Let $P$ be an n th order matrix whose row sums equal $1$. Then for any positive integer m the row sums of the matrix $P^m$ equal $1$.
how can i show that the above statement is true/false? please help.
Let $P$ be an n th order matrix whose row sums equal $1$. Then for any positive integer m the row sums of the matrix $P^m$ equal $1$.
how can i show that the above statement is true/false? please help.