Question

If the point $(2,\alpha ,\beta )$ lies on the plane which passes through the points $(3,4,2)$ and $(7,0,6)$ and is perpendicular to the plane $2x-5y=15$, then $2\alpha -3\beta$ is equal to

Answer 1

Answer: 7

Let the normal to the required plane is , $\vec{n}$ then
$\vec{n}=\left|\begin{array}{ccc}\hat{i}& \hat{j}& \hat{k}\\ 4& -4& 4\\ 2& -5& 0\end{array}\right|=20\hat{i}+8\hat{j}-12\hat{j}$
$\therefore$ Equation of the plane
$\left(x-3\right)\times 20+\left(y-4\right)\times 8+\left(z-2\right)\times \left(-12\right)=0$
$5x-15+2y-8-3z+6=0$
$5x+2y-3z-17=0\dots \left(1\right)$
Since, equation of plane $\left(1\right)$ passes through $\left(2,\alpha ,\beta \right)$,
then $10+2\alpha -3\beta -17=0$
$\Rightarrow 2\alpha -3\beta =7$