The second image is example 1b for reference. Quotient identity that relates thetangent and sine functionsMultiply each side by cos e.sin etan ecos 0cos 0 tan 0 = sin 01tan 0 = sin e(sec o)Reciprocal identityb.tan 0 =and from part (a),3/34= sin 0133V343/3434%3Dsec 0V34V34V34V34343 As in Example 1 (b) of Section 5.1, assumetan e = -1.06, and 0 is in the second%3Dquadrant. Use one of the fundamentalidentities to find sin 0. Provide 4 decimalplaces.Answer:

Answered: Image /qna-images/answer/1d2f68b3-4674-4424-8e7b-e325755b71da.jpg

Answered: As in Example 1 (b) of Section 5.1,…

As in Example 1 (b) of Section 5.1, assume tan e = -1.06, and 0 is in the second quadrant. Use one of the fundamental identities to find sin 0. Provide 4 decimal places. Answer:

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.5: Product-to-sum And Sum-to-product Formulas

Problem 37E

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Question

The second image is example 1b for reference.

Quotient identity that relates the
tangent and sine functions
Multiply each side by cos e.
sin e
tan e
cos 0
cos 0 tan 0 = sin 0
1
tan 0 = sin e
(sec o)
Reciprocal identity
b.
tan 0 =
and from part (a),
3/34
= sin 0
1
3
3
V34
3/34
34
%3D
sec 0
V34
V34
V34
V34
34
3

As in Example 1 (b) of Section 5.1, assume
tan e = -1.06, and 0 is in the second
%3D
quadrant. Use one of the fundamental
identities to find sin 0. Provide 4 decimal
places.
Answer:

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