The angle between the lines `(x^(2)+y^(2))sin^(2)alpha=(x cos beta-y sin beta)^(2)` is

If the pair of lines given by (x^(2)+y^(2)) sin ^(2) alpha=(x cos alpha-y sin alpha)^(2) are perpendicular to each other then alpha=

The acute angle between the lines x^(2)-2 x y sec alpha+y^(2)=0 is

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

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 angle between the lines x cos alpha + y sin alpha = a and x sin beta - y cos alpha = a 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

If sin^(-1) a is the acture angle between the curves x^(2) + y^(2) =4x and x^(2) + y^(2) = 8 at (2,2), then a=

int dx/(sin(x-alpha)cos(x-beta)) =

If alpha, beta, gamma are the angle made by a vector with the coordinate axes, then sin^(2) alpha + sin^(2) beta + sin^(2) gamma =

If alpha and beta are the roots of x^(2) - ax + b^(2) = 0, then alpha^(2) + beta^(2) is equal to :