A229274 -id:A229274 - cp's OEIS frontend

A229324 Composite squarefree numbers n such that p + tau(n) divides n - phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

115, 205, 295, 565, 655, 745, 835, 1195, 1285, 1465, 1555, 1735, 1915, 2005, 2095, 2455, 2545, 2815, 2995, 3085, 3265, 3715, 3805, 3985, 4435, 4705, 4885, 5065, 5155, 5245, 5515, 5965, 6145, 6415, 6505, 6595, 6865, 7045, 7135, 7405, 7495, 7765, 7855, 8035

Offset: 1

Paolo P. Lava, Sep 20 2013

nonn

All terms are apparently multiple of 5.

It appears that a(n) = 5*A061240(n+1). - Michel Marcus, Sep 21 2013

			Prime factors of 2815 are 5, 563 and tau(2815) = 4, phi(2815) = 2248. 2815 - 2248 = 567 and  567 / (5 + 4) = 63, 567 / (563 + 4) = 1.

Paolo P. Lava, Table of n, a(n) for n = 1..500

Cf. A000005, A000010, A228299-A228302, A229274-A229276, A229321-A229323.

with (numtheory); P:=proc(q) global a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 then ok:=0; break;
else if not type((n-phi(n))/(a[i][1]+tau(n)),integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(6*10^9);

Deleted first term, changed b-file and comment by Paolo P. Lava, Sep 23 2013

A229273 Composite squarefree numbers n such that p-tau(n) divides n-sigma(n), where p are the prime factors of n, tau(n) = A000005(n) and sigma(n) = A000203(n).

Original entry on oeis.org

6, 10, 15, 22, 78, 138, 273, 483, 3243, 3913, 104377, 477337, 1537627, 1904487, 2508961, 3326829, 3716167, 5148949, 6154017, 6686113, 11521842, 14355679, 16872583, 25165777, 28029883, 31232337, 32403342, 50725419, 57396469, 68815381, 86850249, 98242959

Offset: 1

Paolo P. Lava, Sep 19 2013

nonn

Subsequence of A120944.

			Prime factors of 273 are 3, 7, 13 and sigma(273) = 448, tau(273) = 8.
273 - 448 = -175 and (-175) / (3 - 8) = 35, (-175) / (7 - 8) = 175, (-175) / (13 - 8) = -35.

Cf. A000005, A000203.

Cf. A228299, A228300, A228301, A228302, A229274, A229275, A229276.

with (numtheory); P:=proc(q) local a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 or a[i][1]=tau(n) then ok:=0; break;
else if not type((n-sigma(n))/(a[i][1]-tau(n)), integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(2*10^6);

a(20)-a(33) from Giovanni Resta, Sep 20 2013

First term deleted by Paolo P. Lava, Sep 23 2013

A229321 Composite squarefree numbers n such that p-tau(n) divides n+phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Original entry on oeis.org

6, 10, 15, 21, 39, 110, 170, 609, 897, 935, 1265, 1729, 2882, 2915, 12374, 15387, 161833, 411230, 444797, 558830, 842741, 881705, 1091810, 1122501, 1163990, 1342165, 1565565, 1898259, 2763901, 4157605, 4453697, 4675877, 5962835, 6241610, 6809690, 7201599

Offset: 1

Paolo P. Lava, Sep 20 2013

nonn

Subsequence of A120944.

			Prime factors of 1265 are 5, 11, 23 and tau(1265) = 8, phi(1265) = 880. 1265 + 880 = 2145 and 2145 / (5 - 8) = -715, 2145 / (11 - 8) = 715, 2145 / (23 - 8) = 143.

Cf. A000005, A000010, A228299-A228302, A229274-A229276, A229322-A229324.

with (numtheory); P:=proc(q) global a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 or a[i][1]=tau(n) then ok:=0; break;
else if not type((n+phi(n))/(a[i][1]-tau(n)), integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(6*10^9);

a(18)-a(37) from Giovanni Resta, Sep 20 2013

First term deleted by Paolo P. Lava, Sep 23 2013

A229275 Composite squarefree numbers n such that p+tau(n) divides n+sigma(n), where p are the prime factors of n, tau(n) = A000005(n) and sigma(n) = A000203(n).

Original entry on oeis.org

10778, 16471, 17353, 439453, 1304443, 3719678, 9234253, 17270678, 20512335, 21179143, 50706307, 77292313, 95506557, 103081993, 104707029, 140419077, 240626953, 287947933, 822767689, 982374757, 1608154233, 1918313911, 2219891947, 2471777007, 2632397677

Offset: 1

Paolo P. Lava, Sep 19 2013

nonn

Subsequence of A120944.

