Sequences
392,541 sequences
- Continued fraction for cube root of 83.A010311
Continued fraction for cube root of 83.
- Continued fraction for cube root of 84.A010312
Continued fraction for cube root of 84.
- Continued fraction for cube root of 85.A010313
Continued fraction for cube root of 85.
- Continued fraction for cube root of 86.A010314
Continued fraction for cube root of 86.
- Continued fraction for cube root of 87.A010315
Continued fraction for cube root of 87.
- Continued fraction for cube root of 88.A010316
Continued fraction for cube root of 88.
- Continued fraction for cube root of 89.A010317
Continued fraction for cube root of 89.
- Continued fraction for cube root of 90.A010318
Continued fraction for cube root of 90.
- Continued fraction for cube root of 91.A010319
Continued fraction for cube root of 91.
- Continued fraction for cube root of 92.A010320
Continued fraction for cube root of 92.
- Continued fraction for cube root of 93.A010321
Continued fraction for cube root of 93.
- Continued fraction for cube root of 94.A010322
Continued fraction for cube root of 94.
- Continued fraction for cube root of 95.A010323
Continued fraction for cube root of 95.
- Continued fraction for cube root of 96.A010324
Continued fraction for cube root of 96.
- Continued fraction for cube root of 97.A010325
Continued fraction for cube root of 97.
- Continued fraction for cube root of 98.A010326
Continued fraction for cube root of 98.
- Continued fraction for cube root of 99.A010327
Continued fraction for cube root of 99.
- Continued fraction for cube root of 100.A010328
Continued fraction for cube root of 100.
- Expressible as C(m,3) + C(n,3) in at least 3 ways.A010329
Expressible as C(m,3) + C(n,3) in at least 3 ways.
- Numbers k such that C(k,3) = C(x,3) + C(y,3) is solvable.A010330
Numbers k such that C(k,3) = C(x,3) + C(y,3) is solvable.
- Numbers that are expressible as C(m,5) + C(n,5) in at least 2 ways.A010331
Numbers that are expressible as C(m,5) + C(n,5) in at least 2 ways.
- Consider integers z such that C(z,4) = C(x,4) + C(y,4), x >= y >= 4, is solvable. Sequence gives values of x.A010332
Consider integers z such that C(z,4) = C(x,4) + C(y,4), x >= y >= 4, is solvable. Sequence gives values of x.
- Length of period of continued for sqrt(A003814(n)).A010333
Length of period of continued for sqrt(A003814(n)).
- Maximal size of binary code of length n and asymmetric distance 4.A010334
Maximal size of binary code of length n and asymmetric distance 4.
- Central term in continued fraction for sqrt(n) is [ sqrt(n) ].A010335
Central term in continued fraction for sqrt(n) is [ sqrt(n) ].
- Maximal size of binary code of length n and asymmetric distance 5.A010336
Maximal size of binary code of length n and asymmetric distance 5.
- Numbers k such that the continued fraction for sqrt(k) has period 5.A010337
Numbers k such that the continued fraction for sqrt(k) has period 5.
- Numbers k such that the continued fraction for sqrt(k) has period 7.A010338
Numbers k such that the continued fraction for sqrt(k) has period 7.
- Numbers k such that the continued fraction for sqrt(k) has period 9.A010339
Numbers k such that the continued fraction for sqrt(k) has period 9.
- Sum of terms in period of continued fraction for sqrt(n).A010340
Sum of terms in period of continued fraction for sqrt(n).
- Sum of all terms except last in period of continued fraction for sqrt(n).A010341
Sum of all terms except last in period of continued fraction for sqrt(n).
- Numbers k such that all terms in the periodic part of the continued fraction for sqrt(k) except the final term are 1.A010342
Numbers k such that all terms in the periodic part of the continued fraction for sqrt(k) except the final term are 1.
- Base-4 Armstrong or narcissistic positive numbers.A010343
Base-4 Armstrong or narcissistic positive numbers.
- Base-4 Armstrong or narcissistic numbers (written in base 10).A010344
Base-4 Armstrong or narcissistic numbers (written in base 10).
- Base-5 Armstrong or narcissistic numbers, written in base 5.A010345
Base-5 Armstrong or narcissistic numbers, written in base 5.
- Base-5 Armstrong or narcissistic numbers (written in base 10).A010346
Base-5 Armstrong or narcissistic numbers (written in base 10).
- Base-6 Armstrong or narcissistic numbers, written in base 6.A010347
Base-6 Armstrong or narcissistic numbers, written in base 6.
- Base-6 Armstrong or narcissistic numbers (written in base 10).A010348
Base-6 Armstrong or narcissistic numbers (written in base 10).
- Base-7 Armstrong or narcissistic numbers, written in base 7.A010349
Base-7 Armstrong or narcissistic numbers, written in base 7.
- Base-7 Armstrong or narcissistic numbers (written in base 10).A010350
Base-7 Armstrong or narcissistic numbers (written in base 10).
- Base-8 Armstrong or narcissistic numbers, written in base 8.A010351
Base-8 Armstrong or narcissistic numbers, written in base 8.
- Base-9 Armstrong or narcissistic numbers, written in base 9.A010352
Base-9 Armstrong or narcissistic numbers, written in base 9.
- Base-9 Armstrong or narcissistic numbers (written in base 10).A010353
Base-9 Armstrong or narcissistic numbers (written in base 10).
- Base-8 Armstrong or narcissistic numbers (written in base 10).A010354
Base-8 Armstrong or narcissistic numbers (written in base 10).
- Number of unlabeled nonseparable (or 2-connected) graphs (or blocks) with n edges.A010355
Number of unlabeled nonseparable (or 2-connected) graphs (or blocks) with n edges.
- Triangle of single-edge stars with n edges by cyclotomic index.A010356
Triangle of single-edge stars with n edges by cyclotomic index.
- Number of unlabeled nonseparable (or 2-connected) loopless multigraphs with n edges.A010357
Number of unlabeled nonseparable (or 2-connected) loopless multigraphs with n edges.
- Triangle of multi-edge stars with n edges by cyclotomic index.A010358
Triangle of multi-edge stars with n edges by cyclotomic index.
- Number of rooted multi-edge stars with n edges.A010359
Number of rooted multi-edge stars with n edges.
- Triangle of rooted multi-edge stars with n edges by degree of root.A010360
Triangle of rooted multi-edge stars with n edges by degree of root.