1. Engineering
  2. Mechanical Engineering
  3. elastic deformation of an axially loaded member 5 of 9...

Question: elastic deformation of an axially loaded member 5 of 9...

Question details

Elastic Deformation of an Axially Loaded Member 5 of 9 Part C Calculate the defection Review What is the deflection of the end of the rod, D? Let a positive deflection be to the right. Express your answer with appropriate units to three significant figures. Learning Goal: To calculate the elastic deflection in an axially loaded member For a bar subject to axial loading, the change in length, or deflection between two points A and B is View Available Hintfs) Hint 1.How to approach the probl Hint 2. Calculate the change in segment AB Hint 3. Calculate the change in segment BC A(r)E() where N is the internal normal force, A is the cross-sectional area, E is the modulus of elasticity of the material, L is the original length of the bar, and z is the position along the bar. This equation applies as long as the section does not change too suddenly response is linear elastic and the cross What is the change in length of the segment from B to C? Recall that di -8 cm, L6m, d 95 GPa 3.2 cm, L2 5 m, F 100 kN, F 45 kN, and E In the simpler case of a constant cross section, homogenous material, and constant axial load, the integral can be evaluated to e δ . This shows that the deflection is linear with respect to the internal normal force and the length of the bar NL AE A B In some situations, the bar can be divided into multiple segments where each one has uniform intenal loading and properties. Then the total deflection can be written as a sum of the deflections for Figure 1 of 1 Express your answer with appropriate units to three significant figures. View Available Hint(s) AB C d. Value Units

Submit Request Answer 6p Value Units Submit Request Answer

Solution by an expert tutor
Blurred Solution
This question has been solved
Subscribe to see this solution