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

The sides of ABCD are parallel to the coordinate axes and A (3,7), C(7, 9)are the opposite vertices.Write the coordinates of B and D.

ABCD is a square of side 2a. Taking the centre of the square as origin and axes parallel to the sides AB and AD. The coordinates of the vertices of the square are

In fig. 28.7 if the coordinates of point P a r e (a , b , c) then Write the coordinates of points A, B, C, D, E and F. Write the coordinates of the feet of the perpendiculars from the point P to the coordinate axes. Write the coordinates of the feet of the perpendicular from the point P on the coordinate planes X Y , Y Z a n d Z Xdot Find the perpendicular distances of point P from X Y , Y Z a n d Z X- planes. Find the perpendicular distances of the point P fro the coordinate axes. Find the coordinates of the reflection of P are (a , b , c) . Therefore O A=a , O B=b n d O C=cdot

Consider the parallelogram ABCD.Find coordinate of C.

In the figure,ABCD is a square.Its diagonals are parallelto the coordinate axes.AC=6 and the coordinates ofA is(3, 2) write the coordinates of the vertices C, B and D.

The sides of the rectangle ABCD are parallel to the coordinate axes. If the coordinates of the vertices B and D be (7,3) and (2,6) respectively , find the coordinates of the vertices A and C .

If a line passes through the point (2,2) and encloses a triangle of area A square units with the coordinate axes , then the intercepts made by the line on the coordinate axes are the roots of the equations

If a line passes through the point (2,2) and encloses a triangle of area A square units with the coordinate axes , then the intercepts made by the line on the coordinate axes are the roots of the equations

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.

The sides of the rectangle ABCD are parallel to the coordinate axis. If the coordinates of the vertices B and D be (7,3) and (2,6) respectively, find the coordinates of the vertices A and C .