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

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

|(sin^2theta,cos^2theta),(cos^2theta,sin^2theta)|=

Prove that : sec^(2)theta - cos^(2) theta = sin^(2)theta(sec^(2)theta + 1)

(sintheta+sin 2theta)/(1+costheta+cos2theta)=

A line line makes the same angle theta with each of the x and z-axes. If the angle beta , which it makes with y-axis, is such that sin^(2)beta=3sin^(2)theta then cos^(2)theta equals

Prove that : cos^(4)theta - cos^(2)theta = sin^(4)theta - sin^(2) theta

If sin theta + sin^(2) theta=1 " then " cos^(2) theta+ cos^(4) theta is equal to

Prove that : sin^(4)theta + cos^(4)theta = 1 - 2 cos^(2) theta + 2 cos^(4)theta

Prove that sin^4 theta - cos^4 theta = 1 - 2cos^2 theta

Prove that : tan theta - cot theta = (2 sin^(2) theta - 1)/(sin theta cos theta)