research article lateral buckling analysis of the steel...

Research ArticleLateral Buckling Analysis of the Steel-ConcreteComposite Beams in Negative Moment Region

Fengqi Guo Shun Zhou and Lizhong Jiang

School of Civil Engineering Central South University Changsha 410075 China

Correspondence should be addressed to Fengqi Guo fengqiguocsueducn

Received 30 April 2015 Revised 7 July 2015 Accepted 7 July 2015

Academic Editor Joao M P Q Delgado

Copyright copy 2015 Fengqi Guo et al This is an open access article distributed under the Creative Commons Attribution Licensewhich permits unrestricted use distribution and reproduction in any medium provided the original work is properly cited

Distortional buckling is one of the important buckling models of steel-concrete composite beam in negative moment regionRotation restraining rigidity and lateral restraining rigidity which steel beam web to bottom plate of steel-concrete compositeare the key factors to influence the distortional buckling behavior A comprehensive and intensive study on rotation restrainingrigidity and lateral restraining rigidity which steel beamweb to bottom plate of I-shaped steel-concrete composite beam in negativemoment region is conducted in this paper Energy variation principle is adopted to deduce the analytical expressions to calculate therotation restraining rigidity and lateral restraining rigidity Combined with the buckling theory of axial compression thin-walledbars in elastic medium the buckling moment is obtained Theoretical analysis shows that the rotation restraining rigidity andlateral restraining rigidity of steel beam web appear to have a linear relationship with the external loads and could also be negativeCompared with other methods the results calculated by the proposed expressions agree well with the numerical results by ANSYSThe proposed expressions are more concise and suitable than the existing formulas for the engineering application

1 Introduction

The steel-concrete composite beam is composed of profiledsteel or welded I-shaped beam and concrete slab throughshear connectors which can resist external loads togetherBecause this composite structure combines the tensile resis-tance of steel with the compressive resistance of concrete ithas the advantages of higher bearing capacity better plasticityand ductility constructing conveniently and lower costwhich makes it widely used in long-span bridges and high-rise buildings In practical engineering it is unnecessary toverify the lateral buckling of composite beams in positivebending moment region because of the enough bendingrigidity and torsional rigidity of concrete slab However withbigger variable loads andunfavorable loads the bottomflangeof steel beam in the negative moment region would yieldlateral buckling associated with web transverse deformationThe distortion buckling is then likely to occur

In recent years several scholars used the energy varia-tional methods to analyze global stability of composite beamSome authors computed the critical buckling load [1ndash3] and

others compiled the corresponding specifications [4] Thesespecifications only consider global bending instability of thesteel beam web but fail to take into account the distortionalbuckling Besides the critical load formulas by thesemethodsare a little tedious for engineering calculations Based onthe elastic foundation compressive bar method Williamsand Jemah [5] Svensson [6] Goltermann and Svensson [7]and Ronagh [8] successively study the stability of compositebeam under constant axial force increasing the contributionof torsional rigidity of the concrete slabs and participatingarea of the steel girder web plate In order to consider theeffect of bending moment gradient compressive bar variablethe axial force is introduced Diansheng and Xiaomin [9]presented a model for analyzing the local buckling propertyof cold-formed thin-wall steel-concrete composite beamTheelastic buckling stresses at steel beam web and flange wallare calculated by the energy method Jiang [10 11] researchedthe local stability in the negative moment region for steelbeam web of continuous composite beams in attempt toestablish the simplified calculation model of local stabilityunder various loads and propose the critical local buckling

Hindawi Publishing CorporationAdvances in Materials Science and EngineeringVolume 2015 Article ID 763634 8 pageshttpdxdoiorg1011552015763634

2 Advances in Materials Science and Engineering

MxMx

xy y

z0

1 bcbf

hwyc

0 x

tf hctw

Figure 1 Cross section dimensions of steel-concrete composite beams and axes

stress formula under a variety of stress states Ye and Chen[12] improved Svensson compressive bar model appropri-ately Considering the steel beam web effective participationpart two variable axial forces distortional buckling stabilitycritical load calculation formulas were deduced based onthe improved model Making use of the finite element theaccuracy of the abovemethodwas analyzed by calculating thecomposite beam constraint distortional buckling load Zhouet al [13 14] used energy variation principle to deduce thecalculationmethod of rotation restraining rigidity and lateralrestraining rigidity

In this paper a comprehensive and intensive study onrotation restraining rigidity and lateral restraining rigiditywhich steel beam web to bottom plate of steel-concretecomposite beam in negative moment region is conductedThe energy method is used to deduce the theoretical formulafor rotation restraining rigidity and lateral restraining rigiditywhich the steel beam web provides for bottom plate Energyvariation principle is adopted to derive the steel beamcritical stress of positive symmetry bending buckling anddissymmetry bending-torsion buckling in order to calculatethe buckling moment In the end of the paper the proposedformulas are discussed and analyzed

2 Basic Assumptions

The schematic diagram of steel-concrete composite beamis shown in Figure 1 The lateral buckling model of steel I-shaped beam in composite beam is different from the freesimply supported steel beam (unconstrained steel beam)The top flange of steel beam constituted by concrete slabhas big stiffness so the lateral deformation and torsionaldeformation are restricted to a certain degree The bottomflange of steel beam is under compression Although it canyield lateral displacement and torsion angle the bottomflange constrained by the web is not perfectly free Thereforethe lateral buckling of composite beam can be regarded asthe distortional buckling in company with lateral bendingdeformation of steel beam web

The right handed coordinate system 119909119910119911 is fixed to thecentroid of steel beam bottom flange As shown in Figure 1the monosymmetrical composite beam bears a bendingmoment 119872

119909in the 119910119911 plane which shows big stiffness In

order to analyze the rotation restraining rigidity 119896120593of steel

y

bf

tf

x

k1205930kx

ky = infin

Figure 2 Simplified calculation model of steel-concrete compositebeams

beam bottom flange to web and the buckling moment someassumptions are made as follows

(1) The materials are isotropic and perfectly elastic body(2) The element is constant section beam and there were

no initial imperfections(3) The cross-sectional shape of steel beam bottom flange

does not change during distortional buckling yield-ing

(4) The lateral deformation and torsional deformation ofsteel beam top flange could not happen because ofenough stiffness of concrete slab

(5) Due to the negative moment most of concrete incomposite beam has been cracked when bucklingyields Therefore the bending capacity of concrete isignored which means that only the bending capacityof the steel reinforcements in concrete slab is consid-ered

(6) The vertical restraining rigidity whichwebs to bottomflange 119896

119910= infin

Based on above assumptions the problem to be analyzedcan be simplified as a thin-walled constraint distortionproblem which is restricted by spring restraint and verticalrigid constraint in horizontal and distortion direction Thesimplified model is plotted in Figure 2

3 Web Constraint Factor 119896120601

and 119896119909

31 Rotation Constraint Rigidity 119896120601 Figure 3 presents a half-

wave length of web section under consideration The width

Advances in Materials Science and Engineering 3

1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

m(z)

The longitudinal edges of the web


Figure 3 Rectangular plate subjected to compression andmoments

and thickness of web section are ℎ119908and 119905119908 respectively 120582

refers to the half-wave length of web caused by distortionbuckling in longitudinal direction (called as the half-wavelength hereafter) Two transversal opposite sides are simplysupported The side connected to top flange is fixed and theother side connected to bottom flange is simply supportedThe two simply supported sides bear the longitudinal lineardistributed stress 120590 in 119885 direction (compressive stress ispositive and tension stress is negative)The side connected tobottom flange bears the equivalent spring constraint moment119898(119911) which bottom flange exerted on web The coordinate ofgravity centre of steel beam total cross section is representedby minus119910

119888 and the moment of inertia is 119868 According to the

assumptions mentioned above when the negative moment119872119909acts on the reinforcement in concrete slab the axial

compressive stress at bottom edge of web is 1205901 = 119872119909119910119888119868

and the axial compressive stress at top edge of web is 1205902 =

1205901(119910119888minusℎ119908)119910119888Therefore the axial compressive stress at otherpoints of web is 120590 = 1205901(119910119888 + 119910)119910119888

Assuming 119863 = 1198641199053

11990812(1 minus 120583

2) 120583 is Poissonrsquos ratio

of steel 119864 is the elastic modulus of steel 119906 denotes thedeformation function of web The boundary conditions of 119906can be expressed as

[119906]119911=0120582 = 0

[119906]119910=0minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(1)

With (1) the displacement functions are written as

119906 = 119888 [

119910

ℎ119908

+ 2(119910

ℎ119908

)

2+(

119910

ℎ119908

)

3] sin120587119911

120582

(2)

The strain energy of half-wave length web in the case ofsmall deformations is [16ndash18]

1198801 =119863

2int

120582

0int

0

minusℎ119908

[(

1205972119906

1205971199102)

2

+(

1205972119906

1205971199112)

2

+ 21205831205972119906

12059711991021205972119906

1205971199112

+ 2 (1minus120583)( 1205972119906

120597119910120597119911

)

2

]119889119910119889119911

(3)

Substituting (2) into (3) leads to the fact that

1198801 =120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4] (4)

The elastic potential energy caused by half-wave lengthlongitudinal side spring constraint is

1198802 =119896120593

2int

120582

0(

120597119906

120597119910

)

2

119910=0119889119911 (5)

Substituting (2) into (5)

1198802 =1205821198961205931198882

4ℎ119908

2 (6)

The external force work of half-wave length web can becomputed by [16ndash18]

119882 =

119905119908

2int

120582

0int

0

minusℎ119908

120590(

120597119906

120597119911

)

2119889119910119889119911

=

119905119908

2int

120582

0int

0

minusℎ119908

1205901 (119910119888 + 119910)

119910119888

(

120597119906

120597119911

)

2119889119910119889119911

(7)


119882 =

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2minus

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2 (8)

The total potential energy of half-wave length web is

Π = 1198801 +1198802 minus119882 (9)

Substitution of (4) (6) and (8) into (9) results in

Π =

120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4]

+

1205821198961205931198882

4ℎ2119908

minus

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2

+

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2

(10)

Based on principle of resident potential energy weobtained the following

119863

2[

2ℎ3

119908

+

215ℎ119908

(

120587

120582

)

2+

ℎ119908

210(

120587

120582

)

4]+

119896120593

4ℎ2119908

minus

1205901119905119908ℎ119908420

(

120587

120582

)

2+

1205901119905119908ℎ2

119908

1120119910119888

(

120587

120582

)

2= 0

(11)

By solving (11) one can obtain

119896120593= (

119905119908ℎ3

119908

105minus

119905119908ℎ4

119908

280119910119888

)(

120587

120582

)

21205901

minus119863[

4ℎ119908

+

4ℎ119908

15(

120587

120582

)

2+

ℎ3

119908

105(

120587

120582

)

4]

(12)


1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

f(z)



Figure 4 Rectangular plate subjected to compression and lateralstress

32 Lateral Constraint Rigidity 119896119909 The half-wave length of

web section is shown in Figure 4 Two transversal oppositesides are simply supported The side connected to top flangeis fixed and the other side connected to bottom flangecan move laterally The two simply supported sides bearthe longitudinal linear distributed stress 120590 in 119885 direction(similarly compressive stress is taken as positive and tensionstress is negative) The side connected to bottom flange bearsthe equivalent spring constraint distributed force 119891(119911) whichbottom flange exerted on web

Based on above analysis the boundary conditions of119906 canbe expressed as

[119906]119911=0120582 = 0

[119906]119910=minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=0minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(13)

According to above boundary conditions the displace-ment functions can be written as

119906 = [119888 minus 3119888 (119910

ℎ119908

)

2minus 2119888 (

119910

ℎ119908

)

3] sin120587119911

120582

(14)

Substituting (14) into (3) the strain energy of half-wavelength web in the case of small deformations is then obtainedas follows

1198801 =120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2] (15)


1198802 =119896119909

2int

120582

0[119906]

2119910=0 119889119911 (16)


1198802 =1205821198961199091198882

4 (17)

Substituting (14) into (7) the external force work of half-wave length web can be obtained as follows

119882 =

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2minus

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2 (18)

Substituting (15) (17) and (18) into (9) the total potentialenergy of half-wave length web is

Π =

120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2]

+

1205821198961199091198882

4minus

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2

+

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2

(19)

Based on principle of resident potential energy one canhave

119863

2[

6ℎ3

119908

+

65ℎ119908

(

120587

120582

)

2+

13ℎ119908

70(

120587

120582

)

4]+

119896119909

4

minus

131205901119905119908ℎ119908140

(

120587

120582

)

2+

31205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2= 0

(20)

By solving (20) we obtained the following

119896119909= (

13119905119908ℎ119908

35minus

3119905119908ℎ2

119908

35119910119888

)(

120587

120582

)

21205901

minus119863[

12ℎ119908

3 +125ℎ119908

(

120587

120582

)

2+

13ℎ119908

35(

120587

120582

)

4]

(21)

33 Discussion about 119896119909and 119896120601

(1) Equations (12) and (21) indicated that both 119896120601and

119896119909show a linear relationship with the longitudinal

compressive stress 1205901 Generally ℎ119908119910119888 is less than2 so the coefficient before 1205901 is positive for mostsituations The bigger 1205901 is the higher 119896120601 and 119896119909 areAt the same time it is of interest to note that both119896120601and 119896119909which steel beam bottom flange to web are

determined by the compressive stress 1205901 but not bycomposite beam section properties

(2) Since the polynomials on right-hand side of (12) and(21) have negative terms 119896

120601and and 119896

119909could be

negative This is not consistent with regular positivedefinite rigidity and rigidity matrix If the rotationconstraint rigidity and lateral constraint rigidity arenegative the rotation and lateral displacement of steelbeam bottomflange will be restricted by web Namelythe steel beam web will restrict bottom flange tobuckle but the steel beam bottom flange will inducethe web to buckle According to [16] the lateralconstraint rigidity 119896 = 119864119905

3

119908(4ℎ3

119908) is obtained by

using strip method in the elastic constraint compres-sion member buckling model However the restraintaction of two adjacent strips is not considered inthis method Therefore the lateral constraint rigiditywhich has nothing to do with external forces isalways positive But this does not agree with theactual situation Furthermore the neglected rotationconstraint rigidity will lead to certain errors whencalculating buckling load of composite beam


(3) The ratios of the first term second term and thirdterm on the right side of (21) and (12) are

(13120590119905119908ℎ11990835) (120587120582)2

(120590119905119908ℎ3

119908105) (120587120582)2

=

39ℎ2

119908

(31205901119905119908ℎ2

11990835119910119888) (120587120582)

