An ideal diatomic gas under goes a process in which its internal energy chnges with volume as given `U=cV^(2//5)` where c is constant. Find the ratio of molar heat capacity to universal gas constant `R` ?

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.

An ideal monoactomic gas undergoes a process ini which its internal energy depends upon its volume as U=asqrt(V) [where a is a constant] (a) find work done by a gas and heat transferred to gas to increse its internal energy by 200 J. (b) find molar specific heat of gas for this process.

An ideal monoactomic gas undergoes a process ini which its internal energy depends upon its volume as U=asqrt(V) [where a is a constant] (a) find work done by a gas and heat transferred to gas to increse its internal energy by 200 J. (b) find molar specific heat of gas for this process.

An ideal gas with the adiabatic exponent gamma undergoes a process in which its internal energy relates to the volume as u = aV^alpha . Where a and alpha are constants. Find : (a) the work performed by the gas and the amount of heat to be transferred to this gas to increase its internal energy by Delta U , (b) the molar heat capacity of the gas in this process.

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.

An ideal gas undergoes a thermodynamic process in which internal energy of the gas depends on pressure of the gas as U= ap!, where a is a positive constant. Assuming gas to be monoatomic, the molar heat capacity of the gas for given process will be