If 0<\alpha_1<\alpha_2<\cdots<\alpha_n<\frac{\pi}{2} is given then prove: : \tan \alpha_1<(\sin \alpha_1+\cdots+\sin

gaitaprepeted05u

gaitaprepeted05u

Answered question

2022-04-21

If 0<α1<α2<<αn<π2 is given then prove: : tanα1<sinα1++sinαncosα1++cosαn<tanαn

Answer & Explanation

Frederick Greer

Frederick Greer

Beginner2022-04-22Added 17 answers

Te left inequality.
We need to prove that
sinα1cosα1<sinα1++sin{αn}cosα1++cosαn
or
sin(α1α2)++sin(α1αn)<0
which is obvious.
We can prove the right inequality by the same way.
Finally we'll get there
sin(αnα1)++sin(αnαn1)>0
Done.

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