2

(1205901119905119908ℎ4

119908280119910

119888) (120587120582)

2=

24

ℎ2

119908

119863 [12ℎ3

119908+ (125ℎ

119908) (120587120582)

2

+ (13ℎ11990835) (120587120582)

4

]

119863 [4ℎ119908+ (4ℎ11990815) (120587120582)

2

+ (ℎ3

119908105) (120587120582)

4

]

asymp

3

ℎ2

119908

(22)

From (22) ℎ2119908119896119909119896120593is not an infinitesimal value so the

lateral constraint rigidity of bottom flange to web cannot bedisregarded Namely in the calculation the equation 119896

119909= 0

is not available Therefore the lateral constraint rigidity ofbottom flange to web cannot be approximated by zero Thisis different from [16] in which the lateral constraint rigiditywhich the cold-formed thin-walled lipped channel steel websto the top and bottom flange is taken as zero

4 Theoretical Derivation of Critical Moment

41 Derivation of Critical Moment The lateral constraintrigidity and rotation constraint rigidity which steel beamwebto bottom flange can be simplified respectively as

119896119909= 1205721120573120590+119863120572

2 (23)

119896120593= 1205723120573120590+119863120572

4 (24)

120573 = (

120587

120582

)

2

(25)

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037) (26a)

1205722=

12

ℎ3

119908

+

24120573

ℎ119908

+ 037ℎ1199081205732

(26b)

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095) (26c)

1205724=

4

ℎ119908

+ 027ℎ119908120573+ 00095ℎ

3

1199081205732

(26d)

120590 =

119872119909119910119888

119868

=

119875

119860119891

(27)

Therein119863 = 1198641199053

119908[12(1minus120583

2

)] 120583 is Poissonrsquos ratio of steel120590 represents the compressive stress of bottom flange 119875 refersto the compressive force of bottom flange minus119910

119888is the gravity

centre coordinate of steel beam total cross section 119868 is theinertia moment of steel beam 120582 = 119897119899 119899 is the buckling half-wave number 119860

119891is the area of bottom flange

As shown in Figure 2 the thin-walled member is doublysymmetric along 119909-axis and 119910-axis and the centre of origin119874 coincides with the flexural center The displacements oforigin 119874 in 119909 direction and 119910 direction are denoted as 119906 andV respectively Because the rigidity in 119910 direction is infinityV is equal to zero The equivalent distributed forces causedby elastic medium as a result of displacements of thin-walledmember can be written as

119903119909= 119896119909119906

119903119910= 119896119910V

(28)

where 119896119909and 119896119910are the lateral and vertical constraint rigidity

which web to bottom flange respectivelyThe torsional angle which the member rotates around the

bending center is assumed to be 120593The equivalent distributedmoment of torsional thin-walled member induced by equiv-alent spring is

119898 = 119896120593120593 (29)

Neutral balance differential equation of thin-walledmember can be expressed as [13 14]

119864119868119910119906119868119881

+119875 (11990610158401015840

+11991011988612059310158401015840

) + 119896119909[119906 minus (119910

119889minus119910119886) 120593] = 0

119864119868119909V119868119881 +119875 (V10158401015840 minus119909

11988612059310158401015840

) + 119896119910[V+ (119909

119889minus119909119886) 120593] = 0

119864119868119908120593119868119881

+ (11990320119875minus119866119869) 120593

10158401015840

minus119875 (119909119886V10158401015840 minus119910

11988611990610158401015840

)

minus 119896119909[119906 minus (119910

119889minus119910119886) 120593] (119910

119889minus119910119886)

+ 119896119910[V+ (119909

119889minus119909119886) 120593] (119909

119889minus119909119886) + 119896120593120593 = 0

(30)

Therein 119868119910= 119905119891119887311989112 119868

119909= 119887119891119905311989112 119869 = 119887

11989111990531198913 11990320 =

1199092119886+119910

2119886+(119868119909+119868119910)119860119904 119860119904being the area of steel beam 119909

119886is the

horizontal coordinate of the bottom flange section bendingcentre 119909

119886= 0 119910

119886is the vertical coordinate of the bottom

flange section bending centre 119910119886= 0 119909

119889is the horizontal

coordinate of the bottom flange section rotation axis 119909119889=

0 119910119889is the vertical coordinate of the bottom flange section

rotation axis 119910119889= 0 119868119908is the fan-shaped inertia moment of

bottom flange section 119868119908= 0 119864 is the tensile elastic modulus

of steel 119866 is the shear elastic modulus of steelWith substitution of 119910

119886= 0 119910

119889= 0 119909

119886= 0 V = 0 119868

119908= 0

119896119909= 0 119909

119886= 0 119910

119886= 0 and 119910

119889= 0 into (30) one can obtain

119864119868119910119868119906119868119881

+11991011988811986011989111987211990911990610158401015840

+ (1205721120573119910119888119872119909 + 1198681198631205722) 119906 = 0 (31)

119896119910[V+ (119909

119889minus119909119886) 120593] = 0 (32)

(11990320119910119888119860119891119872119909 minus119866119869119868) 120593

10158401015840

+ (1205723120573119910119888119872119909 + 1198681198631205724) 120593 = 0 (33)

When the steel-concrete composite beam in negativemoment region bears lateral bending buckling its neutralbalance equation is shown in (31) and the correspondingboundary conditions are

[119906]119911=0119897 = 0

[11990610158401015840

]119911=0119897 = 0

(34)


Assuming 119906 = 119860 sin(radic120573119911) which satisfies the boundaryconditions according to Galerkinrsquos method

1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)

Due to 1198891198721198881199031119889120573 = 0 we obtained the following

1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)

If 119897radic1205731198881199031120587 is an integer substitution of 120573

1198881199031into (36) leads

to the lateral bending critical moment If 119897radic1205731198881199031120587 is not an

integer the two values of 1205731198881199031

which makes 119897radic1205731198881199031120587 be two

integers most near to 119897radic1205731198881199031120587 are then substituted into (36)

and the smaller value is chosen to be the lateral bendingcritical moment

When the steel beam bottom flange of steel-concretecomposite beam in negativemoment region suffers rotationalbuckling the steel-concrete composite beam will yield lateralbending and torsional bucklingTheneutral balance equationis seen in (33) and the boundary conditions are

[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)

Solving (33) we obtained the following

120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)

Substituting (39) into (38) and with 120593 = 0 one can have

sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)

Because of the fact that 1198891198721198881199032119889120573 = 0 then

1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)

Table 1 Geometric dimension of examples

Number of example ℎ119908mm 119905

119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120

When 119897radic1205731198881199032120587 is an integer the substitution of 120573

1198881199032into

(43) gets the lateral bending critical momentWhen 119897radic1205731198881199032120587

is not an integer a similar calculation mentioned before istaken to obtain the lateral bending critical moment

After getting the lateral bending buckling criticalmoment1198721198881199031

and the bending and torsional buckling critical moment1198721198881199032

the smaller one of these two is taken as the buckling loadof composite beam in negativemoment regionThe analyticalresults indicate that the composite beam in negative momentregion yields as a result of lateral bending and torsionalbuckling acting together Therefore in [11 12] the methodin which only one case is considered is questionable Thepresented work is an improvement to them

To sum up the calculation formula of buckling momentcan be expressed as

119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)

