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Design of an Intermediate Gearbox for the Trailing Edge Flaps in a High Lift System for the Airbus A350
“Gearing up for Senior Capstone”
Team #4 Mech 310 May 1, 2015
Trent Hosokawa (Gear Analysis, Bearing Selection, Deflection Analysis) Joey Miyamoto (Shaft Analysis, 2D Drawings, Shear/Moment Diagrams)
Sonja Feck (Shaft Analysis, 2D Drawings, Shaft CAD) Nina Lepp (Housing Design, CAD Assembly, FEA, Housing Analysis) Charlton Azuoma (Lubrication/Sealant Selection, Gasket Design, ORing
Assembly)
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ABSTRACT
This report studies a gearbox used for the Airbus A350, specifically for the trailing edge
flaps of a high lift system. The gearbox assembly is comprised of a sealed housing, an input and
an output shaft, two spur gears, and four roller bearings. The gears within the assembly have a
1:1 ratio and are used to simply change the direction of rotation. Analysis was conducted to
determine forces applied on the shaft from the spur gears as well as the reaction forces from the
bearings. These forces were found using an operating speed of 650 rpm, an operating torque of
1500 inlb, a limit torque of 3500 inlb and an ultimate torque of 5250 inlb. The location of the
critical stress point was identified to be at the shoulder of the shaft and analysis was conducted at
this location, specifically in the keyway. Using Solidworks, these parts were designed and
assembled as seen below in Figure 1. The gearbox design met all specified parameters, including
requirements added throughout the design and analysis process.
DESIGN REQUIREMENTS
Through computational and theoretical analysis, the required parameters were determined
and displayed below in Table 1. In this table, colorcoding was used to specify the status of a
requirement. Green shading is used for positive margins, yellow for margins near zero, and red
for negative margins. All values in Table 1 are green, indicating that the values all have a
positive margin which means all of the requirements were met. Some requirements had to be met
exactly with no variation, such as the input and output length. It can be seen in Table 1 that the
gearbox assembly complied with these requirements and they have a positive margin. The
overall length of the assembly is 5 in, and the height is 9.40 in. The input and output coupling
diameter is 1.25 in, which results in a margin of 0. The basis of estimate “By Design” specifies
that the value was found through computational and/or theoretical analysis, with the necessary
equations which can be seen in the Analysis section of the report. In similar fashion, values
found “By Analysis” were analyzed using the SolidWorks 3D design and program. All the
values below in Table 1 meet the minimum requirements, with the smallest margin being at 0%
for numerous requirements, and the largest margin of 16.3%, for the input and output coupling
diameter, which allows for more than enough space between the design and the requirement.
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Table 1. Technical Design Requirements of the Gearbox Assembly
Length (in) ≤ 5.0 5.0 By Design 0 %
Height (in) ≤ 10.0 9.4 By Design 6 %
Input Length (in) 2.0 2.0 By Design 0 %
Output Length (in) 4.0 4.0 By Design 0 %
Input/Output Length (in) 4.0 4.0 By Design 0 %
Input and Output Coupling Diameter (in) ≤ 1.5 1.255 By Analysis 16.3 %
Four ¼28 UNF Mounting Bolts Comply Comply By Design N/A
Speed (rpm) 650 Comply By Design N/A
Operating Torque (inlb) 1500 Comply By Design N/A
Limit Torque Static Yield (inlb) 3500 Comply By Design N/A
Ultimate Torque yield ok, but no fracture (inlb) 5250 Comply By Design N/A
1 Life Cycle (106 revs) 40 Infinite By Analysis N/A
Fatigue Life Requirement 6 N/A N/A *
Unit Must be Sealed Comply Comply By Design N/A
Breakout Torque (inlb) < 10.0 8.727 By Design 12.73 %
Temperature Comply Comply By Design N/A
Surface Wear Comply Comply By Design N/A
Vibration Comply No By Design **
Corrosion Resistant Comply Comply By Design N/A
*This value was not necessary to calculate due to the assumption of infinite life. Infinite life is
discussed in Section C of shaft analysis.
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**The Vibration Testing could not be completed, because the version of Solidworks used for the
simulation could not load properly to produce frequency results.
COMPONENT CONFIGURATION
Table 2. Gearbox Assembly Overview
Assembly Overview
General Description This assembly is a gearbox assembly for an A350 high lift actuation system. The gearbox is used to change the direction of the rotation of the shaft. The gearbox is sealed and pressurized in order to ensure survival at a range of pressures and temperatures. Torque transmitted to the assembly can potentially vary so it is important that the assembly is able to withstand high torque values.
Basic Operation The central hydraulic power control unit (PCU) of the A350 high lift actuation lift system supplies the necessary power to operate flap panels on each wing. Mechanical power is transmitted through the mechanical transmission shaft to the rotary actuators, which move the flaps on the tracks of the wing. The gearboxes in the system are necessary for larger direction changes for power transmission.[1]
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Figure 1. Exploded View of Gearbox Assembly with Primary Component Callouts
Table 3. Description of the Primary Gearbox Components
ID #
Primary Components
Primary Function Geometry Positioning Failure Modes
1 Input Housing (Red)
Protect gears from damage and keeps lubricant inside, contains bore hole for input shaft
Has a length of 5 in, height of 9.4 in, and width of 1.6 in.
Held as a fixed part in the Assembly.
Fracturing, deformation, loose connection from screws or dowel pins
5
2 Output Housing (Blue)
Protect gears from damage and keeps lubricant inside, contains bore hole for output shaft
Has a length of 5 in, height of 9.4 in, and width of 1.6 in.
Aligned to left housing using dowel pins, and fastened with six screws
Fracturing, deformation, loose connection from screws or dowel pins
3 Input Shaft (Yellow)
Supplies initial drive to system from hydraulic power control unit
Has a small diameter of 1.245in, a large diameter of 1.866in, and a length of 5in.
Shaft inputted into the input housing and held in place with the bearings and retaining rings.
Fracturing and bending.
4 Output Shaft (Gray)
Accepts drive from the input shaft and transmits power to the rotary actuators of the wing.
Has a small diameter of 1.245in, a large diameter of 1.866, and a length of 3.85in.
Aligned parallel to the input shaft, and is held in place in the right housing using bearings and retaining rings.
Fracturing and bending.
5 Gear (x2) (Green)
Transfers direction of power from the input shaft to the output shaft
Has 16 teeth, a pressure angle of 20o, pitch diameter of 4in and width 0.995in, and tooth height of 0.5625in.
Held onto Input or Output Shaft by Retaining Rings and a key.
Improper alignment, tooth bending, and surface wear.
6 SKF CRL 10A Bearings (x4) [2] (Dark Blue)
Keeps shaft stationary, and prohibits movement between the housing and the shafts (both input and output shaft)
Inner diameter of 1.25in, outer diameter of 2.75in, and bore of 0.6875in.
In the housing, contains either input or output shaft.
Loose fit, tight fit, misalignment, lubricant failure, fracturing corrosion
7 Gasket (Black)
Used as a sealant to pressurize the gearbox, keep lubrication inside the assembly, and keep debris out of the assembly.
Made to fit the walls of both the input and output housings.
Press fitted between the input and output housing.
Improper sizing or fit in between the two housings.
8 Key (x2) (Orange)
Holds the gear to the shaft (one for input shaft and one for output shaft).
Height and width of 0.345in and a length of 1 in
Held in place by the shaft keyway and gear keyway.
Improper fit to keyway of shaft or gear.
9 ORing (x2) Seals the input and output shaft. Keeps lubrication inside the gearbox and keeps debris from entering the
Thickness of 0.01in, and diameter of 1.247in.
Press fitted between the coupling hole of either housing
Improper sizing or fit between the shaft and
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assembly through the shaft coupling hole.
and the input and output shaft.
coupling hole of the housing.
ANALYSIS:
Housing/Assembly (Nina)
The housing was designed based on the gear housing from a similar mechanism. This
shape was chosen due to its ease of manufacturing, light weight, and strength to maintain the
shafts and gears under the ultimate torque of 5250 inlb. The left housing and right housing have
nearly identical designs; however the left housing, which contains the input shaft, has a 4 ¼ 28
UNF mounting bolt pattern, while the right housing has no holes in the side of the piece. With a
sealant, the two housings are connected using six screws with a size of ¼” diameter. In order to
keep the required pressure of 15 psi, the two housing parts are connected with a rubber gasket
sealant, and there is a 1.25” hole in the housing surrounding both the input and output shafts,
sealed by an oring. This can be seen above in Figure 1.
Many of the given requirements above left no room for variation and thus have a margin
of difference of zero. The gearbox housing has a width of exactly 5.00 inches and a height of
9.40 inches, both of which are less than or equal to the requirements of 5 and 10 inches
respectively. These dimensions allow for efficient use of materials, while also keeping true to the
requirements assigned by the customer, Airbus. The values for input length, output length, and
the length between the input and output shafts were all specific dimensions, and these values
were taken into consideration when conducting analysis, especially on the shaft design.
Therefore, these values can be observed in the SolidWorks design. The input and output coupling
diameter, assigned to be the diameter of the input and output shafts was found to be 1.25”, to
meet the requirements of design. On the left side of the housing that contains the input shaft,
there is a four bolt pattern, of ¼ inch diameter, with 28 threads/inch with a unified fine threading.
This pattern can be observed by design in Part #1 in the Bill of Materials above.
The Unit is sealed, both with a gasket between the left and right housing and also orings
between the shafts and housings in order to both keep the lubricant in the housing and also keep
foreign debris and other materials from entering the housing. The specified temperature
requirement is met by the materials selected and also the lubricants, seals, and gaskets, to ensure
that all materials will maintain their properties in the extended temperature range. The surface
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wear requirement of selecting a lubricant compatible with the seal was taken into account when
selecting the gasket, oring, and a lubricant.
Corrosion Resistance/ Material Selection
Category T requires that the housing should be resistant to corrosion that may occur when
the aircraft is parked or hovering near the sea.[2] Therefore, cast iron was selected as the material
for its resistance to salt corrosion. It also acts as a damper for vibrations and can save weight.
Analysis was conducted using the Solidworks simulation software to better understand
the effects of the force on the housing. It can be observed that the Factor of Safety is lowest
closest to the area where the force is applied.
Figure 2. FEA Analysis of Housing Factor of Safety
Table 4 below, corresponds to the image of the Assembly in Figure 1, to show the overall
assembly of the gearbox and also how each part is necessary for the system. It can be seen how
the torque on the input shaft is transferred to the output shaft through the gears, maintaining the
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revolutions per minute, and meeting all the specified requirements for both the housing part and
the entire assembly.
Table 4. Overall Housing Assembly Requirements
Parameter Requirement Estimated
Capability
Basis of
Estimate
Margin of
Difference (%)
Length (in) ≤ 5.0 5.0 By Design 0 %
Height (in) ≤ 10.0 9.4 By Design 6 %
Input Length (in) 2.0 2.0 By Design 0 %
Output Length (in) 4.0 4.0 By Design 0 %
Input/Output Length (in) 4.0 4.0 By Design 0 %
Input and Output Coupling
Diameter (in)
≤ 1.5 1.255 By Analysis 16.3 %
Four ¼28 UNF Mounting
Bolts
Comply Comply By Design N/A
Unit Must be Sealed Comply By Design N/A
Breakout Torque (inlb) < 10.0 8.727 By Design 12.73 %
Temperature Comply Comply By Design N/A
Surface Wear Comply Comply By Design N/A
Vibration Comply No (See
Above)
By Test? **
Corrosion Resistant Comply Comply By Design N/A
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Shaft (Sonja/Joey)
Applied Loads
The input and output shafts were designed to be very similar, excluding the length of the
shafts. Due to this and the gear ratio of 1, the forces and moments found in the input shaft are the
same as those found in the output shaft in their respective locations, and consequently, analysis
of only the input shaft is presented below. Important loads required to perform analysis on the
shafts of the assembly were ultimate torque (5250 inlb), limiting torque (3500 inlb), and
operating torque (1500 inlb). Important forces for shaft analysis were the reaction forces of both
bearings B and D, and the force applied to the gear W, which were found through analysis and
can be seen in Table 5. The ultimate torque was used to determine the minimum shaft diameter
to be used in the gearbox assembly. The ultimate torque was used to ensure that the shaft would
survive at all torques which it may be subjected to. Infinite life of the shaft was found using the
operating torque because the shaft will be subjected to this torque for the majority of its life. The
yielding factor of safety was found at the ultimate, limiting, and operating torque to ensure that
the shaft did not yield at any of these values.
Table 5. Applied Forces to the Shaft
Component Ultimate Torque (5250 inlb)
Limiting Torque (3500 inlb)
Operating Torque (1500 inlb)
Bearing B (lbf) 1396.66 931.01 399.07
Bearing D (lbf) 1396.66 931.01 399.07
Gear (lbf) 2793.38 1862.32 798.14
Theoretical Approach and Results:
The results found through analysis of the shaft can be seen in Table 11 at the end of this section.
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A. Critical Stress Points and Factors of Safety for Yielding
Forces B, D, and W were broken into components, where B and D are in both the y and z
components and W is in both the radial and tangential components. These forces are represented
in Figure 3. The shear and moment diagrams were then found and can be seen below in Figures 4
and 5. Ultimate torque was considered for the shear and moment diagrams because this torque
will determine value of factors of safety for yielding and the location of the factors of safety
along the shaft regardless of the torque type. Limited torque is also calculated without shear and
moment diagrams.
Figure 3: Free Body Diagram of Shaft and Gear (Charlton)
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Figure 4. Shear Diagram of the Shaft at Ultimate Torque
Figure 5. Moment Diagram of the Shaft at Ultimate Torque
As found in the moment diagram, two potential critical stress points were discovered, one
at the shoulder and the other at the keyway. The shoulder has a change in geometry that goes
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from a larger diameter to a smaller diameter, where stress will concentrate. Meanwhile, the
keyway also has a change in geometry, plus a higher moment than the shoulder, thus creating a
critical stress point. To find the factors of safety for yielding, stress must first be calculated using
the equation below [2].
( ) + ) ]σ ′ = [ πd3k 32(M +M )t a m 2
( πd3k 16(T +T )fs a m 2 1/2 (1)
is the stress, kf is the fatigue concentration factor, kfs is the fatigue concentration factor forσa
shear, Ma is the alternating moment, Mm is the midrange moment, Ta is the alternating torque, Tm
is the midrange torque and d is the diameter of the shaft. It is important to note that the diameters
for the shoulder and keyway had been estimated in a previous iteration, and for simplicity, were
used for this calculation. Because these diameters are related through a ratio of 1.5, the diameter
value used for this calculation will not affect the determination of the lower factor of safety.
Thus
Kf and Kfs are found using the equation below [2].
(k )K f = 1 + q t − 1 (k )K fs = 1 + qsheer ts − 1 (2)
where, q and qshear are the notch sensitivities which are obtained from Figure 620 and Figure
621[2] , and kt and kts are the stress concentration factors which are obtained from Figure A159
and Figure A158. Factor of safety is then found by using the equation below [2].
n = σ′Sy (3)
where n is the factor of safety, Sy is the yield strength of 4340 normalized steel (103 kpsi), and σ′
is the stress.
The factor of safety found for the keyway was found to be 2.81, which was much less
than the factor of safety for the shoulder, 2.96 as observed below in Table 6. Therefore the
keyway was considered as the critical stress point of the shaft.This can be compared to the FEA
analysis seen below in Figure 6, which demonstrates analysis on the input shaft. The results of
this FEA yield similar results to the data calculated analytically above.
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Figure 6. Factor of Safety FEA using Solidworks
Table 6. A Table of Parameters for the Factor of Safety for Yielding of the Shaft
Ultimate Torque (Keyway)
Ultimate Torque (Shoulder)
Yield Torque (Shoulder)
Yield Torque (Keyway)
kt 1.69 2.14 1.69 2.14
kts 1.48 3.00 1.48 3.00
q 0.82 0.50 0.82 0.50
qshear 0.83 0.20 0.83 0.20
kf 1.93 1.57 1.93 1.57
kf,s 2.66 1.40 2.66 1.40
Ma (lbin) 747.19 537.69 875 358.435
Tm (inlb) 5250 5250 3500 3500
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(psi)σ ′ 36595.63 34698.89 24397 32132.6
Sy (psi) 102976.79 102976.79 102976.79 102976.79
n 2.81 2.96 4.22 4.45
Although the yielding factor of safety is very similar between the shoulder and the keyway the
factor of safety for the keyway was always slightly smaller. Since the factor of safety was
always slightly smaller for the keyway the keyway was used as the critical stress point for further
calculations.
B. Determining the Minimum Diameter of the Shaft:
The minimum diameter of the shaft was determined using the ultimate torque and the
forces of the bearings A and B at the ultimate torque. The material selected for the shaft was
4340 normalized steel which has an ultimate strength of 161 kpsi, and a yielding strength of 103
kpsi. In order to determine the minimum diameter of the shaft the roadmap in Chapter 7 of
Shigley’s Mechanical Engineering Design was used [2].
Equation 1 was used to determine the test specimen endurance limit:
e 0.5SS′ = ut (4)
Where S’e is the test specimen endurance limit and Sut is the ultimate strength.
After S’e is determined, various factors must also be found in order to solve for the endurance
limit at the critical location of the shaft. The equations used to determine the factors ka, kb, kc, kd,
ke, and kf can be seen below.
Ska = a but (5)
ka is the surface modification factor, a and b are factors used for machined equipment, for this
situation, a= 2.7, b= 0.265.
.879dkb = 0−0.107 (6)
kb is the size modification factor, and d is the smaller diameter of the shaft. Initially the smaller
diameter is assumed in order to complete the process.
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The loading factor (kc) is dependent on the load applied to the shaft. In this case the shaft was
subjected to a completely reversing bending stress, for which kc=1.
The temperature factor (kd) accounts for the effects of temperature variation on the shaft. In this
case the shaft must be able to survive being exposed to both extremely low and high
temperatures. The temperature requirement for the shaft was survival from 101.2 oF to 230 oF.
The equation to determine kd can be seen below.
(7).975 .432(10 )T .115(10 )T .104(10 )T .595(10 )Tkd = 0 + 0 −3F − 0
−5 2F + 0
−8 3F − 0
−12 4F
TF is the highest temperature (in this case 230 oF). The hottest temperature was used because
yield strength drops as temperature increases. It is also known that materials are also more
susceptible to creep at higher operating temperatures.
The reliability of the shaft was assumed to be 95% resulting in a reliability factor (ke) of 0.868.
There were no miscellaneous effects to be considered so kf (the miscellaneouseffects
modification factor) can be considered to equal 1.
After all the factors were determined, the endurance limit at the critical location (the keyway)
could be calculated. The equation used to determine the endurance limit (Se) can be seen below.
k k k k k SSe = ka b c d e f ′e (8)
After the endurance limit is calculated, stress concentration factors must be determined before
the minimum diameter can be calculated. Since the critical stress point was found to be at the
keyway, the critical stress factors for torsion (kts) and bending (kt) were found using the geometry
of the keyway. For the first iteration of minimum diameter calculation, a kt value of 2.14 and kts
value of 3 were taken from Table 71.[2] Using the notch radius of the keyway and the ultimate
strength of the shaft material, the notch sensitivity factors (q and qts) can be determined using
Figure 620 and 621 [2]. The values kt, kts, q, and qts can be used to solve for the fatigue stress
concentration factors (Kf and Kfs) using the Equation 2. Assuming a factor of safety (n) of 1.5,
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the first trial can be done to determine the minimum shaft diameter, d. The equation used to
determine the minimum shaft diameter can be seen below:
[4( ) ( ) ( ) ( ) ] d = π16n
SeKMf a 2 + 3 Se
K Tfs a 2 + 4 SyKMf m 2 + 3 Sy
K Tfs m 2 1/2 1/3 (9)
However, Ta and Mm are 0 reducing Equation 9 to:
[4( ) ( ) ] d = π16n
SeKMf a 2 + 3 Sy
K Tfs m 2 1/2 1/3
The minimum diameter found is then used to repeat the process in order to increase the accuracy
of the result. Each time the process was repeated the ratio of the large diameter and the small
diameter (D/d) was always kept at 1.5. After each trial, the minimum diameter that was found
was used in the next trial. Three trials were performed in order to determine an accurate value
for the minimum diameter of the shaft, and these results can be observed below in Table 7, with
a final value of 1.2303 inches for the diameter.
Table 7. Endurance Limit Variable Values for Each Trial
Trial 1 Trial 2 Trial 3
Sut(psi) 160991.89 160991.89 160991.89
Se’ (psi) 80495.95 80495.95 80495.95
ka 0.702 0.702 0.702
kb 0.879 0.860 0.860
kc 1 1 1
kd 1.02 1.02 1.02
ke 0.868 0.868 0.868
Se (psi) 443193.77 43224.26 43221.75
kt 2.14 2.14 2.14
kts 3.00 3.00 3.00
q 0.82 0.82 0.82
qs 0.83 0.83 0.83
kf 1.93 1.93 1.93
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kfs 2.66 2.66 2.66
Assumed FOS 1.5 1.5 1.5
d (in) 1.23036 1.23103 1.2303
After this process was completed a shaft diameter of 1.245in was used in order to decrease the
shafts chance of failing. 1.245in was also chosen in order to find bearings which would closely
fit around the shaft.
C. Shaft Fatigue Factor of Safety
The number of lives that the shaft can withstand can be found by determining the factor
of safety for fatigue. If the value is greater than 1, than infinite life can be assumed. However if
the value is less than 1, finite life is assumed and further analysis can be done to find the number
of cycles to failure. The forces and moments associated with the operating torque were used for
this equation, since the shaft is most likely to experience operating torque a majority of the time.
This factor of safety is found using the equation below.
nf =Seσa′ (10)
is the factor of safety for fatigue, Se is the endurance limit which is found from Equations 4,5,nf 6 ,7, and 8, and ’ is stress which is determined from Eq. 1 and 2. The factor of safety foundσa from this equation is larger than 1, which concludes that the shaft has an infinite life at operating torque.
Table 8. A Table of Parameters for the Factor of Safety for Yielding of the Shaft.
Se’(psi) 80495.95
ka 0.702
kb 0.859
kc 1
kd 1.02
ke 0.868
Se (psi) 40316.5
18
Ma(lbin) 213.465
kf 1.935
d (in) 1.235
’ (psi)σa 2234.51
nf 19.25
D. Shaft Deflection Analysis
In order to analyze the deflection and slope of the shaft from the applied loads, Equation
11 was used. The part of the shaft between the bearings was analyzed and assumed to be
symmetrical. The length between each bearing was 2.02 inches. The elastic modulus for AISI
4340 normalized steel is 29,732,736.22 psi. The mass moment of inertia was calculated for a cylinder
of diameter 1.25 inches.
(4x l) y = Fx248EI − 3 (11)
The variable x is the distance from one bearing to where the maximum deflection would occur.
