V. Torsion on a Stepped Cantilever
To find end rotation due to torques on a stepped cantilever shaft.
Reference
Hand calculation using the following reference:
Gere J. M., and Timoshenko, S. P., Mechanics of Materials, 2nd Edition, PWS Engineering, Page 171, Problem 3.3 - 1.
Problem
A stepped shaft is subjected to torques as shown in the figure. The material
has shear modulus of elasticity G = 80 Gpa. Determine the angle of twist θx
in degrees at the free end.
- T1 = 3,000 N·mm
- T2 = 2,000N·mm
- T3 = 800N·mm
Cantilevered member subject to torsional loads
Comparison
Result | Theory | STAAD.Pro | Difference |
---|---|---|---|
Angle of twist (rad.) | 0.0427 | 0.0427 | none |
STAAD Input
The file C:\Users\Public\Public Documents\STAAD.Pro 2023\Samples \Verification Models\01 Beams\Torsion on a Stepped Cantilever.STDis typically installed with the program.
STAAD SPACE :A STEPPED CANTILEVER SHAFT
START JOB INFORMATION
ENGINEER DATE 18-Sep-18
END JOB INFORMATION
*
* REFERENCE: MECHANICS OF MATERIALS, GERE AND TIMOSHENKO, 2ND EDITION
* PROBLEM 3.3-1 PAGE 171
*
UNIT METER KN
JOINT COORDINATES
1 0 0 0; 2 0.5 0 0; 3 1 0 0; 4 1.5 0 0;
MEMBER INCIDENCES
1 1 2; 2 2 3; 3 3 4;
UNIT MMS KN
MEMBER PROPERTY AMERICAN
1 TABLE ST PIPE OD 80 ID 0
2 TABLE ST PIPE OD 60 ID 0
3 TABLE ST PIPE OD 40 ID 0
DEFINE MATERIAL START
ISOTROPIC MATERIAL1
E 200
POISSON 0.25
END DEFINE MATERIAL
UNIT METER KN
CONSTANTS
MATERIAL MATERIAL1 ALL
SUPPORTS
1 FIXED
UNIT MMS KN
LOAD 1 TORSIONAL MOMENT
JOINT LOAD
2 MX 3000
3 MX 2000
4 MX 800
PERFORM ANALYSIS
PRINT JOINT DISPLACEMENTS LIST 4
FINISH