Integration by substitution or U-substitution is a method that will help you integrate many different functions. By changing the variable of the integrand, we can make an apparently difficult problem into a much simpler one. The challenge is recognising when it is a useful method and what the substitution is (it is very rare that this will be suggested to you). On this page, we'll concentrate on doing that. In order to master the techniques, it is vital that you get plenty of practice!
In the videos, we will look at the method and how to set it up, but will also concentrate on how we recognise that it is an integration by substitution question.
When we are required to evaluate definite integrals then care is required dealing with the limits of integration. It is important to change the limits of integration according to the substitution that you use. The video below shows you how to do that
\(\int _{ \frac { \pi }{ 6 } }^{ \frac { \pi }{ 2 } }{ { cos }^{ 3 }xsinxdx } \)
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The challenge when you start doing Integration by substitution questions is choosing what the correct substitution is. Remember, you are trying to find a function f(x) within the integrand such that the differential of this, f'(x) is also present in the integrand
\(\int { g'(f(x)) \ \cdot f'(x)\quad \ dx } \)
START QUIZ!
Here's the chance to practise the techniques of integration by substitution
START QUIZ!
a) Find \(\int { \frac { { e }^{ x } }{ 1+{ e }^{ x } } dx } \)
b) Evaluate \(\int _{ \frac { { \pi }^{ 2 } }{ 4 } }^{ \pi ^{ 2 } }{ \frac { cos\sqrt { x } }{ \sqrt { x } } } dx\)
Hint
Full Solution
Video Solution
The following diagram shows the graph of f(x) = \(\frac { 4x }{ \sqrt { { x }^{ 2 }+1 } }\)
Let R be the region bounded by f, the x-axis, x = 1 and x = 2
Find R
Hint
Full Solution
Video Solution
How much of Integration by Substitution SL have you understood?
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