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

Transform the equation y = x tan alpha to polar 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 equation of the following curves in cartesian form. If the curve is a circle find the centres and radii. (i) x = -1 + 2cosalpha, y = 3 + 2sinalpha.

Transform the equation x^(2)+y^(2)=ax into polar form.

Find the values of theta and p, if the equation x cos+ y sin = p is the normal form of the line sqrt3 x + y + 2 = 0 .

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

Derive the equation of the line in space passing through a point and parallel to a vector both in vector and cartesian form.

Find all values of theta lying between 0 and 2 pi satisfying the equation r sin theta = sqrt 3 and r + 4 sin theta =2(sqrt 3+1)

Derive the equation of a plane in normal form both in the vector and Cartesian form .