Consider triangle ABC with `AB = 3` units, `AC = 7` units, `B = (0, 0) and C = (3, 4)`. The possible equation of the altitude of the triangle drawn through A, is

The vertices of triangle ABC are A (-2, 3), B (2, -3) and C (4,5) i. Find the slope of BC. ii. Find the equation of the altitude of triangle ABC passing through A.

In Delta ABC , if A= (1,2) ,B= (3,4) and AC = 3, BC= 4 , then the equation of altitude through the vertex 'C' is

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.

Consider a triangle with vertices A(1,2),B(3,1), and C(-3,0). Find the equation of altitude through vertex A .the equation of median through vertex A .the equation of internal angle bisector of /_A.

Consider a triangle with vertices A(1,2),B(3,1), and C(-3,0)dot Find the equation of altitude through vertex A the equation of median through vertex A the equation of internal angle bisector of /_A

Consider a triangle with vertices A(1,2),B(3,1), and C(-3,0)dot Find the equation of altitude through vertex Adot the equation of median through vertex Adot the equation of internal angle bisector of /_Adot

In any triangle ABC, if angle C=90^@ , AC=4 unit, BC=3, find AB.

Consider a triangle with vertices A(1;2);B(3;1) and C(-3;0) Find (i) equation of altitude through vertex A (ii) the equation of median through vertex A (ii) the equation of internal angle bisector of /_A

Consider triangle ABC with vertices A(0,06),B(0,4,0) and C(6,0,0).(i)Find the centroid of triangle ABC .