A277590 - cp's OEIS frontend

A277590 Numbers k such that k/10^m == 3 mod 10, where 10^m is the greatest power of 10 that divides n.

3, 13, 23, 30, 33, 43, 53, 63, 73, 83, 93, 103, 113, 123, 130, 133, 143, 153, 163, 173, 183, 193, 203, 213, 223, 230, 233, 243, 253, 263, 273, 283, 293, 300, 303, 313, 323, 330, 333, 343, 353, 363, 373, 383, 393, 403, 413, 423, 430, 433, 443, 453, 463, 473

Offset: 1

Clark Kimberling, Nov 05 2016

Positions of 3 in A065881.

Numbers having 3 as rightmost nonzero digit in base 10. This is one sequence in a 10-way splitting of the positive integers; the other nine are indicated in the Mathematica program.

Clark Kimberling, Table of n, a(n) for n = 1..10000

Cf. A277588, A277589, A277591-A277596.

z = 460; a[b_] := Table[Mod[n/b^IntegerExponent[n, b], b], {n, 1, z}]
p[b_, d_] := Flatten[Position[a[b], d]]
p[10, 1] (* A277588 *)
p[10, 2] (* A277589 *)
p[10, 3] (* A277590 *)
p[10, 4] (* A277591 *)
p[10, 5] (* A277592 *)
p[10, 6] (* A277593 *)
p[10, 7] (* A277594 *)
p[10, 8] (* A277595 *)
p[10, 9] (* A277596 *)

is(n)=n && n/10^valuation(n,10)%10==3 \\ Charles R Greathouse IV, Jan 31 2017

cp's OEIS Frontend

A277590 Numbers k such that k/10^m == 3 mod 10, where 10^m is the greatest power of 10 that divides n.

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