The angle formed by the positive y - axis and the tangent to `y=x^2+4x-17 at (5/2,-3/4)` is: (a) `tan^(-1)(9)` (b) `pi/2-tan^(-1)(9)` `pi/2+tan^(-1)(9)` (d) none of these

tan^(-1)((1)/(4))+tan^(-1)((2)/(9)) is equal to

The angle between the tangents to the curves y=x^2a n dx=y^2a t(1,1) is cos^(-1)(4/5) (b) sin^(-1)(3/5) tan^(-1)(3/4) (d) tan^(-1)(1/3)

The angle between the pair of lines whose equation is 4x^2+10 x y+m y^2+5x+10 y=0 is (a) tan^(-1)(3/8) (b) tan^(-1)(3/4) (c) tan^(-1){2(sqrt(25-4m))/(m+4)},m in R (d) none of these

Find tan^(-1) tan ((2pi)/3)

The value of tan[cos^(-1)(4/5)+tan^(-1)(2/3)] is 6/(17) (b) 7/(16) (c) (16)/7 (d) none of these

tan^(-1)x +tan^(-1)y = (3pi)/4 Then cot^(-1) x + cot^(-1) y is :

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

tan^(-1)(tan""(9pi)/(8)) ………