id:A138530 - OEIS Search Results

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%I A138530
%S A138530 1,2,1,3,2,1,4,1,2,1,5,2,3,2,1,6,2,2,3,2,1,7,3,3,4,3,2,1,8,1,4,2,4,3,2,
%T A138530 1,9,2,1,3,5,4,3,2,1,10,2,2,4,2,5,4,3,2,1,11,3,3,5,3,6,5,4,3,2,1,12,2,
               2,
%U A138530 3,4,2,6,5,4,3,2,1,13,3,3,4,5,3,7,6,5,4,3,2,1,14,3,4,5,6,4,2,7,6,5,4,3
%N A138530 Triangle read by rows: T(n,k) = sum of digits of n in base k representation, 
               1<=k<=n.
%C A138530 A131383(n) = sum of n-th row;
%C A138530 A000027(n) = T(n,1);
%C A138530 A000120(n) = T(n,2) for n>1;
%C A138530 A053735(n) = T(n,3) for n>2;
%C A138530 A053737(n) = T(n,4) for n>3;
%C A138530 A053824(n) = T(n,5) for n>4;
%C A138530 A053827(n) = T(n,6) for n>5;
%C A138530 A053828(n) = T(n,7) for n>6;
%C A138530 A053829(n) = T(n,8) for n>7;
%C A138530 A053830(n) = T(n,9) for n>8;
%C A138530 A007953(n) = T(n,10) for n>9;
%C A138530 A053831(n) = T(n,11) for n>10;
%C A138530 A053832(n) = T(n,12) for n>11;
%C A138530 A053833(n) = T(n,13) for n>12;
%C A138530 A053834(n) = T(n,14) for n>13;
%C A138530 A053835(n) = T(n,15) for n>14;
%C A138530 A053836(n) = T(n,16) for n>15;
%C A138530 A007395(n) = T(n,n-1) for n>1;
%C A138530 A000012(n) = T(n,n).
%H A138530 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               DigitSum.html">Digit Sum</a>
%e A138530 Start of the triangle for n in base k representation:
%e A138530 ......................1
%e A138530 ....................11....10
%e A138530 ......... ........111....11...10
%e A138530 ................1111...100...11..10
%e A138530 ..............11111...101...12..11..10
%e A138530 ............111111...110...20..12..11..10
%e A138530 ..........1111111...111...21..13..12..11..10
%e A138530 ........11111111..1000...22..20..13..12..11..10
%e A138530 ......111111111..1001..100..21..14..13..12..11..10
%e A138530 ....1111111111..1010..101..22..20..14..13..12..11..10
%e A138530 ..11111111111..1011..102..23..21..15..14..13..12..11..10
%e A138530 111111111111..1100..110..30..22..20..15..14..13..12..11..10,
%e A138530 and the triangle of sums of digits starts:
%e A138530 ......................1
%e A138530 .....................2...1
%e A138530 ......... ..........3...2...1
%e A138530 ...................4...1...2...1
%e A138530 ..................5...2...3...2...1
%e A138530 .................6...2...2...3...2...1
%e A138530 ................7...3...3...4...3...2...1
%e A138530 ...............8...1...4...2...4...3...2...1
%e A138530 ..............9...2...1...3...5...4...3...2...1
%e A138530 ............10...2...2...4...2...5...4...3...2...1
%e A138530 ...........11...3...3...5...3...6...5...4...3...2...1
%e A138530 ..........12...2...2...3...4...2...6...5...4...3...2...1.
%Y A138530 Sequence in context: A086414 A098896 A108371 this_sequence A002341 A128260 
               A083368
%Y A138530 Adjacent sequences: A138527 A138528 A138529 this_sequence A138531 A138532 
               A138533
%K A138530 nonn,base,tabl
%O A138530 1,2
%A A138530 Reinhard Zumkeller (reinhard.zumkeller(AT)gmail.com), Mar 26 2008
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Last modified December 1 19:22 EST 2009. Contains 167811 sequences.
AT&T Labs Research