Understanding Green's Theorem

A double integral and a triple integral

A line integral and a surface integral

A line integral and a double integral

A surface integral and a volume integral

The orientation must be counterclockwise

The curve must be piecewise smooth

The region must be simply connected

The vector field must be conservative

Continuity of the vector field

Closed path of the curve

Smoothness of the region

Conservativeness of the vector field

It provides exact solutions to differential equations

It is used to solve triple integrals

It simplifies the evaluation of line integrals

It helps in finding the area of complex regions

Square

Rectangle

Triangle

Circle

Applying the divergence theorem

Using Cartesian coordinates

Multiplying by the area of the region

Using polar coordinates

A circle and a line

Two intersecting lines

Two parallel lines

A curve and a line

dx first, then dy

dy first, then dx

dr first, then dθ

dθ first, then dr

8π

4/15

16π

2/3

Applications of Green's Theorem in physics

Additional examples of Green's Theorem

Advanced calculus techniques

Introduction to Stokes' Theorem