A110758 -id:A110758 - cp's OEIS frontend

A110756 a(n) = tau(N), where N = concatenation 1,2,3,...,n.

1, 6, 4, 4, 8, 28, 4, 24, 12, 8, 64, 32, 8, 8, 8, 12, 24, 48, 64, 192, 256, 64, 16, 48, 24, 160, 96, 64, 16, 128, 8, 48, 64, 4, 192, 120, 16, 16, 64, 384, 32, 128, 16, 48, 768, 128, 32, 192, 64, 768, 8, 32, 64, 1792, 32, 24, 64, 16, 16, 128, 8, 192, 24, 768, 64

Offset: 1

Amarnath Murthy, Aug 11 2005

			a(3) = tau(123) = 4.

Tyler Busby, Table of n, a(n) for n = 1..117

Cf. A000005, A007908, A110757, A110758, A110759, A110760.

A055642 := proc(n) 1+floor(log10(n)) ; end; A000005 := proc(n) numtheory[tau](n) ; end ; A007908 := proc(n) local a ; a := 1 ; for i from 2 to n do a := a*10^A055642(i)+i ; end; RETURN(a) ; end; A110756 := proc(n) A000005(A007908(n)) ; end; for n from 1 to 50 do printf("%d %d ",n,A110756(n)) ; od ; # R. J. Mathar, Feb 10 2007

Table[DivisorSigma[0,FromDigits[Flatten[IntegerDigits/@Range[n]]]],{n,60}] (* Harvey P. Dale, Apr 01 2024 *)

a(n) = A000005(A007908(n)). - R. J. Mathar, Feb 10 2007

More terms from R. J. Mathar, Feb 10 2007
More terms from David Wasserman, Dec 22 2008
a(57)-a(65) from Jinyuan Wang, May 23 2020

A110760 a(n) = number of divisors of the concatenation of n,n-1,...3,2,1,2,3,...,n-1,n.

Original entry on oeis.org

1, 6, 8, 4, 32, 28, 8, 16, 8, 8, 8, 16, 2, 16, 64, 6, 4, 8, 16, 384, 16, 256, 4, 12, 24, 64, 32, 256, 32, 64, 64, 12, 32, 128, 16, 80, 256, 32, 96, 96, 8, 8, 128, 256, 128, 128, 1024, 192, 64, 96, 128, 64, 32, 32, 128

Offset: 1

Amarnath Murthy, Aug 11 2005

			a(3) = tau(32123) = 8.

Cf. A000005, A007942, A110756, A110757, A110758, A110759.

a(n) = A000005(A007942(n)). - Michel Marcus, Mar 22 2023

More terms from Ryan Propper, Jul 21 2006
Corrected and extended by Tyler Busby, Feb 12 2023
a(45)-a(55) from Tyler Busby, Feb 26 2023

A110757 a(n) = number of divisors of N, where N = reverse concatenation of 1,2,3,...,n.

Original entry on oeis.org

1, 4, 4, 4, 8, 4, 4, 12, 18, 8, 4, 8, 8, 16, 48, 16, 96, 576, 16, 32, 16, 32, 16, 32, 64, 256, 96, 32, 128, 256, 8, 64, 32, 128, 384, 144, 16, 8, 64, 32, 256, 64, 8, 192, 96, 32, 128, 128, 8, 64, 8, 128, 1280, 2560, 8, 24, 16, 64, 8, 8, 32, 384, 48, 64, 128, 128

Offset: 1

Amarnath Murthy, Aug 11 2005

			a(3) = tau(321) = 4.

Tyler Busby, Table of n, a(n) for n = 1..109

Cf. A000005, A000422, A176024.

