Difficulty: Medium
Correct Answer: Material a will be in compression and material b in tension
Explanation:
Introduction / Context:
Composite bars made of different materials experience internal self-stresses when the temperature changes because each material wants to change length by a different free thermal strain. Compatibility (same final extension) forces the materials to “negotiate” through internal forces, which are equal and opposite, producing compression in one and tension in the other.
Given Data / Assumptions:
Concept / Approach:
If the two bars were free, their free thermal strains would be: epsilon_free,a = alpha_a * ΔTepsilon_free,b = alpha_b * ΔT Because alpha_a > alpha_b, material a wants to expand more. Bonding imposes a common final strain epsilon that lies between the two free strains. Hence, the higher-expanding material a must be compressed back from its free expansion, while b must be pulled ahead to catch up.
Step-by-Step Solution:
Let epsilon be the common strain. Then for a: epsilon = alpha_a * ΔT + (σ_a / E_a)For b: epsilon = alpha_b * ΔT + (σ_b / E_b)Force equilibrium for the composite (no external axial load): A_a * σ_a + A_b * σ_b = 0.Solving reveals σ_a is compressive and σ_b is tensile because alpha_a > alpha_b.
Verification / Alternative check:
Think physically: material a tries to expand more and is restrained by b, so a is squeezed (compression); b is dragged along (tension).
Why Other Options Are Wrong:
Common Pitfalls:
Confusing free thermal expansion (no stress) with constrained thermal expansion (self-stress). The key is the bond imposing equal net strain.
Final Answer:
Material a will be in compression and material b in tension
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