How to solve this equation? #arctg(x)+arctg(1/x)=pi/2#?

1 Answer
P dilip_k
May 6, 2017

The given relation is valid for all real values of x. So it is not an equation but an identity. It can be proved as follows.

Let

#tan^-1x=theta#

#=>x=tantheta=cot(pi/2-theta)#

#=>cot^-1x=pi/2-theta#

#=>cot^-1x=pi/2-tan^-1x#

#=>tan^-1x+cot^-1x=pi/2#

#=>tan^-1x+tan^-1(1/x)=pi/2#

Proved

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