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

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

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

A diatomic ideal gas is compressed adiabatically to 1/32 of its initial volume. If the initial temperature of the gas is T_(1) (in kelvin) and the final temperature is aT_(1) .Find the value of a.

An ideal monoatomic gas at 27^(@)C is compressed adiabatically to (8)/(27) times of its present volume. The increase in temperature of the gas is

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