To find: a formula for the logistic function whose graph is shown in the figure.
Given information:
The graph of the required function is:
Definition Used:
Logistic Growth Function:
Let a , b , c , and k be positive constants, with
Where the constant c is the limit to growth.
Explanation:
Now, the required function will be of the form:
Here, as x becomes larger,
On observing the above graph, the upper horizontal asymptote is given by
So, the function becomes:
Now, from the graph, it can be inferred that
Now, to find the value of the constant k , substitute the given point
Take natural log on both sides,
Hence, the required function is:
Chapter 3 Solutions
PRECALCULUS:GRAPHICAL,...-NASTA ED.
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