3. Suppose a sinusoidal function was created to model a yearly lynx population, due to a cyclical pattern of increasing and decreasing throughout each year. This function can take the form of y = a cos[ b (x - c)] + d Explain what the value of each parameter (a, b, c and d) would represent in the real-life context of analyzing lynx populations. If you were analyzing the function, consider what each parameter could tell you about the population or the time of research.
3. Suppose a sinusoidal function was created to model a yearly lynx population, due to a cyclical pattern of increasing and decreasing throughout each year. This function can take the form of y = a cos[ b (x - c)] + d Explain what the value of each parameter (a, b, c and d) would represent in the real-life context of analyzing lynx populations. If you were analyzing the function, consider what each parameter could tell you about the population or the time of research.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section5.2: Exponential Functions
Problem 31E
Question
![3. Suppose a sinusoidal function was created to model a yearly lynx population, due to
a cyclical pattern of increasing and decreasing throughout each year.
This function can take the form of y = a cos[ b (x - c)] + d
Explain what the value of each parameter (a, b, c and d) would represent in the
real-life context of analyzing lynx populations.
If you were analyzing the function, consider what each parameter could tell you about
the population or the time of research.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fb5fdd233-e947-4d5f-a3c0-4edca06f47b3%2F6ee95960-f3b2-4099-bdd6-d6527bd78d8e%2Fibzk3i_processed.jpeg&w=3840&q=75)
Transcribed Image Text:3. Suppose a sinusoidal function was created to model a yearly lynx population, due to
a cyclical pattern of increasing and decreasing throughout each year.
This function can take the form of y = a cos[ b (x - c)] + d
Explain what the value of each parameter (a, b, c and d) would represent in the
real-life context of analyzing lynx populations.
If you were analyzing the function, consider what each parameter could tell you about
the population or the time of research.
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