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Strength of Materials
Springs
Marks 1Marks 2
Pure Bending
Marks 1Marks 2
Stresses In Beams
Marks 1Marks 2
Simple Stress and Strain
Marks 1Marks 2
Complex Stresses
Marks 1Marks 2
Moment of Inertia
Marks 1Marks 2
Deflection of Beams
Marks 1Marks 2
Shear Force and Bending Moment
Marks 1Marks 2
Torsion
Marks 1Marks 2
Thin Cylinders
Marks 1Marks 2
Columns and Struts
Marks 1Marks 2
Strain Energy Method
Marks 1Marks 2
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1
GATE ME 2009
MCQ (Single Correct Answer)
+1
-0.3
A solid circular shaft of diameter $$d$$ is subjected to a combined bending moment, $$M$$ and torque, $$T.$$ The material property to be used for designing the shaft using the relation $${{16T} \over {\pi {d^3}}}\sqrt {{M^2} + {T^2}} $$
A
Ultimate tensile strength $$\left( {{S_u}} \right)$$
B
Tensile yield strength $$\left( {{S_y}} \right)$$
C
Torsional yield strength $$\left( {{S_{sy}}} \right)$$
D
Endurance strength $$\left( {{S_e}} \right)$$
2
GATE ME 2006
MCQ (Single Correct Answer)
+1
-0.3
For a circular shaft of diameter $$'d'$$ subjected to torque $$T,$$ the maximum value of the shear stress is
A
$${{64T} \over {\pi {d^3}}}$$
B
$${{32T} \over {\pi {d^3}}}$$
C
$${{16T} \over {\pi {d^3}}}$$
D
$${{8T} \over {\pi {d^3}}}$$
3
GATE ME 2003
MCQ (Single Correct Answer)
+1
-0.3
Maximum shear stress developed on the surface of a solid circular shaft under pure torsion is 240 MPa. If the shaft diameter is doubled then the maximum shear stress developed corresponding to the same torque will be
A
120 MPa
B
60 MPa
C
30 MPa
D
15 MPa
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Questions Asked from Marks 1
GATE ME 2017 Set 1 (1) GATE ME 2016 Set 1 (1) GATE ME 2015 Set 2 (1) GATE ME 2015 Set 1 (1) GATE ME 2014 Set 3 (1) GATE ME 2009 (1) GATE ME 2006 (1) GATE ME 2003 (1)
GATE ME Subjects
Engineering Mechanics
Machine Design
Strength of Materials
Heat Transfer
Production Engineering
Industrial Engineering
Turbo Machinery
Theory of Machines
Engineering Mathematics
Fluid Mechanics
Thermodynamics
General Aptitude