A. What is the minimum diameter of a solid steel shaft that will
not twist through more than 3° in a 6-m length when subjected to a
torque of 12 kN·m? Use G = 83 GPa.
B. Determine the bearing stress of the punch out plate of the
precious problem, Answer in MPa
For B)
Assuming there is no thickness of plate I am calculating shear stress from the previous problem.
If at all there is incomplete question of part B considering the thickness and load acting we can calculate the bearing stress.(if at all thickness of plate is given)
A. What is the minimum diameter of a solid steel shaft that will not twist through...
A. What is the minimum diameter of a solid steel shaft that will not twist through more than 3° in a 6-m length when subjected to a torque of 12 kN·m? Use G = 83 GPa. B. What maximum shearing stress is developed? C. Determine the bearing stress of the punch out plate of the precious problem, Answer in MPa
Exercises: What is the minimum diameter of a solid steel shaft that will not twist through more than 3° in a 6m length when subjected to a torque of 14 kN-m? What maximum shearing stress is developed? Use G = 83 Gpa Required: d = ? Given: 0 = 30 L = 6m T = 14 kN-m G = 83 GPa Tmax= ?
The steel shaft is formed by attaching a hollow shaft to a solid shaft. Determine the maximum torque T that can be applied to ends of the shaft without exceeding ashear stress of 70 MPa or an angle of twist of 2.5 degrees in the 3.6m length. Use G=83GPa.
Segment AB is a solid steel shaft that is 2 m in length, 0.1 m in diameter, and has an applied torque of 5,000 N∙m in the clockwise direction. Segment BC is a solid steel shaft that is 1.5 meters in length, 0.2 meters in diameter, and has an applied torque of 15,000 N∙m in the counter clockwise direction. a.) Determine the maximum shear stress, in MPa, in the shaft b.) Determine the angle of twist, in degrees, in section...
A solid steel bar of circular cross section has diameter d = 40 mm, length L = 1.3 m and shear modulus of elasticity G = 80 GPa. The bar is subjected to torques T acting at the ends. If the torques have magnitude T = 340 Nm, what is the maximum shear stress in the bar? What is the angle of twist between the ends? If the allowable shear stress is 42 MPa and the allowable angle of twist...
Problem 2: A solid steel shaft ABC of 50 mm diameter is driven at A by a motor that transmits 50 kW to the shaft at 40 rpm. The gears at B and C drive require 35 and 15 kW, respectively. Calculate the maximum shear stress in the shaft and the angle of twist between A and C. G 80 GPa 10 marks Motor 50 mm
(b) The A-36 solid steel shaft is 3.5 m long and has a diameter of 60 mm. The shaft is used to transmit a torque of T = 524 N·m from the engine to the generator. Determine the angle of twist (0) of the shaft. The shear modulus of elasticity (G) of the shaft material is 75 GPa.
(b) The A-36 solid steel shaft is 3.5 m long and has a diameter of 60 mm. The shaft is used to transmit a torque of T=524 N·m from the engine to the generator. Determine the angle of twist (%) of the shaft. The shear modulus of elasticity (G) of the shaft material is 75 GPa. (10 points)
4. For the solid steel shaft shown in the figure, determine the angle of twist at A. Use G-70 GPa. The cylinder has a diameter of 40 mm. 2m 400 N m
A vertical load P = 150 kN is applied to a circular solid shaft which in turn is supported by a circular end cap as shown below. Both members are made of steel with allowable normal stress = 160 MPa, allowable shear stress 100 MPa, and allowable bearing stress 200 MPa. Determine the minimum required diameter of the solid shaft, and the minimum required outer diameter and thickness of the circular end plate. P 150 kN ds d 30 mm...