in a triangle ABC, if A is `(1, 2)` and the equations of the medians through B and c are `x+ y= 5` and `x= 4` respectively then B must be:

In a triangle ABC, co-ordinates of A are (1,2) and the equations to the medians through B and C are x+y=5 and x=4 respectively.Then the co-ordinates of B and C will be

In a triangle ABC, coordinate of A are (1,2) and the equations of the medians through B and C are respectively, x+y=5&x=4 . Then area of DeltaABC (in sq. units) is:

The vertex A of triangle ABC is at origin.The equation of median through B and C are 15x-4y=240 and 15x-52y+240=0 respectively.Then

In a triangle ABC if the equation of the medians AD and BE are 2x + 3y - 6=0 and 3x-2y-10=0 respectively and AD = 6, BE = 11, then find the area of the Triangle ABC : (A) 32 (B) 38 (C) 44 (D) 48

The vertex C of a triangle ABC is (4,-1) . The equation of altitude AD and Median AE are 2x-3y+12=0 and 2x+3y=0 respectively then slope of side AB is :

In a triangle ABC.if A(1,2) and the internal angle bisetors through B and C are y=x and y=-2x, then the in radius r of Delta ABC is :

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

In a triangle ABC, if A is (2,-1), and 7x-10y+1=0 and 3x-2y+5=0 are the equations of an altitude and an angle bisector,respectively, drawn from B ,then the equation of BC is (a) a+y+1=0(b)5x+y+17=0 (c) 4x+9y+30=0( d) x-5y-7=0

In triangle ABC m_(1),m_(2),m_(3) are the lenghts of the medians through A,B and C respectively . If C=(pi)/(2) , then (m_(1)^(2)+m_(2)^(2))/(m_(3)^(2)) =

The base BC of a triangle ABC is bisected at the point (a, b) and equation to the sides AB and AC are respectively ax+by=1 and bx+ay=1 Equation of the median through A is: