The angle between the curves `y=sin x and y = cos x, 0 lt x lt (x)/(2)`, is
a)`tan^-1(2sqrt2)` b)`tan^-1(3sqrt2)` c)`tan^-1(3sqrt3)` d)`tan^-1(5sqrt2)`

The acute angle between the curve y^2=x and x^2=y at (1,1) is a) tan^-1(4/5) b) tan^-1(3/4) c) tan^-1(1) d) tan^-1(4/3)

One maximum point of sin^pxcos^qx is a) x=tan^-1sqrt(p//q) b) x=tan^-1sqrt(q//p) c) x=tan^-1(p//q) d) x=tan^-1(q//p)

The angle between lines represented by the equation 11x^2-24xy+4y^2=0 are: a) tan^-1((-3)/4) b) tan^-1(3/4) c) tan^-1(4/3) d) tan^-1(2/3)

The equation of the tangent to the curve y=2 sin x +sin 2x at x=pi/3 is equal to: a) 2y=3sqrt3 b) y=3sqrt3 c) 2y+3sqrt3=0 d) y+3sqrt3=0

The equation of tangent to the curve x=a sec theta, y =a tan theta" at "theta=(pi)/(6) is: a) 2sqrt3x-y=-sqrt3a b) 2sqrt3x+y=a c) 2x-y=sqrt3a d) 2sqrt3x+y=sqrt3a

If tan^(-1)x = sin^(-1)(3/sqrt(10)) , then: x=

tan((1)/(2).cos^(-1).(2)/(sqrt(5)))=

If 0 lt x lt pi and cos x + sin x = 1/2 , then tan x is

d/dx(tan^-1(x/sqrt(a^2-x^2))=