Physics, Kinetic Theory MCQs | 100 Questions With Answers
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Kinetic Theory MCQs with Answers – Part 3 (Class 11 Physics)

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211. A graph of internal energy \(U\) versus absolute temperature \(T\) is drawn for a fixed amount of monatomic ideal gas. The slope of the graph is
ⓐ. \(\frac{2}{3}nR\)
ⓑ. \(\frac{3}{2}RT\)
ⓒ. \(\frac{nR}{T}\)
ⓓ. \(\frac{3}{2}nR\)
212. A fixed amount of monatomic ideal gas is compressed so that its temperature rises from \(300\,\text{K}\) to \(450\,\text{K}\). The ratio of final to initial internal energy is
ⓐ. \(2:3\)
ⓑ. \(1:1\)
ⓒ. \(3:2\)
ⓓ. \(9:4\)
213. Degrees of freedom of a molecule mean the
ⓐ. independent ways to store energy
ⓑ. number of walls in the gas container
ⓒ. number of molecules in one mole
ⓓ. pressure exerted by one molecule only
214. A monatomic molecule moving freely in three-dimensional space has
ⓐ. \(1\) translational degree of freedom
ⓑ. \(2\) translational degrees of freedom
ⓒ. \(3\) translational degrees of freedom
ⓓ. \(6\) translational degrees of freedom
215. In the expression \(U=\frac{f}{2}nRT\), the symbol \(f\) represents
ⓐ. pressure force on one wall
ⓑ. active degrees of freedom
ⓒ. number of moles only
ⓓ. frequency of wall collision only
216. Consider the following statements about degrees of freedom. I. They represent independent ways of storing molecular energy. II. Translational degrees of freedom exist for molecules moving in space. III. They always equal Avogadro's number for any gas.
ⓐ. II and III only
ⓑ. I and III only
ⓒ. I, II, and III
ⓓ. I and II only
217. Match the molecular motion type with the best description.
Motion typeDescription
P. Translational1. Motion of the molecule's centre of mass through space
Q. Rotational2. Turning motion about an axis
R. Vibrational3. Periodic relative motion of atoms within a molecule
S. Mole count4. Number of molecules in a sample
ⓐ. P-2, Q-1, R-3, S-4
ⓑ. P-1, Q-3, R-2, S-4
ⓒ. P-4, Q-2, R-3, S-1
ⓓ. P-1, Q-2, R-3, S-4
218. A diatomic molecule at ordinary temperature is often treated as having translational and rotational degrees of freedom, while vibrational modes are neglected. This treatment means that
ⓐ. all possible molecular motions are always active equally
ⓑ. only active energy modes are counted
ⓒ. molecules have no translational motion
ⓓ. the gas must have zero internal energy
219. According to the law of equipartition of energy, each active quadratic degree of freedom contributes an average energy of
ⓐ. \(\frac{1}{2}k_BT\) per molecule
ⓑ. \(\frac{3}{2}k_BT\) per molecule
ⓒ. \(k_BT^2\) per molecule
ⓓ. \(\frac{1}{2}RT\) per molecule
220. A monatomic ideal gas has \(f=3\) active degrees of freedom. The average energy per molecule is therefore
ⓐ. \(\frac{1}{2}k_BT\)
ⓑ. \(k_BT\)
ⓒ. \(\frac{3}{2}k_BT\)
ⓓ. \(3k_BT\)
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