This is at the middle of the section of the shaft being examined. The maximum deflection was
calculated to be 0.0000115 inches which is within the requirements as a spur gear can have a
maximum deflection of 0.010 in when the pitch diameter is 4 inches. By taking the derivative of
Equation 11 with respect to x, the slope of the spur gear can be calculated. Equation 12 is the
formula used and the maximum slope should occur in between the bearing and the point of
maximum deflection (x divided by 2). The resulting slope was 0.000034 radians.
L − ( )θ = − dxdy = L 4EI
Fx2 − 8EI3FxL (12)
The calculated slope is acceptable as the slope for an uncrowned spur gear must be less than
0.0005 radians as defined by Table 72 [2].
Table 9. A Table of Parameters for the Deflection of Analysis of the Shaft.
L (in) distance between the bearings 2.018
F (lbs) 955
x at max deflection (in) 1.009
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x at max slope (in) 0.504
E (psi) 29732736.22
I 0.1198
y (in) 0.0000115
(rad)θ 0.000034
E. Key Factor of Safety
The factor of safety for yielding of the key was found through the following relation.
nSsy = F
tL/2 (13)
Ssy is the shear yield strength, which is 57.7% of the yield strength of 4340 normalized steel. The
variable n is the factor of safety, F is the force from the applied torque, t is the thickness of the
key, and L/2 is the length of the key divided by two to account for the possibility of crushing.
The values used for this equation were from the limit torque and the operating torque.
Table 10. A Table of Parameters for the Factor of Safety for Yielding of the Shaft.
Ssy (ksi) 59417
F (at ultimate torque, lbf) 5668
F(at limiting torque, lbf) 3242
t (in) 0.810
L(in) 0.346
n (at ultimate torque) 1.47
n (at yielding torque) 2.57
Table 11. A Table of Parameters for the Shaft
Parameter Requirement Estimated Capability
Basis of Estimate Margin of Difference (%)
Factor of Safety for Yielding at Ultimate Torque
1> 2.81 By Analysis 181%
20
Factor of Safety for Yielding at Limiting Torque
1> 4.22 By Analysis 322%
Diameter Size (in) <1.5 1.25 By Analysis 16.7%
Fatigue Life Factor of Safety (lives)
6 Infinite By Analysis N/A
Life cycle 40 N/A By Analysis *
Deflection (in) <0.003 0.0000115 By Analysis 99.62%
Deflection (radians)
<0.0005 0.00034 By Analysis 32%
Key Factor of Safety at Ultimate
>1 1.47 By Analysis 47%
Key Factor of Safety at Limiting
.1 2.57 By Analysis 157%
Gear (Trent)
Applied Loads
Using the ultimate torque (T=5250 inlb), the gear speed ( 650 rpm) and Equation 14,ω =
the power required of the shaft was found to be about 54 hp which must be transmitted through
the gear.
H = Tω63025 (14)
Equation 14 was then used to find the tangential force applied to the gear which was 2625 lbf.
The pitchline velocity, V, was calculated using Equation 15 where n is the gear speed and d is
the diametral pitch of the gear.
V = 12πdn (15)
W t = V33000H (16)
A 20° degree pressure angle was assumed as it is a common pressure angle for commercial spur
gears. Thus, the radial force was found to be about 955 lbf and the resultant force was about
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2793 lbf. The same process was used to find the resultant force at the limit torque of 3500 inlb
and the operating torque of 1500 inlb. The operating torque forces were found to be 750 lbf for
the tangential force, 273 lbf for the radial force and 1838 lbf for the resultant force. The forces
were assumed to be applied at the center of the gear teeth due to their point of contact.
Theoretical Approach and Result
A. Gear Design:
In order to determine the minimum amount of teeth for the gear to avoid interference,
Equation 17 was used where fulldepth teeth, a onetoone gear ratio change, and a 20° pressure
angle were assumed.
(1 ) Np = 2k3 sin ϕ2 +√1 sin ϕ+ 3 2 (17)
The number of teeth was designated to be 16 as it was a common value found in the tables. The
input to output distance between the two shafts was required to be 4 in. so the diametral pitch of
the gear was designated to be 4 in. Table 12 shows the key features of the first iteration of the
gear that will be used later on.
Table 12. Key Features of the Gear Used in the Gearbox
Material Steel Grade 3 carburized and hardened
Pitch diameter, (teeth/in)P d 4
Pressure Angle, (degrees)ϕ 20
Diametral pitch, (in)dp 4
Number of teeth 16
Gear Speed , (rpm)ω 650
Pitchline velocity, V (m/s) 680.678
Face Width (in) 0.995
B. Bending Analysis:
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The factor of safety for spur gear bending was found using Equation 18. The material
chosen for the gear was a grade 3 carburized and hardened steel.
SF = σS Y /KKt N t R (18)
The bending stress was calculated first using several variables and assumptions. The geometry
factor, J, was found to be 0.27 from Figure 146 with 16 teeth in the gear design.[2] The overload
factor, , was assumed to be 1 as the first iteration for the gear design was calculated at theKo
ultimate torque so an overload adjustment was not necessary. The dynamic factor, , wasKv
found using Equation 19 where Equation 20 was used to solve for variables A and B with an
assumption of 8 for the quality factor, .Qv
Kv = ( )AA+√V B
(19)
0 6(1 )A = 5 + 5 − B .25(12 )B = 0 −Qv 2/3
(20)
The size factor, , was found using Equation 21 where the Lewis form factor, Y, was 0.27 forKs
16 teeth, F was the gear width of 1 in and P was the pitch diameter of 4 teeth per inch.
.192( )Ks = 1 PF√Y 0.0535
(21)
The rimthickness factor, , was assumed to be 1 as the gear design did not have a rim. TheKB
load distribution factor, , was found using Equation 22.Km
(C C C )Km = 1 +Cmc pf pm +Cma e (22)
The gear has uncrowned teeth so was 1. was calculated to be 0.00525 using the gearCmc Cpf
width of 0.79 in and the diameter pitch of 4 in with Equation 23. was assumed to be 1.1 asCpm
the value is half the gear width making the total distance between the two bearings on eachS1
shaft about 2.83 inches; however, the shaft length will be less than 2 inches, thus, making the
value 1.1. Equation 24 and Table 149 was used to calculate . The condition assumedCpm Cma
for Table 149 was that it was a commercial, enclosed unit. was assumed to be 1 “for all otherCe
conditions” [2].
.025Cpf = F10dp − 0 (23)
F FCma = A + B +C 2 (24)
23
The bending stress that the gear experiences under the ultimate torque is about 100 ksi, 67 ksi at
the limit torque and 29 ksi for operating torque. Equation 25 was used to do this.
K K Kσ = W to v s F
PdJ
K Km B (25)
Figure 1414 was used to find the stress cycle factor, , where N was 240 millionY N
revolutions. The temperature factor, , was designated as 1 due to the design parameterKT
survival temperatures between 74°C to 110°C, which is below 120°C. The reliability factor, KR
was calculated using Equation 26, assuming a 99% reliability in order to use Table 143 for steel
gears [2].
.5 .109ln(1 )KR = 0 − 0 − R (26)
The bending stress number, , was found to be 75,000 psi for a steel grade 3 carburized andSt
hardened material from Table 143. The bending factor of safety for the gear under the ultimate
torque was calculated to yield at a value of 1.16. At the limit torque, the factor of safety was
calculated to be 1.74. At operating torque the factor of safety for bending was calculated to be
4.06. The gear will survive the operating torque and can withstand the ultimate torque without
yielding.
C. Surface Analysis:
For the spur gear wear analysis, the gear contact stress was calculated using Equation 27.
σc = Cp√W K K Kto v s
Kmd Fp I
Cf (27)
The elastic coefficient, , was found to be 2300 from Table 148 where the gear andCp √psi
pinion were made of steel.[2] The overload factor , the dynamic factor , the size factorK )( o K )( v
and the load distribution factor were the same values as the bending analysis. wasK )( s K )( m C f
assumed to be 1 as given by the roadmap on page 759 [2]. Equation 26 for an external gear was
used to calculate the surfacestrength geometry factor, I, where the pressure angle was 20° and
the speed ratio, , and the loadsharing ratio, , were 1.mG mN
I = 2mNcosϕsinϕ mG
m +1G (28)
24
The gear contact stress under the ultimate torque, limit torque and operating torque was
calculated to be 251 ksi, 205 ksi and 134 ksi respectively.
For the other variables in the spur gear wear factor of safety equation, Table 146 was
used to find the repeated applied contact strength, , at 275,000 psi for a steel grade 3Sc
carburized and hardened material. The stress cycle factor for wear, , was determined usingZn
Figure 1415 with 240 million revolutions.[2] The hardnessratio factor, was assumed to be 1,CH
as the same material was used for both of the gears. The reliability factor, , was determinedKR
using Equation 26 with an assumed 99% reliability. The temperature factor, , was the same asKT
the spur gear bending value. The spur gear wear factor of safety at the ultimate torque, limit
torque and operating torque were 1.01, 1.51 and 3.52 respectively. The factors of safety for
bending are higher than those of the surface wear, so when the gearbox undergoes the ultimate
torque, the surface will have pits and wear before the gear yields. The material for the gear, steel
grade 3 carburized and hardened, was chosen for its high bending and surface stress number. The
gears will be sealed within the gearbox containing a lubricant. As long as the gearbox is correctly
sealed, the gears will not be susceptible to corrosion. Further comparisons of the factors of safety
can be found in Table 3 and indepth calculations can be found in the appendix.
Table 13. A table of parameters for the gear.
Parameter Requirement Estimated Capability
Basis of Estimate
Margin of Difference (%)
Factor of Safety for bending at ultimate torque (5250 inlb)
>1.00 1.16 By analysis 15.9 %
Factor of safety for bending at limit torque (3500 inlb)
>1.00 1.75 By analysis 73.8 %
Factor of safety for bending at operating torque (1500 inlb)
>1.00 4.07 By analysis 306 %
25
Factor of safety for wear at ultimate torque (5250 inlb)
>1.00 1.01 By analysis 0.90 %
Factor of safety for wear at limit torque (3500 inlb)
>1.00 1.52 By analysis 51.4 %
Factor of safety for wear at operating torque (1500 inlb)
>1.00 3.53 By analysis 252 %
Sealants, Lubricants, Bearings (Charlton) A. Bearings:
The selected bearing for the gearbox was an SKF CRL 10A cylindrical roller bearing. Based on Equation 29 below, the desired life hours for the bearing was calculated to be roughly 6154 hours.
(N)( ) LD = 1ω
1 hr60 min (29)
A bore diameter for the bearing was specified based on the diameter of shaft, which was 1.25 inches. The desired rating was then calculated using Equation 30. These factors as well asC10 the operating speed of 650 rpms was taken into account when selecting a bearing. Dimensions of the bearing can be found in Table 14.
( )C10 = FD L n 60R R
L n 60D D1/a 30)(
Table 14. Key features of the SKF CRL 10A roller bearing
Face width (in) 0.6785
Bore diameter (in) 1.25
Outer diameter (in) 2.75
Operating speed, (rpm)Nr 19,000
rating (lbf)C10 10,000
The reliability of the bearing was then calculated using Equation 31, which was found to be 0.99.
