Download presentation
Presentation is loading. Please wait.
1
Jay James Mike Norton Stephen Nesemann Kaitlyn Richardson
4.2 Area 4.3 Riemann Sums and Definite Integrals 4.6 Numerical Integration Jay James Mike Norton Stephen Nesemann Kaitlyn Richardson
2
4.2 Area Equations:
3
Examples: evaluate ANSWER: 375
4
4.2 Area Let f be continuous and non-negative on the interval [a,b]. The area of the region bounded by the graph of f, the x-axis, x=a, and x=b is: Where and
![4.2 Area Let f be continuous and non-negative on the interval [a,b]. The area of the region bounded by the graph of f, the x-axis, x=a, and x=b is:](http://slideplayer.com./slide/16896678/97/images/4/4.2+Area+Let+f+be+continuous+and+non-negative+on+the+interval+%5Ba%2Cb%5D.+The+area+of+the+region+bounded+by+the+graph+of+f%2C+the+x-axis%2C+x%3Da%2C+and+x%3Db+is%3A.jpg "Where and.")
5
Another Example Find the area under the curve for the equation bounded by the x axis on the interval [2,5]. ANSWER: 39/2 units squared
![Another Example Find the area under the curve for the equation bounded by the x axis on the interval [2,5].](http://slideplayer.com./slide/16896678/97/images/5/Another+Example+Find+the+area+under+the+curve+for+the+equation+bounded+by+the+x+axis+on+the+interval+%5B2%2C5%5D..jpg "ANSWER: 39/2 units squared.")
6
What is a Riemann Sum? In mathematics, a Riemann sum is a method for approximating the total area underneath a curve on a graph, otherwise known as an integral.
7
Reimann Sums and Definite Integrals
If f is closed on the interval from [a,b] and the limit exists… Then f in integrable on [a,b] and the limit is denoted by
8
Things You Should Know! When plugging numbers into your equation you will want to know that.. And…
9
Yet Another Example Find using Riemann Sums: Answer= -3
10
4.6 Numerical Integration Trapezoidal Rule
11
Example: Find using Trapezoidal method: n=4 Answer: about 3.241
12
For Extra Information…
Watch these videos:
Similar presentations
