The specific heat of a metal at low temperature varies according to `S= (4//5)T^(3)` where `T` is the absolute temperature. Find the heat energy needed to raise unit mass of the metal from ` T = 1 K ` to `T= 2K`.

If a piece of metal is heated to temperature theta and the allowed to cool in a room which is at temperature theta_0 , the graph between the temperature T of the metal and time t will be closet to

One mole of an ideal monoatomic gas at temperature T_0 expands slowly according to the law p/V = constant. If the final temperature is 2T_0 , heat supplied to the gas is

A quantity of 2 mole of helium gas undergoes a thermodynamic process, in which molar specific heat capacity of the gas depends on absolute temperature T , according to relation: C=(3RT)/(4T_(0) where T_(0) is initial temperature of gas. It is observed that when temperature is increased. volume of gas first decrease then increase. The total work done on the gas until it reaches minimum volume is :-

Velocity of particle of mass 2kg varies with time t accoridng to the equation vecv=(2thati+4hatj)ms^(-1) . Here t is in seconds. Find the impulse imparted to the particle in the time interval from t=0 to t=2s.

The molar specific heat of the process V alpha T^(4) for CH_(4) gas at room temperature is :-

An ideal gas at temperature T_1 is compressed to 32th of its original volume, then its temperature T_2 will be _____ (gamma=1.4)

A particle is acted upon by a force given by F=(12t-3t^(2)) N, where is in seconds. Find the change in momenum of that particle from t=1 to t=3 sec.

The specific heat capacity of a metal at low temperature (T) is given as C_(p)(kJK^(-1) kg^(-1)) =32((T)/(400))^(3) A 100 gram vessel of this metal is to be cooled from 20^(@)K to 4^(@)K by a special refrigerator operating at room temperaturte (27^(@)C) . The amount of work required to cool the vessel is

One end of rod of length L and cross-sectional area A is kept in a furance of temperature T_(1) . The other end of the rod is kept at at temperature T_(2) . The thermal conductivity of the material of the rod is K and emissivity of the rod is e . It is given that T_(2)=T_(S)+DeltaT where DeltaT lt lt T_(S) , T_(S) being the temperature of the surroundings. If DeltaT prop (T_(1)-T_(S)) , find the proportionality constant. Consider that heat is lost only by radiation at the end where the temperature of the rod is T_(2) .