A (2,- 3) and B (-5, 1) are two vertices of the `DeltaABC` . Its centroid is on x-axis and vertices C is on y-axis, then find the co-ordinates of C .

A(0,-1,-2), B(3,1,4) and C(5,7,1) are vertices of DeltaABD then find the measure of angleA .

If A (11,7) , B (-1, k ) and C (5, -1) are the vertices of DeltaABC and m angleACB =pi/2 then what is k ?

If A(5,-1), B(-3,-2) and C(-1, 8) are the vertices of Delta ABC , find the length of median through A and the coordinates of the centroid

Let A(4,2), B(6,5) and C(1,4) be the vertices of Delta ABC (1) The median from A meets BC at D. Find the coordinates of the points D. (2) Find the coordinates of the points P on AD such that AP : PD = 2 : 1 (3) Find the coordinates of points Q and R on medians BE and CF respectively such that BQ : QE = 2 : 1 and CR : RE = 2 : 1 (4) What do you observe ? [Note : The point which is common to all the three medians is called the centroid and this point divides each median in the ratio 2 : 1 ] (5) If A(x_(1), y_(1)), B(x_(2), y_(2)) and C(x_(3),y_(3)) are the vertices of Delta ABC find the coordinates of the centroid of the triangle

The points A(x_(1), y_(1)) , B(x_(2), y_(2)) and C(x_(3), y_(3)) are the vertices of Delta ABC and AD is a median in Delta ABC . Find the coordinates of a point G on median AD such that AG : GD = 2 : 1

Let A(1, 2, 3), B(0, 0, 1), C(-1, 1, 1) are the vertices of a DeltaABC .The equation of median through C to side AB is

A (1, -1, -3), B(2, 1, -2) and C(-5, 2, -6) are the verticies of DeltaABC . Find co-ordinates of point D, if bisector of angleA intersects bar(BC) at point D.

A(0,5), B(3,0) and C(3,5) are vertices of a/an . . . . . triangle.

If a,b and c are the position vectors of the vertices A,B and C of the DeltaABC , then the centroid of DeltaABC is