Match List-$I$ with List-$II$.
$A$. Isobaric $I$. $\Delta Q = \Delta W$ $B$. Isochoric $II$. $\Delta Q = \Delta U$ $C$. Adiabatic $III$. $\Delta Q = 0$ $D$. Isothermal $IV$. $\Delta Q = \Delta U + P \Delta V$
$\Delta Q = \text{Heat supplied}$,$\Delta W = \text{Work done by the system}$,$\Delta U = \text{Change in internal energy}$,$P = \text{Pressure of the system}$,$\Delta V = \text{Change in volume of the system}$. Choose the correct answer from the options given below:
| $A$. Isobaric | $I$. $\Delta Q = \Delta W$ |
| $B$. Isochoric | $II$. $\Delta Q = \Delta U$ |
| $C$. Adiabatic | $III$. $\Delta Q = 0$ |
| $D$. Isothermal | $IV$. $\Delta Q = \Delta U + P \Delta V$ |
$\Delta Q = \text{Heat supplied}$,$\Delta W = \text{Work done by the system}$,$\Delta U = \text{Change in internal energy}$,$P = \text{Pressure of the system}$,$\Delta V = \text{Change in volume of the system}$. Choose the correct answer from the options given below:
- A$(A)-(IV), (B)-(III), (C)-(II), (D)-(I)$
- B$(A)-(IV), (B)-(I), (C)-(III), (D)-(II)$
- C$(A)-(IV), (B)-(II), (C)-(III), (D)-(I)$
- D$(A)-(II), (B)-(IV), (C)-(III), (D)-(I)$
Explore More
Similar Questions
$1$ mole of rigid diatomic gas performs a work of $Q/5$ when heat $Q$ is supplied to it. The molar heat capacity of the gas during this transformation is $\frac{xR}{8}.$ The value of $x$ is $\ldots \ldots \ldots .$ $[R =$ universal gas constant $]$
DifficultJEE MAIN 2021
View SolutionWhich of the following is correct in terms of increasing work done for the same initial and final state?
Medium
View SolutionIn Column-$I$ devices and in Column-$II$ efficiency are given. Match them appropriately:
Column-$I$ Column-$II$ $(a)$ Heat engine $(i)$ $\eta = \frac{Q_2}{Q_1 - Q_2}$ $(b)$ Heat pump $(ii)$ $\eta = \frac{Q_1 - Q_2}{Q_1}$ $(iii)$ $\eta = \frac{T_1 - T_2}{T_1}$
| Column-$I$ | Column-$II$ |
|---|---|
| $(a)$ Heat engine | $(i)$ $\eta = \frac{Q_2}{Q_1 - Q_2}$ |
| $(b)$ Heat pump | $(ii)$ $\eta = \frac{Q_1 - Q_2}{Q_1}$ |
| $(iii)$ $\eta = \frac{T_1 - T_2}{T_1}$ |
Medium
View SolutionIn the $P-V$ diagram shown,the gas does $5 \, J$ of work in the isothermal process $ab$ and $4 \, J$ of work in the adiabatic process $bc$. What will be the change in internal energy of the gas in the straight path $c$ to $a$ (in $, J$)?
Medium
View SolutionIf heat energy $\Delta Q$ is supplied to an ideal diatomic gas,the increase in internal energy is $\Delta U$ and the amount of work done by the gas is $\Delta W$. The ratio $\Delta W: \Delta U: \Delta Q$ is
Vedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo