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)`

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 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)

Solve tan^-1(1/(1+2x))+tan^-1(1/(1+4x))=tan^-1(2/x^2)

tan^(-1)tan((3pi)/(4))

4tan^(-1)""(1)/(5)-tan^(-1)""(1)/(239)=

Find - tan^(-1)((3)/(4))+tan^(-1)((3)/(5))-tan^(-1)((8)/(19))=

tan^(-1)1+tan^(-1)2+tan^(-1)3=

Find the value of 4tan^(-1)(1/5)-tan^(-1)(1/70)+tan^(-1)(1/99)

If tan^(-1)x-tan^(-1)y=tan^(-1)A, then A=