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

Represent the complex numbers 2-2i

Represent the complex number -2i in the polar form.

A vector 3i + 4j rotates about its tail through an angle 37° in anticlockwise direction then the new vector is

A vector hati + sqrt(3) hatj rotates about its tail through an angle 60° in clockwise direction then the new vector is

If |z|=2, the points representing the complex numbers -1+5z will lie on

If |z|=2, the points representing the complex numbers -1+5z will lie on

A vector sqrt(3)hati + hatj rotates about its tail through an angle 30^(@) in clock wise direction then the new vector is

If the lines represented by x^(2)-2pxy-y^(2)=0 are rotated about the origin through an angle theta , one clockwise direction and other in anti-clockwise direction, then the equation of the bisectors of the angle between the lines in the new position is

The point (4, 1) undergoes the following three transformations successively: (a) Reflection about the line y = x (b) Translation through a distance 2 units along the positive direction of the x-axis. (c) Rotation through an angle pi/4 about the origin in the anti clockwise direction. The final position of the point is given by the co-ordinates.

The point (4, 1) undergoes the following three transformations successively: (a) Reflection about the line y = x (b) Translation through a distance 2 units along the positive direction of the x-axis. (c) Rotation through an angle pi/4 about the origin in the anti clockwise direction. The final position of the point is given by the co-ordinates.