As seen at TrueTyme.org/WholenessAndOnessSeenAnew.pdf , YaleL has proposed that by drawing zero thru one horizontally and then one towards infinity vertically, we can see that the point of wholeness (relative to points of partialness) and the point of oneness (relative to points of multiplicity) is/are the point(s) where the horizontal and vertical line-segments meet. Not only can we see that wholeness and oneness are orthogonal, but we can also relate any number between zero and infinity to its reciprocal by drawing an appropriate line between the horizontal and vertical line-segments of this "dual-aspect monordinate system" representation of multiplicative inverse reciprocal numbers, including infinitesimals and associated infinities. As he cannot possibly be the first to use this unusual method of portraying the numbers one through infinity, can anyone tell me where such a non-standard metaphor is used in one or more branches of mathematics?
via JREF Forum http://forums.randi.org/showthread.php?t=265604&goto=newpost
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