From the point (9, 0), a line perpendicu...

From the point (9, 0), a line perpendicular to the tangent at a variable point P on the parabola `y^2-8x + 16 = 0`, meeting the focal radii of P in point R. If locus of R has it's centre as (alpha, beta), then `|alpha-beta|` is

Similar Questions

Explore conceptually related problems

Perpendicular tangents are drawn from an external point P to the parabola y^2=16(x-3) Then the locus of point P is

From the point (alpha,beta) two perpendicular tangents are drawn to the parabola (x-7)^(2)=8y Then find the value of beta

The locus of the point (r sec alpha cos beta, r sec alpha beta, r tan alpha) is

If P is a point on the parabola y^(2)=8x and A is the point (1,0) then the locus of the mid point of the line segment AP is

If P is the point (1,0) and Q is any point on the parabola y^(2) = 8x then the locus of mid - point of PQ is

If two perpendicular tangents are drawn from a point (alpha,beta) to the hyperbola x^(2) - y^(2) = 16 , then the locus of (alpha, beta) is

If P is point on the parabola y ^(2) =8x and A is the point (1,0), then the locus of the mid point of the line segment AP is

If P is a point on the parabola y^(2)=8x and A is the point (1,0) then the locus of the midpoint of the line segment AP is

The locus of the point of intersection of the perpendicular tangents to the parabola x^(2)-8x+2y+2=0 is