Table of contents
- 0. Functions(0)
- Introduction to Functions(0)
- Piecewise Functions(0)
- Properties of Functions(0)
- Common Functions(0)
- Transformations(0)
- Combining Functions(0)
- Exponent rules(0)
- Exponential Functions(0)
- Logarithmic Functions(0)
- Properties of Logarithms(0)
- Exponential & Logarithmic Equations(0)
- Introduction to Trigonometric Functions(0)
- Graphs of Trigonometric Functions(0)
- Trigonometric Identities(0)
- Inverse Trigonometric Functions(0)
- 1. Limits and Continuity(0)
- 2. Intro to Derivatives(0)
- 3. Techniques of Differentiation(0)
- 4. Applications of Derivatives(0)
- 5. Graphical Applications of Derivatives(0)
- 6. Derivatives of Inverse, Exponential, & Logarithmic Functions(0)
- 7. Antiderivatives & Indefinite Integrals(0)
- 8. Definite Integrals(0)
5. Graphical Applications of Derivatives
Intro to Extrema
5. Graphical Applications of Derivatives
Intro to Extrema: Study with Video Lessons, Practice Problems & Examples
Back to all problems
32PRACTICE PROBLEM
A container is being filled with a liquid at a rate that changes over time. The volume of the liquid in the container after seconds is given by cubic meters. At what time is the magnitude of the flow rate into the container a maximum?
A container is being filled with a liquid at a rate that changes over time. The volume of the liquid in the container after seconds is given by cubic meters. At what time is the magnitude of the flow rate into the container a maximum?