\!- 2 8,93:4?3- 21c?b?!!]’jJ2
5,j!ls17- 3 I,9?\I”/- 2 d,\h85Q- fiU,Q7515’W 3 l,5bbSU- ~ 1,~’i?R~- }l?b~~l)~t”ir?
3,91660- S 11.7c41U3- u l,fl1817= S 1.8!796- u ~,b3550- 7 5.51S38- 511?6~818a21,S7733- 6 3.ak?du5- 9 9,5?342- 8 9.71258. 6 5,0UU91)- 9 1,53196* 612bZ018023,1917b-10 z.37b613- 7 lm932Sb-lil 2.U2312- 8 f4,29b0ti.lk3 2qb3314L3- 612b2018?22,Q1377-11 2.4173b- 8 ?e3Q?@3-12 7,80d2b-lFI a,UiIClk4(Zl+23O,dOCldkl+t?12b2818i?2l,8a00cx+d z.anfloti+m 4 m 0 512b?818~2i.oa~nm- 1 l.unaoo+ Q a 0 0 j612b2B18021,21822- 1 1.87Q8U+ 0 6.719’?2- 2 4,QQ066- 1 2,12184- a 9,79773- 2126281802500?}81- 3 2.86433- ? u,88!JS2- U S.D712L!= 3 1,24747- u 1,49232= 31262818023,83902- 3 s.43b37- u Um88178- b 1,9813/J9-4 5,5403F1- 7 4,24015- 512b2.810029,3a67@- J 3,617UkJ- s 7,68QBZ- B 1,19993- 5 7.83048-10 1,37681- 612b2B18Q21,27515-!(3 &.3@b66- ~ 5.2617b-lQ 2.55611- @ 3,7939?-12 l,u82~4- [email protected]?2893-la 7,834u8-la 0.noOflM+ a L3.aPR~O+ n ~,Ofl~@~+ O @,Bflfl@a+fi12b2B180Z?,1230UCf+O z.b~d~O+ 8 0 0 0 b12bt?81802l,napom- I I.Onanu+ 9 0 161?62B18021,10965- 1 2.7?670+ E l,0in788- ~ 5,0TfJlId~; i?,U56iii9=2 1,0913F+Q i12b28!8@2U09U003- 3 Z.219Z’B- ~ 5.6s793- a 5.70230- 3 1,12438- 0 l,5587a- 3126?B18023,09993- 5 s,85090- u 2,6b004- b 2.211S6- 6 5.1561i38-a 5,81060- 512628180290Bv8b~- 7 3m13~86klws 2,usU19- S 1,20950- 5 1,16787-10 3,87@79w 712bZBl13022,91L313-113Z.fJ537ti-8 2,372bB~ll 2,69907- 8 2,C1127L?-11.?,4S360- 812b28180Zl,76fJl@-!U 1.06830- v fl.flBO@m+a (4.0c30mGI+n 0,90nBR+ 0 B,Bf100a+ 0126201802?06300ci+ 0 3.IdI?aOO+0 m 0 0 712b2B1802l,OaOOn- I l.o~auo+ 9 0 0 0 1512b2818021.2873s- ! j.f3955t3+8 6,53667- 2 S,2029U* 1 2,6605S- 2 1,29667- 11262818024,Q7952- 3 z.37B21- 2 Smb7751- u b.12U19W 3 8,02430- 5 l,7m395- 312b2B18L323,129U3D S 6.08673- U 1,31266= 7 3.799Ul~ U 2,1U0bS- 8 lJ,03k191-5126?81802l,~Bu13- 6 5.3FI?85- 5 1,273UQ- 8 1.47147- 5 1,60230-10 1,36127- 612b~815021,~0823-lfl 2.2L1906- 8 2,?1337-!1 3.3P750- 8 2,27319-17 1,18774- 9126.2918023,faaz0e+ 440.OfdaPe+ 0 0 m 0 812b281802l.OaFIOFI-1 1.30a0a+ 9 0 0 151262B18B22,30413~ 1 1.63185+ a 1,17618- Y U.7+89b~ 1 3,7’97S7- 2 1.15181- 1126291882600U88(I- 3 2.270900 2 8,07918- u b,69526~ 3 1,38863- U l,7B7,20w 312bZBlB022.2u82a~ 5 6.22b?u- u 4.18S12- 7 U.a3904~ U 1,33801- 7 b,82b57- 5126i?8121i721.4209R- 6 6.51991- 5 b,8uk?7ti- 9 1.u58Bb- 5 1,97U17-10 l,i150t)b-61262816023,09536-la 1.Bu363- b 2.7u802-11 2,176S5- 8 1,76944-17 8n2f13R5w1012bZ818024.fJilmOP+k!5.a?iauFl+8 a ni.FIaOOP- 1 1.0fld9FI+9
0 912b2818@20 0 1U126Z8113L42
l,@3@5U- 1 1.8!907+ 0 5,02733- ; 4.53802.- 1 ?,1287b- 2 1,28099- 1126281802i?,IlfJ337-3 Z.62339- 2 3,79239- u 9,19149- 3 2,6Q236- 3 i?,77299- 31262818026014bb53- 7 S.249~1- a 7e6b6U1- S l,lJ802b- U 4,64498- 7 b,9f1926- 512b281802-4,~91’i16-A 8,75553- 5 2,59827-11 100304kl-6 ~,b2012-lb 1,B61OB- 712b2BlL!02
8,2003u-19 1.62273-11 7,5a2b7~19 lo21a3u-12 3,Qa0k3@+ 0 M,@@I?I@O+ 0126?51802~Ofla*8FI+0 b,7101a0kI+0 0 0 u 10126281802l,c4an0P- 1 t.0n30L?+9 u 0 131262818025,01803- d 1.729L37+O ?,61S58- ; 3,98167- 1 9,u372S- 3 1,12557- l12bi?818P2s,2b35$l- Q z.?3328D 2 1,13993- U 1,21143- 2 1,05389- 5 4,5@592- 312bZ81&lf127,5723h- B 1.53830- 3 805blU2- 9 6,88852- S l,lb2@?-13 l,la26il. b1262Bi8L323,5B7i37-la 1.03413- b 3,8alb3-19 1..2596c4-7 8,58998-21 l,819b4- ll126Z818a2I,bilfl?l-?aq,iJ3285-13 OOfifia$tF+a ti,00c7Bfl+flO,fldnOO+ a !3,d1300i3+~12b291802b,oablon+ 0 7e59aQla+ 0 a 8 0l,!3clL30L7-1 l.nnaflti+7
