Let A and B be two points on `y^(2)=4ax` such that normals to the curve at A and B meet at point C, on the curve, then chord AB will always pass through a fixed point whose dinates, are

Let A and B be two points on y^(2)=4ax such that normals to the curve at A and B meet at point C, on the curve, then chord AB will always pass through a fixed point whose coordinates, are

If a,b and c are in AP, then the straight line ax+by+c=0 will always pass through a fixed point whose coordinates are

If two normals to a parabola y^(2)=4ax intersect at right angles then the chord joining their feet pass through a fixed point whose co- ordinates are:

If A, B and C are in AP, then the straight line Ax + 2By+C =0 will always pass through a fixed point. The fixed point is

Find the normal to the curve x=a(1+cos theta),y=a sin theta at theta. Prove that it always passes through a fixed point and find that fixed point.

Tangents are drawn to the ellipse x^(2)+2y^(2)=4 from any arbitrary point on the line x+y=4, the corresponding chord of contact will always pass through a fixed point, whose coordinates are

The normal to the curve x=a(1+cos theta), y=a sin theta " at " 'theta ' always passes through the fixed point

The normal to curve xy=4 at the point (1, 4) meets curve again at :

The curve for which the normal at every point passes through a fixed point (h,k) is