Suppose {Xn}, n = 0, 1, 2, . . . is a discrete time stochastic process with a finite state space S={1,2,. . . ,N} and suppose that for every finite sequence of states {i0, i1, . . . , in}, n < N, we have P(X0 = i0, X1 = i1, . . . Xn = in) = ?(i0)?n j=1qi(ij |i0, . . . , ij?1), where ?(i) = P(X0 = i), for i = 1, . . . , N and qn(in|i0, . . . , in?1) = P(Xn = in|X0 = i0, . . . , Xn?1 = in?1). Then {Xn} is a Markov Chain. TRUE/FALSE