Discussion of Green's Theorem (3) Lynn G published on 2022-01-01 included in category Calculus 1 Question:Evaluate ∫Cxdy−ydxπ(x2+y2), \int_C\frac{xdy-ydx}{\pi(x^2+y^2)}, ∫Cπ(x2+y2)xdy−ydx,where $C_1$ is the circle $(x-1)^2+y^2=9$, traced in the anti-clockwise direction.
Discussion of Green's Theorem (2) Lynn G published on 2022-01-01 included in category Calculus 1 Question:Evaluate ∫Cxdy−ydxπ(x2+y2), \int_C\frac{xdy-ydx}{\pi(x^2+y^2)}, ∫Cπ(x2+y2)xdy−ydx,where $C$ is a unit circle with centre $(0,0)$, traced in the anti-clockwise direction.
Typical application of Green's Theorem (1) Lynn G published on 2021-12-31 included in category Calculus
