Question (1): (20 points) The input to a weakly symmetric channel is a two-symbol alphabet Ex = {A, B}. The output of the channel is a three-symbol alphabet Ey = { C, D, E} according to the following: If the input is A, the output is either C or D or E with probabilities (1/3, 1/6, 1/2), respectively. If the input is B, the output is either C or D or E with probabilities (1/3, 1/2, 1/6), respectively. Find the channel transition matrix Q. (5 points) (10 points) Compute the channel capacity if the input symbols are equiprobable. Compute log() - H(column of Q) and comment on its value. (5 points)