A225169 Denominators of the sequence s(n) of the sum resp. product of fractions f(n) defined recursively by f(1) = 10/1; f(n+1) is chosen so that the sum and the product of the first n terms of the sequence are equal.
1, 9, 819, 7519239, 695384944860879, 6470289227069622272847335347359, 605164280025029017271801950447677089988237937249820002811725119
Offset: 1
Keywords
Examples
f(n) = 10, 10/9, 100/91, 10000/9181, ... 10 + 10/9 = 10 * 10/9 = 100/9; 10 + 10/9 + 100/91 = 10 * 10/9 * 100/91 = 10000/819; ... s(n) = 1/b(n) = 10, 100/9, 10000/819, ...
Programs
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Maple
b:=proc(n) option remember; b(n-1)-b(n-1)^2; end: b(1):=1/10; a:=n->10^(2^(n-1))*b(n); seq(a(i),i=1..7);
Formula
a(n) = 10^(2^(n-1))*b(n) where b(n)=b(n-1)-b(n-1)^2 with b(1)=1/10.
Comments