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Evaluatesin(pi/3) - cos(2pi/3)

User Greg Randall
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1 Answer

13 votes
13 votes

cos(2π/3)can be expressed as,


\cos ((2\pi)/(3))=\cos (\pi-(\pi)/(3))

Since cos(π-x)=-cosx, we can write


\cos (2\pi)/(3)=\cos (\pi-(\pi)/(3)_{})=-\cos (\pi)/(3)

We know,


\begin{gathered} \sin ((\pi)/(3))=\frac{\sqrt[]{3}}{2} \\ \cos (\pi)/(3)=(1)/(2) \end{gathered}

Therefore,


\begin{gathered} \sin (\pi)/(3)-\cos (2\pi)/(3)=\sin (\pi)/(3)-(-\cos (\pi)/(3)) \\ =\sin (\pi)/(3)+\cos (\pi)/(3) \\ =\frac{\sqrt[]{3}}{2}+(1)/(2) \\ =\frac{\sqrt[]{3}+1}{2} \end{gathered}

User Daniel Szmulewicz
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