Cf. A110756, A110758, A110759, A110760.

s = ""; Do[s = ToString[n] <> s; Print[DivisorSigma[0, ToExpression[s]]], {n, 1, 45}] (* Ryan Propper, Sep 23 2005 *)
Table[DivisorSigma[0,FromDigits[Flatten[IntegerDigits/@Range[n,1,-1]]]],{n,50}] (* The program takes a long time to run. *) (* Harvey P. Dale, Jun 06 2018 *)

a(n) = A000005(A000422(n)). - Jinyuan Wang, May 23 2020

More terms from Ryan Propper, Sep 23 2005

a(46)-a(66) from Jinyuan Wang, May 23 2020

A110759 a(n) = tau(N), where N = concatenation 1,2,3,...,n,...,3,2,1. E.g., for n = 4, N = 1234321.

Original entry on oeis.org

1, 3, 9, 9, 9, 243, 9, 81, 45, 2, 4, 18, 8, 64, 96, 16, 24, 48, 64, 4, 48, 8, 16, 384, 4, 64, 640, 4, 16, 768, 16, 512, 144, 64, 64, 448, 8, 48, 192, 16, 64, 96, 8, 64, 896, 128, 64, 192, 128, 128, 384, 32, 64, 1280, 16, 64, 192, 16, 24, 192, 32, 16

Offset: 1

Amarnath Murthy, Aug 11 2005

First 9 terms are odd as corresponding N are perfect squares.
Factorization of the larger N values:
  f(25) = 989931671244066864878631629*p53
  f(26) = 7*3209*17627*1322221*554840431325362973971*p48
  f(27) = 3^4*7*223*28807*108727*5439394515032275997*361855463775135800641*p34
  f(28) = 149*p89
  f(29) = 7*317310923*296879723071339*p72
  f(30) = 3^2*7*167*761*133337*431911*273884231501*4950715302671*p58
  f(31) = 827*1141296551*10940622359204560200188943089306257*p58
  f(32) = 7*31*5537737*42583813*62231909*19871693507*1441602757913*15884064847039967*p44
  f(33) = 3^2*7^2*281*743580875118413*177233764237488717892587862569137279765057*p50
  f(34) = 197*509*17780359481*34117699655579*22315348168833851*p70
  f(35) = 7*10243*73778819*217751506979*815234955828637451*p78

			a(3) = tau(12321) = 9.

Cf. A000005, A110756, A110757, A110758, A110760, A173426.

A055642 := proc(n) 1+floor(log10(n)) ; end; A000005 := proc(n) numtheory[tau](n) ; end ; rep := proc(n) local a ; a := 1 ; for i from 2 to n do a := a*10^A055642(i)+i ; end; for i from n-1 to 1 by -1 do a := a*10^A055642(i)+i ; end; RETURN(a) ; end; A110759 := proc(n) A000005(rep(n)) ; end; for n from 1 to 50 do printf("%d %d ",n,A110759(n)) ; od ; # R. J. Mathar, Feb 10 2007

Table[DivisorSigma[0,FromDigits[Join[Flatten[IntegerDigits/@Range[n]], Flatten[ IntegerDigits/@ Range[n-1,1,-1]]]]],{n,40}] (* Harvey P. Dale, Nov 17 2017 *)

a(n) = A000005(A173426(n)). - Georg Fischer, Feb 28 2023

More terms from R. J. Mathar, Feb 10 2007
a(21)-a(35) from Robert Gerbicz, Nov 27 2010
a(36)-a(44) from Jinyuan Wang, May 17 2020
a(45)-a(58) from Tyler Busby, Feb 13 2023
a(59)-a(62) from Tyler Busby, Mar 04 2025

cp's OEIS Frontend

A110756 a(n) = tau(N), where N = concatenation 1,2,3,...,n.

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A110760 a(n) = number of divisors of the concatenation of n,n-1,...3,2,1,2,3,...,n-1,n.

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A110757 a(n) = number of divisors of N, where N = reverse concatenation of 1,2,3,...,n.

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A110759 a(n) = tau(N), where N = concatenation 1,2,3,...,n,...,3,2,1. E.g., for n = 4, N = 1234321.

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