\displaystyle{12}{x} Explanation: Given: \displaystyle\sqrt{{{24}{x}}}\times\sqrt{{{6}{x}}} Note that 24 is the same as \displaystyle{4}\times{6}\to{2}^{{2}}\times{6} So if we 'split ...

\displaystyle\sqrt{{{30}{x}}} Explanation: \displaystyle\sqrt{{{2}{x}}}.\sqrt{{15}} is the same as \displaystyle\sqrt{{{2}{x}\times{15}}} which equals \displaystyle\sqrt{{{30}{x}}}

\sqrt{2x}\sqrt{x}=\sqrt{2}\sqrt{x}\sqrt{x}=\sqrt{2}(\sqrt{x})^2=\sqrt{2}x=x\sqrt{2} since the square and square-root cancel each other out.

\displaystyle{9}{x} Explanation: \displaystyle{3}\sqrt{{x}}\cdot{3}\sqrt{{x}} \displaystyle={3}^{{2}}\cdot{\left[\sqrt{{{x}}}\right]}^{{2}} \displaystyle={9}{x}

Since it must be \;-5x-1\ge0\iff x\le-\frac15\; , the right side is negative, and since the left side is always non-negative, the inequality is true always within its definition domain, i.e.: ...

Definition of dot product of n\times 1 real matrices: x\cdot y \stackrel{def}= x^Ty