The angle between the pair of straight lines
`y^(2)sin^(2) theta -xy sin^(2)theta +x^(2)(cos^(2)theta-1) =0` is

cos^(2)theta+sin^(2)theta is:

If the angle 2 theta is acute, then the acute angle between the pair of lines x^(2)(cos theta-sin theta)+2 x y cos theta+y^(2)(cos theta+sin theta)=0 is

sin^(6)theta+cos^(6)theta=1-3sin^(2)thetacos^(2)theta

sin^(6)theta=cos^(6)theta=1-3sin^(2)thetacos^(2)theta

sin ^(6) theta+cos ^(6) theta+3 sin ^(2) theta . cos ^(2) theta=

The difference of the tangents of the angles which the lines x^(2)(sec^(2) theta - sin^(2) theta)-2xy tan theta+y^(2)sin^(2) theta=0 makes with x axis is

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 :

(sin theta-2 sin^(3) theta)/(2 cos^(3) theta - cos theta) = _______

int_0^(2pi) theta sin^2 theta cos theta d theta is equal to :