A triangle ABC right angled at A has points A and B as (2, 3) and (0, -1) respectively. If BC = 5 units, then the point C is

The centroid of a triangle ABC is at the point (1,1,1). If the coordinates of A and B are (3,-5,7) and (-1,7,-6) respectively, find the coordinats of the point C.

In a triangle, ABC, the equation of the perpendicular bisector of AC is 3x - 2y + 8 = 0 . If the coordinates of the points A and B are (1, -1) & (3, 1) respectively, then the equation of the line BC will be

The co-ordinates of points A, B and C are (1, 2),(-2, 1) and (0, 6) respectively. Verify that the medians of the triangle ABC are concurrent. Also, find the co-ordinates of the point of concurrence (centroid).

ABC is a right triangle right angled at A. BCED, ACFG and ABMN are squares on the sides BC, CA and AB respectively. Line segent AX bot DE meets BC at Y. Show that: ar(CYXE) = 2ar(FCB)

ABC is a right triangle right angled at A. BCED, ACFG and ABMN are squares on the sides BC, CA and AB respectively. Line segent AX bot DE meets BC at Y. Show that: ar(BYXD) =2ar(MBC)

ABC is a right triangle right angled at A. BCED, ACFG and ABMN are squares on the sides BC, CA and AB respectively. Line segent AX bot DE meets BC at Y. Show that: ar(CYXE) = ar(ACFG)

ABC is a right triangle right angled at A. BCED, ACFG and ABMN are squares on the sides BC, CA and AB respectively. Line segent AX bot DE meets BC at Y. Show that: triangleMBC congtriangleABD

The circle inscribed in the triangle ABC touches the side BC, CA and AB in the point A_(1)B_(1) and C_(1) respectively. Similarly the circle inscribed in the Delta A_(1) B_(1) C_(1) touches the sieds in A_(2), B_(2), C_(2) respectively and so on. If A_(n) B_(n) C_(n) be the nth Delta so formed, prove that its angle are pi/3-(2)^-n(A-(pi)/(3)), pi/3-(2)^-n(B-(pi)/(3)),pi/3-(2)^-n(C-(pi)/(3)). Hence prove that the triangle so formed is ultimately equilateral.