\displaystyle{x}={2}^{{\frac{{1}}{{4}}}}{\left({\cos{{\left(\frac{{{5}\pi}}{{12}}\right)}}}+{i}{\sin{{\left(\frac{{{5}\pi}}{{12}}\right)}}}\right)} or \displaystyle{2}^{{\frac{{1}}{{4}}}}{\left(-{\cos{{\left(\frac{{\pi}}{{12}}\right)}}}+{i}{\sin{{\left(\frac{{\pi}}{{12}}\right)}}}\right)} ...

X = 6 Explanation: \displaystyle{\left(\sqrt{{3}}\right)}^{{{2}{X}+{4}}} = \displaystyle{9}^{{{X}-{2}}} \displaystyle{3}^{{\frac{{1}}{{2}}{\left({2}{X}+{4}\right)}}} = \displaystyle{3}^{{{2}{\left({X}-{2}\right)}}} ...

\displaystyle{x}=-{2}\sqrt{{3}} or \displaystyle\sqrt{{3}} Explanation: To solve \displaystyle{x}^{{2}}+\sqrt{{3}}{x}-{6}={0} , there could be two ways, one, by factorizing the quadratic ...

Plot it with your favorite free graphing software, and see where it crossed the X axis to get sqrt(3) and 3*sqrt(3):

No real roots. Explanation: \displaystyle{y}={2}{x}^{{2}}+{5}\sqrt{{3}}{x}+{11}={0} Solve this quadratic equation by using the quadratic formula: \displaystyle{D}={b}^{{2}}-{4}{a}{c}={75}-{88}=-{13} ...

\displaystyle{8}{x}^{{2}}+{8}\sqrt{{2}}{x}+{4}={8}{\left({x}+\frac{{1}}{\sqrt{{2}}}\right)}^{{2}}={0} and solution is \displaystyle\pm\frac{{1}}{\sqrt{{2}}} Explanation: \displaystyle{8}{x}^{{2}}+{8}\sqrt{{2}}{x}+{4}={0} ...