Activity 11: Let me check your knowledge by filling the blanks with a correct symbols/ letter or terms in order to complete the statement/s. 1. a. To define the inverse sine function, we restrict the domain of sine to the interval On this interval the sine function is one-to-one, and its inverse function sin-1 is defined by sin-1x = y+ sin. For %3D example, sin-1 because sin %3D C. To define the inverse cosine function we restrict the domain of cosine to the interval On this interval the cosine function is one-to-one and its inverse function cos is defined by cosx = y+ cos For example, cos because cos, %3D
Activity 11: Let me check your knowledge by filling the blanks with a correct symbols/ letter or terms in order to complete the statement/s. 1. a. To define the inverse sine function, we restrict the domain of sine to the interval On this interval the sine function is one-to-one, and its inverse function sin-1 is defined by sin-1x = y+ sin. For %3D example, sin-1 because sin %3D C. To define the inverse cosine function we restrict the domain of cosine to the interval On this interval the cosine function is one-to-one and its inverse function cos is defined by cosx = y+ cos For example, cos because cos, %3D
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter7: Analytic Trigonometry
Section7.4: Multiple-angle Formulas
Problem 72E
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