MHT CET · Physics · Kinetic Theory of Gases
The molar specific heat of an ideal gas at constant pressure and constant volume is \(C_p\) and \(C_v\) respectively. If \(R\) is the universal gas constant and the ratio of \(C_p\) to \(C_v\) is \(\gamma\) then. \(C_v=\)
- A \(\frac{y-1}{R}\)
- B \(\frac{1-\gamma}{1+\gamma}\)
- C \(\frac{1+\gamma}{1-\gamma}\)
- D \(\frac{R}{\gamma-1}\)
Answer & Solution
Correct Answer
(D) \(\frac{R}{\gamma-1}\)
Step-by-step Solution
Detailed explanation
Using
\(\begin{aligned} & C_p-C_v=R \\ & \Rightarrow C_p\left(\frac{C_p}{C_v}-1\right)=R \\ & (\gamma-1)=\frac{R}{C_v}\left(\because \frac{C_p}{C_v}=\gamma\right)\end{aligned}\)
Or
\(C_v=\frac{R}{(\gamma-1)}\)
\(\begin{aligned} & C_p-C_v=R \\ & \Rightarrow C_p\left(\frac{C_p}{C_v}-1\right)=R \\ & (\gamma-1)=\frac{R}{C_v}\left(\because \frac{C_p}{C_v}=\gamma\right)\end{aligned}\)
Or
\(C_v=\frac{R}{(\gamma-1)}\)
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