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Given that sin 2π/3= cos y, first express 2π/3 as a sum of π/2 and angle and then apply a trigonometric identity to determine the measure of angle y.

User Rodrigo Ruiz
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1 Answer

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20 votes

Answer:


y=(\pi)/(6)

Explanation:

Given that:


\sin((2\pi)/(3))=\cos y

Substitute the value
(2\pi)/(3)=(\pi)/(2)+(\pi)/(6).


\sin((\pi)/(2)+(\pi)/(6))=\cos(y)

(Using the formula:
\sin(\alpha+\beta)=\sin\alpha\cos\beta+\cos\alpha\sin\beta)


\sin(\pi)/(2)\cos(\pi)/(6)+\cos(\pi)/(2)\sin(\pi)/(6)=\cos y

Using
\sin(\pi)/(2)=1, \cos(\pi)/(2)=0, we obtain:


1*\cos(\pi)/(6)+0* \sin(\pi)/(6)=\cos y

This is equivalent to:


\cos(\pi)/(6)=\cos y

Applying cos inverse on both sides, we get:


y=(\pi)/(6)

User Huskygrad
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