Find the equations of the sides of the t...

Find the equations of the sides of the triangle having `(3, - 1)` as a vertex, `x - 4y + 10 = 0 and 6x + 10y - 59 = 0` being the equations of an angle bisector and a median respectively drawn from different vertices.

Similar Questions

Explore conceptually related problems

Find the equations of the sides of the triangle having (3,-1) as a vertex,x-4y+10=0 and 6x+10y-59=0 being the equations of ram angle bisetor and a median respectively drawn from different vertices.

Find the equations of the sides of a triangle having (4,-1) as a vertex,if the lines x-1=0 and x-y-1=0 are the equations of two internal bisectors of its angles.

Find the equation of the sides of a triangle having B (-4, -5) as a vertex, 5x+3y-4=0 and 3x+8y+13=0 as the equations of two of its altitudes.

Find the equation of the sides of a triangle ABC with A(1,3) as a vertex and x-2y+1=0 and y-1=0 as the equation of two of its medians.

Find the equations of the medians of a triangle, the equations of whose sides are: 3x+2y+6=0,\ 2x-5y+4=0\ a n d\ x-3y-6=0

Find the equations of the medians of a triangle,the equations of whose sides are: 3x+2y+6=0,2x-5y+4=0 and x-3y-6=0

In a triangle ABC , if the equation of sides AB,BC and CA are 2x- y + 4 = 0 , x - 2y - 1 = 0 and x + 3y - 3 = 0 respectively , The equation of external bisector of angle B is

Find the equations of the sides of the triangle having `(3, - 1)` as a vertex, `x - 4y + 10 = 0 and 6x + 10y - 59 = 0` being the equations of an angle bisector and a median respectively drawn from different vertices.

Similar Questions

Recommended Questions