The volume of a gas is reduced adibatically to `(1//4)` of its volume at `27^(@)C`. if `gamma = 1.4` . The new temperature will be

The volume of a gas is reduced adibatically to (1//4) of its volume at 27^(@)C if y = 1.4 The new temperature will be

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

The volume of gas is reduced to half from its original volume. The specific heat will be

A monoatomic gas is compressed adiabatically to (8)/(27) of its initial volume if initial temperature is 27^@C , find increase in temperature

The volume of a given mass of a gas is reduced to 1/4 th of its initial value of at constant temperature. Calculate the percentage change in the pressure of the gas.

The volume of a given mass of a gas is reduced to (1)/(4) th of its initial alue at constant temperature. Calculate the percentage change in the pressure of the gas.

A gas at 105 Pascal pressure and 27ºC temperature is compressed adiabatically to (1)/(8) th of its initial volume. The final temperature of gas becomes 927ºC. The value of gamma for the gas will be -

A mass of ideal gas at pressure P is expanded isothermally to four times the original volume and then slowly compressed adiabatically to its original volume. Assuming gamma to be 1.5, the new pressure of the gas is