The solutions are \displaystyle{S}={\left\lbrace-{19.72},{1.72}\right\rbrace} Explanation: We compare this equation to \displaystyle{a}{x}^{{2}}+{b}{x}+{c}={0} \displaystyle{n}^{{2}}+{18}{n}-{34}={0} ...

m2+422=582 Two solutions were found :  m = 40  m = -40 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

The answer is 26. (mn+3)^2 must be nonnegative because it is a square and -|m+n+2| must be nonpositive because it is an absolute value (always positive) multiplied by -1, thus they must both ...

\displaystyle-{4}{<}{n}{>}{6} Explanation: \displaystyle{n}^{{2}}+{\left({2}\right)}{n}{\left(-{24}\right)}{>}{0} We need to factor this quadratic We need to find two numbers that add to \displaystyle{2} ...

See a solution process below: Explanation: First, add \displaystyle{\left({2}\right)} to each side of the equation to put it into standard quadratic format: \displaystyle{p}^{{2}}-{10}{p}+{7}+{\left({2}\right)}=-{2}+{\left({2}\right)} ...

(3m^2+2am-a^2)+4b (3m+a)(m-a)+4b