Difference between revisions of "Stokes' Theorem"

Revision as of 20:19, 8 January 2024

Stokes' Theorem is a theorem in calculus regarding the relationship between surface integrals and line integrals.

$\int_{S} \int \text{curl}$ F $\cdot \text{d}$ S $=\int_{C}$ F $\cdot \text{d}$ r

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 '''Stokes' Theorem''' is a theorem in [[calculus]] regarding the relationship between surface integrals and line integrals.
 ==Statement==
-<math>\int_{S} \int \text{curl} '''F''' \cdot \text{d}</math>'''S'''<math>=</math>
+<math>\int_{S} \int \text{curl}</math>'''F'''<math>\cdot \text{d}</math>'''S'''<math>=\int_{C}</math>'''F'''<math>\cdot \text{d}</math>'''r'''
 ==Proof==