the spherical spiral
DESCRIPTION
The Spherical Spiral. By Chris W ilson And Geoff Zelder. History. Pedro Nunes , a sixteenth century Portuguese cosmographer discovered that the shortest distance from point A to point B on a sphere is not a straight line, but an arc known as the great circle route. - PowerPoint PPT PresentationTRANSCRIPT
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The Spherical SpiralBy
Chris WilsonAnd
Geoff Zelder
![Page 2: The Spherical Spiral](https://reader035.vdocument.in/reader035/viewer/2022062323/56815c33550346895dca15ac/html5/thumbnails/2.jpg)
History
Pedro Nunes, a sixteenth century Portuguese cosmographer discovered that the shortest distance from point A to point B on a sphere is not a straight line, but an arc known as the great circle route.
Nunes gave early navigators two possible routes across open seas. One being the shortest route and the other being a route following a constant direction, generally about a 60 degree angle, in relation to the cardinal points known as the rhumb line or the loxodrome spiral.
Pedro Nunes 1502-1579
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Loxodrome Spiral
M C Esher (1898-1972), known for his art in optical illusions drew the Bolspiralen spiral, which is the best representation of Nunes’ theory
Bolspiralen spiral1958
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Mercator’s Projection
Gerardus Mercator (1512-1594), used Nunes’ loxodrome spiral which revolutionized the making of world mapsMap makers have to distort the geometry of the globe in order to reproduce a spherical surface on a flat surface
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Plotting the spiral
In this case we let run from 0 to k , so the larger k is the more times the spiral will circumnavigate the sphere. We let , where controls the spacing of the spirals, and controls the closing of the top and bottom of the spiral.
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The Spiral
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A few Applications• A spherical spiral display which rotates about a
vertical axis was proposed in the 60’s as a 3-D radar display. A small high intensity light beam is shot into mirrors in the center which control the azimuth and elevation. A fixed shutter with slits in it would control the number of targets that could be displayed at one time.
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Another use is a high definition 3-D projection technique to produce many 2-D images in different directions so the image could be viewed from any angle, this creates a sort of fishbowl effect.
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Some Fun with the Equation
• Here we let = 1, and . We let
• . We end up with a sort of 3D Clothiod type figure.
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• Here we let , and let .• We let . We end up with a
cylindrical helix.
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• Here we let , and let We let . We end up with this.
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