Are there infinitely many Sophie Germain primes?
Basic
8
Ṁ2142032
93%
chance
1D
1W
1M
ALL
A prime number p is a Sophie Germain prime if 2p + 1 is also prime.
Resolves Yes if it is proven that there infinitely many Sophie Germain primes. Resolves No if it is proven that there are not infinitely many such primes. (A proof will be considered valid if a majority of the academic math community considers it valid). Resolution date will be extended until either of those conditions are fullfilled.
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 cousin primes?
91% chance
Are there infinitely many prime triplets?
92% chance
Are there infinitely many twin primes?
95% chance
Are there infinitely many sexy primes?
94% chance
Are there infinitely many Fermat primes?
4% chance
Are there infinitely many balanced primes?
95% chance
Are there infinitely many palindromic primes in base 10?
87% chance
Are there infinitely many perfect numbers?
88% chance
Are there infinitely many primes of the form n^2 + 1?
92% chance