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Section 17.4 Integration LAST ONE!!! Yah Buddy!.  A physicist who knows the velocity of a particle might wish to know its position at a given time. 

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Presentation on theme: "Section 17.4 Integration LAST ONE!!! Yah Buddy!.  A physicist who knows the velocity of a particle might wish to know its position at a given time. "— Presentation transcript:

1 Section 17.4 Integration LAST ONE!!! Yah Buddy!

2  A physicist who knows the velocity of a particle might wish to know its position at a given time.  A biologist who knows the rate at which a bacteria population is increasing might want to deduce what the size of the population will be at some future time. Introduction

3  In each case, the problem is to find a function F whose derivative is a known function f.  If such a function F exists, it is called an antiderivative of f. Antiderivatives Definition A function F is called an antiderivative of f on an interval I if F’(x) = f (x) for all x in I.

4 Find the integral. (Find the antiderivative.) = ?

5  If F is an antiderivative of f on an interval I, then the most general antiderivative of f on I is F(x) + C where C is an arbitrary constant. Theorem Antiderivatives  Going back to the function f (x) = x 2, we see that the general antiderivative of f is ⅓ x 3 + C.

6 Notation for Antiderivatives  The symbol is traditionally used to represent the most general an antiderivative of f on an open interval and is called the indefinite integral of f.  Thus, means F’(x) = f (x) because the derivative of is

7 Every antiderivative F of f must be of the form F(x) = G(x) + C, where C is a constant. Example: Represents every possible antiderivative of 6x. Constant of Integration

8 Example: Power Rule for the Indefinite Integral

9 Indefinite Integral of e x and b x Power Rule for the Indefinite Integral

10 Sum and Difference Rules Example:

11 Constant Multiple Rule Example:

12 Integration by Substitution Method of integration related to chain rule. If u is a function of x, then we can use the formula

13 Example: Consider the integral: Sub to getIntegrateBack Substitute Integration by Substitution

14 Example: Evaluate Pick u, compute du Sub in Integrate

15 Example: Evaluate

16 Examples on your own:

17 Find the integral of each: 1.)2.) 3.)4.)

18 Find the integral of each: 5.)6.) 7.)8.)

19 Find the integral of each: 9.)10.) 11.)12.)

20 Find the integral of each: 13.)14.)

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