Question

Prove that the equation to the circle passing through the points $(a{t}_1^2,2a{t}_1)$ and $(a{t}_2^2,2a{t}_2)$ and the intersection of the tangents to the parabola at these points is
$x^2+y^2-ax\left[\right(t_1+t_2{)}^2+2]-ay(t_1+t_2\left)\right(1-t_1{t}_2)+a^2{t}_1{t}_2(2-t_1{t}_2)=0.$

Answer 1

The point of intersection of tangents through $P(a{t}_1^2,2a{t}_1)$ and $Q(a{t}_2^2,2a{t}_2)$ is $R(a{t}_1{t}_2,a(t_1+t_2\left)\right)$

Equation of chord $PQ$ is

$(t_1+t_2)y=2x+2a{t}_1{t}_{2}2x-(t_1+t_2)y+2a{t}_1{t}_2=0$

Equation of circle through end points of chord $PQ$ is

$(x-a{t}_1^2)(x-a{t}_2^2)+(y-2a{t}_1)(y-2a{t}_2)+\lambda (2x-(t_1+t_2)y+2a{t}_1{t}_2)=\mathrm{0.....}\left(i\right)$

It passes through $R$

$(a{t}_1{t}_2-a{t}_1^2)(a{t}_1{t}_2-a{t}_2^2)+\left(a\right(t_1+t_2)-2a{t}_1)\left(a\right(t_1+t_2)-2a{t}_2)+\lambda (2a{t}_1{t}_2-(t_1+t_2\left)a\right(t_1+t_2)+2a{t}_1{t}_2)=0-a{t}_1{t}_2{(t_1-t_2)}^2-a{(t_1-t_2)}^2-\lambda {(t_1-t_2)}^2=0\Rightarrow \lambda =-a(t_1{t}_2+1)$

Simplifying $\left(i\right)$

$x^2+y^2-x(a{t}_1^2+a{t}_2^2-2\lambda )-y(2a{t}_1+2a{t}_2+(t_1+t_2\left)\lambda \right)+a^2{t}_1^2{t}_2^2+4a^2{t}_1{t}_2+2a{t}_1{t}_2\lambda =0$

Substituting $\lambda$

$x^2+y^2-x\{a{t}_1^2+a{t}_2^2-2(-a(t_1{t}_2+1)\}-y\{2a{t}_1+2a{t}_2+(t_1+t_2)(-a(t_1{t}_2+1\left)\right)\}+a^2{t}_1^2{t}_2^2+4a^2{t}_1{t}_2+2a{t}_1{t}_2(-a(t_1{t}_2+1))=0x^2+y^2-x(a{t}_1^2+a{t}_2^2+2a{t}_1{t}_2+2a)-ay(t_1-t_2{t}_1^2+t_2-t_1{t}_2^2)+a^2(t_1^2{t}_2^2+4t_1{t}_2-2t_1^2{t}_2^2-2t_1{t}_2)=0x^2+y^2-ax\{{(t_1+t_2)}^2+2\}-ay(t_1+t_2\left)\right(1-t_1{t}_2)+a^2{t}_1{t}_2(2-t_1{t}_2)=0$

Hence proved.