The point represented by the complex number `(2-i)` is rotated about origin through an angle of `pi/2` in clockwise direction. The new position of the point will be-

The point represented by the complex number 2-i is rotated about origin through an angle of (pi)/(2) in clockwise direction. The new position of the point is

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

The point represented by the complex nuber (2-i) is rotated about origin through an angle (pi)/(2) in the clockwise direction, the new position of point is

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

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

The point represented by the complex number 2-i is rotated about origin through an angle pi/2 in the clockwise direction. the complex number corresponding to new position of the point is

The point represented by the complex number 2+i rotated about the origin through an angle (pi)/(2) . The new position of the point is

Let P be a point represented by the complex number Z. Rotate OP (O is the origin) through pi//2 in the anti clockwise direction, the new position of the complex number is represented by

The point (3, 2) undergoes the following transformations successively (i) Reflection with respect to the line y=x (ii) translation through 3 units along the positive direction of the X-axis (iii) Rotation through an angle of pi/6 about the origin in the clockwise direction. The final position of the point P is

The point P(1,3) undergoes the following transformations successively : (i) Reflection with respect to the line y = x (ii) Translation through 3 units along the positive direction of the X-axis (iii) Rotation through an angle of (pi)/(6) about the origin in the clockwise direction. The final position of the point P is