11126281802lli2b2B1802
2,11323- 2 1.76891+ 0 1.24115- ; U,785U9- ; 4,27413- i 1,295.29- 112h281~022,19Ub6- U a,’j5U!32- 2 3.bq313- 5 lm0979b- 2 3,85744- 7 5,09169- 31?62818028,16977- 9 1.b2!187- 3 3,P1321-lFI 8,33BR2- 14 Q,55698-12 8,558L12- 412b2Bl13k3273,13952-!4 1.03632- 6 20Qf1667-?2 U,13652- 7 P017AVI?}!+3 d,k3C30Vti+012b2BlB02
126281 3n, n. a (4 4 11126281803
17jtllQ2021222324252621?8~9
303132333U3536373839atiU142U3Ouus46a7U849505152535a555657585960616263bU
65b66768b9713717273747576777879508182838485
98
I,tlaflavl-1 11.a~anti- 1 a @ a l1261?818~5l.naazn- 1 1.B3JPO+ 9 0 B 1912bc’81tl133804b91fl- z 1.88862+ ~ 2.991719- : 6,0?957- 1 i2,Gi5678. ~ 2,85695- llZbr?918k139,57U17- J ~.blJ7V9- ~ tQ6uL3b0- 3 3,Z355U- .? ~,t42U84- 3 1,48350- ~i2b?818ti3t3.l153Fi- 5 3,41533- 3 5e8@278- s b,7UUQP- 4 1,87012- 5 S,30U65- ui2b’2Bi8035,74Uf19- 6 Z.1FIA49- 4 5,59763- q 9,79809- 6 3,53688- 7 i,37587- 5126?81803Ro3uRll- 9 2.9b9~l- 6 1.3?179- 8 8.bi1655- 7 !,21?32- 9 .?,b~9Zk4w 71262818’d3lo9dSluell ~083bbz- 8 1,3z322-12 2,25852- B i,2B24\-13 8,tj95118- 912bd81Mk43l,45?2dw17 1.1?.289-ld OGflOOklkl+ 8 kl,0t7i4~kl+ P @,i73tiUOt d O,tidkl@EJ+ U126r?!316ti34,nandc4- i s,oaiIokI- 1 8 n B 212bi?81603toOaooOw i l.anilvu+ 9 n PI 0 19\2b2818ti35,2691Ft- 1 ~.lll?b+ kl j,9blb(?- 1 b,B63M5- 1 1,46895- 1 3,U1199- l12b281b14j3,13873= 2 l,d3651- 1 6,8u173- 3 4,18967- 2 2,57752s 3 1,33669= 21262B!M035,Ub734= U 3.b4916~ 3 1,494133- 4 Q,461k15- 4 l,bb97k3- 5 2,41379- 4i2bi2816@34,B8521R ~ ~075bU1- U 20456k39CJb 4,1?2245- 5 1,52541- 6 l,288bO= 512b~818~3301ij59Q= 7 3.63S85- 6 b,3zSU4- B 4,14714* b !$,9dnL13c 5 8,66236- 71t?b~B16ti31,371490 8 i.lsblu- 7 6.0811~-11 1.Sfl@45-~ 3,4i44a-ld 1s7S598- ~12b~818032,75226-11 7.351?3-10 0,0000k7t a 0,ti0L400+@ 0,(3d0@@+ a O,kl.@O@O+@126Z81tJkt3900ak400- 1 \,J5d0M+ o z 0 u 31262B1803!,OaOau- t i.O~d~~~+ ~ 1912b?818k!31,05106w 1 1.70053+ 8 5,98281= ; 5,97b7~- Y 2.2S980- ~ ltl16Q~* l12b2618~35,86919- 3 3,37i399w 2 3,@z61UD 3 1.25887- 2 7,37M95- U u,54185w 312b2811303l,366S1~ 4 1.1S567- ~ 9,31884= S (1.158u!1-4 1,91336- 5 .2,u8397- 41?62816032,3U91PI- 6 3,92186- 9 7,?s07~P 7 1,7Q362- 5 4,7M5Uk3- b 2,60335- b126dS18~35a773u2w 9 7.S22!5- 7 1,02785= 9 5,a9878m 7 2,28855=11 lc7~5Ub- 712b281B031,6u932-11 z.16b34- 8 G,33kU8-lU 2,23759- 8 Z,824ti5-17 5,36277-111262018035001445!5M119~,7773U=11 fl.ifBOO@+0 kl,@Lltlk4El+Fi0,@30@fdt a 0,00000+ ti12b?618@31,3500!2+t41.8aan0t L4 D 0 $1 412bZ818B3l.OaOld@* 1 lpdmk400+v (? 13 141262818033,32479- 2 2,73515+ 8 0,Ub98u~ ; 4.87561- 1 1.55282- 2 1,15765- l12bi?81$035,41368- 3 3,49792= 2 2,930S7= 3 1,56268- 2 7,543b0s 4 7,b72B2a 31t?b2810031,17996= 4 2.46018- 3 6.79717= 5 3,9695tI- U i,lb05b- 5 1,53525= Q1262fJltJ032,98589w 6 4,07339- 5 6,870869 S b,35152- 7 8,3?14bmlZ 2,S1760= 812b281bU32,4\5990iS 9,L151k79w9 S027716=i7 4,US6b3=il !!.030(40+U k3,0@000t Id126281803l,5aBd0t 0 2oif0t4k3ti+@ @ 0 0 512b281Bi331,000009 1 l.enaOO+ ~ a B u 181262818031,37801= 2 1.45343+ @ 5,35251- S a,9bld3- 1 5,Uti31A9-3 1,27204- 11262818031,731’23~S 2.83300- 2 9,44486- 0 1.39569- 2 ic3b912= 4 5,b19419 312b2818036,3761#k!w5 9.49B52w 4 l,47096Q 5 5,52576= 4 U,924911C b 1,98121- 41~bd8i803S,72281= 6 9.04812- 5 3,32U71m 7 4,146?5- 5 1,93021- 8 9,9tib2d- 61262818031,0S127- 8 2.SS522= 6 2,11U03-la b.27219= 7=9,22881-12 3,25351- ~1262818033,i184z=ll z.5P343- 8 U,B178B=A5 1,111259= 8 1.81828-17 2,94831-Iti1262f31t1032.2a000+ a 2.boa0k4+ 0 0 0 a b12b2t318k33lolltflauoa1 l.OOOOO+ 9 @ 0 lb126~BlS0J2nS@051W 2 1.z8b97+ R 8,7LJU41W ; 2,b3824= 1 %,lb2b6w 5 9.73119= .2i2b2St8032.44169- 3 z,524u9w 2 l,2~lId9- J 9,S1485- 3 b,71229s 5 2,94b43w 31262818032,126qzeJ 5 4,13479w U 7.36009= 6 1,46158- 4 1,90885- b b,88B77w 5126281803
