David Custis Kimball - blog
You: Why Dave; why now?
Me: Well, I've a two talented kids; the younger said, 'Stop with the lectures.' Then asked, 'Dad, can I help you set up a blog?' Moments later, Me: 'OK, that's a great idea, thinkin' they might just read it someday.
me ---> 'Gaarr of Blog' <---
Goto oft comments on Art, Bose-Einstein Condensate (BEC), CommoNonsense, Dance, Dark Matter, Design, Etc., Environment, Eventspace, Fable, Food, Frogsense, Hazard Mitigation, Hegel, History, Horsense, Human Affairs, Humor, Law+Lawless, Mathematics, Medicine, Music, Nerd Stuff, Parenting, Physics, Psychophysics, Real Estate, Sailing, Science, Science Fiction, Swimming, Technology, Theology, UncommonSense, and Waldo, alphabetically.
Just use 'Search' for the topic of choice or Waldo, perhaps.
Matters of Import & Timely Expertise
repressing gossip and hate-speech.
An Unmapped Ponderocity:
To say: '"He is a man of truth," is to say nothing; to say: "He is a man of of," is to state an elementary truth of logic.'
Winston Davids, 1969 - Trinity College Valedictorian - 1970; known endeavor: actuarial contributions to The Donald; since has contacted me and sadly is quite ill. Ask prayers for recovery; thanks for his brilliance and music.
| website-hit-counters.com |
Leonardo da Vinci was the first to suggest that the adaptive advantage of the Fibonacci pattern is to maximize exposure to dew. Current thinking supports this interpretation. Phyllotactic architecture optimizes access to moisture, rainfall and sunlight.
Mathematics, Fibonacci Nature likes to count using what came before and using it to shape the present, and now even predict the future. It seems to work.Alternate leaves will have an angle of ½ of a full rotation. In beech and hazel the angle is ⅓, in oak and apricot it is ⅖, in poplar and pear it is ⅜, and in willow and almond the angle is 5/13.[2] The numerator and denominator normally consist of a Fibonacci number and its second successor. The number of leaves is sometimes called rank, in the case of simple Fibonacci ratios, because the leaves line up in vertical rows. With larger Fibonacci pairs, the pattern becomes complex and non-repeating. This tends to occur with a basal configuration. Examples can be found in composite flowers and seed heads. The most famous example is the sunflower head. This phyllotactic pattern creates an optical effect of criss-crossing spirals. In the botanical literature, these designs are described by the number of counter-clockwise spirals and the number of clockwise spirals. These also turn out to be Fibonacci numbers. In some cases, the numbers appear to be multiples of Fibonacci numbers because the spirals consist of whorls.
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