34745947
Descripción
Fichas por Blake Pilger, actualizado hace más de 1 año
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Creado por Blake Pilger
hace casi 3 años
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| Pregunta | Respuesta |
| Line Integrals | |
| Flux Along a Curve | |
| Work/Flow/Circulation | |
| Path Integrals for Conservative Fields | |
| Conditions for Conservative Fields | |
| Green's Theorem (Circulation-Curl or Tangential Form) | |
| Green's Theorem (Flux-Divergence or Normal Form) | |
| Green's Theorem Area Formula | |
| Surface Area Definition | |
| Surface Area of a Parametrized Surface defined as r(u,v) | |
| Surface Area of an Implicit Surface or Level Surface defined by f(x,y,z) = c | |
| Surface Area of an Explicit Surface defined by z = f(x,y) | |
| Surface Integral of a Scalar Function where S is defined parametrically by r(u,v) | |
| Surface Integral of a Scalar Function where S is defined implicitly by f(x,y,z) = c | |
| Surface Integral of a Scalar Function where S is defined explicitly by z = f(x,y) | |
| Stokes' Theorem | |
| curl F | |
| div F | |
| Stokes' Theorem: ndsigma for implicit surfaces defined by f(x,y,z) = c | |
| Stokes' Theorem: ndsigma for parametrized surfaces defined by r(u,v) | |
| Divergence Theorem | |
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