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Lecture 8 – Integration Basics

Lecture 8 – Integration Basics. A few (very few) examples:. Functions – know their shapes and properties. Trigonometric Rules. Know basics about sine, cosine, tangent, secant, plus 2 right triangles. Beyond these angles:. and use reference angles for all quadrants. Substitution Rule.

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Lecture 8 – Integration Basics

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  1. Lecture 8 – Integration Basics A few (very few) examples: Functions – know their shapes and properties

  2. Trigonometric Rules Know basics about sine, cosine, tangent, secant, plus 2 right triangles Beyond these angles: and use reference angles for all quadrants.

  3. Substitution Rule First approach for any integral should be a u-substitution. Ex. 1 Which (if any) of the following can use a basic u-substitution?

  4. Ex. 2 Which (if any) of the following can use a basic u-substitution?

  5. Know derivatives for trig functions. Ex. 3 But what about antiderivatives?

  6. Ex.4 What antiderivative for secant function?

  7. Ex.5

  8. Need to try a different 1.

  9. Lecture 9 – Integration By Parts Likewise,by parts is the “almost” reverse of the product rule. u-substitution is the reverse of the chain rule.

  10. 1: know the 2: look for When figuring out integrals, now looking for one of the following: 3: look for 4: look for When trying to decide what to use for the u, remember _________

  11. Example 1

  12. Example 2

  13. Example 3

  14. Example 4 What is needed to solve each?

  15. Lecture 10 – More Integration By Parts Example 5

  16. Example 6 What is needed to solve each?

  17. Example 7

  18. Example 8

  19. Lecture 11 – Trig Integrals Use u-sub, trig identities, and/or by parts.

  20. Trig identities:

  21. Example 1

  22. Example 2

  23. With dealing with sine or cosine functions, you are looking for (cos x dx) or (sin x dx), respectively. Example 3

  24. Example 4

  25. Lecture 12 – More Trig Integration With dealing with tangent or secant, you are looking for (sec2 x dx) or (sec x tan x dx), respectively. Example 5

  26. Example 6

  27. Example 7

  28. When faced with one of the above in an integral , create a • right triangle and substitute trig expressions in  for algebraic • expressions of x. (unless a simple u-substitution is available) Trig Substitution

  29. Lecture 13 –Trig Substitution Example 1

  30. Example 2

  31. Example 3

  32. Lecture 14 – Partial Fractions Combine the following:

  33. Process can be reversed so that any rational function can be expressed as the sum of partial fractions. Any polynomial can be rewritten as a product of linear and irreducible quadratic factors. So q(x) can be decomposed. Linear fractions have only a constant in the numerator, regardless of the number of repetitions. Quadratic fractions have linear and constant terms only.

  34. Why useful? U S U B T R I G S U B

  35. Example 1

  36. Example 2

  37. Example 3

  38. Example 4

  39. Lecture 15 – Improper Integrals Infinite Integrals: infinity at one or both limits. Example 1

  40. Example 2

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