The average translational kinetic energy of \(O_2\) (molar mass \(32\)) molecules at a particular temperature is \(0.048~\text{eV}\). The translational kinetic energy of \(N_2\) (molar mass \(28\)) molecules in \(\text{eV}\) at the same temperature is:
1. \(0.0015\)
2. \(0.003\)
3. \(0.048\)
4. \(0.768\)
In the PV graph shown below for an ideal diatomic gas, the change in the internal energy is:
1.
2.
3.
4.
To find out the degree of freedom, the correct expression is:
1.
2.
3.
4.
The change in the internal energy of an ideal gas does not depend on?
1. | Number of moles |
2. | Change in temperature |
3. | Specific heat at constant pressure \(C_p\) of the gas |
4. | Specific heat at constant volume \(C_v\) of the gas |
The pressure in a diatomic gas increases from to , when its volume is increased from . The increase in internal energy will be:
1.
2.
3.
4.
The translational kinetic energy of oxygen molecules at room temperature is 60 J. Their rotational kinetic energy will be?
1. 40 J
2. 60 J
3. 50 J
4. 20 J