An increase in the temperature of a gas-filled in a container would lead to:
1. | decrease in the intermolecular distance. |
2. | increase in its mass. |
3. | increase in its kinetic energy. |
4. | decrease in its pressure. |
If the pressure of a gas is doubled, then the average kinetic energy per unit volume of the gas will be:
1. | half of its initial value. | 2. | double its initial value. |
3. | one-fourth of its initial value. | 4. | four times its initial value. |
The ratio of the average translatory kinetic energy of He gas molecules to gas molecules is:
1.
2.
3.
4. 1
A gas at pressure is contained in a vessel. If the masses of all the molecules are halved and their speeds doubled, the resulting pressure would be:
1.
2.
3.
4.
The translational kinetic energy of n moles of a diatomic gas at absolute temperature T is given by:
1.
2.
3.
4.
If at a pressure of \(10^6\) dyne/cm2, one gram of nitrogen occupies \(2\times10^4\) c.c. volume, then the average energy of a nitrogen molecule in erg is:
1. | \(14\times10^{-13}\) | 2. | \(10\times10^{-12}\) |
3. | \(10^{6}\) | 4. | \(2\times10^{6}\) |
The translatory kinetic energy of a gas per \(\text{g}\) is:
1. | \({3 \over 2}{RT \over N}\) | 2. | \({3 \over 2}{RT \over M}\) |
3. | \({3 \over 2}RT \) | 4. | \({3 \over 2}NKT\) |
Without change in temperature, a gas is forced in a smaller volume. Its pressure increases because its molecules:
1. | strike the unit area of the container wall more often. |
2. | strike the unit area of the container wall at a higher speed. |
3. | strike the unit area of the container wall with greater force. |
4. | have more energy. |
Diatomic molecules like hydrogen have energies due to both translational as well as rotational motion. From the equation in kinetic theory, \(PV = \frac{2}{3}E\) \(E\) is:
1. | the total energy per unit volume. |
2. | only the translational part of energy because rotational energy is very small compared to translational energy. |
3. | only the translational part of the energy because during collisions with the wall, pressure relates to change in linear momentum. |
4. | the translational part of the energy because rotational energies of molecules can be of either sign and its average over all the molecules is zero. |
Heat is associated with:
1. | kinetic energy of random motion of molecules. |
2. | kinetic energy of orderly motion of molecules. |
3. | total kinetic energy of random and orderly motion of molecules. |
4. | kinetic energy of random motion in some cases and kinetic energy of orderly motion in other cases. |