MCQEasyJEE 2025Degrees of Freedom & Law of Equipartition

JEE Physics 2025 Question with Solution

For a diatomic gas, if γ1=CPCV\gamma_1 = \frac{C_P}{C_V} for rigid molecules and γ2=CPCV\gamma_2 = \frac{C_P}{C_V} for another diatomic molecules, but also having vibrational modes. Then, which one of the following options is correct? (where CPC_P and CVC_V are specific heats of the gas at constant pressure and volume)

  • A

    γ2=γ1\gamma_2 = \gamma_1

  • B

    γ2>γ1\gamma_2 > \gamma_1

  • C

    2γ2=γ12\gamma_2 = \gamma_1

  • D

    γ2<γ1\gamma_2 < \gamma_1

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: γ1=CPCV\gamma_1 = \frac{C_P}{C_V} for a rigid diatomic molecule and γ2=CPCV\gamma_2 = \frac{C_P}{C_V} for a diatomic molecule with vibrational modes.

Find: The correct relation between γ1\gamma_1 and γ2\gamma_2.

For a gas,

γ=CPCV=CV+RCV=1+RCV\gamma = \frac{C_P}{C_V} = \frac{C_V + R}{C_V} = 1 + \frac{R}{C_V}

So, as CVC_V increases, the value of γ\gamma decreases.

For a rigid diatomic molecule, the degrees of freedom are f=5f = 5. Hence,

CV=f2R=52RC_V = \frac{f}{2}R = \frac{5}{2}R

Therefore,

γ1=1+R(5/2)R=1+25=75\gamma_1 = 1 + \frac{R}{(5/2)R} = 1 + \frac{2}{5} = \frac{7}{5}

When vibrational modes are active, additional degrees of freedom are included. Then,

f=7 f = 7

and so

CV=72RC_V = \frac{7}{2}R

Therefore,

γ2=1+R(7/2)R=1+27=97\gamma_2 = 1 + \frac{R}{(7/2)R} = 1 + \frac{2}{7} = \frac{9}{7}

Now compare:

γ1=75=1.4,γ2=971.29\gamma_1 = \frac{7}{5} = 1.4, \qquad \gamma_2 = \frac{9}{7} \approx 1.29

Thus,

γ2<γ1\gamma_2 < \gamma_1

Therefore, the correct option is D.

Conceptual Comparison

Given: A comparison of the specific heat ratios of two diatomic gases, one rigid and one with vibrational modes.

Find: Whether γ2\gamma_2 is greater than, equal to, or less than γ1\gamma_1.

Vibrational modes add extra degrees of freedom to the molecule. Because of this, more heat supplied goes into internal energy storage for the same rise in temperature, which increases CVC_V.

Since

γ=1+RCV\gamma = 1 + \frac{R}{C_V}

a larger value of CVC_V makes γ\gamma smaller.

So, for the diatomic gas having vibrational modes,

γ2<γ1\gamma_2 < \gamma_1

Hence, the correct option is D.

Common mistakes

  • Assuming that adding vibrational modes increases γ\gamma. This is wrong because vibrational modes increase CVC_V, and from γ=1+RCV\gamma = 1 + \frac{R}{C_V}, a larger CVC_V gives a smaller γ\gamma.

  • Using the monoatomic value of degrees of freedom or the monoatomic heat-capacity ratio. This is incorrect because a diatomic rigid molecule has f=5f = 5, not the monoatomic case.

  • Forgetting that each active vibrational mode contributes two degrees of freedom. This leads to an incorrect value of CVC_V. Count both kinetic and potential contributions for vibration.

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