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(50g) Nth Fibonacci Number
02-27-2015, 01:31 PM
Post: #14
RE: (50g) Nth Fibonacci Number
(02-27-2015 03:29 AM)Han Wrote:  Another way to produce the constants obtained in Eddie's solution is to use formal series and generating functions to solve recurrence equations....
[snip]

So, you are a Math Teacher/Professor !

I have long suspected, but this removes all doubt.

My head hurts just following this, never mind composing it, but it seemed the least I could do. Thanks for the derivation. Reading Eddie's original did indeed lead me to wonder where the heck those constants were from, but honestly not thinking I would ever actually know.

Thanks Han.

--Bob Prosperi
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Messages In This Thread
RE: (50g) Nth Fibonacci Number - Gerald H - 02-22-2015, 09:48 AM
RE: (50g) Nth Fibonacci Number - Joe Horn - 02-22-2015, 09:06 PM
RE: (50g) Nth Fibonacci Number - Offroad - 02-23-2015, 03:07 AM
RE: (50g) Nth Fibonacci Number - rprosperi - 02-26-2015, 01:42 PM
RE: (50g) Nth Fibonacci Number - Han - 02-26-2015, 07:39 PM
RE: (50g) Nth Fibonacci Number - rprosperi - 02-26-2015, 08:23 PM
RE: (50g) Nth Fibonacci Number - Joe Horn - 02-26-2015, 10:19 PM
RE: (50g) Nth Fibonacci Number - Han - 02-27-2015, 03:29 AM
RE: (50g) Nth Fibonacci Number - rprosperi - 02-27-2015 01:31 PM
RE: (50g) Nth Fibonacci Number - rprosperi - 02-27-2015, 01:43 PM
RE: (50g) Nth Fibonacci Number - rprosperi - 02-27-2015, 01:48 PM
RE: (50g) Nth Fibonacci Number - Han - 02-27-2015, 02:22 PM
RE: (50g) Nth Fibonacci Number - Gerald H - 02-27-2015, 03:27 PM



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