Hint: let \mathbb Z^n denote the integer lattice in \mathbb R^n. Which functions f : \mathbb Z^n \to \mathbb R are uniformly continuous?

I have the answer. I can write a(x) = b(x)(x+1)+d(x) So d(x) = a(x)-b(x)(x+1) Then, \alpha(x) = 1 and \beta(x)=-(x+1). It's really easy :)

A(x)=g \circ h(x) since g \circ h(x)=g (h(x))=g(x^2)=x^2-7 B(x)=h(g(x)) since h (g(x))=h((x-7))=(x-7)^2=x^2-14x+49 Try to complete the other two, Hint for the last one, you have to make two ...

Consider the function f_t:[0,1]\to\Bbb R, with t>1. f_t(x)=\frac1{t(1-x)+t-1}\\ \begin{align} \implies F_t &= \int_0^1f_t=\frac 1t\log\left(\frac{2t-1}{t-1}\right)\\ \implies G_t &= \max\{f_t(x)(1-x)\mid x\in[0,1]\}=\frac 1{2t-1}\\ \end{align} ...

Here is a solution without typo's. Let a_i=((p-1)i)! \binom{p^2 i}{pi}. We want to evaluate v_p\left(\frac{1}{p^{n^2}} \prod_{i=1\text{, i odd.}}^{2n-1} a_i\right) Note that by the identities ...

First, your calculations are correct. I think your difficulty is that there are two ways of looking at these problems and you are mixing them up. One possibility is to say that we are looking at a ...