Final answer:
To find the exact values of the absolute maximum and absolute minimum of the function f(x)=x⁴ e⁻³ˣ on the interval [0,2], you can use the first and second derivative tests.
Step-by-step explanation:
To find the exact values of the absolute maximum and absolute minimum of the function f(x)=x⁴e⁻³ˣ on the interval [0,2], we can use the first and second derivative tests.
- Find the critical points by setting the derivative equal to zero: f'(x) = 4x³e⁻³ˣ - 3x⁴e⁻³ˣ = x³e⁻³ˣ(4 - 3x) and solve for x.
- Evaluate f(0) and f(2) to determine the function values at the endpoints of the interval.
- Calculate the second derivative f''(x) and evaluate it at the critical points and endpoints.
- Compare the function values and second derivative values to determine the absolute maximum and minimum.
The absolute maximum and absolute minimum values occur at the critical points and the endpoints.