When 119897radic1205731198881199031120587 is not an integer substituting 120573

1198881199031that

corresponds to two integers of the left and right side of119897radic1205731198881199031120587 into (36) the smaller resulting value of 120573

1198881199031is

the desired value And when 119897radic1205731198881199032120587 is not an integer

substituting 1205731198881199032

that corresponds to two integers of the left


Table 2 Calculation results

Number of example ANSYSMPa Literature method [4]MPa Literature method [15]MPa The proposed methodMPa1 581 times 102 221 times 102 838 times 102 583 times 102

2 546 times 102 205 times 102 832 times 102 551 times 102








and right side of 119897radic1205731198881199032120587 into (43) the smaller resulting

value of 1205731198881199032

is the desired value

42 Practical Example Analysis Nine cases of I-shape steel-concrete composite beam are shown in Table 1 The length ofspecimen in negative moment region is equal to 4000mmFinite element method is adopted to calculate these nineexamples by using ANSYS in which the concrete part ofcomposite beam is substituted by lateral restraint and the steelI-beam is simulated by SHELL 43 The method proposed byBritish Steel Construction Institution [4] and the bucklingmodel method [15] are also used to calculate the bucklingloads The obtained results are shown in Table 2

As shown in Table 2 the results obtained by bucklingmodel method [15] tend to be excessively unsafe The resultsby using the method proposed by British Steel ConstructionInstitution [4] are too conservative However the results ofthe proposed method are in good agreement with thoseof ANSYS which means that the proposed method is areasonable and effective method

5 Conclusions

Based on energy method a comprehensive and intensivestudy on rotation restraining rigidity 119896

120601and lateral restrain-

ing rigidity 119896119909which steel beam web to bottom plate of

steel-concrete composite beam in negative moment region isperformed in this paper The expressions of lateral bendingbuckling stress lateral bending and torsional buckling stressand buckling moments of steel-concrete composite beam innegative moment region are deduced Some conclusions aredrawn as follows

(1) Both the rotation constraint rigidity 119896120601and the lateral

constraint rigidity 119896119909show a linear relationship with

longitudinal compressive stress 1205901 at bottom flange

(2) The rotation constraint rigidity 119896120601and the lateral

constraint rigidity 119896119909could be negative When the

rotation constraint rigidity and the lateral constraintrigidity are negative that means the bottom flange ofsteel beam can be restrained by rotation or lateralconstraint when steel beam was in negative momentregion buckling

(3) Since ℎ2119908119896119909119896120593is not infinitesimal the lateral con-

straint rigidity of bottom flange to web cannot beneglected In other words in the calculation theequation 119896

119909= 0 cannot be used Therefore it is

proved theoretically that the lateral constraint rigidityof bottom flange to web cannot be approximated to bezero This point is different with the steel structure

(4) The results obtained by literatures [4 15] showsome deviations with the ANSYS results But theresults by the presented expressions agree well withthe ANSYS results The reason is that the proposedexpressions consider the lateral bending buckling andlateral bending-torsion buckling simultaneously Theproposed method is more reasonable and clearer inphysical concepts in comparison with those methodswhich consider only one buckling mode Besides theproposed expressions are more concise and suitablefor the engineering application

Conflict of Interests

The authors declare that there is no conflict of interestsregarding the publication of this paper

Acknowledgments

The authors would like to acknowledge financial supportfrom Projects (51078355) supported by National NaturalScience Foundation of China Projects (IRT1296) supportedby the Program for Changjiang Scholars and InnovativeResearch Team in University (PCSIRT) and Project (12K104)supported by Scientific Research Fund of Hunan ProvincialEducation Department China Dr Jing-Jing Qi and DrWang-Bao Zhou have tried their best to help the authorsTheauthors express their sincere gratitude to Dr Jing-Jing Qi andDr Wang-Bao Zhou

References

[1] M Ma and O Hughes ldquoLateral distortional buckling ofmonosymmetric I-beams under distributed vertical loadrdquoThin-Walled Structures vol 26 no 2 pp 123ndash143 1996

[2] M A Bradford ldquoLateral-distortional buckling of continuouslyrestrained columnsrdquo Journal of Constructional Steel Researchvol 42 no 2 pp 121ndash139 1997


[3] M L-H Ng and H R Ronagh ldquoAn analytical solution forthe elastic lateral-distortional buckling of I-section beamsrdquoAdvances in Structural Engineering vol 7 no 2 pp 189ndash2002004

[4] R M Lawson and J W RaekhamDesign of Haunched Compos-ite Beams in Buildings Steel Construction Institute 1989

[5] F WWilliams and A K Jemah ldquoBuckling curves for elasticallysupported columns with varying axial force to predict lateralbuckling of beamsrdquo Journal of Constructional Steel Research vol7 no 2 pp 133ndash147 1987

[6] S E Svensson ldquoLateral buckling of beams analysed as elasticallysupported columns subject to a varying axial forcerdquo Journal ofConstructional Steel Research vol 5 no 3 pp 179ndash193 1985

[7] P Goltermann and S E Svensson ldquoLateral distortional buck-ling predicting elastic critical stressrdquo Journal of StructuralEngineering vol 114 no 7 pp 1606ndash1625 1988

[8] H R Ronagh ldquoProgress in the methods of analysis of restricteddistortional buckling of composite bridge girdersrdquo Progress inStructural Engineering and Materials vol 3 no 2 pp 141ndash1482001

[9] Z Diansheng and Y Xiaomin ldquoStudy on beam local buckling ofcold-formed thin-wall steel and concrete compositerdquo IndustrialArchitecture vol 38 supplement pp 539ndash542 2008

[10] L-Z Jiang L-J Zeng and L-L Sun ldquoSteel-concrete compositecontinuous beam web local buckling analysisrdquo Journal of CivilEngineering and Architecture vol 26 no 3 pp 27ndash31 2009

[11] L Jiang and L Sun ldquoThe lateral buckling of steel-concrete com-posite box-beamsrdquo Journal of Huazhong University of Scienceand Technology (Urban Science Edition) vol 25 no 3 pp 5ndash92008

[12] J Ye and W Chen ldquoBeam with elastic constraints of I-shapedsteelmdashconcrete composite distortional bucklingrdquo Journal ofBuilding Structures vol 32 no 6 pp 82ndash91 2011

[13] W-B Zhou L-Z Jiang and Z-W Yu ldquoAnalysis of beamnegative moment zone of the elastic distortional buckling ofsteel-concrete compositerdquo Journal of Central South University(Natural Science Edition) vol 43 no 6 pp 2316ndash2323 2012

[14] W-B Zhou L-Z Jiang and Z-W Yu ldquoThe calculation formulaof steel concrete composite beams under negative bendingzonedistortional buckling momentrdquo Chinese Journal of Compu-tational Mechanics vol 29 no 3 pp 446ndash451 2012

[15] P Zhu Steel-Concrete Composite Beam Design Theory ChinaArchitecture amp Building Press Beijing China 1989

[16] J Yao and J-G Teng ldquoWeb rotational restraint in elasticdistortional buckling of cold-formed lipped channel sectionsrdquoEngineering Mechanics vol 25 no 4 pp 65ndash69 2008

[17] W-B Zhou L-Z Jiang and Z-W Yu ldquoClosed-form solutionfor shear lag effects of steel-concrete composite box beamsconsidering shear deformation and sliprdquo Journal of CentralSouth University vol 19 no 10 pp 2976ndash2982 2012

