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A036325
Composite numbers whose prime factors have no digits other than 8 and 9.
26
7921, 704969, 800911, 8001011, 8009021, 8802011, 8810911, 8899021, 62742241, 71281079, 79120021, 80001121, 80982001, 88109911, 88910021, 712089979, 712802869, 783378979, 784171079, 791120021, 791200121, 792012869, 800020021, 800109911, 800901121, 800991011, 809001101, 809811011, 880111121
OFFSET
1,1
COMMENTS
All terms are a product of at least two terms of A020472. - David A. Corneth, Apr 30 2018
LINKS
David A. Corneth, Table of n, a(n) for n = 1..10000 (first 5375 terms from Robert Israel)
FORMULA
Sum_{n>=1} 1/a(n) = Product_{p in A020472} (p/(p - 1)) - Sum_{p in A020472} 1/p - 1 = 0.0001296249159... . - Amiram Eldar, May 22 2022
EXAMPLE
7921 is in the sequence because it's composite and its only prime factor is 89, only having digits 8 or 9. - David A. Corneth, Apr 30 2018
MAPLE
N:= 9: # to get all terms of <= N digits
R:= 10^N: G:= {9}: S:= {1}:
for n from 1 to N-1 do
G:= map(t -> (t+8*10^n, t+9*10^n), G);
newprimes:= select(isprime, G);
for p in newprimes do
S:= map(s -> seq(s*p^i, i=0..floor(log[p](R/s))), S)
od
od:
sort(convert(remove(isprime, S minus {1}), list)); # Robert Israel, Apr 30 2018
CROSSREFS
KEYWORD
nonn,easy,base
AUTHOR
Patrick De Geest, Dec 15 1998
EXTENSIONS
More terms from Robert Israel, Apr 29 2018
STATUS
approved