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

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards
From $9.99Unlock all

Prepare for the College Math Placement Test. Study with targeted quizzes and multiple choice questions with explanations and tips to excel. Start your math journey with confidence!

Multiple Choice

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

Explanation:
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

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

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy