The sum of squares of all possible values of $k$, for which area of the region bounded by the parabolas $2 \mathrm{y}^2=\mathrm{kx}$ and $\mathrm{ky}^2=2(\mathrm{y}-\mathrm{x})$ is maximum, is equal to :
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Solution
$k y^2=2(y-x)$
$$
2 y^2=k x
$$
Point of intersection →
$$
\begin{aligned}
& k y^2=\left(y-\frac{2 y^2}{k}\right) \\
& y=0 k y=2\left(\frac{1-2 y}{k}\right) \\
& k y+\frac{4 y}{k}=2 \\
& y=\frac{2}{k+\frac{4}{k}}=\frac{2 k}{k^2+4} \\
& \frac{2 k}{k^2+4}\left(\left(y-\frac{k y}{2}\right)-\left(\frac{2 y^2}{k}\right)\right) \cdot d y \\
& =\frac{y^2}{2}-\left.\left(\frac{k}{2}+\frac{2}{k}\right) \cdot \frac{y^3}{3}\right|_0 ^{\frac{2 k}{k^2+4}} \\
& =\left(\frac{2 k}{k^2+4}\right)^2\left[\frac{1}{2}-\frac{k^2+4}{2 k} \times \frac{1}{3} \times \frac{2 k}{k^2+4}\right] \\
& =\frac{1}{6} \times 4 \times\left(\frac{1}{k+\frac{4}{k}}\right)^2
\end{aligned}
$$
$$
\begin{aligned}
& A \cdot M \geq G \cdot M \frac{\left(k+\frac{4}{k}\right)}{2} \geq 2 \\
& \mathrm{k}+\frac{4}{\mathrm{k}} \geq 4
\end{aligned}
$$
Area is maximum when $\mathrm{k}=\frac{4}{\mathrm{k}}$
$$
\mathrm{k}=2,-2
$$
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