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6 Nov 2019
Now you'll evaluate the integral 7y cos(5x) dx + 5xy dy on the closed curve C consisting of the line segments from (0,0) to (4,3) to (0,3) to (0,0) using Green's Theorem. Green's Theorem says this integral can be rewritten in the form f(x,y) dA In this integral, f(x,y) - Setting up the double integral over the region D, you get f(x,y) dx dy (Note that the order of integration is specified--for this integral it will turn out that this is the easier order of integration). In this, C- Evaluting this integral, Show transcribed image text Now you'll evaluate the integral 7y cos(5x) dx + 5xy dy on the closed curve C consisting of the line segments from (0,0) to (4,3) to (0,3) to (0,0) using Green's Theorem. Green's Theorem says this integral can be rewritten in the form f(x,y) dA In this integral, f(x,y) - Setting up the double integral over the region D, you get f(x,y) dx dy (Note that the order of integration is specified--for this integral it will turn out that this is the easier order of integration). In this, C- Evaluting this integral,
Now you'll evaluate the integral 7y cos(5x) dx + 5xy dy on the closed curve C consisting of the line segments from (0,0) to (4,3) to (0,3) to (0,0) using Green's Theorem. Green's Theorem says this integral can be rewritten in the form f(x,y) dA In this integral, f(x,y) - Setting up the double integral over the region D, you get f(x,y) dx dy (Note that the order of integration is specified--for this integral it will turn out that this is the easier order of integration). In this, C- Evaluting this integral,
Show transcribed image text Now you'll evaluate the integral 7y cos(5x) dx + 5xy dy on the closed curve C consisting of the line segments from (0,0) to (4,3) to (0,3) to (0,0) using Green's Theorem. Green's Theorem says this integral can be rewritten in the form f(x,y) dA In this integral, f(x,y) - Setting up the double integral over the region D, you get f(x,y) dx dy (Note that the order of integration is specified--for this integral it will turn out that this is the easier order of integration). In this, C- Evaluting this integral, 1
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Collen VonLv2
29 Sep 2019