Find the equation of the bisector of ang...

Find the equation of the bisector of `angle A of triangle ABC`, whose vertices are `A(-2,4), B(5,5) and C(4,-2)` .

Text Solution

AI Generated Solution

To find the equation of the bisector of angle A in triangle ABC with vertices A(-2, 4), B(5, 5), and C(4, -2), we can follow these steps: ### Step 1: Calculate the lengths of sides AB and AC We will use the distance formula to find the lengths of the sides AB and AC. **Distance Formula**: \[ d = \sqrt{(x_2 - x_1)^2 + (y_2 - y_1)^2} \] ...

Similar Questions

Explore conceptually related problems

Find the equation of the bisector of angle A ofthe triangle whoe vertices are A(4,3),B(0,0) and C(2,3)

Find the equations of the altitudes of a triangle ABC , whose vertices are A(2,-2), B(1,1) and C(-1,0).

Find the equation of the internal bisector of angle BAC of the triangle ABC whose vertices A,B,C are (5,2),(2,3) and (6,5) respectively

Find the equation of the internal bisector of angle BAC of the triangle ABC whose vertices A,B,C are (5,2),(2,3) and (6,5) respectively.

Find the area of triangle ABC whose vertices are A(-3, -5), B(5,2) and C(-9,-3).

Find the equations of the bisectors of the interior angles of the triangle whose vertices are A(0,0) , B(4,0) and C(0,3) and prove that they are concurrent.

Find the equation of the medians of the triangle ABC whose vertices are A(2,5)B(-4,9) and C(-2,-1)

The area of the triangle whose vertices are (2,4),(-3,7) and (-4,5) is:

Find the angles of /_\ABC whose vertices are A(-1,3,2), B(2,3,5) and C(3,5,-2) .

Find the equation of the bisector of `angle A of triangle ABC`, whose vertices are `A(-2,4), B(5,5) and C(4,-2)` .

Text Solution

Similar Questions

Recommended Questions