If the axes are rotated through an angles 30° in the anticlockwise direction and the point is `(4, -2 sqrt3)` in the new system, the formal point is

A line through the point A(2,0) which makes an angle of 30^(circ) with the positive direction of x -axis is rotated about A thro' an angle 15^(circ) in the clockwise direction. The equation of the line in the new position is

The point (4, 1) undergoes the following three transformations successively: (i) reflection about the line y = x (ii) translation through a distance of 2 units along the positive direction of x-axis (ii) rotation through an angle of (pi)/(4) about the origin in the counter-clockwise direction. The final position of the point is given by:

The coordinate axes are rotated about the origin O in the counter clockwise direction through an angle 60^(circ) . If p and q are the intercepts made on the new axes by a line whose equation referred to the original axes is x+y=1 then (1)/(p^(2))+(1)/(q^(2))=

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

Find the equation of the line through the point (-2,3) and having the slope -4

If the line through A-=(4, -5) is inclined at an angle 45^(@) with the positive direction of the x-axis, then the co-ordinates of the two points on opposite sides of A at a distance 3sqrt(2) are :

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

Find the slope of the time passing through the points (3,-2) and ( -1,4)