Let A (4, -4) and B (9, 6) be points on the parabola, `y^(2)=4x`. Let C be chosen on the are AOB of the parabola, where O is the origin, such that the area of `Delta ACB` is maximum. Then, the area (in sq. units) of `Delta ACB` is

Let A(4,-4) and B(9,6) be points on the parabola y^(2)=4x. Let C be chosen on the on the arc AOB of the parabola where O is the origin such that the area of DeltaACB is maximum. Then the area (in sq. units) of DeltaACB is :

Let P(4,-4) and Q(9,6) be two points on the parabola, y^2=4x and let X be any point on the are POQ of this parabola, where O is the vertex of this parabola, such that the area of Delta PXQ is maximum. Then this maximum area (in square units) is (25k)/(4) . The value of k is

Consider the parabola y^2=4xdot Let A-=(4,-4) and B-=(9,6) be two fixed points on the parabola. Let C be a moving point on the parabola between Aa n dB such that the area of the triangle A B C is maximum. Then the coordinates of C are (a) (1/4,1) (b) (4,4) (c) (3,2/(sqrt(3))) (d) (3,-2sqrt(3))

Let B and C are points of interection of the parabola y=x^(2) and the circle x^(2)+(y-2)^(2)=8. The area of the triangle OBC, where O is the origin, is

Let (a,b) be a point on the parabola y=4x-x^(2) and is the point nearest to the point A(-1,4) Find (a+b).

Let the normals at points A(4a, -4a) and B(9a, -6a) on the parabola y^(2)=4ax meet at the point P. The equation of the nornal from P on y^(2)=4ax (other than PA and PB) is

Let S be the focus of the parabola y^2=8x and let PQ be the common chord of the circle x^2+y^2-2x-4y=0 and the given parabola. The area of the triangle PQS is -

Let B and C are the points of intersection of the parabola x=y^(2) and the circle y^(2)+(x-2)^(2)=8 . The perimeter (in units) of the triangle OBC, where O is the origin, is

Let A, B, C be three points on the parabola y^(2)=4ax such that tangents at these points taken in pairs form a triangle PQR. Then, area (DeltaABC) : (Delta PQR) =

If A(4,-4) and B(9,6) lies on y^2=4x and a point C on arc AOB (O= origin) such that the area of triangleACB is maximum then point c is (1) (1/4,1) (2) (1,1/4) (3) (1,1/2) (4) (1/2,1)