\displaystyle{x}\le{3}{\quad\text{and}\quad}{x}\ge-{5},{S}{o},{x}\in{\left[-{5},{3}\right]} . Explanation: For the product to be negative, \displaystyle{\left({x}-{3}\right)}{\quad\text{and}\quad}{\left({x}+{5}\right)} ...

The answer is \displaystyle{x}\in{\left[-{3},{7}\right]} Explanation: Let \displaystyle{f{{\left({x}\right)}}}={\left({x}-{7}\right)}{\left({x}+{3}\right)} Let's build the sign chart \displaystyle{\left({a}{a}{a}{a}\right)} ...

\displaystyle-{6}\le{x}\le-{3} Explanation: \displaystyle{\left({x}+{3}\right)}{\left({x}+{6}\right)}\le{0} Let's start by distributing the left side \displaystyle{\left({x}\right)}{\left({x}\right)}+{\left({x}\right)}{\left({6}\right)}+{\left({3}\right)}{\left({x}\right)}+{\left({3}\right)}{\left({6}\right)}\le{0} ...

Equality is reached iff (x-3) and -(x+1) have the same sign. An equivalent condition is that -(x-3)(x+1) \geq 0, which is the same as (x-3)(x+1) \leq 0.

This answer falls short of what might be considered an adequate response, but does offer good evidence for the veracity of what is stated in the question. The assertion : There is at least 1 prime ...

This is due to Fubbini's Theorem as follows: \begin{align} \int_{\Xi^{2}}\left\|\xi-\xi' \right\|\Pi(d\xi,d\xi') &= \int_{\Xi^{2}}\left\|\xi-\xi'\right\|\frac{1}{N} ...