D. Edward Mitchell 16:00, 14 April 2020 (UTC) Hello World!    groupKOS Developer Share —usually UNDER CONSTRUCTION

File:GOTK 13-8 3-group wedgie2.jpg

From groupKOS Developer Share
Revision as of 10:38, 11 September 2021 by Don (talk | contribs) (Category: torus knot Category: Hexatron Wedgie {{IndexHexatron}} ;24 'Geomagical' Hexatron Wedgies assemble into a donut of golden profile ;::*<b><big>majorRadius = Phi^(N+4)</big></b> ;::*<b><big>minorRadius = majorRadius - Phi^(N)</big><...)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigation Jump to search
Original file(1,540 × 796 pixels, file size: 364 KB, MIME type: image/jpeg)

Summary

Template:IndexHexatron

24 'Geomagical' Hexatron Wedgies assemble into a donut of golden profile
  • majorRadius = Phi^(N+4)
  • minorRadius = majorRadius - Phi^(N)
Where N is a scaling factor. When N = 1, then the overall diameter is 25.4".


39 grooves form support channels as a slice of a 13
8 torus knot 3-group.
  • The groove at the thickest side of the wedgie is slanted 14.7 degrees from the plane of the torus surface.
  • The inner most groove is slanted 14.7 away from the torus axis, 90 degrees rotated from the first groove.
  • The remaining grooves smoothly divide 90 degrees between them.

This is how the Developer, a newbie woodworker, plans to make a torus knot.

Intermediate woodworkers might glue wedges together as a shell to save wood.

Advanced woodworkers do it with a CNC, these days.

And, HDPE sort may be the substitue wood. Newbie HDPE forming while hot.

File history

Click on a date/time to view the file as it appeared at that time.

Date/TimeThumbnailDimensionsUserComment
current10:38, 11 September 2021Thumbnail for version as of 10:38, 11 September 20211,540 × 796 (364 KB)Don (talk | contribs)Category: torus knot Category: Hexatron Wedgie {{IndexHexatron}} ;24 'Geomagical' Hexatron Wedgies assemble into a donut of golden profile ;::*<b><big>majorRadius = Phi^(N+4)</big></b> ;::*<b><big>minorRadius = majorRadius - Phi^(N)</big><...
  • You cannot overwrite this file.

There are no pages that use this file.