\displaystyle{x}\le-{5} Explanation: We can start by subtracting \displaystyle{3}{x} from both sides. We get \displaystyle{2}{x}+{1}\le-{9} Next, let's subtract \displaystyle{1} ...

See a solution process below: Explanation: First, subtract \displaystyle{\left({7}\right)} from each side of the inequality to isolate the \displaystyle{x} term while keeping the inequality ...

\displaystyle{x}\ge{2} Explanation: The first thing I see is the negative sign by the \displaystyle{x} . I don't mess with negative division in inequalities. Instead, I'll add \displaystyle{3}{x} ...

The format of 'the graph' depends on what you have been taught. I have shown two options. Explanation: Multiply everything by (-1) to make the \displaystyle{2}{x} positive. Note this action turns ...

\displaystyle{2}\le{x}{<}\frac{{17}}{{2}} Explanation: (1) \displaystyle-{6}\le{2}{\left({x}-{5}\right)} and (2) \displaystyle{2}{\left({x}-{5}\right)}{<}{7} (1): \displaystyle-{6}\le{2}{x}-{10} ...

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 ...