1,2

Comments from Farideh Firoozbakht (mymontain(AT)yahoo.com), Dec 01 2005: "I. All numbers of the form 2^(4m-1)*5^n where m & n are natural numbers are in the sequence. Because if s=2^(4m-1)*5^n then phi(s)=2^(4m-2)*4*5^(n-1); sigma(s)=(2^(4m)-1)*(5^(n+1)-1)/4 so phi(s)*sigma(s)=6*((16^m-1)/15)*((5^(n+1)-1)/4)*(2^(4m-1)*5^n)= 6*((16^m-1)/15)*((5^(n+1)-1)/4)*s, note that (16^m-1)/15 and (5^(n+1)-1)/4 are integers, hence s divides phi(s)*sigma(s).

"II. All numbers of the form 2^(2m-1)*3^n where m & n are natural numbers are in the sequence. Because if s=2^(2m-1)*3^n then phi(s)=2^(2m-2)*2*3^(n-1); sigma(s)=(2^(2m)-1)*(3^(n+1)-1)/2 so phi(s)*sigma(s)=((3^(n+1)-1)/2)*((4^m-1)/3)*(2^(2m-1)*3^n) =((3^(n+1)-1)/2)*((4^m-1)/3)*s, note that ((3^(n+1)-1)/2 and (4^m-1)/3 are integers, hence s divides phi(s)*sigma(s).

"So this sequence is infinite. Also it is obvious that perfect numbers (A000396) and multiply-perfect numbers(A007691) are subsequences of this sequence."

R. K. Guy, Divisors and desires, Amer. Math. Monthly, 104 (1997), 359-360.

Select[Range[1770], IntegerQ[DivisorSigma[1, # ]*EulerPhi[ # ]/# ] &] (Firoozbakht)

Cf. A000396, A007691.

Sequence in context: A025163 A022418 A081318 this_sequence A015707 A101527 A028887

Adjacent sequences: A011772 A011773 A011774 this_sequence A011776 A011777 A011778

nonn

R. K. Guy

Corrected and extended by David W. Wilson (davidwwilson(AT)comcast.net)