If x and y are positive acute angles such that `(x+y)` and `(x-y)` satisfy the equation ` tan^(2) theta - 4 tan theta +1=0` , then

Solution set of the equation 3 tan^(2) theta + 4 tan theta + 2 =0 is ...............

Find (dy)/(dx) : x=a sec^(3) theta, y= a tan^(3) theta

If theta is an acute angle and tan theta + cot theta = 2 , find the value of tan^(12)theta + cot^(12)theta .

The number of pairs (x,y) which will satisfy the equation x^2-x y+y^2=4(x+y-4) is

Find the quadrants of the coordinate planes such that for each point (x,y) on these quadrants ( where x ne 0 , y ne 0 ) , the equation, (sin^(4) theta )/x + ( cos^4 theta)/( y)=(1)/(x+y) is soluble for theta .

If x +y= 3-cos4theta and x-y=4sin2theta then

Equation of the line passing through the point ( a cos^(3) theta , a sin^(3) theta ) and perpendicular to the line x sec theta + y cosec theta = a is x cos theta - y sin theta = cos 2 theta .

The equation of normal to the curve y = tan x at (0, 0) is …………… .

If x and y are connected parametrically by the equations without eliminating the parameter, find (dy)/(dx) x = cos theta - cos 2 theta, y= sin theta- sin 2 theta

If x and y are connected parametrically by the equations without eliminating the parameter, find (dy)/(dx) x=a (cos theta + theta sin theta),y= a (sin theta- theta cos theta)