1,2

For primes p, elements of A000040, a(p) = A000030(p). The cumulative sum of this sequence is A112265. Primes in the cumulative sum are A112266. This is a base 10 sequence, the base 1 equivalent is A001222(n) = BigOmega(n) = e_1 + e_2 + ... + e_k, the number of prime factors (with multiplicity), where k = A001221(n) = SmallOmega(n). The base 2 equivalent is equal to the base 1 equivalent. The base 3 equivalent is A112267, base 4 is A112268, base 5 is A112269, base 6 is A112270, base 7 is A112271, base 8 is A112272, base 9 is A112273.

Eric Weisstein's World of Mathematics, Prime Factor.

Eric Weisstein's World of Mathematics, Distinct Prime Factors.

a(1) = 0 and given the prime factorization n = (p_1)^(e_1) * (p_2)^(e_2) * ... * (p_k)^(e_k) then a(n) = (e_1)*A000030(p_1) + (e_2)*A000030(p_2) + ... + (e_k)*A000030(p_l).

a(4) = 4 because 4 = 2*2, so the sum of the initial digits is 2 + 2 = 4.

a(11) = 1 because 11 is prime and its initial digit is 1.

a(22) = 3 because 22 = 2*11, so the sum of the initial digits is 2 + 1 = 3.

a(98) = 16 because 98 = 2 * 7^2, so the sum of the initial digits is 2 + 7 + 7 = 16.

a(100) = 14 because 100 = 2^2 * 5^2, so the sum of the initial digits is 2 + 2 + 5 + 5 = 14.

a(121) = 2 because 121 = 11^2, so the sum of the initial digits is 1 + 1 = 2.

a(361) = 2 because 361 = 19^2, so the sum of the initial digits is 1 + 1 = 2.

Cf. A000030, A000040, A001221, A001222, A112266-A112273.

Sequence in context: A073794 A017892 A017882 this_sequence A017872 A161209 A000026

Adjacent sequences: A112261 A112262 A112263 this_sequence A112265 A112266 A112267

base,easy,nonn

Jonathan Vos Post (jvospost3(AT)gmail.com), Aug 30 2005