Identities similar to \arctan(x)+\arctan(1/x)=\frac{\pi}{2} The \arctan(x)+\arctan(1/x)=\pi/2 identity can be solved by

Jessie Jenkins

Jessie Jenkins

Answered question

2022-01-29

Identities similar to arctan(x)+arctan(1x)=π2
The arctan(x)+arctan(1x)=π2 identity can be solved by taking the derivative of the left hand side, showing it is 0, and then plugging in, say, x=1 to get its constant value π2
Are there any other (nontrivial) identities which can be solved similarly?

Answer & Explanation

portafilses

portafilses

Beginner2022-01-30Added 13 answers

Answer provided below
arccos(x)+arcsin(x)=π2
Joy Compton

Joy Compton

Beginner2022-01-31Added 13 answers

If we know sin(x)=cos(x) and cos(x)=sin(x), then we can compute
ddx[sin2(x)+cos2(x)]=0,
to conclude sin2(x)+cos2(x) is constant. Then plug in one value to get
sin2(x)+cos2(x)=1

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