Integration
M. Dumbser 1 / 18 Analisi Numerica Università degli Studi di Trento Dipartimento dIngegneria Civile ed Ambientale Dr.-Ing. Michael Dumbser Lecture on Numerical.
Page 0. Page 1 Section IThe Basics Page 2 Antiderivatives If I ask you what is the derivative of x, you will say 1. If I ask you what is the antiderivative.
The Maximum Principle: Continuous Time Main purpose: to introduce the maximum principle as a necessary condition that must be satisfied by any optimal.
Lesson 11 plane areas area by integration
Definite Integral
Dr. Jie Zou PHY33201 Chapter 8 Numerical Integration Lecture (I) 1 1 Ref.: “Applied Numerical Methods with MATLAB for Engineers and Scientists”, Steven.
Chapter 3 Programming with MATLAB. Newton’s Second Law Euler’s method To obtain good accuracy, it is necessary to use many small steps Extremely.
Lecture 7 Fourier Series Skim through notes before lecture Ask questions in lecture After lecture read notes and try some problems See me in E47 office.
Chapter 4 Continuous Random Variables and Probability Distributions.
Monte Carlo Integration
Monte Carlo Path Tracing and Caching Illumination