| Display title | Clairaut's relation (differential geometry) |
| Default sort key | Clairaut's relation (differential geometry) |
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| Page ID | 324886 |
| Page content language | en - English |
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| Page creator | imported>QCDvac |
| Date of page creation | 17:19, 6 February 2024 |
| Latest editor | imported>QCDvac |
| Date of latest edit | 17:19, 6 February 2024 |
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Description | Content |
Article description: (description)
This attribute controls the content of the description and og:description elements. | In classical differential geometry, Clairaut's relation, named after Alexis Claude de Clairaut, is a formula that characterizes the great circle paths on the unit sphere. The formula states that if γ is a parametrization of a great circle then
$ \rho (\gamma (t))\sin \psi (\gamma (t))={\text{constant... |