[18] W-B Zhou L-Z Jiang and Z-W Yu ldquoClosed-form solutionto thin-walled box girders considering the effects of sheardeformation and shear lagrdquo Journal of Central South Universityvol 19 no 9 pp 2650ndash2655 2012

Submit your manuscripts athttpwwwhindawicom

ScientificaHindawi Publishing Corporationhttpwwwhindawicom Volume 2014

CorrosionInternational Journal of

Hindawi Publishing Corporationhttpwwwhindawicom Volume 2014

Polymer ScienceInternational Journal of



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CompositesJournal of

NanoparticlesJournal of



International Journal of

Biomaterials


NanoscienceJournal of

TextilesHindawi Publishing Corporation httpwwwhindawicom Volume 2014

Journal of

NanotechnologyHindawi Publishing Corporationhttpwwwhindawicom Volume 2014

Journal of

CrystallographyJournal of


The Scientific World JournalHindawi Publishing Corporation httpwwwhindawicom Volume 2014


CoatingsJournal of

Advances in

Materials Science and EngineeringHindawi Publishing Corporationhttpwwwhindawicom Volume 2014

Smart Materials Research



MetallurgyJournal of


BioMed Research International

MaterialsJournal of


Nano

materials


Journal ofNanomaterials


MxMx

xy y

z0

1 bcbf

hwyc

0 x

tf hctw

Figure 1 Cross section dimensions of steel-concrete composite beams and axes

stress formula under a variety of stress states Ye and Chen[12] improved Svensson compressive bar model appropri-ately Considering the steel beam web effective participationpart two variable axial forces distortional buckling stabilitycritical load calculation formulas were deduced based onthe improved model Making use of the finite element theaccuracy of the abovemethodwas analyzed by calculating thecomposite beam constraint distortional buckling load Zhouet al [13 14] used energy variation principle to deduce thecalculationmethod of rotation restraining rigidity and lateralrestraining rigidity

In this paper a comprehensive and intensive study onrotation restraining rigidity and lateral restraining rigiditywhich steel beam web to bottom plate of steel-concretecomposite beam in negative moment region is conductedThe energy method is used to deduce the theoretical formulafor rotation restraining rigidity and lateral restraining rigiditywhich the steel beam web provides for bottom plate Energyvariation principle is adopted to derive the steel beamcritical stress of positive symmetry bending buckling anddissymmetry bending-torsion buckling in order to calculatethe buckling moment In the end of the paper the proposedformulas are discussed and analyzed

2 Basic Assumptions

The schematic diagram of steel-concrete composite beamis shown in Figure 1 The lateral buckling model of steel I-shaped beam in composite beam is different from the freesimply supported steel beam (unconstrained steel beam)The top flange of steel beam constituted by concrete slabhas big stiffness so the lateral deformation and torsionaldeformation are restricted to a certain degree The bottomflange of steel beam is under compression Although it canyield lateral displacement and torsion angle the bottomflange constrained by the web is not perfectly free Thereforethe lateral buckling of composite beam can be regarded asthe distortional buckling in company with lateral bendingdeformation of steel beam web

The right handed coordinate system 119909119910119911 is fixed to thecentroid of steel beam bottom flange As shown in Figure 1the monosymmetrical composite beam bears a bendingmoment 119872

119909in the 119910119911 plane which shows big stiffness In

order to analyze the rotation restraining rigidity 119896120593of steel

y

bf

tf

x

k1205930kx

ky = infin

Figure 2 Simplified calculation model of steel-concrete compositebeams

beam bottom flange to web and the buckling moment someassumptions are made as follows

(1) The materials are isotropic and perfectly elastic body(2) The element is constant section beam and there were

no initial imperfections(3) The cross-sectional shape of steel beam bottom flange

does not change during distortional buckling yield-ing

(4) The lateral deformation and torsional deformation ofsteel beam top flange could not happen because ofenough stiffness of concrete slab

(5) Due to the negative moment most of concrete incomposite beam has been cracked when bucklingyields Therefore the bending capacity of concrete isignored which means that only the bending capacityof the steel reinforcements in concrete slab is consid-ered

(6) The vertical restraining rigidity whichwebs to bottomflange 119896

119910= infin

Based on above assumptions the problem to be analyzedcan be simplified as a thin-walled constraint distortionproblem which is restricted by spring restraint and verticalrigid constraint in horizontal and distortion direction Thesimplified model is plotted in Figure 2

3 Web Constraint Factor 119896120601

and 119896119909

31 Rotation Constraint Rigidity 119896120601 Figure 3 presents a half-

wave length of web section under consideration The width


1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

m(z)











Assuming 119863 = 1198641199053

11990812(1 minus 120583



[119906]119911=0120582 = 0

[119906]119910=0minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(1)


119906 = 119888 [

119910

ℎ119908

+ 2(119910

ℎ119908

)

2+(

119910

ℎ119908

)

3] sin120587119911

120582

(2)


1198801 =119863

2int

120582

0int

0

minusℎ119908

[(

1205972119906

1205971199102)

2

+(

1205972119906

1205971199112)

2

+ 21205831205972119906

12059711991021205972119906

1205971199112

+ 2 (1minus120583)( 1205972119906

120597119910120597119911

)

2

]119889119910119889119911

(3)


1198801 =120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4] (4)


1198802 =119896120593

2int

120582

0(

120597119906

120597119910

)

2

119910=0119889119911 (5)


1198802 =1205821198961205931198882

4ℎ119908

2 (6)


119882 =

119905119908

2int

120582

0int

0

minusℎ119908

120590(

120597119906

120597119911

)

2119889119910119889119911

=

119905119908

2int

120582

0int

0

minusℎ119908

1205901 (119910119888 + 119910)

119910119888

(

120597119906

120597119911

)

2119889119910119889119911

(7)


119882 =

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2minus

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2 (8)


Π = 1198801 +1198802 minus119882 (9)


Π =

120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4]

+

1205821198961205931198882

4ℎ2119908

minus

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2

+

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2

(10)


119863

2[

2ℎ3

119908

+

215ℎ119908

(

120587

120582

)

2+

ℎ119908

210(

120587

120582

)

4]+

119896120593

4ℎ2119908

minus

1205901119905119908ℎ119908420

(

120587

120582

)

2+

1205901119905119908ℎ2

119908

1120119910119888

(

120587

120582

)

2= 0

(11)


119896120593= (

119905119908ℎ3

119908

105minus

119905119908ℎ4

119908

280119910119888

)(

120587

120582

)

21205901

minus119863[

4ℎ119908

+

4ℎ119908

15(

120587

120582

)

2+

ℎ3

119908

105(

120587

120582

)

4]

(12)


1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

f(z)







[119906]119911=0120582 = 0

[119906]119910=minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=0minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(13)


119906 = [119888 minus 3119888 (119910

ℎ119908

)

2minus 2119888 (

119910

ℎ119908

)

3] sin120587119911

120582

(14)


1198801 =120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2] (15)


1198802 =119896119909

2int

120582

0[119906]

2119910=0 119889119911 (16)


1198802 =1205821198961199091198882

4 (17)


119882 =

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2minus

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2 (18)


Π =

120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2]

+

1205821198961199091198882

4minus

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2

+

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2

(19)


119863

2[

6ℎ3

119908

+

65ℎ119908

(

120587

120582

)

2+

13ℎ119908

70(

120587

120582

)