=3,0S876S 9 9.fj~26b- 6 4,18627-10 l,i961b= 6 2086541JM 9 6,66865= 712b2818031.50572= 9 5.96339- 7 8.52373=13 ii,i6747w 8 u,77990wlfJ 4,b91Bd-l l12b2818031;76B68=17 5.36608=12 O;O@@OO+ !4B.00i300+ a 0000i3B0t 0 MgOOOOti+2,bi10B0+ IJ 3.k?030k3+ @ !4 0 0l,OauOnm 1 1.0000rd+9 a 0 01.96407- R 1.39816+ L!8.7995b- 3 3024869M 1 5,08760, J lK29ti99-l,8b3a4- 3 3.83bbu- 2 8,11S45= u 1,47!15= Z 2,b422i!w 4 7,b6Y09-7,9$700D ~ 3m2721~* 3 2,590S4W b l,682kJ7=4 7,b843@w 6 3,08i!9tJ-3,24649= 7 7,!j41B9~ S l,29370=lg 1,19587- b i,(41b96-10 bob2Si9iml,klb436=13 ~.16b85~ 8 3.48545-22 9,83700-11 5,368b3=ltj 3,73tI10-’3.8a000+ 0 u.eOaOti+ @ 0 n 0
t312b2818L43712bi?816035126281803l12b?81803312bc?81803412b281803712bi?B1803~12bi?818~38126281803
l~0a0t30m 1 i~iiartnn+9 a II @ lbi2b?8i803l,3207iw 2 1,41975* 6 5,854dl= 3 3.29234- 1 4n@H983, 3 1,271336w 11262816032,562kIlw S 3.50u29* i?1,39542- 3 1,31015- 2 2,2358S9 u 4,45143- 31262810032,91953- 5 1,50874- 3 6,11U76= b 5,1fJk367wU l,4ki932= b l,4fd6t44w41262818036,27413- 7 1.S1276- ~ 1,38711= 7 7,bb$3@- 5 3,1R2b7mld 1oB2300- b12bt?f318031,9?393~11 5.90662- 7 1.29404-16 1,01114= 7 1,9jtib2-lti 1,79063-ll12b2B1803l,460dftm18 2.215fIl-12 L!,OEJOB@+8 0.bflOClO+PI8,0a0U0t d ti,k10klBi3t@l~bi?818@34m0afdbB+ 0 5.00a0tI+ @ a k! bl,eaoan- 1 l.aOaOn+ 9
912bc?8i8@3u a B lb12b281b03
1,0987S- 2 10$U883+ @ 3,76431- 3 2,62959- 1 20952uti- 3 1,24255- 11262818031,31773= J Z.b2327- 2 4,327bU- 4 l,S@568W 2 7,58fikJl=5 6,75533- 312b2B18k331,70549= 4 4.Q517Bw 3 1,S7962= o 1,01725- 3 7,89368- 8 30U749b- 412b2M1803
860788699@9192
93949596979899
Itin101td2ld3104lklsldb1U71u8lk19110111112113114115116117118119120121122123124125126127128129130131132i33134135136137138139140141142143i4414514614714814915fl151152t53154155
99
1.523SC?- a 9.753Q3- 5 6.23427- 9 6.2u.2U0- 5 1.f37U93-li3t,UUU1l- 61c?02918a5 156ii7158!5910A
161162163lbU
lb5lbbtb7Ibtilb9i7d171172173
:3us6
I891L4111213Ill15lb1718
H212223Zfl2s2b2728?9
H5233343536373839QtiU142034445U647U8a95051
100
525354555b
575859btibib263bUb566b7b8697$7172737475767778798d8182838U8586878flRQ909192939495969798
,;;
ldllbli?Ill!1,14ldsltihlk’t7li)~109110111112113114115116117il~~~~l~n
101
121i22123lda
12512612712912913kl13113213313013s13b13713813914$4lUIIaz1U3lQO14514614714811J915fl15115215315U155156157158159lb~161lb2lb~lb4165
lb6
Ibl10816917kllil172
i3u5b7891(4111213In
15
102
1, V$1846W 8 3.”i743d - 7 6,027 HJJ- 9 1,!38903- 7 1.!i4&!Q7- 9 7,5”/ S05- 81?9b3113ti2
l,!it~f,l-lt2.31?88- 8 1,7714?-11 6,;64513-1(40,i4dfli4d+2)KI,i!tikItid+fi129b91BK2q.::iji’f’n-1 1.55A.!;l+@ i? r4 @I,fia!:,ln-~ ~.(la;l!’$+ 9
31r?9b918v2‘(! h U i7129bB1814i?
5,93Q74- z 1,762?4+ 0 2,413U71- z 3,7u63Y- 1 1,34?2?- 2 l,tif19ql- 11?9biJ18(42
5,199??- 3 Z,?151ftC- .2 4,6[fh/15- u U,2Ua8(I- 3 10t?fJ’/711- U l,Llt??R5- 312?b91dHz4,?s6157- 5 9,55{~lF- L1 !,L!~17q- 5 i,747~zw 2 ?!,92C496- 6 5Q3Uklh@- 51??bti10@(?
