A050710 -id:A050710 - cp's OEIS frontend

A050770 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 3 skipped primes.

26, 33, 35, 55, 208, 297, 300, 351, 352, 420, 432, 441, 486, 660, 735, 910, 1000, 1140, 1225, 1452, 1584, 1715, 1938, 2016, 2250, 2548, 2816, 3003, 3724, 4056, 4180, 4455, 4459, 4600, 4736, 4845, 5280, 5625, 5746, 5888, 5915, 6422, 6475, 6864, 6916, 6930

Offset: 0

Patrick De Geest, Sep 15 1999

nonn

			a(2)=33 + (3+11) = ending prime 47. Between 33 and 47 one finds 3 primes 37, 41 and 43.

Cf. A050703, A050710.

A050771 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 4 skipped primes.

Original entry on oeis.org

8, 9, 34, 38, 51, 65, 68, 85, 96, 116, 143, 224, 225, 304, 306, 416, 448, 544, 546, 570, 600, 621, 640, 714, 783, 810, 1020, 1134, 1197, 1254, 1280, 1408, 1521, 1540, 1666, 1716, 1806, 1900, 1953, 2088, 2646, 2760, 3159, 3185, 3255, 3392, 3920, 3968, 4176

Offset: 0

Patrick De Geest, Sep 15 1999

nonn

			a(2)=9 + (3+3) = 15 + (3+5) = ending prime 23. Between 9 and 23 one finds 4 primes 11, 13, 17 and 19.

Cf. A050703, A050710.

A050773 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 6 skipped primes.

Original entry on oeis.org

4, 22, 54, 93, 111, 145, 155, 185, 221, 231, 377, 450, 667, 688, 992, 1122, 1161, 1428, 1638, 1995, 2144, 2220, 2624, 2820, 2838, 3627, 3774, 3876, 4225, 4761, 5106, 5434, 5590, 5676, 5850, 6188, 6216, 6405, 6734, 8364, 8554, 9196, 9471, 9558, 10660

Offset: 1

Patrick De Geest, Sep 15 1999

nonn

			a(2)=22 + (2+11) = 35 + (5+7) = ending prime 47. Between 22 and 47 one finds 6 primes 23, 29, 31, 37, 41 and 43.

Cf. A050703, A050710.

Offset corrected by Sean A. Irvine, Aug 18 2021

A050774 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 7 skipped primes.

Original entry on oeis.org

39, 40, 58, 78, 205, 272, 330, 341, 357, 437, 475, 476, 520, 533, 551, 616, 738, 833, 1105, 1184, 1274, 1984, 2262, 2312, 2652, 2964, 3008, 3010, 3198, 3444, 3776, 4386, 5530, 5831, 6020, 6204, 6360, 6768, 7056, 7380, 7420, 7930, 8322, 8835, 8844, 8991

Offset: 1

Patrick De Geest, Sep 15 1999

nonn

			a(1)=39 + (3+13) = 55 + (5+11) = ending prime 71. Between 39 and 71 one finds 7 primes 41, 43, 47, 53, 59, 61 and 67.

Cf. A050703, A050710.

Offset corrected by Sean A. Irvine, Aug 18 2021

A050775 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 8 skipped primes.

Original entry on oeis.org

16, 36, 74, 80, 81, 86, 115, 119, 121, 123, 141, 215, 266, 276, 360, 451, 465, 572, 779, 868, 1548, 1624, 1674, 1763, 1917, 1925, 2196, 2331, 2368, 2730, 3108, 3306, 3430, 3816, 4452, 4575, 5110, 5312, 5412, 6273, 6324, 6820, 7632, 8772, 9027, 9204, 9435

Offset: 1

Patrick De Geest, Sep 15 1999

nonn

			a(6)=86 + (2+43) = ending prime 131. Between 86 and 131 one finds 8 primes 89, 97, 101, 103, 107, 109, 113 and 127.

Cf. A050703, A050710.

Offset corrected by Sean A. Irvine, Aug 18 2021

A057874 Sets of three composites in bidirectional 'sum of prime factors' progression/retrogression.

Original entry on oeis.org

95, 119, 143, 174191, 175031, 175871, 298687992, 298688708, 298689424

Offset: 0

Patrick De Geest, Sep 15 2000

First term of next set > 2000000000.

			First set is (95,119,143) all terms having 'sum of prime factors' = 24. So '95' + (5+19) = '119' + (7+17) = '143' AND '143' - (11+13) = '119' - (7+17) = '95'.

Index entries for sequences related to primes in arithmetic progressions

Cf. A050780, A050781, A050703-A050710.

This really seems to be three sequences, not one! Should be split. - N. J. A. Sloane

A177791 Partial sums of A050705.

Original entry on oeis.org

10, 22, 36, 51, 71, 92, 118, 151, 186, 224, 268, 316, 367, 432, 500, 586, 679, 775, 886, 998, 1114, 1237, 1398, 1586, 1787, 1990, 2196, 2405, 2615, 2830, 3051, 3329, 3626, 3926, 4230, 4536, 4857, 5209, 5565, 5936, 6320, 6715, 7113, 7526, 7946, 8387, 8858

Offset: 1

Jonathan Vos Post, May 13 2010

nonn

Partial sums of composite number such that when sum of its prime factors is added or subtracted becomes prime. The subsequence of primes in the partial sums begins: 71, 151, 367, 1237, 1787, 3329, 5209, 8387, 9343, 13781. The subsequence of partial sums which are themselves composite number such that when sum of their prime factors is added or subtracted becomes prime, begins: 10, 51, which other such fixed points are there?

			a(13) = 10 + 12 + 14 + 15 + 20 + 21 + 26 + 33 + 35 + 38 + 44 + 48 + 51 = 367 is prime.

Cf. A000040, A001414, A050705, A050703-A050710.

a(n) = SUM[i=1..n] A050705(i) = SUM[i=1..n] {n such that n+A001414(n) is in A000040, and n-A001414(n) is in A000040}.

A226218 Ending primes for n-th composite number in the iterated procedure of composite added to sum of prime factors.

Original entry on oeis.org

23, 11, 23, 23, 17, 19, 23, 23, 47, 41, 29, 31, 47, 47, 47, 41, 71, 71, 71, 83, 47, 53, 47, 71, 59, 71, 71, 83, 59, 167, 71, 59, 149, 167, 71, 167, 83, 71, 167, 79, 89, 251, 167, 149, 149, 83, 269, 89, 167, 251, 251, 113, 239, 149, 167, 109, 127, 269, 251, 107

Offset: 1

Jayanta Basu, May 31 2013

nonn

If we consider nonprimes instead of composite then a(1)=2. Sorted list of primes generated here are given in A050778.

			For the first composite number 4 repeated application of composite added to sum of prime factors give 4, 8, 14, 23 and so a(1)=23.

Cf. A050703-A050710, A050778.

a[n_] := NestWhile[#+Total[Times@@@FactorInteger[#]]&, n, !PrimeQ[#]&]; t={}; Do[If[!PrimeQ[n], AppendTo[t, a[n]]], {n, 4, 80}]; t

cp's OEIS Frontend

A050770 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 3 skipped primes.

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A050771 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 4 skipped primes.

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A050773 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 6 skipped primes.

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A050774 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 7 skipped primes.

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A050775 Iterated procedure 'composite k added to sum of its prime factors reaches a prime' yields 8 skipped primes.

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A057874 Sets of three composites in bidirectional 'sum of prime factors' progression/retrogression.

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A177791 Partial sums of A050705.

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A226218 Ending primes for n-th composite number in the iterated procedure of composite added to sum of prime factors.

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Mathematica