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MA 242.003 . Day 36 – February 26, 2013 Section 12.3: Double Integrals over General Regions. Section 12.3: Double Integrals over General Regions. Problem: Compute the double integral of f(x,y ) over the region D shown in the diagram. Solution:.
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MA 242.003 • Day 36 – February 26, 2013 • Section 12.3: Double Integrals over General Regions
Section 12.3: Double Integrals over General Regions Problem: Compute the double integral of f(x,y) over the region D shown in the diagram. Solution:
Section 12.3: Double Integrals over General Regions Problem: Compute the double integral of f(x,y) over the region D shown in the diagram. Solution:
Section 12.3: Double Integrals over General Regions Problem: Compute the double integral of f(x,y) over the region D shown in the diagram.
Section 12.3: Double Integrals over General Regions Problem: Compute the double integral of f(x,y) over the region D shown in the diagram. It turns out that if we can integrate over 2 special types of regions, then properties of integrals implies we can integrate over general regions.
Question: How do we evaluate a double integral over a type I region?
Question: How do we evaluate a double integral over a type I region?
Question: How do we evaluate a double integral over a type I region?
Question: How do we evaluate a double integral over a type I region?
Example type II regions: A circular region is type I
Example type II regions: A circular region is also type II
Using techniques similar to the above we can establish the following:
Using techniques similar to the above we can establish the following:
“Reversing the order of Integration” Does NOT mean
“Reversing the order of Integration” Does NOT mean
“Reversing the order of Integration” Step #1: Given an iterated integral over a type I region, for example: Sketch the region in the xy-plane given by a
“Reversing the order of Integration” Step #1: Given an iterated integral over a type I region, for example: Sketch the region in the xy-plane given by a Step #2: Describe the region as (one or more) type II region(s).
“Reversing the order of Integration” Step #1: Given an iterated integral over a type I region, for example: Sketch the region in the xy-plane given by a Step #2: Describe the region as (one or more) type II region(s). Step #3: Set up the iterated integral over the type II region(s).
“Reversing the order of Integration” Step #1: Given an iterated integral over a type II region, for example: Sketch the region in the xy-plane given by a Step #2: Describe the region as (one or more) type I region(s). Step #3: Set up the iterated integral over the type I region(s).
Reversing the order of integration can turn an impossible task into something that is computable.
Reversing the order of integration can turn an impossible task into something that is computable.