Given vertices `A (1, 1),B(4, -2)&C(5, 5)` of a triangle, find the equation of the perpendicular dropped from C to the interior bisector of the angle A.

A(5, 4), B(-3, -2) and C(1,-8) are the vertices of a triangle ABC. Find the equation of median AD

If A(1, 4), B(2, 3) and C(-1,-2) are the vertices of a triangle ABC , find the equation of (i) the median through A (ii) the altitude through A (iii) the perpendicular bisector of BC.

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

If A(-1, 6), B(-3, -9) and C(5, -8) are the vertices of a triangle ABC , find the equations of its medians.

A (10, 4), B (-4, 9), C (-2,-1) are the vertices of a triangle. Find the equations of i) line AB ii) the median through A iii) the altitude through B iv) the perpendicular bisector of the side line AB

The vertices of a triangle are (2,1), (5,2) and (4,4) The lengths of the perpendicular from these vertices on the opposite sides are

The points A(2,3), B(4,-1) and C(-1,2) are the vertices of A ABC. Find the length of perpendicular from C on AB and hence find the area of triangle ABC .

If A(4, 3), B(0, 0) and C(2, 3) are the vertices of a triangle ABC , find the equation of the bisector of angle A .