4]+

119896119909

4

minus

131205901119905119908ℎ119908140

(

120587

120582

)

2+

31205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2= 0

(20)


119896119909= (

13119905119908ℎ119908

35minus

3119905119908ℎ2

119908

35119910119888

)(

120587

120582

)

21205901

minus119863[

12ℎ119908

3 +125ℎ119908

(

120587

120582

)

2+

13ℎ119908

35(

120587

120582

)

4]

(21)







120601and and 119896

119909could be


3

119908(4ℎ3





(13120590119905119908ℎ11990835) (120587120582)2

(120590119905119908ℎ3

119908105) (120587120582)2

=

39ℎ2

119908

(31205901119905119908ℎ2

11990835119910119888) (120587120582)

2

(1205901119905119908ℎ4

119908280119910

119888) (120587120582)

2=

24

ℎ2

119908

119863 [12ℎ3

119908+ (125ℎ

119908) (120587120582)

2

+ (13ℎ11990835) (120587120582)

4

]

119863 [4ℎ119908+ (4ℎ11990815) (120587120582)

2

+ (ℎ3

119908105) (120587120582)

4

]

asymp

3

ℎ2

119908

(22)



119909= 0




119896119909= 1205721120573120590+119863120572

2 (23)

119896120593= 1205723120573120590+119863120572

4 (24)

120573 = (

120587

120582

)

2

(25)

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037) (26a)

1205722=

12

ℎ3

119908

+

24120573

ℎ119908

+ 037ℎ1199081205732

(26b)

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095) (26c)

1205724=

4

ℎ119908

+ 027ℎ119908120573+ 00095ℎ

3

1199081205732

(26d)

120590 =

119872119909119910119888

119868

=

119875

119860119891

(27)

Therein119863 = 1198641199053

119908[12(1minus120583

2






119903119909= 119896119909119906

119903119910= 119896119910V

(28)




119898 = 119896120593120593 (29)


119864119868119910119906119868119881

+119875 (11990610158401015840

+11991011988612059310158401015840

) + 119896119909[119906 minus (119910

119889minus119910119886) 120593] = 0

119864119868119909V119868119881 +119875 (V10158401015840 minus119909

11988612059310158401015840

) + 119896119910[V+ (119909

119889minus119909119886) 120593] = 0

119864119868119908120593119868119881

+ (11990320119875minus119866119869) 120593

10158401015840

minus119875 (119909119886V10158401015840 minus119910

11988611990610158401015840

)

minus 119896119909[119906 minus (119910

119889minus119910119886) 120593] (119910

119889minus119910119886)

+ 119896119910[V+ (119909

119889minus119909119886) 120593] (119909

119889minus119909119886) + 119896120593120593 = 0

(30)

Therein 119868119910= 119905119891119887311989112 119868

119909= 119887119891119905311989112 119869 = 119887

11989111990531198913 11990320 =

1199092119886+119910


119886is the


119886= 0 119910









119886= 0 119910

119889= 0 119909

119886= 0 V = 0 119868

119908= 0

119896119909= 0 119909

119886= 0 119910

119886= 0 and 119910


119864119868119910119868119906119868119881

+11991011988811986011989111987211990911990610158401015840

+ (1205721120573119910119888119872119909 + 1198681198631205722) 119906 = 0 (31)

119896119910[V+ (119909

119889minus119909119886) 120593] = 0 (32)

(11990320119910119888119860119891119872119909 minus119866119869119868) 120593

10158401015840

+ (1205723120573119910119888119872119909 + 1198681198631205724) 120593 = 0 (33)


[119906]119911=0119897 = 0

[11990610158401015840

]119911=0119897 = 0

(34)



1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)


1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)


1198881199031into (36) leads







[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)


120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)


sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)


1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)



119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120


1198881199032into







119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)


1198881199031that


1198881199031is


substituting 1205731198881199032














value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials




1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

m(z)











Assuming 119863 = 1198641199053

11990812(1 minus 120583



[119906]119911=0120582 = 0

[119906]119910=0minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(1)


119906 = 119888 [

119910

ℎ119908

+ 2(119910

ℎ119908

)

2+(

119910

ℎ119908

)

3] sin120587119911

120582

(2)


1198801 =119863

2int

120582

0int

0

minusℎ119908

[(

1205972119906

1205971199102)

2

+(

1205972119906

1205971199112)

2

+ 21205831205972119906

12059711991021205972119906

1205971199112

+ 2 (1minus120583)( 1205972119906

120597119910120597119911

)

2

]119889119910119889119911

(3)


1198801 =120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4] (4)


1198802 =119896120593

2int

120582

0(

120597119906

120597119910

)

2

119910=0119889119911 (5)


1198802 =1205821198961205931198882

4ℎ119908

2 (6)


119882 =

119905119908

2int

120582

0int

0

minusℎ119908

120590(

120597119906

120597119911

)

2119889119910119889119911

=

119905119908

2int

120582

0int

0

minusℎ119908

1205901 (119910119888 + 119910)

119910119888

(

120597119906

120597119911

)

2119889119910119889119911

(7)


119882 =

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2minus

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2 (8)


Π = 1198801 +1198802 minus119882 (9)


Π =

120582119863

2[

21198882

ℎ3

119908

+

21198882

15ℎ119908

(

120587

120582

)

2+

1198882ℎ119908

210(

120587

120582

)

4]

+

1205821198961205931198882

4ℎ2119908

minus

12058211988821205901119905119908ℎ119908420

(

120587

120582

)

2

+

12058211988821205901119905119908ℎ

2

119908

1120119910119888

(

120587

120582

)

2

(10)


119863

2[

2ℎ3

119908

+

215ℎ119908

(

120587

120582

)

2+

ℎ119908

210(

120587

120582

)

4]+

119896120593

4ℎ2119908

minus

1205901119905119908ℎ119908420

(

120587

120582

)

2+

1205901119905119908ℎ2

119908

1120119910119888

(

120587

120582

)

2= 0

(11)


119896120593= (

119905119908ℎ3

119908

105minus

119905119908ℎ4

119908

280119910119888

)(

120587

120582

)

21205901

minus119863[

4ℎ119908

+

4ℎ119908

15(

120587

120582

)

2+

ℎ3

119908

105(

120587

120582

)

4]

(12)


1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

f(z)







[119906]119911=0120582 = 0

[119906]119910=minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=0minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(13)


119906 = [119888 minus 3119888 (119910

ℎ119908

)

2minus 2119888 (

119910

ℎ119908

)

3] sin120587119911

120582

(14)


1198801 =120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2] (15)


1198802 =119896119909

2int

120582

0[119906]

2119910=0 119889119911 (16)


1198802 =1205821198961199091198882

4 (17)


119882 =

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2minus

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2 (18)


Π =

120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2]

+

1205821198961199091198882

4minus

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2

+

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2

(19)


119863

2[

6ℎ3

119908

+

65ℎ119908

(

120587

120582

)

2+

13ℎ119908

70(

120587

120582

)

4]+

119896119909

4

minus

131205901119905119908ℎ119908140

(

120587

120582

)

2+

31205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2= 0

(20)


119896119909= (

13119905119908ℎ119908

35minus

3119905119908ℎ2

119908

35119910119888

)(

120587

120582

)

21205901

minus119863[

12ℎ119908

3 +125ℎ119908

(

120587

120582

)

2+

13ℎ119908

35(

120587

120582

)

4]

(21)







120601and and 119896

119909could be


3

119908(4ℎ3





(13120590119905119908ℎ11990835) (120587120582)2

(120590119905119908ℎ3

119908105) (120587120582)2

=

39ℎ2

119908

(31205901119905119908ℎ2

11990835119910119888) (120587120582)

2

(1205901119905119908ℎ4

119908280119910

119888) (120587120582)

2=

24

ℎ2

119908

119863 [12ℎ3

119908+ (125ℎ

119908) (120587120582)

2

+ (13ℎ11990835) (120587120582)

4

]

119863 [4ℎ119908+ (4ℎ11990815) (120587120582)

2

+ (ℎ3

119908105) (120587120582)

4

]

asymp

3

ℎ2

119908

(22)



119909= 0




119896119909= 1205721120573120590+119863120572

2 (23)

119896120593= 1205723120573120590+119863120572

4 (24)

120573 = (

120587

120582

)

2

(25)

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037) (26a)

1205722=

12

ℎ3

119908

+

24120573

ℎ119908

+ 037ℎ1199081205732

(26b)

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095) (26c)

1205724=

4

ℎ119908

+ 027ℎ119908120573+ 00095ℎ

3

1199081205732

(26d)

120590 =

119872119909119910119888

119868

=

119875

119860119891

(27)

Therein119863 = 1198641199053

119908[12(1minus120583

2






119903119909= 119896119909119906

119903119910= 119896119910V

(28)




119898 = 119896120593120593 (29)


119864119868119910119906119868119881

+119875 (11990610158401015840

+11991011988612059310158401015840

) + 119896119909[119906 minus (119910

119889minus119910119886) 120593] = 0

119864119868119909V119868119881 +119875 (V10158401015840 minus119909

11988612059310158401015840

) + 119896119910[V+ (119909

119889minus119909119886) 120593] = 0

119864119868119908120593119868119881

+ (11990320119875minus119866119869) 120593

10158401015840

minus119875 (119909119886V10158401015840 minus119910

11988611990610158401015840

)

minus 119896119909[119906 minus (119910

119889minus119910119886) 120593] (119910

119889minus119910119886)

+ 119896119910[V+ (119909

119889minus119909119886) 120593] (119909

119889minus119909119886) + 119896120593120593 = 0

(30)

Therein 119868119910= 119905119891119887311989112 119868

119909= 119887119891119905311989112 119869 = 119887

11989111990531198913 11990320 =

1199092119886+119910


119886is the


119886= 0 119910









119886= 0 119910

119889= 0 119909

119886= 0 V = 0 119868

119908= 0

119896119909= 0 119909

119886= 0 119910

119886= 0 and 119910


119864119868119910119868119906119868119881

+11991011988811986011989111987211990911990610158401015840

+ (1205721120573119910119888119872119909 + 1198681198631205722) 119906 = 0 (31)

119896119910[V+ (119909

119889minus119909119886) 120593] = 0 (32)

(11990320119910119888119860119891119872119909 minus119866119869119868) 120593

10158401015840

+ (1205723120573119910119888119872119909 + 1198681198631205724) 120593 = 0 (33)


[119906]119911=0119897 = 0

[11990610158401015840

]119911=0119897 = 0

(34)



1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)


1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)


1198881199031into (36) leads







[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)


120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)


sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)


1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)



119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120


1198881199032into







119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)


1198881199031that


1198881199031is


substituting 1205731198881199032














value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials




1205901 1205901

yc ycz

y

1205902 1205902

120582 tw

h

f(z)







[119906]119911=0120582 = 0

[119906]119910=minusℎ

119908

= 0

[

120597119906

120597119910

]

119910=0minusℎ119908

= 0

[minus119863(

1205972119906

1205971199112 +120583

1205972119906

1205971199102)]119911=0120582

= 0

(13)


119906 = [119888 minus 3119888 (119910

ℎ119908

)

2minus 2119888 (

119910

ℎ119908

)

3] sin120587119911

120582

(14)


1198801 =120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2] (15)


1198802 =119896119909

2int

120582

0[119906]

2119910=0 119889119911 (16)


1198802 =1205821198961199091198882

4 (17)


119882 =

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2minus

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2 (18)


Π =

120582119863

2[

61198882

ℎ3

119908

+

131198882ℎ119908

70(

120587

120582

)

4+

61198882

5ℎ119908

(

120587

120582

)

2]

+

1205821198961199091198882

4minus

1312058211988821205901119905119908ℎ119908140

(

120587

120582

)

2

+

312058211988821205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2

(19)


119863

2[

6ℎ3

119908

+

65ℎ119908

(

120587

120582

)

2+

13ℎ119908

70(

120587

120582

)

4]+

119896119909

4

minus

131205901119905119908ℎ119908140

(

120587

120582

)

2+

31205901119905119908ℎ2

119908

140119910119888

(

120587

120582

)

2= 0

(20)


119896119909= (

13119905119908ℎ119908

35minus

3119905119908ℎ2

119908

35119910119888

)(

120587

120582

)

21205901

minus119863[

12ℎ119908

3 +125ℎ119908

(

120587

120582

)

2+

13ℎ119908

35(

120587

120582

)

4]

(21)







120601and and 119896

119909could be


3

119908(4ℎ3





(13120590119905119908ℎ11990835) (120587120582)2

(120590119905119908ℎ3

119908105) (120587120582)2

=

39ℎ2

119908

(31205901119905119908ℎ2

11990835119910119888) (120587120582)

2

(1205901119905119908ℎ4

119908280119910

119888) (120587120582)

2=

24

ℎ2

119908

119863 [12ℎ3

119908+ (125ℎ

119908) (120587120582)

2

+ (13ℎ11990835) (120587120582)

4

]

119863 [4ℎ119908+ (4ℎ11990815) (120587120582)

2

+ (ℎ3

119908105) (120587120582)

4

]

asymp

3

ℎ2

119908

(22)



119909= 0




119896119909= 1205721120573120590+119863120572

2 (23)

119896120593= 1205723120573120590+119863120572

4 (24)

120573 = (

120587

120582

)

2

(25)

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037) (26a)

1205722=

12

ℎ3

119908

+

24120573

ℎ119908

+ 037ℎ1199081205732

(26b)

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095) (26c)

1205724=

4

ℎ119908

+ 027ℎ119908120573+ 00095ℎ

3

1199081205732

(26d)

120590 =

119872119909119910119888

119868

=

119875

119860119891

(27)

Therein119863 = 1198641199053

119908[12(1minus120583

2






119903119909= 119896119909119906

119903119910= 119896119910V

(28)




119898 = 119896120593120593 (29)


119864119868119910119906119868119881

+119875 (11990610158401015840

+11991011988612059310158401015840

) + 119896119909[119906 minus (119910

119889minus119910119886) 120593] = 0

119864119868119909V119868119881 +119875 (V10158401015840 minus119909

11988612059310158401015840

) + 119896119910[V+ (119909

119889minus119909119886) 120593] = 0

119864119868119908120593119868119881

+ (11990320119875minus119866119869) 120593

10158401015840

minus119875 (119909119886V10158401015840 minus119910

11988611990610158401015840

)

minus 119896119909[119906 minus (119910

119889minus119910119886) 120593] (119910

119889minus119910119886)

+ 119896119910[V+ (119909

119889minus119909119886) 120593] (119909

119889minus119909119886) + 119896120593120593 = 0

(30)

