Hi
For those intrested in number theory and/or power sums the following seems to be true and new ??
tommy's extended prime number theorem ( EPNT )
let n and k be positive integers with n - 50 > k^2 > 0 and n sufficiently large then for the odd primes we have when p is the biggest odd prime =< n
3^k + 5^k + 7^k + 11^k + ... + p^k
~ [n^(k+1)] / [(k+1) ( ln(n) - ln(k) ) ]
regards
tommy1729
For those intrested in number theory and/or power sums the following seems to be true and new ??
tommy's extended prime number theorem ( EPNT )
let n and k be positive integers with n - 50 > k^2 > 0 and n sufficiently large then for the odd primes we have when p is the biggest odd prime =< n
3^k + 5^k + 7^k + 11^k + ... + p^k
~ [n^(k+1)] / [(k+1) ( ln(n) - ln(k) ) ]
regards
tommy1729