Author

Topic: Fibonacci Towel @Bitmit (Read 1913 times)

sr. member
Activity: 401
Merit: 252
February 29, 2012, 02:37:20 PM
#17


 Grin

@coretechs It is really nice to see your trade activities and how Bitcoin influences the real life -> your baby =). Do you allow me to post the picture in our G+/Facebook wall to advertise Bitcoin/Bitmit?

@FreeMoney, do you have more in stock ? I like it =)
vip
Activity: 574
Merit: 500
Don't send me a pm unless you gpg encrypt it.
February 29, 2012, 10:22:03 AM
#16
Cute. Smiley
donator
Activity: 362
Merit: 250
February 29, 2012, 10:19:55 AM
#15


 Grin
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 18, 2012, 10:47:50 AM
#14
Not much time left. Support the fledgling bitcoin textile industry.
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 16, 2012, 01:05:47 PM
#13
Would anyone be interested in a knit mobius strip?

You mean a scarf?

Yes, a mobius scarf. If someone wants to commit to buying it at a good price you can choose the color too.

What do you define as a good price? Also, do you ship to Australia?

Would be willing to ship to Aus, but don't know the cost and would want it covered. 6BTC would be a good price for a Mobius scarf.
hero member
Activity: 518
Merit: 500
February 16, 2012, 08:06:02 AM
#12
Would anyone be interested in a knit mobius strip?

You mean a scarf?

Yes, a mobius scarf. If someone wants to commit to buying it at a good price you can choose the color too.

What do you define as a good price? Also, do you ship to Australia?
hero member
Activity: 518
Merit: 500
February 16, 2012, 08:04:50 AM
#11


Lies!!  Tongue


The smallest squares are uh, not quite square, is that what you mean?

I think he means the ratio between them should be 1:.618, where it appears to be 1:1...

"By definition, the first two numbers in the Fibonacci sequence are 0 and 1, and each subsequent number is the sum of the previous two."

This brings up a good point - perhaps I should have assumed that the center of the towel is the start of the sequence instead of an infinite fixed ratio.

Very well then.



Grin

Does it go by side length? 1, 1, 2, 3, 5, 8, 13?
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 16, 2012, 12:30:26 AM
#10
Would anyone be interested in a knit mobius strip?

You mean a scarf?

Yes, a mobius scarf. If someone wants to commit to buying it at a good price you can choose the color too.
legendary
Activity: 882
Merit: 1000
February 15, 2012, 02:11:08 PM
#9
Would anyone be interested in a knit mobius strip?

You mean a scarf?
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 15, 2012, 02:50:10 AM
#8
Would anyone be interested in a knit mobius strip?
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 14, 2012, 02:27:18 AM
#7
Ah, you can't really put the starting squares in the very center because every new area is bigger than the sum of the previous areas. You can put them on an edge if you go up, right, up, right, etc. Instead of up, right, down, left...

If you call the area of each of the first squares 1, then the area marked 6 in that image would be 4. In reality the first two squares not being square changed a lot.

There will be a more perfect specimen available eventually, but this one has character.
donator
Activity: 362
Merit: 250
February 13, 2012, 08:56:15 PM
#6


Lies!!  Tongue


The smallest squares are uh, not quite square, is that what you mean?

I think he means the ratio between them should be 1:.618, where it appears to be 1:1...

"By definition, the first two numbers in the Fibonacci sequence are 0 and 1, and each subsequent number is the sum of the previous two."

This brings up a good point - perhaps I should have assumed that the center of the towel is the start of the sequence instead of an infinite fixed ratio.

Very well then.



Grin
vip
Activity: 574
Merit: 500
Don't send me a pm unless you gpg encrypt it.
February 13, 2012, 08:40:27 PM
#5


Lies!!  Tongue


The smallest squares are uh, not quite square, is that what you mean?

I think he means the ratio between them should be 1:.618, where it appears to be 1:1...

"By definition, the first two numbers in the Fibonacci sequence are 0 and 1, and each subsequent number is the sum of the previous two."
sr. member
Activity: 322
Merit: 250
We are bees, and we hate you.
February 13, 2012, 08:30:39 PM
#4


Lies!!  Tongue


The smallest squares are uh, not quite square, is that what you mean?

I think he means the ratio between them should be 1:.618, where it appears to be 1:1...
legendary
Activity: 1246
Merit: 1016
Strength in numbers
February 13, 2012, 06:46:14 PM
#3


Lies!!  Tongue


The smallest squares are uh, not quite square, is that what you mean?
donator
Activity: 362
Merit: 250
February 13, 2012, 04:33:38 PM
#2


Lies!!  Tongue
legendary
Activity: 1246
Merit: 1016
Strength in numbers
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