1,54726- b 2.31;’Qq- 5 !.21174- 7 7,q6U23- 6 1,.2SU;jhes 1,3?153- biz9h51Bk12u,j?b;!5- 9 p.~37b~- ? l,b87,?7- 9 j,~34~7- 7 6,79687.lb lJ,jb63b- 81~9b!3]HCi~
1,97~’:”L7-13 1.QJZ2F)- 8 2,17181-II 7,83U11-lP B,tidMtik7t Z ti.ijkl,i2At til?qbf!t8021.35:127* 2 1.!3~A3v+ 0 a a n 41?9!J131fJk421.?J?JP. 1 10P:.!Z:4;?4 9 3 0 U 1712’+b9!8d28,1353~2- ~ j,b~??~+ @ 4.?2751- .2 3,9(lbb@- 1 1,9.$11(,9- 2 l,li~l~li- 112V6!31MH2b,5?z2u- 3 Z.13’7~1- 2 U,6955R- U U,5826q- 3 1,45695- 4 1,u9459- .31F’9b91h9zlI,L7;fi95-s 4m61i3C)U-U 1,3x32U- 5 1.697119- U !,?b6d~- 6 4t74U01- Sl?9t181?I021.617hu- 6 ?.77J11W 5 7.99722- f!I,112U7- 5 3,72U33- 9 l,blfJ15- bl.?9bh~8825.6j9j8-lkJ 3.2/11113-7 ?,9783q-17 3,53259- R 4,75u54.13 z,58db6- 8]?9bylijFl%3aJ17~l.1,~ 3,1q9fJ3- 8 l,79b8q-11 7.83287-lpI D,@a2k4m+ u 4,kiiALA@i3+ti1zQ6319fi2l,(!t~x>+(12.2?di~i!+!4 2 n 0!O?2:A,1P.1 :.;;l~:4,’+q
51Z7h918M21? U \6129h51ti?2
1.k!5?q3- 1 l,9b7U9+ 0 4.uu39b- ; U,2qU3d- 1 2,2q205- 2 1,2?229- !12qbf31&@250fl’JbZI-3 Z,23?3U- ?.Q,79737- u u,9@l19- 3 1,G2927- U l,5q599- 312Y0816MZ3,8+7b’J- 5 5.21673- U 7.a.?4~5- 5 l.bR51ti- 4 1,38864- 6 U,b\i99~- 5129bblUb2l,l~t)bb.6 3,1h27b- s fl.p~l~~- 8 1.29665- 5 4.3J954-IB l,ti~i59d-bl?9b8\8~21,1?23?-11 4.71S3h- 8 5,fi~272-la I?,BL3.19u-8 6,82189-15 2,37744- 9129b318ti2U,Q7U51-1~ /.~212f3-12 3,(?:\F)titi+~ ti,aZ~@U+ !4OOf’jJWCIO+a (4,k10(~t3d+t!129b9113022,2J7<~IJ+9 2.bOAYti+ il z r!
loi?’3n?P-1 1,?!4;4V’V+9D b12qb9113k)2
a @ o 16129b918f121,11323- 1 1.87437+ 0 U,b1858- ~ 4,538fi5- 1 2,63442. 2 1,35U53- l129b918ii~5,59679- ~ 2oU72bi?- ? 5.7b593- U 5,5!6?5- 3 9,32899- ‘aI,78F155- 31?9691.3023.2162P- 5 S.5111?8- ~ u.U6552. 6 1,66758- 4 7,63784- 7 4,@22v9- 51?9631.8(42
!,22937- h 3,767M0- 5 Ue77S37- 8 1,4.2569- ~ 1.U264U-10 2,96Q24- 81?96!Jlbklc?~.2q~ib-lF4 2.72532- 8 3,1JP357-11 2.76.?71- (?3,191L17-11 2,5685!3- tl12QbfilfjW23.295!1491u 7.89u78-l? fl,fia~~~+B u,2C4H?V+ B k?,4)dt3ML!+3 Z,UW?(IO+ dl?9b5133Z2,f)t:’4k!t4+o 3,L3aaEfl+@ ? n H 712?b9!802l.aa~,!ti-i lo3n3vti+9 a 0 @ 151?9691902l,711tiS3-1 1.9q81b+ 0 5.201337- ~ U,96’f9q- 1 2,03232- 2 1,299U2- l129b8]t40d4,61,Aq,q-3 ?mU~339- 2 4,96f49/3mI!Js,79b69- 3 7,2b757- 5 1,8H235. 3129b91&@22,97493- 5 5,95167- U 1,37521- 6 1,31516- 4 7,81538- 7 b,U95b9- 5129bf31f3k4~1,3U5?7- b a.lq9?h- 5 8,1?2UF33-9 1,32563- ~ 4,3U955-11 3.211965- 61?9b61L!~26,2?851-!1 2.82!lflti-8 3Qf321’7B-1~2.391q2- 8 1.f3U5145-17l,27bu#- 91?’)b818fi23,){v’\!6~+~ UOti;’:’ltik!+k! a n u 5129b51PJ2l,qaxd>- 1 ~o:jfl;l:~kl+9 3 0 d 151t??bE18i~21,65!’45- 1 2.hl?~7+ 0 1,.2R.{9U-1 ‘j,i15378-\ 3,S9738- 2 I,d5879= l129bt\\!jC26,1t1752- 3 2.?8199- ? 9,50~2?- 4 5,36582- 3 l,lt32b3- 4 1,66514- 3i2qb918[~2.3,11583- 5 b,(l~l>;~f)- U ?,5q6dU- 5 6,99?44- 5 2,795?1- 7 b,9~ll!b- 512~bq16fi2
~,’i?1J61?+ b f,051J/:~1- 5 ~,?$7/9- 8 l,4?fIlf3-5 7,373]2-12 l,~hj17d- blt?9t)til[\kl~
4,tfbUhf4-tU3.Z!(?952-7 U,IJf1932-~32,2!334- R 8,U9394-18 3,812b5- l~l?9b818@24,flaFlEln+ti5*nvaPE* (4 n n 0l.oanoo- I l.noaoa+ 9
9129681802B a lU129681f3L3Z
6,79765- z z.7112P+ 0 S,ulflll- ; 5,1U82fJ* 1 2,47509- 2 l,2i3Ci6w 11296818022,35525- 3 2.46?ml- 2 4,3n295- U f3,11B14~ 3 3.618n6- 5 3.E11364- 31?96815$?2l,19uI10- 6 5.311133- u 4,1438fl- 7 6,41636* 5 1,fik57ti8- 6 7,22842- 51t29bB18~24,78.207- 9 7.23151- 5 7,93591-13 l,0Uq87- 6 6,48490-16 1,79138- 7129b818f125,?824u-19 2.16683-11 6,54327-19 7,i3324s-13 O,GIOtitXP+0 0.uRtiflti+@129b818@25m0i3U0Ci+ti6.OPOOW+ B 0 n ml,a~~l?~- ; 1,’3tidPk++9
lP129b818@2a ~ 0 131296f318?Iz
UOZU126P z 1,69877+ 0 l,b4049- 2 2,9811u0 1 l,0U532m Z 1.Li!125- l12qb818f126,75477- 4 Z,88257- 2 lob2514- 4 1.09155- 2 l,b0557- 5 4,27432- 31296818(422,777ba- 7 2,36536- 3 2,59924- 8 6,0bl12@ S 3,20931-14 1,22232- 6129b818027,72785-14 qo96913* ~ 9.IsB21-IB l,7J03~- 7 6,[email protected]~ 2,U619b-~112qbB} 80~l,156990?n 6.94295-13 0CPtnt3t4C!+o EIOOOtiGIm+0 0,t43cIoGI+0 0,0L300EI+0129bB18k3~b,QZROfl+ 0 7,sFIE10V+9 0 ml.’aaaom- 1 1.0nti0!4+7
0 11129681802lli29b8~802
1,83492- 2 1.7P393+ 0 6,6Bb48- ; 3,301?1- ; U,US528- ! l,2@398- 11.29b818@22,17b71?- 4 4.50L157w 2 3,27137- 5 l,U021313W2 7,38277= 7 4,q74f17w 312’?6818027,7’dbBS- 9 ~8f3~977- I 3,26129-10 6,29S14- U l,bb3Q1-13 2,6%513- Q12Qb818~22,3U462015 1.03613- b 2,5B144-22 l,b32(.36- 7 B,03L3nc4+ 3 0,@Bt3ta0+ @1296i31802
129681 3
16171819202122232425f?b
