0,3

Sequence A057660 gives the sum of the orders of the elements in a cyclic group with n elements so a(n) = [A057660(n) / n] = [Sum_{k=1..n} 1/g.c.d.(n, k)] = [Sum of 1/d times phi(n/d)] for all divisors d of n, where phi is Euler's phi function. This sum may also be expressed as the product of (p^(2*e(p)+1)+1)/((p+1) * p^e(p)) over all prime divisors p of n where the canonical factorization of n is the product of p^e(p), the e(p) being the exponents of the power of p in the factorization (as usual [] denotes floor)

A057660, A018804.

Sequence in context: A060766 A029578 A054345 this_sequence A062968 A053197 A088145

Adjacent sequences: A060364 A060365 A060366 this_sequence A060368 A060369 A060370

nonn

Avi Peretz (njk(AT)netvision.net.il), Apr 01 2001