This is related to the the May 16 post, but takes only the prime indexed terms. Does it still diverge?

Hint

Transform the product into a sum


Hint

The harmonic series 1 + 1/2 + 1/3 + … 1/n +… diverges


  • EyeBeam@links.hackliberty.orgOP
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    5 months ago
    Solution


    What I like about this solution is that it doubles as a proof that there are infinitely many prime numbers. It’s not circular either – it uses the number theoretic fact that every integer has a prime factorization, but nothing deeper. If only finitely many primes were required for that, … well then of course every finite product converges.