4.5 Integration by Substitution

1. 4.5 Integration by Substitution Antidifferentiation of a Composite Function Let f and g be functions such that f og and g’ are continuous on an interval I. If F is an antiderivative of f on I, then Inside Derivative of Inside Outside

2. Evaluate Let u = x2 + 1 du = 2x dx Let u = 5x Evaluate du = 5 dx

3. Multiplying and dividing by a constant Let u = x2 + 1 du = 2x dx Let u = 2x - 1 du = 2dx

4. Substitution and the General Power Rule What would you let u = in the following examples? u = 3x - 1 u = x2 + x u = x3 - 2 u = 1 – 2x2 u = cos x

5. A differential equation, a point, and slope field are given. Sketch the solution of the equation that passes through the given point. Use integration to find the particular solution of the differential equation. Day 1 stop (1-41 odd)

6. u = x3 du = 3x2 dx

7. Let u = sin 3x du = 3cos 3x dx rewritten as Day 2 stop (43-56 all, 57-61 odd)

8. Let u = 2x - 1 u + 1 = 2x du = 2dx

9. Evaluate u = x2 + 1 du = 2x dx Note that there are no upper and lower limits of integration. We must determine new upper and lower limits by substituting the old ones in for x in u = x2 + 1 2 Or, we could use the old limits if we substitute x2 + 1 back in. 1

10. 2u du = 2 dx u du = dx What limits are we going to use? 3 1 See area comparisons when using different upper and lower limits. Page 302

11. Integration of Even and Odd Functions If f is an even function, then Ex. Odd or Even? If f is an odd function, then