Compute the value of \(\displaystyle{\frac{{{\left({\arctan{{\frac{{{1}}}{{{2}}}}}}+{\arctan{{\frac{{{1}}}{{{3}}}}}}\right)}}}{{{\left({a}{r}{\mathcal{{o}}}{t}{\frac{{{1}}}{{{2}}}}+{a}{r}{\mathcal{{o}}}{t}{\frac{{{1}}}{{{3}}}}\right)}}}}\)

Dominique Pace

Dominique Pace

Answered question

2022-03-26

Compute the value of
(arctan12+arctan13)(arcot12+arcot13)

Answer & Explanation

Adan Berry

Adan Berry

Beginner2022-03-27Added 12 answers

Hello and welcome to the site!
tan(arctan(12)+arctan(13))
=tan(arctan(12))+tan(arctan(13))1tan(arctan(12))tan(arctan(13))=12+1311213=1
So arctan(12)+arctan(13)=π4 And thus, arcot(12)+arcot(13)=ππ4=3π4
So the final result will be 13.

Mikaela Winters

Mikaela Winters

Beginner2022-03-28Added 14 answers

Like showing arctan(23)=12arctan(125)
for ab<1
arctana+arctanb=arctan(a+b1ab)
arctan12+arctan13=arctan1==π4
and
arctana+arota=π2arot12+arot13
=ππ4=

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