The Circumcircle of the triangle formed by any three tangents to a parabola passes through

Statement 1: The circumcircle of a triangle formed by the lines x=0,x+y+1=0 and x-y+1=0 also passes through the point (1,0). Statement 2: The circumcircle of a triangle formed by three tangents of a parabola passes through its focus.

The orthocenter of a triangle formed by 3 tangents to a parabola y^(2)=4ax lies on

The locus of the Orthocentre of the triangle formed by three tangents of the parabola (4x-3)^(2)=-64(2y+1) is

Q15) The area of the triangle enclosed by the axes and the tangent to the parabola y at any point on the parabola is (figure) A.2 B.3 C. D.1

Area of the triangle formed by any arbitrary tangents of the hyperbola xy = 4 , with the co-ordinate axes is

The equation of the circumcircle of the triangle formed by the lines x=0, y=0, 2x+3y=5, is

If a triangle is formed by any three tangents of the parabola y^(2)=4ax, two of whose vertices lie on the parabola x^(2)=4by, then find the locus of the third vertex