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

(1+tan^2theta) sin^2theta

Solve 3tan^(2) theta-2 sin theta=0 .

Difference of slopes of the lines represented by the equation x^2(sec^2 theta - sin ^2 theta) -2xytan theta + y^2 sin^2 theta=0 is (A) 4 (B) 3 (C) 2 (D) None of these

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

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

If y=2 sin^(2) theta + tan theta then (dy)/(d theta) will be-

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

Prove: (sin theta xx tan ""(theta)/(2)) = 2sin ^(2) ""(theta)/( 2)

Show that the two straight lines x^2(tan^2theta+cos^2theta)-2xy tantheta+y^2sin^2theta=0 Make with the axis of x angles such that the difference of their tangents is 2 .

If sin theta = cos theta find the value of : 3 tan ^(2) theta+ 2 sin ^(2) theta -1