A144717 -id:A144717 - cp's OEIS frontend

A144718 a(n) = n-th prime arising A144717.

3, 5, 13, 61, 421, 3361, 30241, 332641, 3991681, 55883521, 950019841, 19000396801, 456009523201, 13680285696001, 465129713664001, 20465707401216001, 1473530932887552001, 125250129295441920001, 10771511119408005120001

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

Jon E. Schoenfield, Table of n, a(n) for n = 1..282

Cf. A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731.

k = 2; a = {}; Do[If[PrimeQ[k n + 1], AppendTo[a, k n+1 ]; k = k n ], {n, 1, 3000}]; a

a(n) = 2*Product_{k=1..n} A144717(k) + 1.

A046972 Primes arising in A046966.

Original entry on oeis.org

2, 3, 7, 31, 181, 1621, 19441, 311041, 6842881, 171072001, 4961088001, 153793728001, 5382780480001, 252990682560001, 14420468905920001, 879648603261120001, 58056807815233920001, 4586487817403479680001, 371505513209681854080001, 40122595426645640240640001

Offset: 1

G. L. Honaker, Jr.

Amiram Eldar, Table of n, a(n) for n = 1..282 (terms 1..100 from T. D. Noe)

Cf. A046966.

Cf. A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731. [Artur Jasinski, Sep 19 2008]

k = 1; a = {}; Do[If[PrimeQ[k n + 1], k = k n; AppendTo[a, k + 1]], {n, 1, 1000}]; a (* Artur Jasinski, Sep 19 2008 *)

A144729 Primes arising in A144728.

Original entry on oeis.org

7, 13, 37, 181, 1621, 19441, 311041, 6842881, 171072001, 4961088001, 153793728001, 5382780480001, 252990682560001, 14420468905920001, 879648603261120001, 58056807815233920001, 4586487817403479680001

Offset: 1

Artur Jasinski, Sep 19 2008; corrected Sep 19 2008

nonn

A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731

A144723 a(n)= primes arising A144722.

Original entry on oeis.org

7, 19, 73, 433, 3457, 72577, 1669249, 43400449, 1302013441, 46872483841, 1734281902081, 67636994181121, 2840753755607041, 153400702802780161, 8743840059758469121, 638300324362368245761, 52978926922076564398081

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731

k = 3; a = {}; Do[If[PrimeQ[k n + 1], AppendTo[a, k n+1 ]; k = k n ], {n, 1, 3000}]; a (*Artur Jasinski*)

A144724 a(n) is the smallest positive integer such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 4.

Original entry on oeis.org

1, 3, 5, 7, 8, 9, 11, 12, 14, 17, 20, 24, 30, 34, 44, 72, 85, 86, 92, 115, 122, 125, 132, 142, 150, 161, 162, 181, 186, 198, 224, 248, 252, 282, 283, 290, 307, 319, 321, 344, 350, 376, 445, 476, 567, 623, 676, 682, 704, 741, 749, 786, 803, 806, 893, 1014, 1046, 1079

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

Is this A144717 without the 2? - R. J. Mathar, Jul 24 2023

			4*1+1=5 is prime => a(1)=1.
4*1*2+1=9 is not prime (omitted).
4*1*3+1=13 is prime => a(2)=3.

Cf. A046966, A046972, A144717, A144718, A144722, A144723, A144725, A144726, A144727, A144728, A144729, A144730, A144731.

k = 4; a = {}; Do[If[PrimeQ[k n + 1], k = k n; AppendTo[a, n]], {n, 1, 3000}]; a (* Artur Jasinski *)

Definition corrected by Georg Fischer, Jun 18 2021

A144725 Primes arising in A144724.

Original entry on oeis.org

5, 13, 61, 421, 3361, 30241, 332641, 3991681, 55883521, 950019841, 19000396801, 456009523201, 13680285696001, 465129713664001, 20465707401216001, 1473530932887552001, 125250129295441920001

Offset: 1

Artur Jasinski, Sep 19 2008; corrected Sep 19 2008

nonn

Is this A144718 without the 3? - R. J. Mathar, Jul 24 2023

A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731

A144726 Incorrect duplicate of A046966.

