The radian measure of an angle in standard position is -2023π/6. In what quadrant will its terminal side lies?
Question
The radian measure of an angle in standard position is -2023π/6. In what quadrant will its terminal side lies?
Solution
To determine the quadrant in which the terminal side of the angle lies, we first need to convert the radian measure to a value between 0 and 2π (or 0 and 360 degrees if you prefer degrees).
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The radian measure of the angle is -2023π/6. We can simplify this by dividing both the numerator and the denominator by π to get -2023/6.
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Next, we divide -2023 by 6 to get approximately -337.17.
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Since this value is negative, it means the angle is measured in the clockwise direction.
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To find the equivalent positive angle, we can add 360 until we get a positive value. When we add 360 to -337.17, we get 22.83.
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Now, we need to determine in which quadrant this angle lies. An angle of 22.83 degrees lies in the first quadrant.
So, the terminal side of the angle -2023π/6 lies in the first quadrant.
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