MCQEasyJEE 2023Dimensions & Dimensional Analysis

JEE Physics 2023 Question with Solution

The equation of state for some gases is given by: (P+aV2)(Vb)=RT\left( P + \frac{a}{V^2} \right) (V - b) = RT The physical quantity, which has the same dimensional formula as b2a\frac{b^2}{a}, will be:

  • A

    Bulk modulus

  • B

    Modulus of rigidity

  • C

    Compressibility

  • D

    Energy density

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: (P+aV2)(Vb)=RT\left( P + \frac{a}{V^2} \right) (V - b) = RT

Find: The physical quantity having the same dimensional formula as b2a\frac{b^2}{a}.

From the equation, bb is subtracted from VV, so both must have the same dimensions:

[b]=[V][b] = [V]

Also, PP is added to aV2\frac{a}{V^2}, so

[aV2]=[P]\left[\frac{a}{V^2}\right] = [P]

Hence,

[a]=[P][V2][a] = [P][V^2]

Therefore,

[b2a]=[V2][P][V2]=1[P]\left[\frac{b^2}{a}\right] = \frac{[V^2]}{[P][V^2]} = \frac{1}{[P]}

Now, compressibility has dimensions equal to the reciprocal of pressure:

[K]=1[P][K] = \frac{1}{[P]}

Therefore, the physical quantity is Compressibility. The correct option is C.

The solution lists the label as B, but the worked statement identifies Compressibility, which matches option C in the given options.

Dimensional Matching

Given: (P+aV2)(Vb)=RT\left( P + \frac{a}{V^2} \right) (V - b) = RT

Find: Which option matches the dimensions of b2a\frac{b^2}{a}.

Use dimensional consistency of addition and subtraction:

  1. In VbV - b, both terms must have identical dimensions, so [b]=[V][b] = [V].
  2. In P+aV2P + \frac{a}{V^2}, both terms must have identical dimensions, so
[aV2]=[P]\left[\frac{a}{V^2}\right] = [P]

This gives

[a]=[P][V2][a] = [P][V^2]

Now evaluate:

[b2a]=[b]2[a]=[V]2[P][V2]=[P]1\left[\frac{b^2}{a}\right] = \frac{[b]^2}{[a]} = \frac{[V]^2}{[P][V^2]} = [P]^{-1}

Among the given physical quantities, compressibility is the reciprocal of bulk modulus, and hence has dimensions of inverse pressure.

So the correct option is C (Compressibility).

Common mistakes

  • Confusing compressibility with bulk modulus. Bulk modulus has dimensions of pressure, whereas compressibility has dimensions of reciprocal pressure. Use the inverse relation carefully.

  • Assuming aa and bb are independent constants with arbitrary dimensions. Their dimensions must be obtained from the addition and subtraction terms in the equation of state.

  • Using [ab2]=[P]\left[\frac{a}{b^2}\right] = [P] and then forgetting to invert while finding [b2a]\left[\frac{b^2}{a}\right]. The required quantity is inverse pressure, not pressure.

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