What is the main challenge when working with π/12 in trigonometric problems?
Evaluate using the sum formula of two angles of cosine
Interactive Video
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Quizizz Content
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Mathematics, Other
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11th Grade - University
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Hard
The video tutorial covers the addition and subtraction of fractions involving π/12, explores trigonometric identities, and introduces the cosine addition formula. The instructor guides students through identifying and applying the formula, emphasizing the importance of understanding trigonometric values and their simplifications. The session concludes with a validation of the formula's application, ensuring students grasp the concepts for their homework and tests.
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5 questions
Show all answers
1.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
It cannot be used in addition or subtraction.
Its exact value is unknown.
It is difficult to convert to degrees.
It is not a commonly used angle.
2.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
Which angles are suggested to be used instead of π/12 for easier calculations?
30, 15, or 5 degrees
90, 60, or 45 degrees
60, 45, or 30 degrees
45, 30, or 15 degrees
3.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the formula for adding two angles in cosine?
cos(U + V) = cos(U) + cos(V) + sin(U) * sin(V)
cos(U + V) = cos(U) * cos(V) - sin(U) * sin(V)
cos(U + V) = sin(U) * cos(V) + cos(U) * sin(V)
cos(U + V) = sin(U) + sin(V) - cos(U) * cos(V)
4.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What are the values of cosine and sine for π/3?
cosine: 0, sine: 1
cosine: 1, sine: 0
cosine: sqrt(3)/2, sine: 1/2
cosine: 1/2, sine: sqrt(3)/2
5.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the result of applying the cosine addition formula to π/4 and π/3?
cos(π/4 + π/3) = 1
cos(π/4 + π/3) = 0
cos(π/4 + π/3) = sqrt(2)/2
cos(π/4 + π/3) = 1/2
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