One mole of an ideal monatomic gas undergoes the process `p=alphaT^(1//2)`, where `alpha` is a constant.
(a) Find the work done by the gas if its temperature increases by 50K.
(b) Also, find the molar specific heat of the gas.

One mole of an ideal monatomic gas undergoes the process p=alphaT^(1//2) , whwre a is a constant. The work done by the gas if its temperature increases by 50K is (50R)/(x) . Find the value of x.

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 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 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 .

An ideal diatomic gas (gamma=7/5) undergoes a process in which its internal energy relates to the volume as U=alphasqrtV , where alpha is a constant. (a) Find the work performed by the gas to increase its internal energy by 100J. (b) Find the molar specific heat of the gas.

An ideal diatomic gas (gamma=7/5) undergoes a process in which its internal energy relates to the volume as U=alphasqrtV , where alpha is a constant. (a) Find the work performed by the gas to increase its internal energy by 100J. (b) Find the molar specific heat of the gas.

An ideal diatomic gas (gamma=7/5) undergoes a process in which its internal energy relates to the volume as U=alphasqrtV , where alpha is a constant. (a) Find the work performed by the gas to increase its internal energy by 100J. (b) Find the molar specific heat of the gas.