\frac{n!}{k!\cdot (n-k)!} =\frac{n(n-1)\cdots(n-k+1)}{k!} =\frac{(n-k+k)(n-1)\cdots(n-k+1)}{k!}\\ =\frac{(n-1)\cdots(n-k)}{k!}+ \frac{(n-1)\cdots(n-k+1)}{(k-1)!} Now use (double) induction. This ...

Let X_1 denote the number of times we draw the first red marble, X_2 the number of times we draw the second red marble, and X_3 be the number of times we draw a blue marble. We wish to find P(X_1 \geq 1, X_2 \geq 1) ...

Assuming that a_1,\ldots,a_n are distinct integers, n\binom{l}{a_1,\ldots,a_n}\\=\binom{l}{a_1,a_2,\ldots,a_{n-1},a_n}+\binom{l}{a_2,a_3\ldots,a_{n},a_1}+\ldots+\binom{l}{a_n,a_1,\ldots,a_{n-2},a_{n-1}} ...

We’re dealing with a principal unit z=1+x where |x|<1, or equivalently v_p(x)>0; and with a p-adic integer \alpha. You ask about two methods of calculating z^\alpha, but you don’t say ...

You drop the marginal density p(x) (the normalizing constant ) because it is a function of the data which are fixed (in the Bayesian context ) but that leads the posterior density p(\theta|x) to ...