A113699 -id:A113699 - cp's OEIS frontend

A113693 Semiprimes in A054556.

4, 15, 34, 249, 391, 565, 771, 886, 1915, 3814, 5149, 5739, 6046, 7354, 9169, 10765, 11611, 15814, 16321, 18429, 20665, 22426, 24259, 28141, 29499, 32311, 36769, 39106, 43161, 48291, 52786, 53709, 57481, 60394, 63379, 65409, 67471, 69565

Offset: 1

Jonathan Vos Post, Nov 05 2005

This sequence contains semiprimes from the center straight up the y-axis in the semiprime spiral of A113688-A113689. Semiprimes from the center straight down the y-axis in the semiprime spiral are A113691. Semiprimes from the center straight right along the x-axis in the semiprime spiral are A113690. Semiprimes from the center straight left along the x-axis in the semiprime spiral are A113692.

			a(27) = 4*97^2 - 9*97 + 6 = 36769 = 83 * 443.
a(28) = 4*100^2 - 9*100 + 6 = 39106 = 2 * 19553.
a(27) and a(28) are horizontally adjacent in the prime spiral, hence part of a clump and not isolated semiprimes as in A113688.
a(45) = 4*157^2 - 9*157 + 6 = 97189 = 17 * 5717 is the greatest member under 10^5.

Vincenzo Librandi, Table of n, a(n) for n = 1..1000

Cf. A001358, A054556, A113688-A113699.

IsSemiprime:= func; [s: n in [2..150] | IsSemiprime(s) where s is 4*n^2 - 9*n + 6]; // Vincenzo Librandi, Sep 22 2012

Select[Table[4 n^2 - 9 n + 6, {n, 140}], PrimeOmega[#] == 2 &] (* Vincenzo Librandi, Sep 22 2012 *)

{a(n)} = Intersection of A001358 and A054556. Semiprimes of the form 4*k^2 - 9*k + 6.

A113690 Semiprimes in A054552.

Original entry on oeis.org

86, 298, 371, 1243, 1541, 2426, 2627, 3053, 4258, 5366, 5663, 6281, 6602, 6931, 7613, 8327, 9073, 9458, 10661, 13283, 14702, 15191, 16706, 18293, 18838, 23486, 25361, 26002, 26651, 27973, 28646, 34318, 35063, 36577, 38123, 41311, 43786, 44627

Offset: 1

Jonathan Vos Post, Nov 05 2005

This sequence, A113690, contains semiprimes from the center straight right along the x-axis in the semiprime spiral of A113688-A113689. Semiprimes from the center straight left along the x-axis in the semiprime spiral are A113692. A113693 contains semiprimes from the center straight up the y-axis in the semiprime spiral. Semiprimes from the center straight down the y-axis in the semiprime spiral are A113691.

			a(10) = 4*37^2 - 3*37 + 1 = 5366 = 2 * 2683.
a(11) = 4*38^2 - 3*38 + 1 = 5663 = 7 * 809.
a(10) and a(11) are horizontally adjacent in the prime spiral, hence part of a clump and not isolated semiprimes as in A113688.
a(57) = 4*156^2 - 3*156 + 1 = 96877 = 11 * 8807 is the greatest member under 10^5.

Vincenzo Librandi, Table of n, a(n) for n = 1..1000

Cf. A001358, A054552, A113688-A113699.

IsSemiprime:= func; [s: n in [1..120] | IsSemiprime(s) where s is 4*n^2 - 3*n + 1]; // Vincenzo Librandi, Sep 22 2012

Select[Table[4*n^2 - 3*n + 1, {n, 150}], PrimeOmega[#] == 2&] (* Vincenzo Librandi, Sep 22 2012 *)

{a(n)} = Intersection of A001358 and A054552. Semiprimes of the form 4*k^2 - 3*k + 1.

Corrected a(6) by Vincenzo Librandi, Sep 22 2012

A113691 Semiprimes in A033951.

Original entry on oeis.org

46, 77, 218, 1073, 1351, 1502, 1661, 2186, 2998, 4193, 4727, 5006, 5293, 5891, 7183, 8603, 10558, 12266, 13631, 14581, 15563, 19811, 20953, 25202, 27806, 29843, 30538, 31241, 32671, 33398, 35627, 37153, 39502, 40301, 46118, 46981, 49618, 56051

Offset: 1

Jonathan Vos Post, Nov 05 2005

This sequence, A113691, contains semiprimes from the center straight down the y-axis in the semiprime spiral of A113688-A113689. A113693 contains semiprimes from the center straight up the y-axis in the semiprime spiral. A113690 contains semiprimes from the center straight right along the x-axis in the semiprime spiral. Semiprimes from the center straight left along the x-axis in the semiprime spiral are A113692.

			a(5) = 4*18^2 + 3*18 + 1 = 1351 = 7 * 193.
a(6) = 4*19^2 + 3*19 + 1 = 1502 = 2 * 751.
a(7) = 4*20^2 + 3*20 + 1 = 1661 = 11 * 151.
a(5), a(6) and a(7) are vertically adjacent in the semiprime spiral, hence part of a clump and not isolated semiprimes as in A113688. a(11), a(12) and a(13) are another such vertical string of 3 adjacent semiprimes and so is a(26), a(27) and a(28).
a(52) = 4*152^2 + 3*152 + 1 = 92873 = 11 * 8443 is the greatest member under 10^5.

Vincenzo Librandi, Table of n, a(n) for n = 1..1000

Cf. A001358, A033951, A113688-A113699.

IsSemiprime:= func; [s: n in [1..120] | IsSemiprime(s) where s is 4*n^2 + 3*n + 1]; // Vincenzo Librandi, Sep 22 2012

Select[Table[4*n^2 + 3*n + 1, {n, 200}], PrimeOmega[#] == 2&] (* Vincenzo Librandi, Sep 22 2012 *)

{a(n)} = Intersection of A001358 and A033951. Semiprimes of the form 4*k^2 + 3*k + 1.

A113692 Semiprimes in A054567.

Original entry on oeis.org

6, 69, 106, 265, 334, 411, 589, 799, 1041, 1174, 1315, 1959, 2329, 3394, 4659, 5221, 5815, 7099, 8146, 8511, 10869, 16449, 21979, 23181, 23794, 25681, 26326, 31774, 33949, 35439, 36961, 38515, 40101, 43369, 45051, 48511, 50289, 52099, 54874

Offset: 1

Jonathan Vos Post, Nov 05 2005

This sequence, A113692, contains semiprimes from the center straight left along the x-axis in the semiprime spiral of A113688-A113689. A113690 contains semiprimes from the center straight right along the x-axis in the semiprime spiral. A113691 contains semiprimes from the center straight down the y-axis in the semiprime spiral. A113693 contains semiprimes from the center straight up the y-axis in the semiprime spiral.

			a(4) = 4*9^2 - 7*9 + 4 = 265 = 5 * 53.
a(5) = 4*10^2 - 7*10 + 4 = 334 = 2 * 167.
a(6) = 4*11^2 - 7*11 + 4 = 411 = 3 * 137.
a(4), a(5) and a(6) are horizontally adjacent in the semiprime spiral, hence part of a clump and not isolated semiprimes as in A113688. a(9), a(10) and a(11) are another such horizontal string of 3 adjacent semiprimes.
a(46) = 4*151^2 - 7*151 + 4 = 90151 = 17 * 5303 is the greatest member under 10^5 (it is coincidence that this integer ends, base 10, with the same 151 that is the index of the quadratic).

Vincenzo Librandi, Table of n, a(n) for n = 1..1000

Cf. A001358, A054567, A113688-A113699.

IsSemiprime:= func; [s: n in [2..120] | IsSemiprime(s) where s is 4*n^2 - 7*n + 4]; // Vincenzo Librandi, Sep 22 2012

Select[Table[4*n^2 - 7*n + 4, {n, 200}], PrimeOmega[#] == 2&] (* Vincenzo Librandi, Sep 22 2012 *)

{a(n)} = Intersection of A001358 and A054567. Semiprimes of the form 4*k^2 - 7*k + 4.

A113698 Combinatorial sequence. Begin with 1 then 2 then 12 then 3 then all concatenations of all sizes of 1,2 and 3, then 4, then all concatenations of all sizes of 1,2,3,4 not included earlier etc.

Original entry on oeis.org

1, 2, 12, 3, 13, 23, 123, 4, 14, 24, 34, 124, 134, 234, 1234, 5, 15, 25, 35, 45, 125, 135, 145, 235, 245, 345, 1235, 1245, 1345, 2345, 12345, 6, 16, 26, 36, 46, 56, 126, 136, 146, 156, 236, 246, 256, 346, 356, 456, 1236, 1246, 1256, 1346, 1356, 1456, 2346, 2356

Offset: 1

Amarnath Murthy, Nov 11 2005

The index of n is 2^n for n<10. After 9 if n ( like 13, 23) has appeared earlier it will not appear but it will be used in the concatenation at its turn as mentioned above. needs better description.

The sequence contains groups of integers generated from seeds s=1,2,3,4,... A group is the sorted list of numbers defined by the seed and all concatenations of integers of previous groups with the seed, discarding any duplicates. - R. J. Mathar, Aug 31 2007

			The group 4, 14, 24, 34, 124, 134, 234, 1234 is generated from the seed s=4 itself and attaching s=4 to the previous elements 1, 2, 12, 3, 13, 23, 123, that is 14, 24, 124, 34, 134, 234, 1234, then sorting within the group (moving 34 between 24 and 124).

T. D. Noe, Table of n, a(n) for n = 1..511

Cf. A113699.

Flatten[Table[FromDigits /@ Complement[Subsets[Range[n]], Subsets[Range[n - 1]]], {n, 5}]] (* T. D. Noe, Feb 22 2012 *)

More terms from R. J. Mathar, Aug 31 2007

cp's OEIS Frontend

A113693 Semiprimes in A054556.

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A113690 Semiprimes in A054552.

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A113691 Semiprimes in A033951.

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A113692 Semiprimes in A054567.

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A113698 Combinatorial sequence. Begin with 1 then 2 then 12 then 3 then all concatenations of all sizes of 1,2 and 3, then 4, then all concatenations of all sizes of 1,2,3,4 not included earlier etc.

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