A diatomic gas initially at `18^(@)C` is compressed adiabatically to one-eight of its original volume. The temperature after compression will be

A diatomic gas initially at 18^(@) is compressed adiabatically to one- eighth of its original volume. The temperature after compression will b

A monatomic gas initially at 17^@ C has suddenly compressed adiabatically to one-eighth of its original volume. The temperature after compression is

An ideal gas at 27^(@)C is compressed adiabatically to 8//27 of its original volume. If gamma = 5//3 , then the rise in temperature is

A diatomic ideal gas is compressed adiabatically to 1/32 of its initial volume. If the initial temperature of the gas is T_i (in Kelvin) and the final temperature is a T_i , the value of a is

A diatomic ideal gas is compressed adiabatically to 1/32 of its initial volume. If the initial temperature of the gas is T_i (in Kelvin) and the final temperature is a T_i , the value of a is

A diatomic ideal gas is compressed adiabatically to 1/32 of its initial volume. If the initial temperature of the gas is T_i (in Kelvin) and the final temperature is aT_i , the value of a is

Comprehension-3 An ideal gas initially at pressure p_(0) undergoes a free expansion (expansion against vacuum under adiabatic conditions) until its volume is 3 times its initial volume. The gas is next adiabatically compressed back to its original volume. The pressure after compression is 3^(2//3)p_(0) . The gas, is monoatomic, is diatomic, is polyatomic, type is not possible to decide from the given information. What is the ratio of the average kinetic energy per molecule in the final state to that in the initial state?

Comprehension-3 An ideal gas initially at pressure p_(0) undergoes a free expansion (expansion against vacuum under adiabatic conditions) until its volume is 3 times its initial volume. The gas is next adiabatically compressed back to its original volume. The pressure after compression is 3^(2//3)p_(0) . The pressure of the gas after the free expansion is:

A monoatomic gas is compressed adiabatically to 8/27 of its initial volume, if initial temperature is 27^° C, then increase in temperature

A monoatomic gas is compressed adiabatically to (1)/(4)^(th) of its original volume , the final pressure of gas in terms of initial pressure P is