First of all, when you see this sort of seemingly intractable problem, don't despair. There's usually a very simple "trick" that makes the problem trivial. In this case, you have to realise two ...

The question asks about the prime factorisation of \sum_{k=0}^{n}k! . The first thing to notice is that you have 0!=1!=1 and all the other terms are divisible by 2, so the sum is divisible by ...

Okay let's try to make rigorous sense of this question: First you need to define what you mean by a 10-adic number (10 is not prime!). The most sensible thing to consider would be, in this context, R = \varprojlim \mathbb{Z}/10^n\mathbb{Z} ...

I’m not sure about your notation, but I’ll do my best to answer. The first combination equals 190 whose prime factors are 19, 5, and 2. A combination with two means that there will be a two ...

We have p_k(p_k - 1) > p_{k+1} p_k^2 > p_k + p_{k+1} Now, we know there is always a prime between p_k and 2p_k (weak Bertrand's postulate) therefore, p_k<p_{k+1}<2p_k assume ...

1!+2!+3!+4!+\cdots+n!=(1+2)+2\cdot3+2\cdot3\cdot4 +\cdots + 2\cdot3\cdot 4\cdot 5\cdots n= =3(1+2+2\cdot 4+2\cdot4\cdot5 + 2\cdot 4\cdot5\cdots n)