A (2,0) B(4,4) and C (6,2) are the vetices of the ` triangleABC`. The mid - points of ` bar(BC) , bar(CA) and bar(AB)` are D (5,3), E(4,1) and F(3,2) respectively. Then find the length of the three medians.

A(-1,5),B(3,1)and C(5,7) are the vertices of the DeltaABC . If D ,E and F are the mid - points of the sides overline(BC),overline(CA)andoverline(AB) respectively , find the area of DeltaDEF . Show also that , DeltaABC=4DeltaDEF .

A(1,3,0),B(2,2,1) and C(5,-1,4) are the vertices of the triangle ABC, if the bisector of /_BAC meets its side bar(BC) at D, then find the coordinates of D.

If the point C(x,y,-14) lies on the line -segment bar(AB) produced where the coordinates of A and B are (2,-3,4) and (3,1,-2) respectively, then find the values of x and y.

The coordinatea of A,B and C of the DeltaABC are (3,1), (9,7) and (-3,7) respectively. If D,E and F are the mid-point of the sides bar(BC),bar(CA)andbar(AB) respectively, then find the area of the DeltaDEF. Also show that DeltaABC=4DeltaDEF.

If the coordinates of the points A,B,C,D be (1,2,3), (4,5,7), (-4,3,-6) and (2,9,2) respectively, then find the angle between the lines AB and CD.

If A (-1, 4,2), B(3, -2, 0) and C(1,2,4) are the vertices of the triangle ABC, then the length of its median through the vertex A is-

P is a point on bar(AB) such that bar(AP)=3bar(PB) . If the coordinates of A and B be (3, -4) and (-5, 2) respectively, find P.

P is a point on the line segment bar(AB) such that AP = PB. If the coordinates of A and B are (3, -4) and (-5, 2) respectively find the coordinates of P.

The cordinates of the mid points of the sides BC, CA and AB of the triangle ABC are (5,2,8), (2,-2,-3) and (2,-3,4) , find the coordinates of the centroid of the triangle.

If the mid-points of AB, BC and CA of the DeltaABC are D, E and F respectively, P and Q are also the mid-points of DE and EF respectively. Then PQ =