1. 4.1 ANTIDERIVATIVES & INDEFINITE INTEGRATION

2. Definition of Antiderivative  A function is an antiderivative of f on an interval I if F’(x) = f(x) for all x in I  Note: F is called an antiderivative of f, rather than the antiderivative of f because:  F 1 (x)=x 3, F 2 (x)=x 3 – 5 and F 3 (x)=x 3 +97 are all antiderivatives of f(x)=3x 2

3. Representation of Antiderivatives  If F is an antiderivative of f on an interval I, then G is an antiderivative of f on the interval I if and only if G is of the form:  G(x) = F(x) + c, for all x in I where c is a constant

4. Example 1:Solving a differential  Find the general solutions of the differential equation y’=2

5. Notation for antiderivatives  When solving a differential equation of the form:  It is convenient to write it in the equivalent form:  dy = f(x) dx  The process of finding all solutions of this equation is called antidifferentiation (or indefinite integration)

6. Notation for Antiderivatives  Antidifferentiation is denoted by the integral sign:  The general solution is denoted by: Integrand Variable of Integration Constant of Integration

7. Basic Integration Rules Moreover. If, then

8. Basic Integration Rules  Look at rules on page 244

9. Power Rule

10. Example 1

11. Example 2

12. Example 3

13. Example 4

14. Example 5

15. Example 6

16. Example 7

17. Example 8