Let f(x)=15/1 +4e^−0.2x . Over what interval is the growth rate of the function increasing?
To find the interval over which the growth rate of a function is increasing, we need to find the derivative of the function and determine where it is positive
To find the interval over which the growth rate of a function is increasing, we need to find the derivative of the function and determine where it is positive.
Given the function f(x) = 15/(1 + 4e^(-0.2x)), let’s find its derivative.
Using the quotient rule, the derivative of f(x) is:
f'(x) = [(1 + 4e^(-0.2x))(0) – 15(4e^(-0.2x)(-0.2))] / (1 + 4e^(-0.2x))^2
Simplifying further:
f'(x) = (12e^(-0.2x)) / (1 + 4e^(-0.2x))^2
To determine where the growth rate is increasing, we need to find where the derivative f'(x) is positive.
Setting f'(x) > 0 and solving for x:
(12e^(-0.2x)) / (1 + 4e^(-0.2x))^2 > 0
To make the inequality simpler, we can multiply both sides by (1 + 4e^(-0.2x))^2, noting that this expression is always positive:
12e^(-0.2x) > 0
Since e^(-0.2x) is always positive for any value of x, we can divide both sides of the inequality by e^(-0.2x) without changing the sign:
12 > 0
This inequality holds true for all real numbers, so the growth rate of the function f(x) = 15/(1 + 4e^(-0.2x)) is increasing over the entire real number line, or over the interval (-∞, +∞).
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