Trapezoid Rule Example (Equal Step Size) | Numerical Methods
In this video, we're diving into the world of numerical methods by using Trapezoid Rule to solve the definite integral of the function xe^sinx from 1 to 6.
Understanding how to apply numerical methods like Trapezoid Rule is crucial in solving integrals, especially when dealing with complex functions. We'll break down the step-by-step process to compute the definite integral of this function within the given limits.
Trapezoid Rule is a numerical technique that approximates definite integrals by dividing the range into equally spaced intervals and using linear functions to approximate areas within those segments. It's a powerful method for approximating integrals when analytical solutions aren't readily available.
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This timeline is meant to help you better understand how to solve a Trapezoid rule problem:
0:00 Introduction
0:13 Recall Trapezoid Rule Theory
1:10 Approximating a definite integral with Trapezoid Rule
2:58 Finding maximum error when using the Trapezoid rule
4:39 Outro
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This video is part of our Numerical Methods course. Numerical methods is about solving math problems through approximating the solution of problems that would be difficult or impossible to solve analytically. In this playlist we will cover topics such as solving systems of linear equations, solving systems of non-linear equations, numerical integration, numerical derivatives, etc..
Watch video Trapezoid Rule Example (Equal Step Size) | Numerical Methods online without registration, duration 04 minute 58 second in high hd quality. This video was added by user StudySession 08 January 2024, don't forget to share it with your friends and acquaintances, it has been viewed on our site 2 thousand once and liked it 35 people.