The locus of a point P which divides the line joining (1, 0) and `(2 cos theta, 2 sin theta)` internally in the ratio `2: 3` for all `theta`, is a

The locus of a point P which divides the line joining (1,0) and (2cos theta,2sin theta) intermally in the ratio 1:2 for all theta. is

The line joining (5,0) to (10cos theta,10sin theta) is divided internally in the ratio 2:3 at P then the locus of P is

The locus of a point which divides the line segment joining the point (0, -1) and a point on the parabola, x^(2) = 4y internally in the ratio 1: 2, is:

If the point R divides the line segment joining the point (2, 3) and (2 tan theta, 3 sec theta), 0 lt theta lt (pi)/(2) internally in the ratio 2 :3 , then the locus of R is

Solve : 3-2 cos theta -4 sin theta - cos 2theta+sin 2theta=0 .

The distance of the mid point of the line joining the points (a sin theta, 0)and (0, a cos theta) from the origin is