Table of contents
- 0. Functions(0)
- 1. Limits and Continuity(0)
- 2. Intro to Derivatives(0)
- 3. Techniques of Differentiation(0)
- 4. Derivatives of Exponential & Logarithmic Functions(0)
- 5. Applications of Derivatives(0)
- 6. Graphical Applications of Derivatives(0)
- 7. Antiderivatives & Indefinite Integrals(0)
- 8. Definite Integrals(0)
- 9. Graphical Applications of Integrals(0)
- 10. Integrals of Inverse, Exponential, & Logarithmic Functions(0)
- 11. Techniques of Integration(0)
- 12. Trigonometric Functions(0)
- Angles(0)
- Trigonometric Functions on Right Triangles(0)
- Solving Right Triangles(0)
- Trigonometric Functions on the Unit Circle(0)
- Graphs of Sine & Cosine(0)
- Graphs of Other Trigonometric Functions(0)
- Trigonometric Identities(0)
- Derivatives of Trig Functions(0)
- Integrals of Basic Trig Functions(0)
- Integrals of Other Trig Functions(0)
- 13: Intro to Differential Equations(0)
- 14. Sequences & Series(0)
- 15. Power Series(0)
- 16. Probability & Calculus(0)
13: Intro to Differential Equations
Separable Differential Equations
13: Intro to Differential Equations
Separable Differential Equations: Videos & Practice Problems
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Problem 77Multiple Choice
A skydiver is descending under the influence of gravity and air resistance. According to Newton's Second Law of Motion, the velocity of the skydiver satisfies the equation , where is the mass of the skydiver, is the acceleration due to gravity, and represents the resistive force due to air drag. Assume the resistive force is proportional to the square of the velocity and acts opposite to the direction of motion, so , where is the drag coefficient. Suppose the positive direction is downward. Find the velocity function assuming , and that the velocity satisfies the condition .
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