I want to know if it's true. \(\displaystyle{\sin{{\left(\frac{\pi}{{2}}+{2}\pi{K}\right)}}}{>}{\sin{{\left({3}{\left(\frac{\pi}{{2}}+{2}\pi{k}\right)}\right)}}}\)

Aliyah Mendez

Aliyah Mendez

Answered question

2022-04-07

I want to know if it's true.
sin(π2+2πK)>sin(3(π2+2πk))

Answer & Explanation

razmenile7chp

razmenile7chp

Beginner2022-04-08Added 11 answers

Assuming kNsin(π2+2kπ)=sin(π2)=1
sin(3π2+6πk)=sin(3π2)=111
sin(π2+2πk)=sin(π2)=1
sin(3π2+6πk)=sin(3π2)=11<1
You can use the fact that for the proof for the above
sin(a±b)=sin(a)cos(b)±sin(a)cos(a)

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