Our server costs ~$56 per month to run. Please consider donating or becoming a Patron to help keep the site running. Help us gain new members by following us on Twitter and liking our page on Facebook!
Current time: December 28, 2024, 4:54 am

Thread Rating:
  • 0 Vote(s) - 0 Average
  • 1
  • 2
  • 3
  • 4
  • 5
A tetrahedron relating the Fibonacci to a pentagon
#1
A tetrahedron relating the Fibonacci to a pentagon
If you take a regular tetrahedron and keep the angles at one vertex unchanged but change the lengths from the vertex to any three successive terms of the Fibonacci series you will find the new fourth face to have one side of a pentagon and the two internal diagonals.
Reply
#2
RE: A tetrahedron relating the Fibonacci to a pentagon
At work.

Hello and welcome to the forum! Big Grin
Reply
#3
RE: A tetrahedron relating the Fibonacci to a pentagon
(July 7, 2019 at 8:47 pm)[email protected] Wrote: If you take a regular tetrahedron and keep the angles at one vertex unchanged but change the lengths from the vertex to any three successive terms of the Fibonacci series you will find the new fourth face to have one side of a pentagon and the two internal diagonals.

Well, THAT'S a relief.  I've spent years taking irregular octahedrons, changing all the angles of the all the vertices, bisecting along the interior acutrix of the nebulonic series, and getting a thundering headache as a result.

Boru
‘I can’t be having with this.’ - Esmeralda Weatherwax
Reply
#4
RE: A tetrahedron relating the Fibonacci to a pentagon
I feel geometrically violated.
Being told you're delusional does not necessarily mean you're mental. 
Reply
#5
RE: A tetrahedron relating the Fibonacci to a pentagon
(July 7, 2019 at 8:47 pm)[email protected] Wrote: If you take a regular tetrahedron and keep the angles at one vertex unchanged but change the lengths from the vertex to any three successive terms of the Fibonacci series you will find the new fourth face to have one side of a pentagon and the two internal diagonals.

Drawings or it didn't happen. And, if I understand what you have posted, you have a triangle. Whoop-de-doo. Triangles are a dime a dozen.
If you get to thinking you’re a person of some influence, try ordering somebody else’s dog around.
Reply
#6
RE: A tetrahedron relating the Fibonacci to a pentagon
Welcome! You will have to put money into my paypal account to get me to play math with you!
God thinks it's fun to confuse primates. Larsen's God!






Reply
#7
RE: A tetrahedron relating the Fibonacci to a pentagon
well I dont know how to upload drawings but you can prove this yourself with just the sine and cosine laws...anyway all I'm saying is the Fibonacci series doesnt just have a one-dimensional or two-dimensional relation; there is a three-dimensional relation as well
Reply
#8
RE: A tetrahedron relating the Fibonacci to a pentagon
(July 8, 2019 at 5:44 am)[email protected] Wrote: well I dont know how to upload drawings but you can prove this yourself with just the sine and cosine laws...anyway all I'm saying is the Fibonacci series doesnt just have a one-dimensional or two-dimensional relation; there is a three-dimensional relation as well

And what, precisely, are we to do with this mathematical revelation?

Boru
‘I can’t be having with this.’ - Esmeralda Weatherwax
Reply
#9
RE: A tetrahedron relating the Fibonacci to a pentagon
A weird e-mail as username... I never knew there was an atheist.com domain Dodgy
Reply
#10
RE: A tetrahedron relating the Fibonacci to a pentagon
(July 8, 2019 at 5:44 am)[email protected] Wrote: well I dont know how to upload drawings but you can prove this yourself with just the sine and cosine laws...anyway all I'm saying is the Fibonacci series doesnt just have a one-dimensional or two-dimensional relation; there is a three-dimensional relation as well

Are you alright?
Reply



Possibly Related Threads...
Thread Author Replies Views Last Post
  Is the tetrahedron rotating clockwise or counter-clockwise? FlatAssembler 9 1813 June 30, 2018 at 7:32 am
Last Post: Gawdzilla Sama



Users browsing this thread: 3 Guest(s)