Answer:Options A and D are correct choices.Step-by-step explanation: We have been given an inequality x\\leq -7[\/tex] and we are asked to find the correct options from our given choices.Let us solve inequalities in our given options one by one to see which of these matches with our given inequality.(A) ...

Deepak G. Aug 10, 2016 \displaystyle-{4}{x}-{8}\le{56} or \displaystyle{4}{x}+{8}\ge-{56} or \displaystyle{4}{\left({x}+{2}\right)}\ge-{56} or \displaystyle{x}+{2}\ge-\frac{{56}}{{4}} ...

See a solution process below: Explanation: Subtract \displaystyle{\left({2}{x}\right)} from each side of the inequality to solve for \displaystyle{x} while keeping the inequality balanced: \displaystyle{3}{x}-{\left({2}{x}\right)}\le{2}{x}-{\left({2}{x}\right)}-{3} ...

the answer is \displaystyle{x}\ge{5} Explanation: first you have to subtract \displaystyle{3} from both sides. now you have \displaystyle-{10}\le-{2}{x} and now divide \displaystyle-{2} ...

\displaystyle{2}{<}{x}\le{3} . Explanation: \displaystyle{3}{x}-{5}\le{4} . So, \displaystyle{3}{x}\le{9}{\quad\text{or}\quad}{x}\le{3} . \displaystyle{3}{x}-{5}{>}{1} . So, \displaystyle{3}{x}{>}{6}{\quad\text{or}\quad}{x}{>}{2} ...

We have, for all real numbers a,b, a\le0,\quad b\le0 \implies a+b \le 0 and we don't have a\le0,\quad b\le0 \iff a+b \le 0 since for example -11+1=-10\le0 \quad\text{but}\quad 1>0.