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Integration by Substitution

6.3 integration by substitution

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Page 1: 6.3 integration by substitution

Integration by Substitution

Page 2: 6.3 integration by substitution

Recognizing the “Outside-Inside” Pattern

From doing derivatives we need to recognize the integrand above is a composite function from the from the ““derivative of the outside times derivative of the outside times the derivative of the insidethe derivative of the inside”” (chain rule). (chain rule).

Cx 32 1

3

1 “+ C” since this is an indefinite integral

Page 3: 6.3 integration by substitution

Think of this function as 2 functions: f(x) and g(x)

As a composite function then:

Now look at the original integral:

2xxf 12 xxg

22 1 xxgf

insideoutside

f(g(x)) g’(x)

Page 4: 6.3 integration by substitution

Read this as “the antiderivative of the outside function with the inside function plugged in…plus C”

Page 5: 6.3 integration by substitution
Page 6: 6.3 integration by substitution

Let’s Practice !!!

Let u = x3

du = 3x2

du sin u

Page 7: 6.3 integration by substitution

Let u = x4 + 2

du = 4 x3

1/4 4

u du

More Practice !!!

Page 8: 6.3 integration by substitution

Here are some problems for you to work on!!!

Page 9: 6.3 integration by substitution

Less Apparent Substitution

Let u = x – 1 du = dx

x = u + 1x2 = (u + !)2

(u + 1) u du


5.3 integration by substitution dfs-102

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