			Prime factors of 10778 are 2, 17, 317 and sigma(10778) = 17172, tau(10778) = 8.
10778 + 17172 = 27950 and 27950 / (2 + 8) = 2795, 27950 / (17 + 8) = 1118, 27950 / (317 + 8) = 86.

Cf. A000005, A000203, A228299-A228302, A229273, A229274, A229276.

with (numtheory); P:=proc(q) local a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 then ok:=0; break;
else if not type((n+sigma(n))/(a[i][1]+tau(n)), integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(2*10^6);

a(4) corrected and a(7)-a(26) by Giovanni Resta, Sep 20 2013

First term deleted by Paolo P. Lava, Sep 23 2013

A229322 Composite squarefree numbers n such that p + tau(n) divides n + phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Original entry on oeis.org

72285, 82218, 1612671, 52371129, 511130199, 2111850465, 4789685289, 8884216243, 8916435021, 9863075721, 15364177629, 28243714821, 99459827349

Offset: 1

Paolo P. Lava, Sep 20 2013

nonn

a(15) > 10^11. - Giovanni Resta, Sep 20 2013

Subsequence of A120944.

			Prime factors of 82218 are 2, 3, 71, 193 and tau(82218) = 16, phi(82218) = 26680. 82218 + 26680 = 109098 and  109098 / (2 + 16) = 6061, 109098 / (3 + 16) = 5742, 109098 / (71 + 16) = 1254, 109098 / (193 + 16) = 522.

Cf. A000005, A000010, A228299-A228302, A229274-A229276, A229321, A229323, A229324.

with (numtheory); P:=proc(q) global a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 then ok:=0; break;
else if not type((n+phi(n))/(a[i][1]+tau(n)),integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(6*10^9);

a(4)-a(14) from Giovanni Resta, Sep 20 2013

First term deleted by Paolo P. Lava, Sep 23 2013

A229323 Composite squarefree numbers n such that p - tau(n) divides n - phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Original entry on oeis.org

6, 10, 15, 21, 42, 28101, 38505, 5298186, 8022111, 28231629, 36367086, 98671659, 132798279, 163143714, 201713946, 251860911, 434246667, 537424773, 968870877, 999640581, 1495625721, 1548129363, 3338717307, 3836384682, 6316358811, 6982412973

Offset: 1

Paolo P. Lava, Sep 20 2013

nonn

Subsequence of A120944.

			Prime factors of 28101 are 3, 17, 19, 29 and tau(28101) = 16, phi(28101) = 16128. 28101 - 16128 = 11973 and  11973 / (3 - 16) = -921, 11973 / (17 - 16) = 11973, 11973 / (19 - 16) = 3991, 11973 / (29 - 16) = 921.

Cf. A000005, A000010, A228299-A228302, A229274-A229276, A229321, A229322, A229324.

with (numtheory); P:=proc(q) global a, b, c, i, ok, p, n;
for n from 2 to q do  if not isprime(n) then a:=ifactors(n)[2]; ok:=1;
for i from 1 to nops(a) do if a[i][2]>1 or a[i][1]=tau(n) then ok:=0; break;
else if not type((n-phi(n))/(a[i][1]-tau(n)),integer) then ok:=0; break; fi; fi; od; if ok=1 then print(n); fi; fi; od; end: P(6*10^9);

a(9)-a(27) from Giovanni Resta, Sep 20 2013

First term deleted by Paolo P. Lava, Sep 23 2013

cp's OEIS Frontend

A229324 Composite squarefree numbers n such that p + tau(n) divides n - phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Views

Author

Keywords

Comments

Examples

Links

Crossrefs

Programs

Maple

Extensions

A229273 Composite squarefree numbers n such that p-tau(n) divides n-sigma(n), where p are the prime factors of n, tau(n) = A000005(n) and sigma(n) = A000203(n).

Views

Author

Keywords

Comments

Examples

Crossrefs

Programs

Maple

Extensions

A229321 Composite squarefree numbers n such that p-tau(n) divides n+phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Views

Author

Keywords

Comments

Examples

Crossrefs

Programs

Maple

Extensions

A229275 Composite squarefree numbers n such that p+tau(n) divides n+sigma(n), where p are the prime factors of n, tau(n) = A000005(n) and sigma(n) = A000203(n).

Views

Author

Keywords

Comments

Examples

Crossrefs

Programs

Maple

Extensions

A229322 Composite squarefree numbers n such that p + tau(n) divides n + phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Views

Author

Keywords

Comments

Examples

Crossrefs

Programs

Maple

Extensions

A229323 Composite squarefree numbers n such that p - tau(n) divides n - phi(n), where p are the prime factors of n, tau(n) = A000005(n) and phi(n) = A000010(n).

Views

Author

Keywords

Comments

Examples

Crossrefs

Programs

Maple

Extensions