8 Refer to the table below if needed.Second QuadrantThird QuadrantFourth Quadrantsin(180. -e) = sinesin(e - 180°) = - sinesin(360• -e) = - sinecos(180° -e) = - cosecos(e - 180°) = - cosecos(360° -e) = cosetan(180° -e) = - tanetan(e - 180°) = tanetan(360. -e) = - tanecot(1800 -e) = - cotecot(e - 180°) = cotecot(360° -e) = - cotesec(180° -e) = - secesec(e - 1800) = - secesec(360. -e) = sececsc(180° -e) = cscecsc(e - 180°) = - cscecsc(360° -e)= -csceGiven that sine = 3/5 and e lies in quadrant II, find the following value.tane3/4-3/4-4/3O O

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Answered: Given that sine 3/5 ande lies in…

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Given that sine 3/5 ande lies in quadrant II, find the following value. %3D tane 3/4 -3/4 -4/3

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter6: The Trigonometric Functions

Section: Chapter Questions

Problem 14RE

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Question

Refer to the table below if needed.
Second Quadrant
Third Quadrant
Fourth Quadrant
sin(180. -e) = sine
sin(e - 180°) = - sine
sin(360• -e) = - sine
cos(180° -e) = - cose
cos(e - 180°) = - cose
cos(360° -e) = cose
tan(180° -e) = - tane
tan(e - 180°) = tane
tan(360. -e) = - tane
cot(1800 -e) = - cote
cot(e - 180°) = cote
cot(360° -e) = - cote
sec(180° -e) = - sece
sec(e - 1800) = - sece
sec(360. -e) = sece
csc(180° -e) = csce
csc(e - 180°) = - csce
csc(360° -e)
= -
csce
Given that sine = 3/5 and e lies in quadrant II, find the following value.
tane
3/4
-3/4
-4/3
O O

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