If `theta` is the angle between the curves xy = 2 and `x^(2)+4y = 0` then `tan theta = `

The angle between the curves xy = 2 and y^(2) = 4x at their point of intersection is

The angle between the curves xy = 2 and y^2 = 4x at their point of intersection is

The angle between the lines x^(2) + 4xy + y^(2) = 0 is

The angle between the curves x^(2) = 4y, y^(2) = 4x at (4,4) is

The curve x = y^(2) and xy = k cut at right angles if

Find the slope of the normal to the curve x = a cos^(3)theta, y = a sin^(3) theta at theta = (pi)/3 .

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

Find the slope of the normal to the curve x = 1 - a sin theta, y = b cos^(2) theta at theta = (pi)/2 .

The equation x^(2)-3 x y+lambda y^(2)+3 x-5 y+2=0 , whose lambda is a real number, represents a pair of lines. If theta is the angle between the lines then operatorname(cosec)^(2) theta=

Find the slope of the normal to the curve x=1 -a sin theta , y = b cos^(2) theta at theta= (pi)/(2) .