The minimum area of the triangle formed by the variable line `3 cos theta.x +4 sin theta.y=12` and the co-ordinate axes is

The minimum area of the triangle formed by the variable line 3cos theta x+4sin thetay=12 and co-ordinate axes is :

x = a cos theta, y = b sin theta .

The area of the triangle formed by the lines x=0, y=0 and 3 x+4 y=12 is (in square units)

The minimum value of sin theta . cos theta is

The centroid of a triangle formed by the points (0, 0), (cos theta, sin theta) and (sin theta, -cos theta) lies on the line y=2x . Then theta is :

If alpha beta gt 0, ab gt 0 and the variable line (x)/(a), (y)/(b)=1 is drawn through the given point P(alpha, beta) , then the least area of the triangle formed by this line and the co-ordinate axes is :

Solve 7 cos^(2) theta+3 sin^(2) theta=4 .

The area of the triangle formed by the co-ordinate axes and a tangent to the curve xy=a^(2) at the point (x_(1), y_(1)) on it is :

Find the area of the circle whose parametric equations x=3+2 cos theta and y=1+2 sin theta.

Solve sqrt(3) cos theta-3 sin theta =4 sin 2 theta cos 3 theta .