The vertex of the right angle of a right angled triangle lies on the straight line `2x -y- 10 =0` and the two other vertices, at points `(2,-3)` and `(4,1)` then the area of triangle in sq. units is-

The centroid of a triangle lies at the origin and the coordinates of its two vertices are (-8, 0) and (9, 11), the area of the triangle in sq. units is

In a right-angled triangle, the angles other than the right angle are

Two medians draen form the acute angles of a right angled triangle intersefct at an angle (pi)/(6). If the length of the hypotenuse of the triangle is 3 units, then the area of the triangle (in sq units) is sqrtK, then K is

Two medians drawn from the acute angles of a right angled triangle intersect at an angle (pi)/(6) . If the length of the hypotenuse of the triangle is 3 units,then the area of the triangle (in sq. units is (a) sqrt(3)(b)3(c)sqrt(2) (d) 9

Show that the points (-2,5),(3,-4)and (7,10) are the vertices of the right angled triangle .

Find the in-centre of the right angled isosceles triangle having one vertex at the origin and having the other two vertices at (6, 0) and (0, 6).

In a right angled triangle the vertex at the right angle is (1,1), one of the sides of the triangle is 2x-y=1 and the mid point of the hypotenuse is (5,-2), find the equation of the other sides of the triangle.