Statement 1: The point of intersection o...

Statement 1: The point of intersection of the tangents at three distinct points `A , B ,a n dC` on the parabola `y^2=4x` can be collinear. Statement 2: If a line `L` does not intersect the parabola `y^2=4x ,` then from every point of the line, two tangents can be drawn to the parabola.

Similar Questions

Explore conceptually related problems

The point of intersection of the tangents at the ends of the latus rectum of the parabola y^(2)=4x is

" The point of intersection of the tangents at the points on the parabola " y^(2)=4x " whose ordinates are " 4 " and " 6 " is

Point of intersection of tangent at any Two points on the Parabola

If the line x-y-1=0 intersect the parabola y^(2)=8x at P and Q, then find the point on intersection of tangents P and Q.

Find the locus of points of intersection of tangents drawn at the end of all normal chords to the parabola y^2 = 8(x-1) .

The set of points on the axis of the parabola (y-2)^2=4(x-1/2) from which three distinct normals can be drawn to the parabola are

The tangents at the end points of any chord through (1,0) to the parabola y^(2)+4x=8 intersect

The point of intersection of the tangents of the parabola y^(2)=4x drawn at the end point of the chord x+y=2 lies on

Statement I The line y=mx+a/m is tangent to the parabola y^2=4ax for all values of m. Statement II A straight line y=mx+c intersects the parabola y^2=4ax one point is a tangent line.

Statement 1: The point of intersection of the tangents at three distinct points `A , B ,a n dC` on the parabola `y^2=4x` can be collinear. Statement 2: If a line `L` does not intersect the parabola `y^2=4x ,` then from every point of the line, two tangents can be drawn to the parabola.

Similar Questions

Recommended Questions