One mole of an ideal monoatmic gas under...

One mole of an ideal monoatmic gas undergoes a process defined y `U=asqrtV` where `U` is internal energy and `V` is its volume.The molar specific heat of the gas for this process is found to be `(**)/(12)R`. The number in the numerator is not readable.What may be this number ?

Similar Questions

Explore conceptually related problems

An ideal diatomic gas undergoes a process in which the pressure is proportional to the volume. Calculate the molar specific heat capacity of the gas for the process.

One mole of an ideal monoatomic gas undergoes a process as shown in the figure. Find the molar specific heat of the gas in the process. R is a gas constant.

An ideal gas with adiabatic exponent gamma = 4/3 undergoes a process in which internal energy is related to volume as U = V^2 . Then molar heat capacity of the gas for the process is :

A certain amount of ideal monoatomic gas undergoes a process given by TV^(1//2) = constant. The molar specific heat of the gas for the process will be given by

One mole of a diatomic gas undergoes a thermodynamic process, whose process equation is P prop V^(2) . The molar specific heat of the gas is

One mole of an ideal monatomic gas undergoes the process P=alphaT^(1//2) , where alpha is constant . If molar heat capacity of the gas is betaR1 when R = gas constant then find the value of beta .

One mole of an ideal monoatmic gas undergoes a process defined y `U=asqrtV` where `U` is internal energy and `V` is its volume.The molar specific heat of the gas for this process is found to be `(**)/(12)R`. The number in the numerator is not readable.What may be this number ?

Similar Questions

Recommended Questions