(A) Given the equation of state: $PV = AT - BT^2$.Since the pressure $P$ is constant,we differentiate the equation with respect to $T$:$P dV = A dT -

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$A\left(T_{2}-T_{1}\right)+B\left(T_{2}^{2}-T_{1}^{2}\right)$

(A) Given the equation of state: $PV = AT - BT^2$.Since the pressure $P$ is constant,we differentiate the equation with respect to $T$:$P dV = A dT - B(2T) dT$.Work done $W = \int P dV$.Substituting $P dV$ into the integral:$W = \int_{T_1}^{T_2} (A - 2BT) dT$.$W = A \int_{T_1}^{T_2} dT - 2B \int_{T_1}^{T_2} T dT$.$W = A(T_2 - T_1) - 2B \left[ \frac{T^2}{2} \right]_{T_1}^{T_2}$.$W = A(T_2 - T_1) - B(T_2^2 - T_1^2)$.

Class 11 Physics Thermodynamics Mix Examples-Thermodynamics

Difficult

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

WBJEE 2015 All WBJEE

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
$A\left(T_{2}-T_{1}\right)-\frac{B}{2}\left(T_{2}^{2}-T_{1}^{2}\right)$
D
$\frac{A\left(T_{2}-T_{1}^{2}\right)}{V_{2}-V_{1}}$

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Which of the following is correct in terms of increasing work done for the same initial and final state?

Medium

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$1\,g$ of a liquid is converted to vapour at $3 \times 10^5\,Pa$ pressure. If $10\%$ of the heat supplied is used for increasing the volume by $1600\,cm^3$ during this phase change,then the increase in internal energy in the process will be $............\,J$.

MediumJEE MAIN 2023

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What is the specific heat of a gas in an isothermal process and an adiabatic process?

Easy

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An engine (consisting of one mole of an ideal gas in a cylinder with a piston) follows the cycle shown in the figure. Find the heat exchanged by the engine with the surroundings in each part of the cycle. Given $C_V = \frac{3}{2}R$.
$(a)$ $A$ to $B$: Constant volume
$(b)$ $B$ to $C$: Constant pressure
$(c)$ $C$ to $D$: Adiabatic expansion
$(d)$ $D$ to $A$: Constant pressure

Difficult

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$A$ gas obeying the equation of state $pV = RT$ undergoes a hypothetical reversible process described by the equation $pV^{5/3} \exp \left(-\frac{pV}{E_0}\right) = C_1$,where $C_1$ and $E_0$ are dimensioned constants. Then,for this process,the thermal compressibility at high temperature

KVPY 2017

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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

Similar Questions

Which of the following is correct in terms of increasing work done for the same initial and final state?

$1\,g$ of a liquid is converted to vapour at $3 \times 10^5\,Pa$ pressure. If $10\%$ of the heat supplied is used for increasing the volume by $1600\,cm^3$ during this phase change,then the increase in internal energy in the process will be $............\,J$.

What is the specific heat of a gas in an isothermal process and an adiabatic process?

$A$ gas obeying the equation of state $pV = RT$ undergoes a hypothetical reversible process described by the equation $pV^{5/3} \exp \left(-\frac{pV}{E_0}\right) = C_1$,where $C_1$ and $E_0$ are dimensioned constants. Then,for this process,the thermal compressibility at high temperature

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