A274680 -id:A274680 - cp's OEIS frontend

A274756 Values of n such that 2n+1 and 6n+1 are both triangular numbers.

0, 945, 13167, 35578242, 495540990, 1338951572595, 18649189618605, 50390103447476100, 701843601611053692, 1896381151803363988917, 26413182084381205040235, 71368408216577696911440390, 994033693861758668873164410, 2685878672926303893761783662455

Offset: 1

Colin Barker, Jul 04 2016

Intersection of A074377 and A274757.

			945 is in the sequence because 2*945+1 = 1891, 6*945+1 = 5671, and 1891 and 5671 are both triangular numbers.

Colin Barker, Table of n, a(n) for n = 1..400
Index entries for linear recurrences with constant coefficients, signature (1,37634,-37634,-1,1).

Cf. A124174 (2*n+1 and 9*n+1), A274579 (2*n+1 and 5*n+1), A274603 (2*n+1 and 3*n+1), A274680 (2*n+1 and 4*n+1).

isok(n) = ispolygonal(2*n+1, 3) && ispolygonal(6*n+1, 3)

concat(0, Vec(63*x^2*(15+194*x+15*x^2)/((1-x)*(1-194*x+x^2)*(1+194*x+x^2)) + O(x^20)))

G.f.: 63*x^2*(15+194*x+15*x^2) / ((1-x)*(1-194*x+x^2)*(1+194*x+x^2)).

a(n) = a(n-1)+37634*a(n-2)-37634*a(n-3)-a(n-4)+a(n-5). - Wesley Ivan Hurt, Apr 24 2021

A274832 Values of n such that 2n+1 and 7n+1 are both triangular numbers (A000217).

Original entry on oeis.org

0, 27, 297, 24570, 267030, 22064157, 239792967, 19813588740, 215333817660, 17792580624687, 193369528466037, 15977717587380510, 173645621228683890, 14347972600887073617, 155933574493829667507, 12884463417879004727880, 140028176249837812737720

Offset: 1

Colin Barker, Jul 08 2016

Intersection of A074377 and A274830.

			27 is in the sequence because 2*27+1 = 55, 7*27+1 = 190, and 55 and 190 are both triangular numbers.

Colin Barker, Table of n, a(n) for n = 1..650
Index entries for linear recurrences with constant coefficients, signature (1,898,-898,-1,1).

Cf. A000217, A074377, A274830.

Cf. A124174 (2*n+1 and 9*n+1), A274579 (2*n+1 and 5*n+1), A274603 (2*n+1 and 3*n+1), A274680 (2*n+1 and 4*n+1), A274756 (2*n+1 and 7*n+1).

LinearRecurrence[{1, 898, -898, -1, 1}, {0, 27, 297, 24570, 267030}, 20] (* Paolo Xausa, Oct 21 2024 *)

isok(n) = ispolygonal(2*n+1, 3) && ispolygonal(7*n+1, 3)

concat(0, Vec(27*x^2*(1+10*x+x^2)/((1-x)*(1-30*x+x^2)*(1+30*x+x^2)) + O(x^20)))

G.f.: 27*x^2*(1+10*x+x^2) / ((1-x)*(1-30*x+x^2)*(1+30*x+x^2)).

A279042 Numbers k such that 2k+1 and 10k+1 are both triangular numbers (A000217).

Original entry on oeis.org

4455, 30537, 461938302, 3166172226, 47894687058501, 328275068740587, 4965816943137597372, 34036215673995404100, 514865832250497683700195, 3528942913182916419190605, 53382319214430283898266055610, 365887859090594924500524938502

Offset: 1

Colin Barker, Dec 04 2016

			4455 is in the sequence because 2*4455+1 = 8911 and 10*4455+1 = 44551 are both triangular numbers.

Colin Barker, Table of n, a(n) for n = 1..350
Index entries for linear recurrences with constant coefficients, signature (1,103682,-103682,-1,1).

Cf. A000217, A124174, A274579, A274603, A274680, A274756, A274832.

LinearRecurrence[{1, 103682, -103682, -1, 1}, {4455, 30537, 461938302, 3166172226, 47894687058501}, 20] (* Vincenzo Librandi, Dec 05 2016 *)

Vec(81*x*(55 + 322*x + 55*x^2) / ((1 - x)*(1 - 322*x + x^2)*(1 + 322*x + x^2)) + O(x^15))

isok(k) = ispolygonal(2*k+1, 3) & ispolygonal(10*k+1, 3)

a(n) = a(n-1) + 103682*a(n-2) - 103682*a(n-3) - a(n-4) + a(n-5) for n>5.

G.f.: 81*x*(55 + 322*x + 55*x^2) / ((1 - x)*(1 - 322*x + x^2)*(1 + 322*x + x^2)).

A279043 Numbers k such that 3k+1 and 4k+1 are both triangular numbers (A000217).

Original entry on oeis.org

63, 12285, 2383290, 462346038, 89692748145, 17399930794155, 3375496881317988, 654828995044895580, 127033449541828424595, 24643834382119669475913, 4780776836681674049902590, 927446062481862646011626610, 179919755344644671652205659813

Offset: 1

Colin Barker, Dec 04 2016

			63 is in the sequence because 3*63+1 = 190 and 4*63+1 = 253 are both triangular numbers.

Colin Barker, Table of n, a(n) for n = 1..400
Index entries for linear recurrences with constant coefficients, signature (195,-195,1).

Cf. A000217, A274680.

Vec(63*x / ((1 - x)*(1 - 194*x + x^2)) + O(x^20))

isok(k) = ispolygonal(3*k+1, 3) & ispolygonal(4*k+1, 3)

a(n) = 195*a(n-1) - 195*a(n-2) + a(n-3) for n>3.

G.f.: 63*x / ((1 - x)*(1 - 194*x + x^2)).

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A274756 Values of n such that 2*n+1 and 6*n+1 are both triangular numbers.

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A274832 Values of n such that 2*n+1 and 7*n+1 are both triangular numbers (A000217).

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A279042 Numbers k such that 2*k+1 and 10*k+1 are both triangular numbers (A000217).

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A279043 Numbers k such that 3*k+1 and 4*k+1 are both triangular numbers (A000217).

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A274756 Values of n such that 2n+1 and 6n+1 are both triangular numbers.

A274832 Values of n such that 2n+1 and 7n+1 are both triangular numbers (A000217).

A279042 Numbers k such that 2k+1 and 10k+1 are both triangular numbers (A000217).

A279043 Numbers k such that 3k+1 and 4k+1 are both triangular numbers (A000217).