Transform to Cartesian coordinates the equations: `r^2=a^2cos2theta`

If cos^(4)theta+p, sin^(4)theta+p are the roots of the equation x^(2)+a(2x+1)=0 and cos^(2)theta+q,sin^(2)theta+q are the roots of the equation x^(2)+4x+2=0 then a is equal to

Find the cartesian coordinates of the points whose polar coordinates are (5 sqrt(2), (pi)/(4))

The general value of theta which satisfies the equation (cos theta + isin theta) (cos 3theta+ isin3theta)…[cos(2n-1)theta+isin(2n-1)theta]=1 is

Find the general values of theta which satisfies the equation tan theta =-1 and cos theta =(1)/(sqrt(2))

The general value of theta which satisfies the equation (cos theta + i sin theta) (cos 3 theta + I sin 3 theta) ….. {cos(2n - 1) theta + I sin (2n - 1) theta} = 1 is

Transform the equation r = 2 a cos theta to cartesian form.

The transform equation of r^(2)cos^(2)theta = a^(2)cos 2theta to cartesian form is (x^(2)+y^(2))x^(2)=a^(2)lambda , then value of lambda is

Find the area of the circle whose parametric equations x=3+2 cos theta and y=1+2 sin theta.

The number of solutions of the paires of equations : 2sin^(2)theta - cos2theta = 0 , 2cos^(2)theta - 3sintheta = 0 in the interval [0,2pi] is :