Are there infinitely many Fermat primes?
Basic
4
Ṁ2052101
4%
chance
1D
1W
1M
ALL
Fermat numbers are numbers of the form Fₙ = 2^2^n + 1. Fₙ is prime for n=0 through n=4, with F₄ = 65537. No other Fermat primes are known, but it is still open whether they exist or even whether there are infinitely many of them.
This question is managed and resolved by Manifold.
Get
1,000
and3.00
Related questions
Related questions
Are there infinitely many Mersenne primes?
95% chance
Are there infinitely many composite Fermat numbers?
98% chance
Are there infinitely many cousin primes?
91% chance
Are there infinitely many balanced primes?
95% chance
Are there infinitely many prime triplets?
92% chance
Are there infinitely many twin primes?
95% chance
Will a blank-slate AI prove the infinitude of primes by 2025-11-03?
33% chance
Are there infinitely many sexy primes?
94% chance
Will any prime factor of the 1801st Fibonacci Number be found by 2025?
19% chance
Are there infinitely many palindromic primes in base 10?
87% chance