2728zq3d31323334555b
3738394041lJ243(JUU5U6
4748495i45152535U555(15758596ii61b?b36465b6b7686978
71727371J
7576
7778798081020384
103
cl,l,flaOOO- 1 ::OOOw 1
0 n a 11129681803
l,naannm 1 l.a~nfln+90 0 0 11296818030 0 0 1912’+681803
b,139U3u- z 1.828S6+ 0 1,79709- z 4,uZU36~ 1 1,7’?6t2UWZ 3,1573S- 11296818038,328bz- 3 i3.i?1851=~ l,5b763- 3 3,BQb93= Z 8,0071L4m 4 1,52913- 2129b818L131,08019- fJu.08730- 3 4,fJ7418- S 9,153@u- u 2.26294- 5 6,63367- Ul?9b818036,16562- 6 z,16661- 4 l,0bflU4_ 7 2,1L7i?UtI-5 ~Ol@6U2- 7 1,41375- 5129b818035,64193- 0 3.S90ub- b 1,18292- B 8.138b2- 7 1,53176- 9 2,5~370- 712qb818B33,3UR9?W11 2.82396= o l,39a89-12 1,99297= 8 9,31669-14 8,09492- 9129b818U31,10218-17 1.i91bQ-10 M,f4@B@~+ 0 fl,0f10RC4+B O,flaO@fl+a O.O?OOO+ 0129681803u,flamnnw 1 9,nn00n- 1 a 0 B 2129b81803l,0d1700- 1 1.13B?!)n@+~ ‘d 191i?9bB18f134,2282L1- 1 2.10816+ 0 1,11371- ! 6,58651* ; 1,!8296- 1 3,25990- 11296816032,69752- 2 1.07296- 1 bo5vbbU- 3 3.bf124U- 2 l,8i12f4U- 3 i,29721v 2129b818037,0Q91u- a 3.74172w 3 1,2s783- o 1,06400- 3 10U319U- 5 3,08336- 4129b81803U,9U374- 5 1.83772- Q !,92624= b U,55b93- 5 l,5U430- b 1,30698- 5129b81B031,13710- 7 3.b926tI- b 3,37506- 8 3,10s79- 6 6,95776- 0 1,18609- 6129b818031.1216?- 8 1.1U5Q0- 7 1,71843-11 1.998S7- R 8,3UU89-12 2,27629- 8129b818033,!3287=11 7.35785-10 O,ClflmO@+0 fl,O@OflP+0 3,fi0fl@0+3 0,0~0~0+ dl~9b818059,R30t!c9-1 l,35i3’dO+@ D n @ 31296818413l.OaOfde- 1 l.OnaOfa+ 9 0 n a 191296816038,82611- a 1.B9R21+ 0 U,79U2bw 2 3.26E69= 1 1,99948- 2 1015926w l129b81f3036,57171- 3 3.26515- 2 2,78555- 3 1,36895- 2 5,65112= Q uo8@5~l- 3129b818031,78337- 4 9.8S393- 4 9,Z18ti13-S 5.85u49- U 1,7946% 5 2,1fi58B- 41296818032.43757- ()3.69557- 5 6,9u2fi3cI7 1.769k33w 5 2,7784S- 8 2,54538w b129b918032,91U26- 9 6.58748- 7 l,@7938- Q b.11638- 7 u,52U14-l\ Z,2277u- 71t?9b818034,58827-13 3.UZ202- 8 13,88773-lQ I,9R52Q- 8 1,93785-17 lob938ti-lllt?9b811303U.9771J9-ILI1.66638-11 m,2!L7~U@+ a B,000L70+ fl D,f13kIwn+ 3 ZI,i3n0flB+ 0129b818a3lo15~an+ @ 1.8CIZOO+0 0 @l.oannn- 1 loaciaom+9
0 U129b818030 0 14129b81803
205Q581- ~ 207z28u+ 0 ;07bdl~- ~ Uob3823- 1 1,42129- 2 1;21389- 11296818037,1aUUU- 3 3.U543Z- 2 3,5~375- s 1.UP1187- 2 l,tl1534- 3 b,~5UFi0- 3129b81803402b52t- 5 4.Ubb98- 3 8,319813- 5 3,713601- U 7,14j7b6w b 7,137959- 512’?6810333,flbu11- b IJ.99359- 5 8,59748- 8 6.262fi7- 7 1,C16139CI-112,BMC466- 8129b818143l,7b5@2-t7 2.8tlEb7- 8 3,82367-17 1,36227-11 O,FIaOPfl+a 0,M03PZl+ 0129601003l,f3a~na+0 2.2t3an0+ @ 0 P ol,f3a03c4-I 1.aa4r4kI+ 9
5129b818k33a P FI 18129691633
lon?but- 2 1,43417+ n 5.49S48- 3 3,12535- 1 3,27115- 3 1,16749- l129b81tIE31,95914- 3 2.8u8Q3- 2 1,(011775-3 1,3231u- 2 1,21183- 4 4,07ulU0 3129b818037,2238f!- s 7mlIRh2W U 7,97283- b 5,5b282- U 7,v12f173.6 1.16591- 4129b818333,87177- b 7.373?9- 5 U,U6273- 7 jo821013- 5 !,7U934- 8 l,J725b- 5!29691803b.3365b- 9 Z.568~LI- 6 5.84567-11 ?.5s693- 7-6,28Zbl-12 9,4926ao 8129bfl18Ci3!I.CI?3F)6-112.81962- 8 2,19957-16 2,97.%96- 8 l,lllb2-17 9,7U859-l ll?Ybf_!lL!P32.?2?;)0+ V ~,bflaflt’i+ 2! a 0 0l,D&41tdP- ! 1.J1JJ20+ .9
61290918V3n k! 16129b!!16R3
1.63652- 2 ~.bM5~q+ 3 1,19676- ; 3,317313- 1 s.8U222- 3 8,66]36- 2123b919V33.a31A?- 3 1.?1968- 2 6,72R54- 4 13.t.lzlaq- 3 0,772u9- 5 1,58U89- 312968115B32.94’121- 5 3.12173- 4 7,533til- b 3vub752- 5 3,!582b- b b,5~73b- 51t?9bBl&U33,92!1?4-.9 5,4555?- b 9.?uR43-lzI b,319?4- 7 ~.\2Ulh- 9 6,679HU- 7129b316k3Jl,5?ldb- 9 Ij.979fl~~-7 1.!191q6-14 2,21e78- 8 3.116(:5-23 9,33222-ll122~3Ji3;~3!.;b?b7-17 l.g~si?-ll ~eJflkjhZ+ # 0,;jntJ@3+ ~ 8.tiAZIOc+ 2 0qk114ijZ2+ Ei12jb81flf132,6?420+ k!3.J2d~O+ 9 a P a 71?96318?35l,i!ilV4A-1 l.dXJ$’?+ 9 a n 8 151?9h318@31,:!11)0- 2 ~07(i5ti5+~ l,fJ~79b- 2 U,5?98/J- 1 5.276(I6- 3 1.1759U- il?yO~1ti?3
l,91113?- 3 4.43913- 2 !.Ii92u- 3 1.37541- ? 1,7?261- 4 7.435’56- 312’)~816i~39ql ’I\5,~- 5 >.9)’8S37- 3 4,!3311V0 5 l,132b9h- 4 8,71789- 5 3,7?lab- f.112’lbt31t!m36.?a091- 7 7,J761.2- 5 5,19358-11 b,27173- 7 u,b3bbo-11 b,?51u5-” 7129b918U31,75777-15 2,171.28- 8 l,793b8m24 2,45928-11 h,fli1728-182,33799- 12129b9183Z30i3dfi.lA+0 u.03tii4U+ 0 d FI alona.l:;a-1 loti;lfif4kl+ 9
e129br518B5a P u lbl?9b81Mti3
