Consider a flat plate, of porous material, of thickness b and with the other two dimensions being very large. Heat is being generated by chemical reaction at the center line (x=0) of the slab such that the temp at the center of the slab is constant at Tc. The slab is surrounded by a gas having temperature Ts, and the heat transfer coefficient is so large that the temperature at the boundary may be considered equal to the temperature in the bulk. A) Write the differential equation to find the temperature in the slab as a function of position. B) Write the boundary conditions necessary to solve the problem. C) Solve the differential equation in (A) for temperature as a function of position.