A diatomic gas expands adiabatically so that final density is 32 times the initial density. Find pressure becomes N times of initial presurre . the value of N 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

In an adiabatic process, the density of a diatomic gas becomes 32 times its initial value . The final pressure fo the gas is found to be n time the initial pressure . The value of n is :

A monatomic gas is expanded adiabatically and due to expansion volume becomes 8 times, then

An ideal monatomic gas at 300 K expands adiabatically to 8 times its volume . What is the final temperature ?

An ideal gs at pressure P is adiabatically compressed so that its density becomes n times the initial vlaue The final pressure of the gas will be (gamma=(C_(P))/(C_(V)))

A gas is compressed adiabatically till its pressure becomes 27 times its initial pressure. Calculate final temperature if initial temperature is 27^@ C and value of gamma is 3/2.

An ideal gas at a pressure of 1 atm and temperature of 27^(@)C is compressed adiabatically until its pressure becomes 8 times the initial pressure , then final temperature is (gamma=(3)/(2))

An ideal diatomic gas is taken through an adiabatic process in which density increases to 32 times. If pressure increases to 'n' times. Find n

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