Original entry on oeis.org

2, 3, 5, 7, 10, 12, 14, 15, 19, 21, 26, 29, 30, 39, 41, 56, 62, 77, 96, 105, 112, 113, 115, 121, 136, 145, 159, 168, 188, 236, 240, 258, 281, 305, 324, 362, 376, 422, 521, 588, 639, 643, 652, 695, 698, 737, 770, 776, 784, 806, 807, 809, 818, 959, 1023, 1060, 1071

Offset: 1

Artur Jasinski, Sep 19 2008

dead

Previous name was: a(n) is the smallest integer greater than a(n-1) such that a(1)*a(2)*...*a(n) + 1 is prime.

Cf. A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731.

k = 5; a = {}; Do[If[PrimeQ[k n + 1], k = k n; AppendTo[a, n]], {n, 1, 3000}]; a

A144722 a(n) is the smallest positive integer m such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 3.

Original entry on oeis.org

2, 3, 4, 6, 8, 21, 23, 26, 30, 36, 37, 39, 42, 54, 57, 73, 83, 86, 88, 91, 93, 98, 99, 112, 120, 137, 140, 142, 148, 161, 162, 169, 171, 174, 179, 237, 247, 294, 312, 335, 340, 382, 474, 475, 484, 498, 500, 539, 589, 598, 653, 654, 660, 704, 720, 732, 789, 804

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

			3*1+1=4 is not prime (omitted).
a(1)=2 because 3*2+1=7 is prime.
a(2)=3 because 3*2*3+1=19 is prime.

Cf. A046966, A046972, A144717, A144718, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144730, A144731.

k = 3; a = {}; Do[If[PrimeQ[k*n + 1], k = k*n; AppendTo[a, n]], {n, 1, 3000}]; a

Definition corrected by Georg Fischer, Jun 18 2021

A144728 a(n) is the smallest positive integer such that b * (Product_{k=1..n} a(k)) + 1 is prime, with a(n) > a(n-1) for n >= 2, and b = 6.

Original entry on oeis.org

1, 2, 3, 5, 9, 12, 16, 22, 25, 29, 31, 35, 47, 57, 61, 66, 79, 81, 108, 114, 148, 163, 172, 185, 198, 203, 205, 236, 265, 275, 282, 294, 312, 344, 359, 377, 397, 398, 411, 427, 431, 493, 512, 589, 647, 648, 660, 708, 719, 765, 887, 911, 916, 935, 1062, 1093, 1102

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

Cf. A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144729, A144730, A144731.

k = 6; a = {}; Do[If[PrimeQ[k n + 1], k = k n; AppendTo[a, n]], {n, 1, 3000}]; a

Definition corrected by Georg Fischer, Jun 18 2021

A144730 a(n) is the smallest positive integer m such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 7.

Original entry on oeis.org

4, 7, 13, 19, 33, 35, 36, 43, 48, 55, 59, 62, 87, 129, 149, 153, 159, 190, 228, 231, 245, 265, 266, 269, 284, 300, 329, 331, 340, 347, 372, 432, 449, 450, 461, 485, 496, 500, 514, 544, 560, 565, 594, 598, 605, 614, 639, 677, 684, 734, 736, 794, 804, 813, 882

Offset: 1

Artur Jasinski, Sep 19 2008

nonn

A046966, A046972, A144717, A144718, A144722, A144723, A144724, A144725, A144726, A144727, A144728, A144729, A144731

k = 7; a = {}; Do[If[PrimeQ[k n + 1], k = k n; AppendTo[a, n]], {n, 1, 3000}]; a (*Artur Jasinski*)

Definition corrected by Georg Fischer, Jun 18 2021

cp's OEIS Frontend

A144718 a(n) = n-th prime arising A144717.

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A046972 Primes arising in A046966.

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A144729 Primes arising in A144728.

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A144723 a(n)= primes arising A144722.

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A144724 a(n) is the smallest positive integer such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 4.

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A144725 Primes arising in A144724.

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A144726 Incorrect duplicate of A046966.

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A144722 a(n) is the smallest positive integer m such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 3.

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A144728 a(n) is the smallest positive integer such that b * (Product_{k=1..n} a(k)) + 1 is prime, with a(n) > a(n-1) for n >= 2, and b = 6.

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A144730 a(n) is the smallest positive integer m such that b * (Product_{k=1..n} a(k)) + 1 is prime, with b = 7.

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