Use the unit circle, reflection, and symmetry to determine the angle θ that corresponds to the given function value in the given quadrant. If no such angle exists, write DNE. (As always, give exact values.) sec(θ)= -(sqrt(2)) and θ is in quadrant two: θ= tan(θ)= 1 and θ is in quadrant one: θ= sec(θ)= -(sqrt(2)) and θ is in quadrant three: θ= cot(θ)= (sqrt(3)) and θ is in quadrant three: θ= tan(θ)= (sqrt(3)) and θθ is in quadrant one: θ=
Use the unit circle, reflection, and symmetry to determine the angle θ that corresponds to the given function value in the given quadrant. If no such angle exists, write DNE. (As always, give exact values.) sec(θ)= -(sqrt(2)) and θ is in quadrant two: θ= tan(θ)= 1 and θ is in quadrant one: θ= sec(θ)= -(sqrt(2)) and θ is in quadrant three: θ= cot(θ)= (sqrt(3)) and θ is in quadrant three: θ= tan(θ)= (sqrt(3)) and θθ is in quadrant one: θ=
Trigonometry (11th Edition)
11th Edition
ISBN:9780134217437
Author:Margaret L. Lial, John Hornsby, David I. Schneider, Callie Daniels
Publisher:Margaret L. Lial, John Hornsby, David I. Schneider, Callie Daniels
Chapter1: Trigonometric Functions
Section: Chapter Questions
Problem 1RE:
1. Give the measures of the complement and the supplement of an angle measuring 35°.
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Use the unit
sec(θ)= -(sqrt(2)) and θ is in quadrant two: θ=
tan(θ)= 1 and θ is in quadrant one: θ=
sec(θ)= -(sqrt(2)) and θ is in quadrant three: θ=
cot(θ)= (sqrt(3)) and θ is in quadrant three: θ=
tan(θ)= (sqrt(3)) and θθ is in quadrant one: θ=
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