Therein 119868119910= 119905119891119887311989112 119868

119909= 119887119891119905311989112 119869 = 119887

11989111990531198913 11990320 =

1199092119886+119910


119886is the


119886= 0 119910









119886= 0 119910

119889= 0 119909

119886= 0 V = 0 119868

119908= 0

119896119909= 0 119909

119886= 0 119910

119886= 0 and 119910


119864119868119910119868119906119868119881

+11991011988811986011989111987211990911990610158401015840

+ (1205721120573119910119888119872119909 + 1198681198631205722) 119906 = 0 (31)

119896119910[V+ (119909

119889minus119909119886) 120593] = 0 (32)

(11990320119910119888119860119891119872119909 minus119866119869119868) 120593

10158401015840

+ (1205723120573119910119888119872119909 + 1198681198631205724) 120593 = 0 (33)


[119906]119911=0119897 = 0

[11990610158401015840

]119911=0119897 = 0

(34)



1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)


1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)


1198881199031into (36) leads







[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)


120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)


sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)


1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)



119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120


1198881199032into







119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)


1198881199031that


1198881199031is


substituting 1205731198881199032














value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials





(13120590119905119908ℎ11990835) (120587120582)2

(120590119905119908ℎ3

119908105) (120587120582)2

=

39ℎ2

119908

(31205901119905119908ℎ2

11990835119910119888) (120587120582)

2

(1205901119905119908ℎ4

119908280119910

119888) (120587120582)

2=

24

ℎ2

119908

119863 [12ℎ3

119908+ (125ℎ

119908) (120587120582)

2

+ (13ℎ11990835) (120587120582)

4

]

119863 [4ℎ119908+ (4ℎ11990815) (120587120582)

2

+ (ℎ3

119908105) (120587120582)

4

]

asymp

3

ℎ2

119908

(22)



119909= 0




119896119909= 1205721120573120590+119863120572

2 (23)

119896120593= 1205723120573120590+119863120572

4 (24)

120573 = (

120587

120582

)

2

(25)

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037) (26a)

1205722=

12

ℎ3

119908

+

24120573

ℎ119908

+ 037ℎ1199081205732

(26b)

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095) (26c)

1205724=

4

ℎ119908

+ 027ℎ119908120573+ 00095ℎ

3

1199081205732

(26d)

120590 =

119872119909119910119888

119868

=

119875

119860119891

(27)

Therein119863 = 1198641199053

119908[12(1minus120583

2






119903119909= 119896119909119906

119903119910= 119896119910V

(28)




119898 = 119896120593120593 (29)


119864119868119910119906119868119881

+119875 (11990610158401015840

+11991011988612059310158401015840

) + 119896119909[119906 minus (119910

119889minus119910119886) 120593] = 0

119864119868119909V119868119881 +119875 (V10158401015840 minus119909

11988612059310158401015840

) + 119896119910[V+ (119909

119889minus119909119886) 120593] = 0

119864119868119908120593119868119881

+ (11990320119875minus119866119869) 120593

10158401015840

minus119875 (119909119886V10158401015840 minus119910

11988611990610158401015840

)

minus 119896119909[119906 minus (119910

119889minus119910119886) 120593] (119910

119889minus119910119886)

+ 119896119910[V+ (119909

119889minus119909119886) 120593] (119909

119889minus119909119886) + 119896120593120593 = 0

(30)

Therein 119868119910= 119905119891119887311989112 119868

119909= 119887119891119905311989112 119869 = 119887

11989111990531198913 11990320 =

1199092119886+119910


119886is the


119886= 0 119910









119886= 0 119910

119889= 0 119909

119886= 0 V = 0 119868

119908= 0

119896119909= 0 119909

119886= 0 119910

119886= 0 and 119910


119864119868119910119868119906119868119881

+11991011988811986011989111987211990911990610158401015840

+ (1205721120573119910119888119872119909 + 1198681198631205722) 119906 = 0 (31)

119896119910[V+ (119909

119889minus119909119886) 120593] = 0 (32)

(11990320119910119888119860119891119872119909 minus119866119869119868) 120593

10158401015840

+ (1205723120573119910119888119872119909 + 1198681198631205724) 120593 = 0 (33)


[119906]119911=0119897 = 0

[11990610158401015840

]119911=0119897 = 0

(34)



1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)


1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)


1198881199031into (36) leads







[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)


120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)


sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)


1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)



119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120


1198881199032into







119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)


1198881199031that


1198881199031is


substituting 1205731198881199032














value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials





1205732minus

119872119909119910119888119860119891

119864119868119910119868

120573 +

(1205721120573119872119909119910119888119868 + 119863120572

2)

119864119868119910

= 0 (35)

By solving (35)

1198721198881199031 =

119864119868119910120573 + 1198631205722120573

(119860119891minus 1205721) 119910119888

119868 (36)


1205731198881199031 =

346

radic119864119868119910ℎ3119908119863 + 037ℎ4

119908

1198991198881199031 =

119897radic1205731198881199031120587

(37)


1198881199031into (36) leads







[120593]119911=0119897 = 0

[12059310158401015840

]119911=0119897 = 0

(38)

Assume 1205852 = (1205723120573119872119909119910119888119868 + 119863120572

4)(1199032

0119872119909119910119888119860119891119868 minus 119866119869)


120593 = 119860 sin 120585119911 +119861 cos 120585119911 (39)


sin 120585119897 = 0 (40)

120585 =

119899120587

119897

= radic120573 (41)

(1205723120573119872119909119910119888119868 + 1198631205724)

(11990320119872119909119910119888119860119891119868 minus 119866119869)

= 120573 (42)

Solving (42)

1198721198881199032 =

1198631205724120573 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868 (43)


1205731198881199032

=

205

ℎ2

119908

1198991198881199032

=

119897radic1205731198881199032

120587

(44)



119908mm 119905

119891mm 119887

119891mm

1 1886 7 114 1002 1886 7 104 1003 1886 7 94 1004 1886 8 94 1005 1886 9 94 1006 150 8 94 1007 200 8 94 1008 200 8 94 809 200 8 94 120


1198881199032into







119872119888119903

= min1198641198681199101205731198881199031 + 11986312057221205731198881199031

(119860119891minus 1205721) 119910119888

119868

11986312057241205731198881199032 + 119866119869

(11990320119860119891 minus 1205723) 119910119888

119868

1205731198881199031

=

346

radic119864119868119910ℎ3

119908119863 + 037ℎ

4

119908

1205731198881199032

=

205

ℎ2

119908

1205721= 119905119908ℎ119908(

0086ℎ119908

119910119888

minus 037)

1205722=

12

ℎ3

119908

+

241205731198881199031

ℎ119908

+ 037ℎ1199081205732

1198881199031

1205723= 119905119908ℎ3

119908(

00036ℎ119908

119910119888

minus 00095)

1205724=

4

ℎ119908

+ 027ℎ1199081205731198881199032+ 00095ℎ

3

1199081205732

1198881199032

(45)


1198881199031that


1198881199031is


substituting 1205731198881199032














value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials















value of 1205731198881199032




5 Conclusions


















Acknowledgments


References



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials



























CeramicsJournal of







Biomaterials




Journal of


Journal of





CoatingsJournal of

Advances in








MaterialsJournal of


Nano

materials



research article lateral buckling analysis of the steel...

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