WBJEE · Physics · Thermodynamics
The pressure \(p\), volume \(V\) and temperature \(T\) for a certain gas are related by \(p=\frac{A T-B T^{2}}{V}\) where \(A\) and \(B\) are constants. The work done by the gas when the temperature changes from \(T_{1}\) to \(T_{2}\) while the pressure remains constant, is given by
- A \(A\left(T_{2}-T_{1}\right)+B\left(T_{2}^{2}-T_{1}^{2}\right)\)
- B \(\frac{A\left(T_{2}-T_{1}\right)}{V_{2}-V_{1}}-\frac{B\left(T_{2}^{2}-T_{1}^{2}\right)}{V_{2}-V_{1}}\)
- C \( A\left(\tau_{2}-T_{1}\right)-\frac{B}{2}\left(T_{2}^{2}-T_{1}^{2}\right)\)
- D \(\frac{A\left(T_{2}-T_{1}^{2}\right)}{V_{2}-V_{1}}\)
Answer & Solution
Correct Answer
(C) \( A\left(\tau_{2}-T_{1}\right)-\frac{B}{2}\left(T_{2}^{2}-T_{1}^{2}\right)\)
Step-by-step Solution
Detailed explanation
Given \(P=\frac{A T-B T^{2}}{V}\) \(\begin{array}{lc}\Rightarrow & P V=A T-B T^{2} \\ \Rightarrow & P \Delta V=A \Delta T-B T \Delta T\end{array}\) On integrating, we get Work \(=\int P d V=A \int_{T_{1}}^{T_{2}} d T-B \int_{T_{1}}^{T_{2}} T d T\)…
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