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In this video I go over the method of integration by parts which allows the ability to simplify a more complex function to make integration easier. The integration by parts method corresponds to the product rule for derivatives in much the same way as the substitution rule corresponds to the chain rule for derivatives. This method is very important and is used throughout integral calculus so it is important to watch this video to fully understand the proof of it!
Download the notes in my video: http://1drv.ms/1yZoQm9
Derivative Rules - Proof of the Product Rule: http://youtu.be/EIjvGJhDAOk
The Substitution Rule for Integrals: http://youtu.be/VsLC-0g6hVg
Derivative Rules: Proof of Chain Rule: http://youtu.be/tYDDpKzP-VU
The Definite Integral - Brief Introduction: http://youtu.be/vhMP5SKbQjU
Fundamental Theorem of Calculus - Intro and Proof of Part 2 of the Theorem: http://youtu.be/yuIl-BPQHss
Fundamental Theorem of Calculus - Introduction and Part 1 of the Theorem: http://youtu.be/3o8Q6UJzJyk
Fundamental Theorem of Calculus - Proof of Part 1 of the Theorem: http://youtu.be/CAqTwiPxYwU .
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