With three consecutive primes p,q,r |$q^2$-$p*r$|=prime(n)#. There are two solutions of 7,11,13 and 17,19,23 for 3#=30 and two solutions of 97,101,103 and 107,109,113 for 4#=210. Do you think there are any other solutions for higher primorials? At least one or perhaps two?
2026-02-23 01:37:53.1771810673
|$q^2$-$p*r$|=prime(n)#
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