26
xp(− ) )R = e ( θ−x0
x ( ) −xD C10
a Ff D a0 b (31)
B. Sealants:
Rubber Gasket
The housing was sealed using a hightemperature silicone rubber gasket material found
on McMasterCarr’s website. The gasket was shaped on Solidworks to fit the housing, while also
being careful to include holes for the screws and dowels were properly aligned. This material has
an operating temperature range from 80 degrees Fahrenheit to 450 degrees Fahrenheit and can
also withstand pressures up to 1000 psi. The breakout torque for the seal was 8.727 lb in and∙
was calculated using the following equation:
65 diameter) rpm) T = . * ( 2 * ( 1/3 (32)
Figure 7: HighTemperature Silicone Rubber Gasket
ORing
For the shaft, an oring seal was used because of its many advantages. They are very easy
to maintain because there are no bolts to tighten or adjust. They also are advantageous as they do
not require any additional adhesives or alternative application methods. In the housing, the
diameter for the hole where both the input and output shafts are located is 1.25 inches while both
the shafts themselves have 1.24 inch diameters at that same point. This meant that the oring had
to have an outer diameter slightly larger than 1.25 inches so that it could be pressfit into the
housing. For this report and design, a McMasterCarr’s Extreme Chemical
27
polytetrafluoroethylene (PTFE) #24 oring was used. These orings have exceptional temperature
resistance as it can withstand a range of 100 degrees Fahrenheit to 500 degrees Fahrenheit. The
outer diameter of the oring is 1.254 inches and has a thickness of 0.070 inches. It can observed
in the assembly in Figure 1 that there is no specific oring part installed in the housing. This is
because of the properties of Solidworks and the tight tolerances that the oring contains. In the
true assembly, the oring would be pressfit into this space, allowing for a tight pressure to be
maintained, but also allowing for movement of the shafts and thus the gears.
Lubricant
Parker Super OLube is an allpurpose lubricant that operates at the required temperature
range of 65.2 degrees Fahrenheit to 399.2 degrees Fahrenheit. Although it is anpurpose
lubricant, this material has the capacity to function as a high viscosity silicone oil, which makes
it a good choice as a seal lubricant. This lubricant is also compatible with the PTFE as well as
silicone, which is the material the oring and gasket sealant are made of, respectively. Below,
Table 15 shows the properties of these materials for the gasket, oring, and lubricant, and to
show how these properties meet the temperature range requirement.
Table 15. Properties of Materials to be used in Assembly
Item Brand Temperature Range
Rubber Gasket Sealant HighTemperature Rubber Gasket Sealant (McMasterCarr)
80 deg F to 450 deg F
ORing Extreme Chemical ORing #024 (McMasterCarr)
100 deg F to 500 deg F
Lubricant Parker Super OLube 65.2 deg F to 399.2 deg F
2D DRAWINGS (Sonja/Joey)
28
Figure 8: Input Shaft Solidworks Drawing
29
Figure 9: Output Shaft Solidworks Drawing
30
Figure 10: Input Gearbox Solidworks Drawing
31
Figure 11: Output Gearbox Solidworks Drawing
32
Figure 12: Gear Solidworks Drawing
33
REFERENCES [1] Recksiek, M. (2009). Advanced high lift system architecture with distributed electrical flap
actuation. Proceedings of the 2nd International Workshop on Aircraft System Technologies, 4959.
[2] Experimental Conditions and Test Procedures for Airborne Equipment. Thesis. RTCA D0160F,
2007. N.p.: n.p., n.d. Print. [3] Budynas, Richard G., J. Keith. Nisbett, and Joseph Edward. Shigley. Shigley's Mechanical
Engineering Design. 10th ed. N.p.: n.p., 2014. Print. [4] ISSF. "The Salt Spray Test and Its Use in Ranking Stainless Steel." (2008): n. pag. Web. APPENDIX Sample Calculations: Power & Torque:
250 in bsτ = 5 ∙ l
50 rpmω = 6 = n
57, 56 lb n/sH = 3 3 ∙ i
e = product of driven tooth numbersproduct of driving tooth mumbers = 1
32Np =
teeth/inP d = 8
/P 2/8 indp = Np d = 3 = 4
/N /32 125m = d p = 4 = .
(m) 393pn = π = .
80.678 ft/minV = 12πdn = 12
π(4)(650) = 6
Force Analysis at Ultimate Torque:
(10)4.14 horsepowerH = Tω63025 = 63025
5250in∙lbs 650 rpm* = 5
80.678 feet/minV = 12πdn = 12
π(4in)(650rpm) = 6
624.77 lbf 625 lbfW t = V33000H = 680.678 f t/min
33000 H (54.14 horsepower) = 2 = 2
34
625 lbf an(20 ) 55 lbfW r = 2 * t ° = 9
Yielding Factor of Safety for Shaft Analysis:
At the Keyway of the Shaft:
Eq. 2: = =1.93(k )K f = 1 + q t − 1 .82(2.14 )1 + 0 − 1
= =2.66(k )K fs = 1 + qsheer ts − 1 .83(3 )1 + 0 − 1
Eq. 1: =( ) + ) ]σa′ = [ πd3k 32(M +M )t a m 2
( πd3k 16(T +T )fs a m 2 1/2 ( ) + ) ][ π 1.235in* 3
1.93 32(747in−lbs)* 2( π 1.235in* 32.66 16(5250in−lbs)* 2 1/2
=36.5kpsi
Eq. 3: n = σ′Sy = = 2.81103kpsi
36.5kpsi
At the Shoulder of the Shaft:
Eq. 2: = =1.57(k )K f = 1 + q t − 1 .82(1.69 )1 + 0 − 1
= =1.40(k )K fs = 1 + qsheer ts − 1 .83(1.48 )1 + 0 − 1
Eq. 1: =( ) + ) ]σa′ = [ πd3k 32(M +M )t a m 2
( πd3k 16(T +T )fs a m 2 1/2 ( ) + ) ][ π 1.235in* 3
1.57 32(747in−lbs)* 2( π 1.235in* 31.40 16(5250in−lbs)* 2 1/2
=34.7kpsi
Eq. 3: n = σ′Sy = = 2.96103kpsi
34.7kpsi
Determining the Minimum Diameter of the Shaft:
These sample calculations show the process using the numbers from the first trial where d was
assumed to be 1in and D was assumed to be 1.5in.
Eq. 4: =0.5*161kpsi = 80.5kpsie 0.5SS′ = ut
Eq. 5: =2.7* (0.265) = 0.702Ska = a but 161kpsi)(
Eq. 6: = =0.879.879dkb = 0−0.107 .879 in0 * 1 −0.107
kc=1 (for bending)
Eq. 7: .975 .432(10 )T .115(10 )T .104(10 )T .595(10 )Tkd = 0 + 0 −3F − 0
−5 2F + 0
−8 3F − 0
−12 4F
= =1.02.975 .432(10 )230 .115(10 )230 .104(10 )230 .595(10 )2300 + 0 −3 − 0 −5 2 + 0 −8
3 − 0 −12
4
ke=0.868 (for a reliability of 95%)
kf=1 (there were no miscellaneous factors to be considered)
Eq. 8: = = 44.2kpsik k k k k SSe = ka b c d e f ′e .702 .879 .02 .868 0.5kpsi0 * 0 * 1 * 1 * 0 * 1 * 8
35
Kf = 1.93 (found previously in yielding factor of safety section)
Kfs = 2.66 (found previously in yielding factor of safety section)
n = 1.5 (was used as the minimum factor of safety)
Eq. 9: =[4( ) ( ) ] d = π16n
SeKMf a 2 + 3 Sy
K Tfs m 2 1/2 1/3
= 1.23in[4( ) ( ) ] π16 1.5*
44.2kpsi1.93 747in−lbs* 2 + 3 103kpsi
2.66 5250in−lbs* 2 1/2 1/3
Shaft Fatigue Factor of Safety:
The values of the different factors and the endurance limit from the final trial of the minimum
shaft diameter calculations can also be used to determine the fatigue factor of safety.
Eq. 10: = = 26.7 (only bending stress was accounted for as specified in thenf =Seσa′
43kpsi1.6kpsi
requirements)
Shaft Deflection Analysis:
Eq. 11: = )= 1.15E(5)(4x l) y = Fx248EI − 3 (4 .0088in .0175in955lbf 1.0088in* 2
48 29.7Msi 0.119* * * 1 − 3 * 2
Eq. 12: − L )L .0175in( )θ = dxdy = − (4EI
Fx2 − 8EI3Fxl = − 2 4 29.7Msi 0.119* *
955lbf 1.0088in* 2− 8 29.7Msi 0.119* *
3 955lbf 1.0088in 2.0175in* * *
= 2.44E(4)rad
Key Factor of Safety Analysis:
Eq. 13: = = 1.8n = 2 F*S t Lsy* *
2 5.6kip*59.4kpsi 0.346in 1in* *
Spur Gear Bending Analysis
Figure 146 .37J = 0
Assume , , Ko = 1 KB = 1 T FKT = 1 < 250°
Eq. 1427 .21874Kv = ( )AA+√V B
= 1
Eq. 1428 0 6(1 ) 0 6(1 .629961) 0.7222A = 5 + 5 − B = 5 + 5 − 0 = 7
.25(12 ) .629961B = 0 −Qv 2/3 = 0
AssumingQv = 8
.192( ) .192( ) .0713Ks = 1 PF√Y 0.0535
= 1 4 teeth/in1 in√0.27 0.0535
= 1
36
where the Lewis Form Factor, Y=0.27
(C C C ) .15598Km = 1 +Cmc pf pm +Cma e = 1
where uncrowned teethCmc = 1
.025 Cpf = F10dp − 0 = 0
F F .127 .0158(1) .930(10 )(1) .142707Cma = A + B +C 2 = 0 + 0 − 0 −4 2 = 0
all other conditionsCe = 1
K K K 8016.88 psi 8 ksiσ = W to v s F
PdJ
K Km B = 5 = 5
Assuming Steel carburized and hardened grade 3
40 0 )6 .4 0 revolutionsN = ( * 1 6 = 2 * 1 8
.6831(N) .902462Y N = 1−0.0323 = 0
Assuming a reliability factor of 0.99
.5 .109ln(1 ) .002 KR = 0 − 0 − R = 1
S 5000 psit = 7
.1579 .16SF = σS Y /KKt N t R = 1 = 1
Spur gear wear analysis
Force at Operating Torque
35714.5 psi (14 6) σc = Cp√W K K Kto v s
Kmd Fp I
Cf = 1 − 1
where 3, 00 3, 00 50 lbfW t = 3 0 VH = 3 0 15.4701 hp
680.678 f t/min = 7
300 Cp = 2 √psi C f = 1
.080348 (14 3) external gearsI = 2mNcosϕsinϕ mG
m +1G= 2(1)cos20°sin20° 1
1+1 = 0 − 2
in F in dp = 4 = 1
.53 (14 2)SH = σcS Z C /K Kc n H T R = 3 − 4
where for carburized and hardened grade 3 steel75, 00 psiSc = 2 0
Figure 1415.4488(2.4 ) .92953Zn = 1 * 108−0.023
= 0
as .2CH = 1 HBGHBP = 1 < 1
as T 50°FKT = 1 < 2
37
for 99% reliability.5 .109ln(1 ) .002 KR = 0 − 0 − R = 1
Bearing Reliability
(N)( ) (2.4 )( ) 153.85 hoursLD = 1ω
1 hr60 min = 1
650 * 108 1 hr60 min = 6
( ) 55.42( ) 946.13 lbfC10 = FD L n 60R R
L n 60D D1/a
= 9 1066153.85 650 60* * 3/10 = 4
40xD = LRL N 60D D = 10 rev6
6153.85 hours 650 rpm 60* * = 2
xp(− ) ) .99R = e ( θ−x0
x ( ) −xD C10
a Ff D a0 b = 0
where , , , , , .2af = 1 a = 310 0, 00 lbfC10 = 1 0 .459θ = 4 .02x0 = 0 .483b = 1
Sealants
65 diameter) rpm) 65 1.245 in) 650 rpm) .727 lb nT = . * ( 2 * ( 1/3 = . * ( 2 * ( 1/3 = 8 ∙ i
38
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