A triangle `A B C` with vertices `A(-1,0),B(-2,3/4),` and `C(-3,-7/6)` has its orthocentre at `Hdot` Then, the orthocentre of triangle `B C H` will be

Let k be an integer such that the triangle with vertices (k ,-3k),(5, k) and (-k ,2) has area 28s qdot units. Then the orthocentre of this triangle is at the point : (1) (1,-3/4) (2) (2,1/2) (3) (2,-1/2) (4) (1,3/4)

Find the area of the triangle with vertices A(1,12), B(2,3,5), C(1,5,5)

For the triangle ABC whose vertices are A (-2, 3), B (4, - 3) and C (6, 5), find the equation of : the altitude from A.

In the triangle with vertices A (2, 3), B (4, -1) and C (-1,2), find the equation and length of the altitude from the vertex A.

Vertices of a triangle are (-1, 3), (2, -1), (0, 0). Find its orthocentre.

For the triangle ABC whose vertices are A (-2, 3), B (4, - 3) and C (6, 5), find the equation of : the perpendicular bisector of the side BC.

The vertices of a triangle are A (-2, 1), B (6, -2) and C (4, 3). Find the lengths of the altitudes of the triangle.

The vertices of a triangle are (0, 3), (-3, 0) and (3, 0). The coordinates of its orthocentre are

Two vertices of a triangle are (3,- 1) and (- 2, 3) and its orthocentre is at the origin. Find the co-ordinates of the third vertex.