" (iii) "tan^(-1)x+tan^(-1)y=pi+tan^(-1)((x+y)/(1-xy)),xy>1;x,y>0

Prove that tan^(-1)x-tan^(-1)y=tan^(-1)((x-y)/(1+xy)),xygt-1

If x,y are real numbers such that xy<1 then tan^(-1)x+tan^(-1)y=tan^(-1)((x+y)/(1-xy))

Assertion (A) : The value of "tan"^(-1)+"tan"^(-1)3=(3pi)/(4) Reason (R) : If x gt 0, y gt , 0, xy gt 1 then tan^(-1)x+tan^(-1)y=pi +tan^(-1)((x+y)/(1-xy))

Prove that tan^(-1)x+tan^(-1)y=tan^(-1)((x+y)/(1-xy)) when xylt1

tan^(-1)x-tan^(-1)y=tan^(-1)((x-y)/(1+xy)) holds good for

tan^(-1)x-tan^(-1)y=tan^(-1)((x-y)/(1+xy)) holds good for

" (a) "tan^(-1)x+tan^(-1)y+tan^(-1)z=tan^(-1)(x+y+z-xyz)/(1-xy-yz-zx)

tan^-1 x + tan^-1y= tan^-1 (frac{x+y}{1-xy} ).

Prove that xy tan^-1x+tan^-1y=tan^-1(frac(x+y)(1-xy))

The result tan^(-1)x-tan^(-1)y = tan^(-1)((x-y)/(1+xy)) is true when the value of xy is "………."