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

Transform the equation y = x tan alpha to polar form.

The transformed 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 vector equation of the plane passing through the points (1, -2, 5) (0, -5, -1) and (-3, 5, 0). Transform the vector equation into cartesian equation.

Let p,qin N and q gt p , the number of solutions of the equation q|sin theta |=p|cos theta| in the interval [0,2pi] is

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

Find the values of theta and p , if the equation x cos theta + y sin theta =p is the normal form of the line sqrt(3x) + y + 2=0 .

Find the general solution of the equation (sqrt3-1) sin theta +(sqrt3 + 1)cos theta = 2

The value of theta , lying between theta =0 and theta=(pi)/(2) and satisfying the equation . |{:(1+ cos^(2 ) theta , sin^(2) theta , 4 sin 4 theta ),(cos^(2) theta , 1+sin^2 theta , 4 sin 4 theta ),(cos^(2) theta , sin^(2) theta , 1+ 4 sin 4 theta ):}|=0 , is

If theta is eliminated from the equations costheta-sintheta=b and cos3theta+sin3theta=a , find the eliminate.

Prove that if the axes be turned through (pi)/(4) the equation x^(2)-y^(2)=a^(2) is transformed to the form xy = lambda . Find the value of lambda .