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| ==Origin== | | ==Origin== |
| [https://nordan.daynal.org/wiki/index.php?title=English#ca._1100-1500_.09THE_MIDDLE_ENGLISH_PERIOD Middle English], from ''dep'' deep | | [https://nordan.daynal.org/wiki/index.php?title=English#ca._1100-1500_.09THE_MIDDLE_ENGLISH_PERIOD Middle English], from ''dep'' deep |
− | *[http://en.wikipedia.org/wiki/14th_century 14th Century] | + | *[https://en.wikipedia.org/wiki/14th_century 14th Century] |
| ==Definitions== | | ==Definitions== |
| *1a (1) : a deep place in a body of [[water]] <fish living at great depths> (2) : a part that is far from the outside or [[surface]] <the depths of the woods> (3) : [[abyss]] | | *1a (1) : a deep place in a body of [[water]] <fish living at great depths> (2) : a part that is far from the outside or [[surface]] <the depths of the woods> (3) : [[abyss]] |
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| [[Three]]-[[dimensional]] [[space]] is a geometric 3-parameters model of the physical [[universe]] (without considering [[time]]) in which we exist. These three dimensions can be labeled by a combination of three chosen from the terms '''length''', width, height, '''depth''', and '''breadth'''. Any three [[directions]] can be chosen, provided that they do not all lie in the same [[plane]]. | | [[Three]]-[[dimensional]] [[space]] is a geometric 3-parameters model of the physical [[universe]] (without considering [[time]]) in which we exist. These three dimensions can be labeled by a combination of three chosen from the terms '''length''', width, height, '''depth''', and '''breadth'''. Any three [[directions]] can be chosen, provided that they do not all lie in the same [[plane]]. |
| | | |
− | In [[physics]] and [[mathematics]], a sequence of n numbers can be [[understood]] as a location in n-dimensional space. When n = 3, the set of all such locations is called 3-dimensional Euclidean space. It is commonly represented by the symbol [[File:R-3-2.jpg]] . This space is only one example of a great variety of spaces in three dimensions called [http://en.wikipedia.org/wiki/3-manifold 3-manifolds].[http://en.wikipedia.org/wiki/Three-dimensional_space] | + | In [[physics]] and [[mathematics]], a sequence of n numbers can be [[understood]] as a location in n-dimensional space. When n = 3, the set of all such locations is called 3-dimensional Euclidean space. It is commonly represented by the symbol [[File:R-3-2.jpg]] . This space is only one example of a great variety of spaces in three dimensions called [https://en.wikipedia.org/wiki/3-manifold 3-manifolds].[https://en.wikipedia.org/wiki/Three-dimensional_space] |
| ==Quote== | | ==Quote== |
| [[Personality]] is [[bestowed]] by the [[Universal Father]] upon his [[creatures]] as a [[potentially]] [[eternal]] [[endowment]]. Such a [[divine]] gift is [[designed]] to [[function]] on numerous levels and in [[successive]] universe situations ranging from the lowly [[finite]] to the highest [[absonite]], even to the borders of the [[absolute]]. [[Personality]] thus [[performs]] on [[three]] [[cosmic]] [[planes]] or in three universe [[phases]]: | | [[Personality]] is [[bestowed]] by the [[Universal Father]] upon his [[creatures]] as a [[potentially]] [[eternal]] [[endowment]]. Such a [[divine]] gift is [[designed]] to [[function]] on numerous levels and in [[successive]] universe situations ranging from the lowly [[finite]] to the highest [[absonite]], even to the borders of the [[absolute]]. [[Personality]] thus [[performs]] on [[three]] [[cosmic]] [[planes]] or in three universe [[phases]]: |