Is there a way to solve for A and B which are probabilities when:
AN + BL = 1
(1 - A)^(M-1) x = k
(1 - B)^(M-1) y = k
It s ok to solve it for the limit case as N, L, and M go to infinity.
Is there a way to solve for \pi_{H} and \pi_{L} which are probabilities when:
\pi_{H} N_{H} + \pi_{L} N_{L} = 1
(1 - \pi_{H})^{M-1} y_{H} = k
(1 - \pi_{L})^{M-1} y_{L} = k
It s ok to solve it for the limit case as N_{H}, N_{L}, and M go to infinity.