The complex number z = 1 + i is rotated through an angle ` 3 pi // 2 ` anticlockwise direction about the origin and stretched by additional ` sqrt(2)` units, then the new complex number is

The complex number z=1+i is rotated through an angle (3 pi)/(2) in anti-clockwise direction about the origin and stretched by aditional sqrt(2) unit,then the new complex number is:

If a complex number z=1+sqrt(3)i is rotated through an angle of 120^(@) in anticlockwise direction about origin and reach at z_(1), then z_(1) is

The line 2x-y=3 is rotated through an angle (pi)/(4) in anticlockwise direction about the point (2,1) ,then equation of line in its new position

If z^2 = 12 sqrt(-1) , find the complex number z .

The point represented by the complex number 2-i is rotated about origin through on angle pi/2 the clockwise direction, the new position of the point is

Let the point P represent the complex number z. If OP is turned round 0 by an angle pi/2 in the clockwise sense where 0 is the origin then in the new position P represents the complex number _______.

A vector 4hat i+3hat j rotates about its tail through an angle 53^(@) in anticlockwise direction then the new vector is

If the axes are rotated through 60^@ in anticlockwise direction about origin. Find co-ordinates of point(2,6) in new co-ordinate axes.

The point represented by the complex number (2 - i) is rotated about origin through an angle (pi)/(2) in the clockwise direction, the new position of point is (A) 1+2i (B) -1-2i (C) 2+i (D) -1+2i