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Find two values of Θ, 0< Θ < 2 pi, that satisfy the following equationsin Θ = negative square root 2 over 2

Find two values of Θ, 0< Θ < 2 pi, that satisfy the following equationsin Θ = negative-example-1
User Jmng
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1 Answer

9 votes
9 votes

Given:


\sin\theta=-(√(2))/(2),0\leq\theta<2\pi

To find:

The two values.

Step-by-step explanation:

It can be written as,


\begin{gathered} \sin\theta=-(√(2))/(2)*(√(2))/(√(2)) \\ \sin\theta=-(2)/(2√(2)) \\ \sin\theta=-(1)/(√(2)) \\ \theta=\sin^(-1)(-(1)/(√(2))) \end{gathered}

Since the angle lies between 0 and 2π.

Also, the value of the sine function is negative only when the angle lies in the third and fourth quadrant.

So, the angles are,


\begin{gathered} \theta=180+45^(\circ)\Rightarrow\text{ }225^(\circ)\text{ }(or)\text{ }(5\pi)/(4) \\ \theta=360-45\Rightarrow\text{ }315^(\circ)\text{ }(or)\text{ }(7\pi)/(4) \end{gathered}

Final answer:

The values are,


\theta=(5\pi)/(4),(7\pi)/(4)

User Atetc
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