11. 12. 13. The derivative of the sinusoidal function y = cos(x) is another sinusoidal function y = sin(x). The rate of change of a sinusoidal function is periodic in nature. A sinusoidal function can be differentiated when the independent variable is measured in radians or degrees. 14. 15. The derivatives of the reciprocal trigonometric functions can be found using the chain rule and their related base functions. There are an infinite number of tangents with a given non-zero slope to a sinusoidal curve.

11. 12. 13. The derivative of the sinusoidal function y = cos(x) is another sinusoidal function y = sin(x). The rate of change of a sinusoidal function is periodic in nature. A sinusoidal function can be differentiated when the independent variable is measured in radians or degrees. 14. 15. The derivatives of the reciprocal trigonometric functions can be found using the chain rule and their related base functions. There are an infinite number of tangents with a given non-zero slope to a sinusoidal curve.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.4: Multiple-angle Formulas

Problem 70E

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Question

PLS HELP ASAP ON ALL ASKED QUESTIONS. T/F

11.
12.
13.
The derivative of the sinusoidal function y = cos(x) is another sinusoidal
function y
=
sin(x).
The rate of change of a sinusoidal function is periodic in nature.
A sinusoidal function can be differentiated when the independent variable is
measured in radians or degrees.
14.
15.
The derivatives of the reciprocal trigonometric functions can be found using
the chain rule and their related base functions.
There are an infinite number of tangents with a given non-zero slope to a
sinusoidal curve.

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