A367823 -id:A367823 - cp's OEIS frontend

A272244 a(n) = Product_{k=0..n} (n^2 + k^2).

0, 2, 160, 21060, 4352000, 1313845000, 547573478400, 301758856490000, 212663770808320000, 186659516597629140000, 199722414913149440000000, 255947740845844788169000000, 387074162712817024892928000000, 682170272459193898736228210000000

Offset: 0

Vaclav Kotesovec, Apr 23 2016

Cf. A126804, A272246, A272247, A272248, A367823, A367833.

Cf. A101686, A272180, A323540, A324403.

Table[Product[n^2+k^2,{k,0,n}],{n,0,15}]

a(n) ~ 2^(n + 1/2) * n^(2*(n+1)) / exp((4-Pi)*n/2).

A324439 a(n) = Product_{i=1..n, j=1..n} (i^6 + j^6).

Original entry on oeis.org

1, 2, 1081600, 528465082730906880000, 29276520893554373473343522853366005760000000000, 5719545329208791496596894540018824083491259163047733746620041978183680000000000000000

Offset: 0

Vaclav Kotesovec, Feb 28 2019

nonn

Cf. A079478, A324403, A324426, A324437, A324438, A324440, A367834.

Cf. A367668, A367823.

a:= n-> mul(mul(i^6 + j^6, i=1..n), j=1..n):
seq(a(n), n=0..5);  # Alois P. Heinz, Nov 26 2023

Table[Product[i^6 + j^6, {i, 1, n}, {j, 1, n}], {n, 1, 6}]

from math import prod, factorial
def A324439(n): return (prod(i**6+j**6 for i in range(1,n) for j in range(i+1,n+1))*factorial(n)**3)**2<Chai Wah Wu, Nov 26 2023

a(n) ~ c * 2^(n*(n+1)) * (2 + sqrt(3))^(sqrt(3)*n*(n+1)) * exp(Pi*n*(n+1) - 9*n^2) * n^(6*n^2 - 3/2), where c = 0.104143806044091748191387307161835081649...
a(n) = A324403(n) * A367668(n). - Vaclav Kotesovec, Dec 01 2023
For n>0, a(n)/a(n-1) = A367823^2 / (2*n^18). - Vaclav Kotesovec, Dec 02 2023

a(n)=1 prepended by Alois P. Heinz, Nov 26 2023

A272246 a(n) = Product_{k=0..n} (n^3 + k^3).

Original entry on oeis.org

0, 2, 1152, 1428840, 3488808960, 15044494500000, 105235903511101440, 1119277024472896248960, 17216259547948971039129600, 368066786222106315186876633600, 10591209807103301277597696000000000, 399472472359100444604916002033020774400

Offset: 0

Vaclav Kotesovec, Apr 23 2016

Cf. A126804, A272244, A272247, A272248, A367823, A367833.

Cf. A255433, A323541, A324426.

Table[Product[n^3+k^3,{k,0,n}],{n,0,12}]

a(n) ~ 2^(2*n + 1/2) * n^(3*n + 3) / exp((3 - Pi/sqrt(3))*n).

A272247 a(n) = Product_{k=0..n} (n^4 + k^4).

Original entry on oeis.org

0, 2, 8704, 104372388, 3087748038656, 194985808028125000, 23467500289618753093632, 4938279594477505466022892304, 1699491802948673617630927695904768, 907214902722906584628050661111614570016, 719684491044699824651608981274624000000000000

Offset: 0

Vaclav Kotesovec, Apr 23 2016

Cf. A126804, A272244, A272246, A272248, A367823, A367833.

Cf. A255434, A323542.

Table[Product[n^4+k^4,{k,0,n}],{n,0,10}]

a(n) ~ 2^(n+1/2) * (1+sqrt(2))^(sqrt(2)*n) * n^(4*n + 4) / exp((4 - Pi/sqrt(2))*n).

A272248 a(n) = Product_{k=0..n} (n^5 + k^5).

Original entry on oeis.org

0, 2, 67584, 7924375800, 2876035930521600, 2693451205324687500000, 5648896640332217707816550400, 23819277009290664033936067933468800, 185754160490281505676324140907107450880000, 2507604631016507710974687639612411760216253760000

Offset: 0

Vaclav Kotesovec, Apr 23 2016

In general, for p>=1, Product_{k=0..n} (n^p + k^p) ~ sqrt(2) * n^(p*(n+1)) * exp(n*Sum_{j>=1} (-1)^(j+1) / (j*(1 + j*p))).

Cf. A126804, A272244, A272246, A272247, A367823, A367833.

Cf. A255435, A323543, A324438.

Table[Product[n^5+k^5,{k,0,n}],{n,0,10}]

a(n) ~ 2^(2*n+1/2) * phi^(sqrt(5)*n) * n^(5*n+5) / exp((5-sqrt(phi)*Pi/5^(1/4))*n), where phi = A001622 = (1+sqrt(5))/2 is the golden ratio.

A367833 a(n) = Product_{k=0..n} (n^8 + k^8).

Original entry on oeis.org

0, 2, 33685504, 3851231199376068, 2670340833224951538384896, 8442437541556000328575439453125000, 96982590530284083757788173242580213780447232, 3406021755102121469537208768079471859185253483110025744

Offset: 0

Vaclav Kotesovec, Dec 02 2023

nonn

Cf. A126804, A272244, A272246, A272247, A272248, A367823.

Cf. A367834.

Table[Product[n^8 + k^8, {k, 0, n}], {n, 0, 10}]

a(n) ~ 2^(n + 1/2) * ((2 + sqrt(2 + sqrt(2)))/(2 - sqrt(2 + sqrt(2))))^(sqrt(2 + sqrt(2))*n/2) * (sqrt(2) - 1 + sqrt(4 - 2*sqrt(2)))^(sqrt(2 - sqrt(2))*n) * exp((Pi/sqrt(2 - sqrt(2)) - 8)*n) * n^(8*(n + 1)).

cp's OEIS Frontend

A272244 a(n) = Product_{k=0..n} (n^2 + k^2).

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A324439 a(n) = Product_{i=1..n, j=1..n} (i^6 + j^6).

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A272246 a(n) = Product_{k=0..n} (n^3 + k^3).

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A272247 a(n) = Product_{k=0..n} (n^4 + k^4).

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A272248 a(n) = Product_{k=0..n} (n^5 + k^5).

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A367833 a(n) = Product_{k=0..n} (n^8 + k^8).

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