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)
4. Applications of Derivatives
Related Rates
4. Applications of Derivatives
Related Rates: Study with Video Lessons, Practice Problems & Examples
Back to all problems
22PRACTICE PROBLEM
A biologist is studying the growth rate of a bacterial culture. The population size of the bacteria is a function of time in hours. If the derivative of with respect to , , is small, what can be inferred about the population of the bacteria when small changes are observed in ?
A biologist is studying the growth rate of a bacterial culture. The population size of the bacteria is a function of time in hours. If the derivative of with respect to , , is small, what can be inferred about the population of the bacteria when small changes are observed in ?