What is the area of a triangle whose vertices are vertex and end points of latus rectum of `x^2 =12y `?

Find the area of the triangle whose vertices are (3,8),(-4,2) and (5,1)

Find the area of a triangle whose vertices are (1,-1) ,(-4, 6) and (-3, -5).

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 :

(5,10) and (5,-10) are end points of latus rectum of parabola y^2 = 20x .

The area of triangle with vertices (3,2),(8,12) and (11,8) is ……….

If area of triangle whose vertices are (2,2) (6,6) and (5,k) is 4 then k= "........."

In each of the find the coordinates of the foci and the vertices, the eccentricity and the length of the latus rectum of the hyperbolas. (y^(2))/(9)-(x^(2))/(27)=1

In each of the find the coordinates of the foci and the vertices, the eccentricity and the length of the latus rectum of the hyperbolas. 9y^(2)-4x^(2)=36

In each of the find the coordinates of the foci and the vertices, the eccentricity and the length of the latus rectum of the hyperbolas. 49y^(2)-16x^(2)=784