1,1

Sum of n-th even perfect number and n-th even superperfect number.

Also, sum of n-th perfect number and n-th superperfect number, if there are no odd perfect and odd superperfect numbers, then the n-th perfect number is the difference bettween a(n) and the n-th superperfect number (See A135652, A135653, A135654 and A135655).

O. E. Pol, Determinacion geometrica de los numeros primos y perfectos.

a(n) = 2^(2*A000043(n) - 1). Also, a(n) = 2^A133033(n), if there are no odd perfect numbers. Also, a(n) = A000396(n) + A019279(n), if there are no odd perfect and odd superperfect numbers. Also, a(n) = A000396(n) + A061652(n), if there are no odd perfect numbers, the we can write: perfect number A000396(n) = a(n) - A061652(n).

a(n) = A061652(n)*(A000668(n)+1) = A061652(n)*A075398(n). - Omar E. Pol (info(AT)polprimos.com), Apr 13 2008

a(5)=33554432 because A000043(5)=13 and 2^(2*13 - 1) = 2^25 = 33554432.

Also, if there are no odd perfect and odd superperfect numbers then we can write a(5) = A000396(5) + A019279(5) = A000396(5) + A00061652(5) = 33554432.

Cf. A000079, A000396, A019279, A061645, A061652, A133033, A135652, A135653, A135654, A135655, A139286, A139294, A139307.

Cf. A000043, A000668, A075398.

Adjacent sequences: A139303 A139304 A139305 this_sequence A139307 A139308 A139309

Sequence in context: A140789 A120781 A139286 this_sequence A079271 A031445 A131547

nonn

Omar E. Pol (info(AT)polprimos.com), Apr 13 2008