Two rods whose lengths are l1 and l2 an...

Two rods whose lengths are `l_1` and `l_2` and heat conductivity coefficient `x_1` and `x_2` are placed end to end. Find the heat conductivity coefficient of a uniform rod of length `l_1 + l_2` whose conductivity is the same as that of the system of these two rods. The lateral surfaces of the rods are assumed to be thermally insulated.

Similar Questions

Explore conceptually related problems

Two rods having length l_1 and l_2 , made of materials with the linear expansion coefficient alpha_1 and alpha_2 , were soldered together. The equivalent coefficient of linear expansion for the obtained rod is

Two rods having length l_(1) and l_(2) , made of materials with the linear coefficient of expansion alpha_(1) and alpha_(2) were welded together. The equivalent coefficients of linear expansion for the obtained rod:-

Two rods of length l and 2l thermal conductivities 2K and K are connected end to end. If cross sectional areas of two rods are eual, then equivalent thermal conductivity of the system is .

Two rods of length l_(1) and l_(2) and coefficients of thermal conductivities k_(1) and K_(2) are kept touching each other. Both have the same area of cross-section. The equivalent of thermal conductivity is

Three rods of lengths L,21 and 3L having thermal conductivities 3K,2K and K are connected end to end If cross sectional areas of three rods are equal If cross sectional areas of three rods are equal then equivalent thermal conductivity of the system is .

There are two rods of length l_1 and l_2 and coefficient of linear expansions are alpha_1 and alpha_2 respectively. Find equivalent coefficient of thermal expansion for their combination in series.

Two rods having length l_(1) and l_(2) , made of materials with the linear coefficient of expansion alpha_(1) and alpha_(2) were welded togther. The equivalent coefficients of linear expansion for the obtained rod:-

A metal rod of area of cross section A has length L and coefficient of thermal conductivity K the thermal resistance of the rod is .

There are two rods of length l_1 l_2 and coefficient of linear expansions are alpha_1 and alpha_2 respectively. Find equivalent coefficient of thermal expansion for their combination in series.

Similar Questions

Recommended Questions