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February 14

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Lowest Fibonacci power of 10?

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Not counting 1. What is the lowest power of 10 that is a Fibonacci number?Naraht (talk) 16:15, 14 February 2020 (UTC)[reply]

There aren't any. Fibonacci number#Fibonacci primes says:
The only nontrivial square Fibonacci number is 144.[1] Attila Pethő proved in 2001 that there is only a finite number of perfect power Fibonacci numbers.[2] In 2006, Y. Bugeaud, M. Mignotte, and S. Siksek proved that 8 and 144 are the only such non-trivial perfect powers.[3].
PrimeHunter (talk) 16:22, 14 February 2020 (UTC)[reply]

References

  1. ^ Cohn, JHE (1964), "Square Fibonacci Numbers etc", Fibonacci Quarterly, 2: 109–13
  2. ^ Pethő, Attila (2001), "Diophantine properties of linear recursive sequences II", Acta Mathematica Academiae Paedagogicae Nyíregyháziensis, 17: 81–96
  3. ^ Bugeaud, Y; Mignotte, M; Siksek, S (2006), "Classical and modular approaches to exponential Diophantine equations. I. Fibonacci and Lucas perfect powers", Ann. Math., 2 (163): 969–1018, arXiv:math/0403046, Bibcode:2004math......3046B, doi:10.4007/annals.2006.163.969
If I'm right, any Fibonacci number that is divisible by 10 is divisible by 610. Georgia guy (talk) 20:31, 14 February 2020 (UTC)[reply]
You are right. Using the indexing scheme where F0 = 0, F1 = 1, as in our article on Fibonacci numbers, the following divisibility property holds:
If m ≥ 3,  mn  ⇔  FmFn .
So  10|Fn  ⇔  (2|Fn) ∧ (5|Fn)  ⇔  (F3Fn) ∧ (F5Fn)  ⇔  (3|n) ∧ (5|n)  ⇔  15|n  ⇔  610|Fn .  --Lambiam 06:43, 15 February 2020 (UTC)[reply]