The two ends of a rod of length `L` and a uniform cross-sectional area `A` are kept at two temperature `T_(1)` and `T_(2)` `(T_(1) gt T_(2))`. The rate of heat transfer. `(dQ)/(dt)`, through the rod in a steady state is given by

Two ends of a rod of non uniform area of cross section are maintained at temperature T_(1) and T_(2) (T_(1)>T_(2)) as shown in the figure If l is heat current through the cross-section of conductor at distance x from its left face, then the variation of l with x is best represented by

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) .

Three rods of same cross-section but different length and conductivity are joined in series . If the temperature of the two extreme ends are T_(1) and T_(2) (T_(1)gtT_(2)) find the rate of heat transfer H.

Two ends of a rod of uniform cross sectional area are kept at temperature 3T_(0) and T_(0) as shown. Thermal conductivity of rod varies as k=alphaT , (where alpha is a constant and T is absolute temperature). In steady state, the temperature of the middle section of the rod is

The temperature of the two outer surfaces of a composite slab, consisting of two materials having coefficients of thermal conductivity K and 2K and thicknesses x and 4x, respectively are T_(2) and T_(1)(T_(2)gtT_(1)) . The rate of heat of heat transfer through the slab, in ? steady state is [(A(T_(2)-T_(1))/(x)]f , with f equal to :-

Two curves are given at temperatures T_(1) and T_(2) in an isothermal process, then-

Two rods are connected as shown. The rods are of same length and same cross sectional area. In steady state, the temperature (theta) of the interface will be -