An ideal gas undergoing adiabatic change has the following pressure-temperature relationship

For a monoatomic ideal gas undergoing an adiabatic change, the relation between temperature and volume TV^(x) = constant, where x is

An ideal gas is expended adiabatically then

A rigid diatomic ideal gas undergoes an adiabatic process at room temperature .The relation between temperature and volume for this process in TV^x = constant ,then x is :

A rigid diatomic ideal gas undergoes an adiabatic process at room temperature .The relation between temperature and volume for this process in TV^x = constant ,then x is :

A one mole of an ideal gas expands adiabatically ato constant pressure such that its temperature Tpropto (1)/(sqrt(V)) .The value of the adiabatic constant gas is

The ideal gas equation for an adiabatic process is

When 1mol of a monoatomic ideal gas at TK undergoes adiabatic change under a constant external pressure of 1atm , changes volume from 1 L to 2L . The final temperature (in K) would be

When 1mol of a monoatomic ideal gas at TK undergoes adiabatic change under a constant external pressure of 1atm , changes volume from 1 L to 2L . The final temperature (in K) would be

When an ideal gas is compressed adiabatically and reversibly, the final temperature is:

For an ideal gas the fractional change in its volume per degree rise in temperature at constant pressure is equal to [T is absolute temperature of gas]