Question

A variable chord $PQ$ of the parabola $y^2=4ax$ is drawn parallel to line $y=x$. Then the locus of point of intersection of normals at $P$ and $Q$ is:

• A. $2x-y-12a=0$
• B. $2x+y-a=0$
• C. $x-2y-4a=0$
• D. $3x-y-8a=0$

Answer 1

The correct option is A $2x-y-12a=0$

Equation of normal's at $P(a{t}_1^2,2a{t}_2)$ and $Q(a{t}_2^2,2a{t}_2)$ are
$y+x{t}_1=2a{t}_1+a{t}_1^3$ and
$y+x{t}_2=2a{t}_2+a{t}_2^3$
Point of intersection of both lines is
$x=2a+a(t_1^2+t_2^2+t_1{t}_2)$ and
$y=-a{t}_1{t}_2(t_1+t_2)$
$\because$ Slope of chord
$PQ=\frac{2a{t}_1-2a{t}_2}{a{t}_1^2-a{t}_2^2}=1$
$\therefore t_1+t_2=2$
$\Rightarrow y=-a{t}_1{t}_2(t_1+t_2)\Rightarrow t_1{t}_2=\frac{-y}{2a}$
$x=2a+a(t_1^2+t_2^2+t_1{t}_2)\Rightarrow x=2a+a\left(\right(t_1+t_2{)}^2-t_1{t}_2)$
$\Rightarrow x=2a+a(4+\frac{y}{2a})$
$2x-y-12a=0$