There are four rods A, B, C and D of same length L but different linear mass density d, 2d, 3d & 4d respectively. These are joined to form a square frame with sides C & D along x & y axis of coordinate axes respectively. Find coordinate of centre of mass of structure. ?

A,B, C and D are respectively:

Find the coordinates of points A,B,C,D in Figure.

(B), (C), and (D), respectively, are

The side of a square ABCD is 'a' units A,B,C,D are in the anti-clockwise order AB and AD are coordinate axes. Then coordinates of C are

A ,B and C are the points (2, 0),(5,0) and (5,3) respectively. Find coordinates of D such that ABCD is a square.

Four particles A, B, C and D of masses m, 2m, 3m and 4m respectively are placed at corners of a square of side x as shown in Fig. Locate the centre of mass.

ABCD is a square having length of a side 20 units. Taking the centre of the square as the origin and x and y axes parallel to AB and AD respectively, find the coordinates of A, B, C and D.

In the arrangement as shown, A and B arc two cylinders each of length L and density d_1 and d_(2)(d_(1)ltd_(2)) respectively. They are joined together and submerged in the liquid of density d with length L//2 of A outside the liquid. If the difference in densities of two cylinders is equal to density of the liquid, find d_(1) .

ABCD is a parallelogram.If the coordinates of A,B,C are (2,3),(1,4) and (0,-2) respectively,find the coordinates of D.

Four particles of masses 1kg, 2kg, 3kg and 4kg are placed at the four vertices A, B, C and D of a square of side 1m. Find the position of centre of mass of the particles.