Consider the parabola `y^2 = 8x.` Let `Delta_1` be the area of the triangle formed by the end points of its latus rectum and the point P(`1/2`,2) on the parabola and `Delta_2` be the area of the triangle formed by drawing tangents at P and at the end points of latus rectum. `Delta_1/Delta_2` is :

Consider the parabola y^(2) = 8x . Let Delta_(1) be the area of the triangle formed by the end points of its latus rectum and the point P(1/2,2) on the parabola, and Delta_(2) be the area of the triangle formed by drawing tangents at P and at the end points of the latus rectum. Then (Delta_(1))/(Delta_(2)) is

Consider the parabola y^(2) = 8x . Let triangle_(1) be the area of the triangle formed by the endpoints of its latus rectum and the point P ((1)/(2) ,2) on the parabola, and triangle_(2) be the area of the triangle formed by drawing tangents at P and at the endpoints of the latus rectum. Then is (Delta_(1))/(Delta_(2)) is.

the area of triangle formed by the points (0,0) (1,1) and (2,3) is

The end points of the latus rectum of the parabola x ^(2) + 5y =0 is

The end points of latus rectum of the parabola x ^(2) =4ay are

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Consider the parabola y^(2)=8x Area of the figure formed by the tangents and normals drawn at the extremities of its latus rerum