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The Logic Behind Integration by Sustitution (1 Viewer)

untouchablecuz

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I know how to integrate by substitution, but I don't really understand why it works? How do we break up du/dx? Why does the method work? I've always thought that du RELIES on dx etc etc. Any help would be appreciated.
 

lolokay

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you're just putting an integral that you can't identify how to solve into a form you can

maybe if you give an example, it could help us explain clearly why it works
 

Trebla

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untouchablecuz said:
I know how to integrate by substitution, but I don't really understand why it works? How do we break up du/dx? Why does the method work? I've always thought that du RELIES on dx etc etc. Any help would be appreciated.
Integration by substitution is basically a method of SIMPLIFYING the integral.
A simple example:
∫ 2x(1 + x²)² dx = (1 + x²)³ / 3 + c
because it is obvious that when you differentiate , (1 + x²)³ a 2x must pop out because of the chain rule and the 3 comes out in front. However, since there is no 3 in the integrand, we have to divide the primitive by 3 to maintain equality.

So one way to rewrite this is if f(x) = (1 + x²) with f'(x) = 2x, then
2x(1 + x²)² dx =∫ f'(x) [f(x)]² dx = [f(x)]³ / 3 + c
Notice that if we differentiate [f(x)]³ / 3 we get 3[f(x)]² f'(x) / 3 = [f(x)]² f'(x) which is the original integrand.

Integration by substitution follows that very same principle but instead of f(x), it is commonly written as u.
u = (1 + x²) {this is f(x)}
du/dx = 2x {this is f'(x)}

So instead of ∫ f'(x)[f(x)]² dx we write it as:
2x(1 + x²)² dx = ∫ (du/dx) u² dx
= ∫ u² du
= u³ / 3 + c
= (1 + x²)³ / 3 + c
 
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3unitz

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∫ (1 - x^2)^(1/2) dx

using the substitution x = sin u

what happens to the absolute signs on cos u?
 

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