b,711U5- 3 ?.75492+ 0 9,118RALI-3 4.721a3- 1 u,lb’736- 3 1,.?2448- li2’lhO18?33.?2$911- 3 3.1?;!21- 2 1.!3?89- 3 9,757DI- 3 3,7171)(3-U U,3M924- 3129b51U833,H9P58- 5 1.3h5Ril- 3 9oU:jmti?- 6 3,7123L+- 4 .?,738b5- b l,b~437- 41E’968115L3t?.347d5- ? 8.68151- 5 2,08287- 7 7,L1273u-5 2,b6Ui4U-11 7,99598- 71?9b91155131,05/J2S-11 5,/6721- 7 Uol\u8?-17 6,09S78- 8 1.Cl;17/39-18l,Q31U3-~l l?QbUl15fi31,53248-18 1.29915-12 a.nootio+ 3 3.dni432+ n QCtiauu$t+ a B,avwk!a+ tl129b5ipfi5u,aat)Jfi+o 5.i!:4di+11+u d a w 9129bB1883l.~a?vdn 1 l.aEAv*ti+9 0 0 0 lb129b91BJ58.3577A- 3 jo3’33t12+0 3,59519- 3 ?.73349- 1 2,5”Iz85P 3 1.36271- 112Y6B1SV3
858667888990919293949596979899100101102lfd3IB41051ti6l’a7108ln9110111112113lia1151161171181191231211221231.241251261.27128129131d131t3213513a135ljb
137138159t4\3
Iul142IQ3144145146147148149{5GI151152153
104
15U1551561571581>9lb~161lb216316U16510bib7
168169170171172173
1
BASIC
This appendix
APPENDIX D
DECAY ENERGY FUNCTIONS, TERMINOLOGY, AND UNITS
summarizes the conceptual basis and equations of this report
for those readers who feel a need for additional detail.
I. BASIC EQUATIONS IN ABSENCE OF NEUTRON ABSORPTION EFFECTS
During the fission process, the fission products are generated directly by
fission and by decay or neutron absorption from precursors; absorption and de-
cay also transmutes each product. Summation codes account for all simultaneous
processes for each product, including the continuing decay following the end of
the fission interval.
The buildup and decay processes are continuous, and
sarily provide information at specified time intervals.
described in this report provide the aggregate summation
summation codes neces-
The basic libraries
spectra following a
fission pulse in a multigroup format at two or more points per time decade out
to 109 s (= 2.778 x 105 h = 31.7 yr). Collapsing the fine-energy multigroups
to a reduced, but still multigroup, set and fitting each group to a single func-
tional form results in a practical but still accurate
decay energies at any decay or “cooling” time. These
functions to provide the decay energies subsequent to
histories.
description of the group
can be used as Green’s
specified power (fission)
105
Because the fits are to pulse decay data, the functions do not account for
changes in the ensemble of products due to neutron absorption. Absorption al-
ters the decay energies, particularly at long (?104 s) cooling times. The ef-
fect depends on the magnitude and spectra of the neutron flux, and on the length
of the fission history. As described in Sec. V of this report, neutron absorp-
tion effects can be accounted for to good approximation in a relatively simple
way. In general, absorption decreases the density, hence also the decay energy
of some products, and increases the density of others. The net effect, the one
of interest here, tends to be an increase in decay energy, depending on the de-
cay group. At some long cooling times, the net effect is very significant but
is due to only a very few nuclides -- primarily the shielded nuclides, which are135
generated only by absorption, and certain nuclides associated with Xe and
148pm●
The following equations apply only in the &sence of neutron alx?orptwn;
for Zong irradiutwn times and Zarge neutron fkrxs, tkese must be correctedat
long cooling times as described in this appendix and in Sec. V. For s~mpl~c~ty
of exposition, subscripts for the decay group and fissioning nuclide are ignored;
group results must be summed over each fissioning nuclide. In addition, decay
energies can be presented in four related ways: (1) gamma (beta) energy/s,
(2) gammas (betas)/s, (3) gamma (beta) energy/fission, or (4) gammas (betas)/
fission. Presentation on a per fission basis is preferable in that it eliminates
the actual fission rate and is, for example, independent of the reactor ”power
level. However, this is only possible for a constant fission rate prior to cool-
ing. For broad multigrouping, it is also preferable to use the actual energy
release per second or per fission rather than multiplicities, because the latter
requires a specification of the average energy per group, which is not neces-
sarily well approximated by, for example, the
We have specified energies in MeV units.
and MeV/s is
MeV/fiss sMeV/s
fiss/s ‘
where the numerator is the
denominator
ffss :
106
is the fission
midpoint of the group energy.
The relation between MeV/fiss
(Dl)
energy release rate during the cooling time, and the
rate prior to cooling. Let
total number of fissions prior to the beginning of thecooling time,
S(t’) z
f(t) z
F(t,T) ~
H(t,T) ~
Then
ffss =
fission rate (per second) during the fission interval,
MeV/fiss/s at t seconds following a fission pulse (that is,the release rate”in MeV/s normalized to the numberduring the pulse),
MeV/fiss at t seconds following a constant fissionT seconds,
MeV/s at t seconds following a fission interval of
L
[S(t’)dt’
‘o
If S(t’) is a constant
H(t,T)F(t,T) = S
●
= s, then
MeV/s MeV
1=— .
Fiss/s FissL J
All quantities are computed on some arbitrary
Here we are using f(t), F(t,T), etc., to
by summation codes or approximations obtained
of fissions
rate of
T seconds.
(D2)
(D3)
al quantities can be accurately fitted to several
report we have used a linear sum of exponential
N
f(t) =x
a e-A~ti
i=l
(MeV/fiss/s)
unit volume.
represent quantities calculated
from fitted functions. The actu-
functional forms. In this
. (D4)
The number of exponential N required for a specified accuracy of fit depends
on the total time over which f(t) is to be used and on the energy group. How-
ever, the number is minimized by use of a nonlinear least-squares fit to the
xi parameters. For example,al ‘
an extreme case is the fit achieved to the
total beta plus gamma energy release rate over a very long cooling time -- 23
exponential have been used to achieve fits well within 1% out to > 300 000 yr.*
*The pulse fits are based on 6 points per time decade from 0.1-10 13 s and formthe bases of the 1978 ANS 5 decay-heat standard.
107
The multigroup spectra, which do not require such accuracy, use fewer exponen-
tial. In addition, when the pulse fits are folded into an extended fission
interval, the resulting accuracy is further improved.
In practice, the pulse values were obtained from the summation code using
10-4 s as the irradiation
Therefore, the pulse data
The use of 10-4
s for the
time. The code normally provides F(t,T) and H(t,T).
F(t,T)f(T) is obtained from f(t) = T = F(t,T) X 104.
-2pulse is arbitrary; for times < 10 s, the value of
f(t) does not change. This is to be expected because the fission product half-
lives are long compared to such short irradiation times.
The value of the fitted pulse function is that, once obtained, it can be
used to produce F(t,T), the energy release rate at t seconds following any
finite fission period T.
T
F(t,T) =
~
f(t+T-t’)dt’ (MeV/fiss) ,
0
or changing variables,
t+T
J
F(t,T) = f(t’)dt’ (MeV/fiss) .
t
Using the fitted form [Eq. (D4)], this results in
N
x AF(t,T) = se- t -A T
Ai (l-e i ) (MeV/fiss) .
ii-1
(D5)
(D6)
(D7)
Alternately, we can fit Eq. (D7) to the result of, for example, an experi-
ment following a finite fission time to generate the parameters a ,~ Ai for an
equivalent pulse function. This is useful, for example, when it is necessary
to combine the results of several experiments, all having different fission
intervals.
In the ANS 5.1 decay-heat standard, the concept of heating (or energy re-
lease rate) function following an infinite, constant fission rate (H) is used
and is derived from the pulse function. That is,
108
w
JF(t, m) = f(t’)dt’ .
0
(D8)
This is only possible in the absence of neutron absorption. Otherwise the mag-
nitude of F(t,T) would increase continuously with increases in T. However, the
concept is useful in that the F(t,w) function could, like the pulse function,
be used to generate the finite irradiation values. Thus,
t+T a m
J
F(t,T) = f(t’)dt’ =
~
f(t’)dt’ -J
f(t’)dt’
t t t+T
= F(t,m) - F(t+T,m) (MeV/fiss) . (D9)
The pulse function f(t) and the infinite irradiation function F(t,~) therefore
contain equivalent information. In this report, we have concentrated on gen-
erating the pulse function because users will likely find it easier to apply to
a variable fission history (although either function can be used). It should
be noted the the a., Ii parameters apply for either function, provided that the1
fit extends over a sufficiently long cooling time. Thus ,
Na
z .F(t,~) = -Ait~e
A.(MeV/fiss) .
1=1 =
However, for practical reasons, the ANS 5.1 decay-heat
13as infinity so that the factor (l-e-AiT) with T = 10
(D1O)
*
. .standard defines 1015 s
s multiplies the terms in
this expression; that is, Eq. (D7) is used for F(t,~) in the standard where13
T=1O S.
In the case of a variable fission rate S(t), it is necessary to use MeV/s
rather than MeV/fiss [i.e., H(t,T) rather than F(t,T)].
T
1
H(t,T) = S(t’) f(t+T-t’)dt’ (MeV/s) .
0
(Dll)
109
Alternatively, one can use the power level
T
H(t,T) =r
P(t’)— f(t+T-t’)dt’
K(MeV/s) ,
where
P(t) = power in watts at time t ,
and
K= watt-s/fiss (for 200 MeV/fiss, K
11 ● APPLICATION OF THE FUNCTIONAL FITS
The Variable f(t) is only a symbolic
-- of the summation code output. Most of
in the main text are useful only when the
simple functional form such as Eq. (D4).
(D12)
= 0.32042 X 10-10) .
representation of pulse library data
the expressions in this appendix and
pulse values are approximated by a
With Eq. (D4), the user can readily
construct expressions to be used in practice. For example, if P(t) can be de-
scribed by J histograms of constant power P over time intervals T+, theni.l J
-~ (T+t+j) -ak(T+&T )ek
-ej-1 1(MeV/s) ‘ ,(D13)
where T = O.0
If the power is constant over the entire period, then this reverts back to
Eq. (D7) multiplied by P/K.
The reader is reminded that -there is a set of coefficients (ai,Ai) for each
energy group and for each fissioning nuclide. Thus, the expression [Eq, (D13)]
should, strictly, have a group subscript, In addition, if there is more than
one fissioning nuclide, the P /K should be replaced by the fission rate for eachj
‘uclide Sjiand summed over k. In general, for each group g, Eq. (D13) becomes
110
111. ABSORPTION EFFECTS .
Absorption couples mass chains and changes the fission-product distribu-
tion. The effect is dependent on the type of reactor (neutron spectrum) and the
power history (magnitude of the neutron flux). Therefore > Precise Calculations
of F(t,T) or H(t,T) must resort to summation calculations; there is no single
tabulation of F(t,T) appropriate to all reactors and, of course, the pulse func-
tion does not incorporate the absorption effects.
