tan^(-1)(x+2)+tan^(-1)(x-2)=(pi)/(4);x>0...

`tan^(-1)(x+2)+tan^(-1)(x-2)=(pi)/(4);x>0`

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tan^(-1)(x/2)+tan^(-1)(x/3)=(pi)/(4)

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

Solve the following equations : tan^(-1) (x+2) +tan^(-1) (x-2) = pi/4 , x gt 0

Solve for x : tan^(-1)(x/2)+tan^(-1)(x/3)=pi/4 , 0

If tan^(-1)(a/x)+tan^(-1)(b/x)+tan^(-1)(c /x)+tan^(-1)(d/x)=(pi)/(2) then x^(4)-x^(2)(Sigma ab)+abcd=

The value of x satisfying the equation tan^(-1)(2x)+tan^(-1)3x=(pi)/(4) is

tan^(-1)2x+tan^(-1)3x=(pi)/(4)

tan^(-1)x+tan^(-1)(1)/(x)={[(pi)/(2), if x>0-(pi)/(2), if x<0

tan^(-1)((a)/(x))+tan^(-1)((b)/(x))=(pi)/(2) then x=

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