Before we tackle a constant volume situation for an ideal gas let us think about an equivalent problem, where we keep the pressure constant, while volume is allowed to increase. If γ is the coefficient of volume expansion at a temperature T, which of the following is true?
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The new volume upon expansion, V′, is given as-
V′ = V(1+γΔT)
⇒ nRT′V = nRTV(1+γΔT)
(where we have used the ideal gas equation, PV = nRT, for constant pressure P)
⇒ T′ = T(1+γΔT)
⇒ T′ = T+TγΔT
⇒ (T′−T) = TγΔT
⇒ TγΔT = ΔT
⇒ γ = T−1.
Awesome! This suggests that, for an ideal gas at a temperature T, the volume expansion coefficient is just T−1. See if you can do a similar analysis for the coefficient of pressure expansion at constant volume, in the earlier problem.