![multivariable calculus - How are the two forms of Green's theorem are equivalent? - Mathematics Stack Exchange multivariable calculus - How are the two forms of Green's theorem are equivalent? - Mathematics Stack Exchange](https://i.stack.imgur.com/XXdlY.png)
multivariable calculus - How are the two forms of Green's theorem are equivalent? - Mathematics Stack Exchange
![SOLVED: Using Green's Theorem, evaluate the path integral ∮g⋅dr where g is the semi-circle centered at (0, 1) with radius r in the right-half plane as indicated in the diagram below: Without SOLVED: Using Green's Theorem, evaluate the path integral ∮g⋅dr where g is the semi-circle centered at (0, 1) with radius r in the right-half plane as indicated in the diagram below: Without](https://cdn.numerade.com/ask_images/ea0674159a4a443c90518a147c665f09.jpg)
SOLVED: Using Green's Theorem, evaluate the path integral ∮g⋅dr where g is the semi-circle centered at (0, 1) with radius r in the right-half plane as indicated in the diagram below: Without
![Use Green's Theorem to evaluate ef F Calculator F = √x+6y, 3x+6y) C is the boundary of the region - brainly.com Use Green's Theorem to evaluate ef F Calculator F = √x+6y, 3x+6y) C is the boundary of the region - brainly.com](https://media.brainly.com/image/rs:fill/w:3840/q:75/plain/https://us-static.z-dn.net/files/da1/e31ae8c7c41a41f9875d1c8e26db6698.png)