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If sin(θ) = 0.5, what is the angle θ in degrees?

15 degrees

30 degrees

To determine the angle $ \theta $ when $ \sin(\theta) = 0.5 $, we can refer to the unit circle and the values of sine for commonly known angles.

The sine function, $ \sin(\theta) $, represents the ratio of the opposite side to the hypotenuse in a right triangle. From the unit circle, we learn that $ \sin(30^\circ) $ is equal to $ 0.5 $. Therefore, when $ \sin(\theta) = 0.5 $, one valid solution for $ \theta $ is indeed $ 30^\circ $.

Additionally, the sine function is positive in the first and second quadrants. Thus, beyond $ 30^\circ $, there is also an angle in the second quadrant where $ \sin(180^\circ - 30^\circ) = 0.5$, which gives us $ 150^\circ $ as another solution. However, if we are only focusing on angles from $ 0^\circ $ to $ 180^\circ $ for typical placements in such problems, the immediate and simplest answer remains $ 30^\circ $.

Hence, the value of

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45 degrees

60 degrees

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