Question

$PQ$ is a chord of the parabola which subtends a right angle at the vertex. Then locus of the centroid of triangle $PSQ$, where $S$ is the focus of a given parabola, is

Answer 1

Step 1. Determine the slopes of $OP$ and $OQ$.

It is given that $PQ$ is a chord of the parabola that subtends a right angle at the vertex.

Assume the parabola is of the form $x^2=4y$ and $S(0,1)$.

Consider the two points $P$ and $Q$ has coordinates $\left(2t_1,{t_1}^2\right)$ and $\left(2t_2,{t_2}^2\right)$.

Then, the slope of $OP$ is as follows:

$\begin{array}{rcl}\mathrm{Slope}\mathrm{of}OP& =& \frac{{t_1}^2}{2t_1}\\ & \Rightarrow & \mathrm{Slope}\mathrm{of}OP=\frac{t_1}{2}\end{array}$

The slope of $OQ$ is as follows:

$\begin{array}{rcl}\mathrm{Slope}\mathrm{of}OQ& =& \frac{{t_2}^2}{2t_2}\\ & \Rightarrow & \mathrm{Slope}\mathrm{of}OQ=\frac{t_2}{2}\end{array}$

Hence, the slope of $OP$ is $\frac{t_1}{2}$ and $OQ$ is $\frac{t_2}{2}$.

Step 2. Determine the value of $h$ and $k$ in terms of $t_1$ and $t_2$.

It is given that $OP$ is perpendicular to $OQ$ with $O$ as the origin.

Since $OP$ is perpendicular to $OQ$, $\begin{array}{rcl}\mathrm{Slope}\mathrm{of}OP\times \mathrm{Slope}\mathrm{of}OQ& =& -1\end{array}$.

$\begin{array}{rcl}\frac{t_1}{2}\times \frac{t_2}{2}& =& -1\\ & \Rightarrow & \frac{t_1{t}_2}{4}=-1\\ & \Rightarrow & t_1{t}_2=-4\end{array}$

Consider the centroid of the parabola to be denoted by $C\left(h,k\right)$ and it is given by $C\left(h,k\right)=\left(\frac{2t_1+2t_2+0}{3},\frac{{t_1}^2+{t_2}^2+1}{3}\right)$.

The value of $h$ and $k$ is as follows:

$\begin{array}{rcl}h& =& \frac{2t_1+2t_2+0}{3}\\ & \Rightarrow & \frac{3h}{2}=t_1+t_2\cdots \left(1\right)\\ k& =& \frac{{t_1}^2+{t_2}^2+1}{3}\\ & \Rightarrow & 3k-1={t_1}^2+{t_2}^2\cdots \left(2\right)\end{array}$

Hence, the value of $h$ in terms of $t_1$ and $t_2$ is is $\begin{array}{rcl}\frac{3h}{2}& =& t_1+t_2\end{array}$ and $k$ in terms of $t_1$ and $t_2$ is $\begin{array}{rcl}3k-1& =& {t_1}^2+{t_2}^2\end{array}$.

Step 3. Determine the locus of the centroid.

Take square on both sides of the equation $\left(1\right)$.

$\begin{array}{rcl}\frac{9h^2}{4}& =& {\left(t_1+t_2\right)}^2\\ & \Rightarrow & \frac{9h^2}{4}={t_1}^2+{t_2}^2+2t_1{t}_2\\ & \Rightarrow & \frac{9h^2}{4}={t_1}^2+{t_2}^2+2\left(-4\right)\left[\therefore t_1{t}_2=-4\right]\\ & \Rightarrow & \frac{9h^2}{4}+8={t_1}^2+{t_2}^2\cdots \left(3\right)\end{array}$

Equate equation $\left(2\right)$ and $\left(3\right)$.

$\begin{array}{rcl}3k-1& =& \frac{9h^2}{4}+8\\ & \Rightarrow & 12k-4=9h^2+32\\ & \Rightarrow & 9h^2=12k-36\\ & \Rightarrow & 3h^2=4k-12\\ & \Rightarrow & h^2=\frac{4}{3}\left(k-3\right)\end{array}$

Hence, the locus of the centroid is $x^2=\frac{4}{3}\left(y-3\right)$.