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Ooosterschelde conicals: Difference between revisions
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<small>[[File:Essay pen.jpg|32px]]This article is an essay authored by | <small>[[File:Essay pen.jpg|32px]]This article is an essay authored by | ||
[[User: | [[User:Franciscus]]<ref>[http://nl.wikisage.org/w/index.php?title=Over_het_minimum_oppervlak_van_een_kegel&oldid=206429 wikisage(nl):Over het minimum oppervlak van een kegel]</ref> | ||
</small><br | </small><br> | ||
[[File:Kugel-Zeeland.jpg|thumb|450px]] | [[File:Kugel-Zeeland.jpg|thumb|450px]] | ||
[[File:Areal radius relationship.png|thumb|450px]] | [[File:Areal radius relationship.png|thumb|450px]] | ||
In Oosterschelde there is a cone a very special property. | In Oosterschelde there is a cone with a very special property. | ||
It appears namely that when larger or smaller are out of the radius R - at a given content V - not just the surface area A becomes larger or smaller, but that also a smallest surface is present, or in other words: It achieves surface - at a constant content - a limit by changing the radius and height. | It appears namely that when larger or smaller are out of the radius R - at a given content V - not just the surface area A becomes larger or smaller, but that also a smallest surface is present, or in other words: It achieves surface - at a constant content - a limit by changing the radius and height. | ||
<gallery>File:Grafiek_kegel_ohne_Titel.jpg|arrows shows a minimum</gallery> | <gallery>File:Grafiek_kegel_ohne_Titel.jpg|arrows shows a minimum</gallery> | ||
This proposition naturally ask for further clarification. | This proposition naturally ask for further clarification. | ||
<references/> | |||
Latest revision as of 04:48, 17 November 2016
This article is an essay authored by
User:Franciscus[1]
In Oosterschelde there is a cone with a very special property. It appears namely that when larger or smaller are out of the radius R - at a given content V - not just the surface area A becomes larger or smaller, but that also a smallest surface is present, or in other words: It achieves surface - at a constant content - a limit by changing the radius and height.
-
arrows shows a minimum
This proposition naturally ask for further clarification.