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JEE Physics 2026 Question with Solution

In the following pVp\text{–}V diagram, the equation of state along the curved path is given by (V2)2=4ap,(V-2)^2 = 4ap, where aa is a constant. The total work done in the closed path is:

A p-V diagram with pressure on vertical axis and volume on horizontal axis, showing points A at V=1, C at V=3 on a horizontal line, and a curved path through B below them forming a closed loop.
  • A

    13a-\dfrac{1}{3a}

  • B

    +13a+\dfrac{1}{3a}

  • C

    12a\dfrac{1}{2a}

  • D

    1a-\dfrac{1}{a}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given: The curved path satisfies

(V2)2=4ap(V-2)^2 = 4ap

so

p=(V2)24ap = \frac{(V-2)^2}{4a}

The closed cycle runs from ACA \to C along a horizontal line and returns along the curved path from CAC \to A.

Find: Total work done in the closed path.

For a closed cycle on a pVp\text{–}V diagram,

W=pdVW = \oint p \, dV

which equals the enclosed area. Since the cycle is clockwise, the work done is positive.

At points AA and CC, the volumes are V=1V=1 and V=3V=3. Using the curve equation,

(12)2=4app=14a(1-2)^2 = 4ap \Rightarrow p = \frac{1}{4a}

and

(32)2=4app=14a(3-2)^2 = 4ap \Rightarrow p = \frac{1}{4a}

Hence the upper horizontal path is at constant pressure

p=14ap = \frac{1}{4a}

Area and integration steps

Work done along the top path ACA \to C is

WAC=13pdV=14a13dV=14a(31)=12aW_{AC} = \int_{1}^{3} p \, dV = \frac{1}{4a}\int_{1}^{3} dV = \frac{1}{4a}(3-1) = \frac{1}{2a}

Curved path and total work

Along the curved return path CAC \to A,

WCA=31(V2)24adV=14a13(V2)2dVW_{CA} = \int_{3}^{1} \frac{(V-2)^2}{4a} \, dV = -\frac{1}{4a}\int_{1}^{3}(V-2)^2 \, dV

Now let x=V2x = V-2. Then the limits change from V=1V=1 to V=3V=3 into x=1x=-1 to x=1x=1:

13(V2)2dV=11x2dx=[x33]11=23\int_{1}^{3}(V-2)^2 \, dV = \int_{-1}^{1} x^2 \, dx = \left[\frac{x^3}{3}\right]_{-1}^{1} = \frac{2}{3}

Therefore,

WCA=14a23=16aW_{CA} = -\frac{1}{4a} \cdot \frac{2}{3} = -\frac{1}{6a}

So the total work done in the cycle is

Wtotal=WAC+WCA=12a16a=13aW_{\text{total}} = W_{AC} + W_{CA} = \frac{1}{2a} - \frac{1}{6a} = \frac{1}{3a}

Therefore, the correct option is B.

Common mistakes

  • Taking the work done as the area under only one branch of the curve is wrong because this is a closed cycle. For a closed path, use the enclosed area or add work along each segment with proper limits.

  • Missing the sign of work on the return path is incorrect. Along CAC \to A, the volume decreases, so the integral must be taken from 33 to 11, which makes that contribution negative.

  • Using the curved-path equation directly without finding the pressure of the horizontal segment is incomplete. First evaluate the curve at V=1V=1 and V=3V=3 to identify the constant pressure on the top path.

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