Question

The centroid of the triangle formed by the feet of the normals from the point $(h,k)$ to the parabola $y^2+4ax$ $=0,(a>0)$ lies on

• A. $x$-axis
• B. $y$-axis
• C. $x=h$
• D. $y=k$

Answer 1

Answer: (A)

Co-ordinates of any point on the parabola $y^2=-4ax$ are $\left(-a{t}^2,2at\right)$
Equation of the normal at $\left(-a{t}^2,2at\right)$ is
$y-xt=2at+a{t}^3$
If the normal passes through the point $(h,k)$, then
or $a{t}^3+(2a+h)t-k=0$,
$k-th=2at+a{t}^3$
which is a cubic equation whose three roots $t_1,t_2,t_3$ are the parameters of the feet of the three normals.
$\therefore$ Sum of the roots $=t_1+t_2+t_3=-\frac{\text{ Coefficient of }{t}^2}{\text{ Coefficient of }{t}^3}=0$
$\therefore$ Centroid of the triangle formed by the feet of the normals
$=\left(-\frac{a}{3}\left(t_1^2+t_2^2+t_3^2\right),\frac{2a}{3}\left(t_1+t_2+t_3\right)\right)$
$=\left(-\frac{a}{3}\left(t_1^2+t_2^2+t_3^2\right),0\right)$
which, clearly, lies on the $x$-axis.