One mole of an ideal gas whose pressure changes with volume as `P=alphaV` , where `alpha` is a constant, is expanded so that its volume increase `eta` times. Find the change in internal energy and heat capacity of the gas.

Consider one mole of an ideal gas whose volume changes with temeperature as V=(alpha)/(T) , where alpha is a constant. Heat is supplied to the gas to raise its temperature by DeltaT . If gamma adiabatic constant then choose the correct options.

Consider one mole of an ideal gas whose volume changes with temeperature as V=(alpha)/(T) , where alpha is a constant. Heat is supplied to the gas to raise its temperature by DeltaT . If gamma adiabatic constant then choose the correct options.

The pressure of an ideal gas varies with volume as P= aV, where a is a constant. One mole of the gas is allowed to undergo expansion such that its volume becomes ‘m’ times its initial volume. The work done by the gas in the process is

One mole of an ideal gas is heated at constant pressure so that its temperature rises by DeltaT = 72 K. In The heat supplied is Q=1.6 kJ, find the change in its internal energy and the work done by the gas.

An ideal gas whose adiabatic exponent equals gamma is expanded according to the law p = alpha V , where alpha is a constant. The initial volume of the gas is equal to V_0 . As a result of expansion the volume increases eta times. Find : (a) The incident of the internal energy of the gas , (b) the work performed by the gas , ( c) the molar heat capacity of the gas in the process.

One mole of an ideal gas undergoes a process P=P_(0)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. The maximum attainable temperature is

One mole of an ideal gas undergoes a process P=P_(0)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. The maximum attainable temperature is

One mole of an ideal gas undergoes a process P=P_(0)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. When temperature is maximum, volume is