Do Now: #36 and 38 on p.322

1. Do Now: #36 and 38 on p.322 Evaluate

2. Do Now: #36 and 38 on p.322 Evaluate

3. Section 6.2b Separation of Variables

4. Separable Differential Equations A differential equation is separable if can be expressed as a product of a function of and a function of . The differential equation then has the form:

5. Separable Differential Equations If , we can separate the variables by dividing both sides of the equation by h(y), obtaining, in succession, We can now find a solution for the differential equation by integrating each side separately…

6. Practice Problems Solve the differential equation Since is never zero, we can solve by separating the variables: On the left:

7. Practice Problems Solve the differential equation Since is never zero, we can solve by separating the variables: On the right:

8. Practice Problems Solve the differential equation Since is never zero, we can solve by separating the variables: Combining the constants of integration: This gives y as an implicit function of x. We can give yas an explicitfunction of x by simply solving for y…

9. Practice Problems Solve the differential equation

10. Practice Problems Solve the differential equation On the left:

11. Practice Problems Solve the differential equation (Note: technically, C is now C’ = C/2, but C’s are generic)

12. Practice Problems Solve the differential equation

13. Practice Problems Solve the initial value problem: Initial condition:

14. Practice Problems Solve the initial value problem: On the right:

15. Practice Problems Solve the initial value problem: Initial condition: