A heat exchanger is a device in which heat flows between two fluid streams brought into thermal contact through a barrier, such as a pipe wall. Heat exchangers can be operated in either the cocurrent (both fluid streams flowing in the same direction) or countercurrent (streams flowing in opposite direction). The heat flow rate from fluid 1 to fluid 2 per unit length of the heat exchanger, Q is proportional to the temperature difference (T1-T2): Q=(Heat flow rate from fluid 2 per unit length of heat exchanger) = k(T1-T2) where k is a constant of proportionality with units of J/(m s K0. The fluids in the two streams are the same and their flow rates are equal. The initial and final temperatures of stream 1 will be 35C and 15C, respectively, and those for stream 2 will be -15C and 5 C. a) Wrtie the balance equations for each fluid stream in a portion of the heat exchanger of length dL and obtain differential equations by letting dL->0. b) Intergreate the energy balance equations over the length of the exchanger to obtain expressions for the temperature of each stream at any point in the exchanger for each flow confuguration. Also compute the length of the exchanger, in units of L0 = M Cp / 2k (where M is the mass flow rate of either stream), needed to accomplish the desired heat transfer. c) Write an expression for the change of entropy of stream 1 with distance for any point in the exchanger.