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} ...

\displaystyle{h}{\left({3}\right)}={3} Explanation: For \displaystyle{h}{\left({3}\right)} , we have to find the value of \displaystyle{x} . \displaystyle{5}-{2}{x}={3} \displaystyle{2}{x}={2} ...

Given that, 7x^2+2\sqrt{14}x+2 we know that, A = (\sqrt{A})^2 \sqrt{AB}=(\sqrt{A})(\sqrt{B}) ∴(\sqrt{7}x)^2+2\sqrt{7}x \sqrt{2}+(\sqrt{2})^2 ∴(\sqrt{7}x+\sqrt{2})^2 ∴ ...

We have x^2-2\sqrt{2}x+1=(x-(1+\sqrt2))(x-(-1+\sqrt2))=0 so let x_1=1+\sqrt2 and x_2=-1+\sqrt2. Let a=\tan^{-1}(1+\sqrt2). Using the double angle tangent formula, \begin{align}\tan2a=\frac{2\tan a}{1-\tan^2a}&\implies\tan2a=\frac{2(1+\sqrt2)}{1-(1+\sqrt2)^2}=-1\end{align} ...

Hint: Minimizing the distance is equivalent to minimizing the square of the distance. Remove that square root sign. You get a harmless quadratic. So I would write "equivalently, we minimize the ...