In a `triangleABC` , B=(2,3),C=(7,-1) and AB=3,AC=5 then find the equation of altitude through the vertex A.

Consider a triangle with vertices A(1,2),B(3,1) and C(-3,0) . Find the equation of altitude through vertex 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 the triangle ABC with vertices A (2, 3), B (4, -1) and C (1, 2), find the equation and length of altitude from the vertex A.

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

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.

In DeltaABC, A = (3,5), B = (7, 8) and C = (1, -10) . Find the equation of the median through. A.

The vertices of a triangle are A(10,4) ,B(-4,9) and C(-2,-1). Find the equation of the altitude through A.

In DeltaABC , A (3, 5), B (7, 8) and C(1, -10). Find the equation of the median through A.

Three sides A B ,A Ca n dC A of triangle A B C are 5x-3y+2=0,x-3y-2=0a n dx+y-6=0 respectively. Find the equation of the altitude through the vertex Adot

In triangle ABC, the co-ordinates of vertices A, B and C are (4, 7), (-2, 3) and (0, 1) respectively. Find the equation of median through vertex A. Also, find the equation of the line through vertex B and parallel to AC.