The line segment joining (5, 0) and `(10"cos"theta,10"sin"theta)` is divided internally in the ratio `2:3` at P. If `theta` varies, then the locus of P is

A line perpendicular to the line segment joining the points (1,0) and (2,3) divides it in the ratio 1:n. find the equation of the line.

A line perpendicular to the line segment joining the points (1,0) and (2,3) divides it in the ratio 1: n . Find the equation of the line.

Prove that sin (3theta)/(1+2cos 2theta)=sin theta .

Find the slope of the line joining the points (a cos theta , b sin theta) and (a cos phi, b sin phi)

Given that tantheta=a/b find sin2theta and cos2theta

If the line joining the points (a cos theta , b sin theta) and (a cos phi, b sin phi) .Prove that the equation of this lines is x/a "cos" (theta + phi)/2 + y/b"sin" (theta + phi)/2 = "cos" (theta -phi)/2

If cos theta+sin theta=sqrt(2) cos theta ,then show that cos theta-sin theta=sqrt(2) sin theta

Solve 7cos^(2)theta+3sin^(2)theta=4 .