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| author | Justin Gassner <justin.gassner@mailbox.org> | 2024-02-15 05:11:07 +0100 |
|---|---|---|
| committer | Justin Gassner <justin.gassner@mailbox.org> | 2024-02-15 05:11:07 +0100 |
| commit | 7c66b227a494748e2a546fb85317accd00aebe53 (patch) | |
| tree | 9c649667d2d024b90b32d36ca327ac4b2e7caeb2 /pages/complex-analysis/one-complex-variable/cauchys-theorem.md | |
| parent | 28407333ffceca9b99fae721c30e8ae146a863da (diff) | |
| download | site-7c66b227a494748e2a546fb85317accd00aebe53.tar.zst | |
Update
Diffstat (limited to 'pages/complex-analysis/one-complex-variable/cauchys-theorem.md')
| -rw-r--r-- | pages/complex-analysis/one-complex-variable/cauchys-theorem.md | 2 |
1 files changed, 1 insertions, 1 deletions
diff --git a/pages/complex-analysis/one-complex-variable/cauchys-theorem.md b/pages/complex-analysis/one-complex-variable/cauchys-theorem.md index 2445b8b..6d78e89 100644 --- a/pages/complex-analysis/one-complex-variable/cauchys-theorem.md +++ b/pages/complex-analysis/one-complex-variable/cauchys-theorem.md @@ -14,7 +14,7 @@ If $\gamma_0$, $\gamma_1$ are homotopic closed curves in $G$, then $$ \int_{\gamma_0} \! f(z) \, dz = -\int_{\gamma_1} \! f(z) \, dz +\int_{\gamma_1} \! f(z) \, dz $$ If $\gamma$ is a null-homotopic closed curve in $G$, then |