An ideal gas has an adiabatic exponent `gamma`. In some process its molar heat capacity varies as `C = alpha//T`,where `alpha` is a constant Find :
(a) the work performed by one mole of the gas during its heating from the temperature `T_0` to the temperature `eta` times higher ,
(b) the equation of the process in the variables `p, V`.

One mole of an ideal gas whose adiabatic axponent equal gamma undergoes a process in which the gas pressure relates to the temperature as p = aT^alpha , where a and alpha are consists. Find : (a) the work performed by the gas if its temperature gets an increment Delta T , (b) the molar heat capacity of the gas in the process , at what value of alpha will the heat capacity be negative ?

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 the work performed by the gas and the amount of heat to be transferred to this gas to increase its internal energy by DeltaU

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.

For an ideal gas the equation of a process for which the heat capacity of the gas varies with temperatue as C=(alpha//T(alpha) is a constant) is given by

An ideal gas has adiabatic exponenty. It expands according to the law P = alpha V, where is alpha constant. For this process, the Bulk modulus of the gas is

The molar heat capacity C for an ideal gas going through a given process is given by C=a/T , where 'a' is a constant. If gamma=C_p/C_v , the work done by one mole of gas during heating from T_0 to eta T_0 through the given process will be

The volume of one mode of an ideal gas with adiabatic exponent gamma is varied according to the law V = a//T , where a is constant . Find the amount of heat obtained by the gas in this process, if the temperature is increased by Delta T .

An ideal gas with the adiabatic exponent gamma goes through a process p = p_0 - alpha V , where p_0 and alpha are positive constants, and V is the volume. At what volume will the gas entropy have the maximum value ?

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.

For an ideal gas the molar heat capacity varies as C=C_V+3aT^2 . Find the equation of the process in the variables (T,V) where a is a constant.