Most of the absorption effect occurs in those nuclides near the line of
nuclide stability where half-lives are long and where most of the radioactive
nuclides that are shielded from precursor decay by stable nuclides are located.
Because these nuclides are not only generally long lived but also have rela-
tively small decay energies, their effect is primarily evident following a long
fission interval and long cooling times.
On a nuclide-by-nuclide basis, the neutron absorption, can increase or de-
crease nuclide concentrations, hence decay energy. Except for a few nuclides,
the net effect is small and positive. At some cooling times there is a very
large effect that can be identified as due to only a few specific nuclides. Be–
cause these are few in number and do not require explicit calculation of their
short-lived precursors, it is possible and practical to supplement the F(t,T)
and H(t,T) values with values from correction equations that account for the
modified spectra at long cooling times for any power history. This has been
done in the main text, and parameters appropriate to light water reactors are
included there. The equations apply to any type of reactor with appropriate
cross sections. For completeness, this apperidix summarizes the basis of the
corrections.
The most significant absorption effects do not require explicit calcula-
tions for short-lived precursors nor do the significant corrections require com-
putation of multiple captures in fission products. However, the corrections are
dependent on fluence, flux level, and neutron spectrum. While the net correc-
tion could be approximated with an empirical expression at short cooling times,
the long cooling times, where corrections are particularly important, require
aciurate knowledge of the behavior of specific nuclides. For this we have found
that two nuclides per chain for those few nuclides presented in the main text
are sufficient. In addition, a general solution of the differential equations
for two coupled nuclides can be programmed and used for all nuclide pairs.
Let N..N. = the density of the first and second nuclide, where 1 and 21- z
A=
A=
‘i =
Y~ =
E. =J
~.
[The
denote parameters of the respective nuclides (N is normallygiven in units of I/b-cm).mfOa@dE = absorption rate per unit density. If @ is given on
a group basis (two groups are adequate for thermal reactors), the.value of A is XgOg$g (S-l).
-1decay constant (s ).
fission rate from fuel i (fiss/s-b-cm).
nuclide yield per fission from fuel i.
energy per decay, where j denotes the 13or y decay group (MeV).
branching fraction for the type of coupling between nuclide 1 and 2.
nuclide subscript (1,2) has been omitted for simplicity of expres-
sion from A, yi, E. and a.]J
For simplicity in writing the general solution, let
fizA+A , (D15)
Y = Z.y.s.JJJ
(j denotes fissionable nuclide) .(D16)
y ❑ C@ or ct~ depending on the coupling, where the yields y. willbe cumulative, direct, or zero, depending on J
the nuclide. (D17)
With or without
the general solution
interval t are
neutron absorption (i.e., f3❑ 1 in absence of absorption),
for N1 and N2 during a constant fission rate for a time
-@lt-131t
Nl(t) = Y1 ‘l-e )131
+ N1(0)e 9 (D18)
112
r -fy
1N2(t) = ylY1 — -e-Bit
13;132 @@2-B1) + E2(132-B1)1
[
x -e-ez’+ylN1(0)62-61 [1
-(32’
-1-Y1 -e
+N (0)e-62t2 132 2
(D19)
For a constant fission rate over the entire fission interval, N,(O) = NO(0)
= O for fission products. If the power or fission history is variab~e, as w~uld
be the flux and (31~ values, these equations can still be applied by using At. in
place of t for eac~ histogram interval j and using N1(Atj_l) and N2(Atj_1) i:
Place of N1(0) and N2(0). In this case, N1 z(t) is the density at t = Atl -I-
At2+. ..+At..j
The associated group deca~ energies are thus ANEJ Y,@”
It is necessary to evaluate these equations during and following the fis-
sion interval. In addition, it is necessary to subtract the densities or ener-
gy emission rates that occur in the absence of neutron absorption because this
energy is included in the F(t,T) and H(t,T) functions. From a computer code
viewpoint, this is easiest to do by coding the
the results with and without a neutron flux —
result in any significant absorption effects.
We assume that the fission history can be
general equations and computing
or, rather$ a flux too small to
described by histogram intervals
during which Y and A are constant. In this case, N(0) = O for the first inter-
val and Eqs. (D18) and (D19) provide the basis for recursion equations for subse-
quent intervals j of duration At.. For example, Eq. (D18) becomesJ
(l-e-~ljAtj, +N -f3jAtj
Nl(tj) = N =Ylj lj B lj-le 9
lj(D20)
j = 1,2,3, .... J,
and similarly for N2(tj).
113
If J = the final fission interval, then at any shutdown time t
()e-A1t- LA2t -A2t
N2(t) =ct~N1 1 lJ A2 -Al + ‘2J e
.
(D21)
(D22)
Note that
(D22) ~8 zero,
if the coupling is by (n,y), tkn the f~pstte~ forN2(t)in@~
tkzt is,
-i2tN,.(t) = N2J e . (D23)
(In programming these equations, any potential problem with roundoff can
be avoided by replacing each beta or lambda with, for example, f3(l-10-9/t), where
t is the shutdown time or Atj
appearing in the exponentials. This permits Eqs.
(D20)-(D23) to be evaluated without resorting to a special set of equations, yet
the effects of the change in beta are too small to alter calculated densities.)
The energies are given by
MeV/s = ([N(t)-N(t)’] AE , (D24)
where N(t)’ is the density without neutron absorption.
If the fission rate
elide, the MeV/fiss from
MeV/fiss MeV/s=— =fissls
S is constant and applies to a single fissioning nu-
any nuclide is
[N(t)-N(t)’]~Es
. (D25)
* u.s. Government PRINTINooFFICE 19713-777-08W163
114
Rmlml m lhc Unkd StM.’sof Amuiu. Awildhlc fromNational Tcchniul Information %wicc
VS Dewrtmcnl of Commcru528s Port Royal RoadSprmsixld. VA 22161
Mmmfkhc. S3.00
Wlas 4.00 I ?61 sO l,IJ 73 I -275 10.75 376400 13.00 sol .s2s [s.2s0?642S0 4.s43 151-17s X.oo 276.300 11.00 401425 I 3.25 S26-SS0 15.s0051-07s 5.?5 116.2W 9.00 30!-32s 11.75 4264S0 I 4.00 5s1.575 16..?s
076-100 6.00 ?01-22s 9)5 126.350 i2.00 4s[475 14.s0 576-600 16.50!01-12s 6.S0 216.250 9X7 1s1-375 I ~.~o 476.SW 1s00 601-UP
Nolt.. Add S2.S0 (,$, w.h uldttwul lilo.IwKc mmmcnl Iron) 601 P.@.. up.