Index to OEIS (Section Be)

Index to OEIS (Section Be)

[ Aa | Ab | Al | Am | Ap | Ar | Ba | Be | Bi | Bl | Bo | Br | Ca | Ce | Ch | Cl | Coa | Coi | Com | Con | Cor | Cu | Cy | Da | De | Di | Do | Ea | Ed | El | Eu | Fa | Fe | Fi | Fo | Fu | Ga | Ge | Go | Gra | Gre | Ha | He | Ho | Ia | In | J | K | La | Lc | Li | Lo | Lu | M | Mag | Map | Mat | Me | Mo | Mu | N | Na | Ne | Ni | No | Nu | O | Pac | Par | Pas | Pea | Per | Ph | Poi | Pol | Pos | Pow | Pra | Pri | Pro | Ps | Qua | Que | Ra | Rea | Rel | Res | Ro | Ru | Sa | Se | Si | Sk | So | Sp | Sq | St | Su | Sw | Ta | Te | Th | To | Tra | Tri | Tu | U | V | Wa | We | Wi | X | Y | Z | 1 | 2 | 3 | 4 | Up ]

Section Be

Beans-Don't-Talk: A005694 , A005695 , A005696 , A005697 , A005698
Beanstalk: A005692 , A005693
Beatty sequences (start):
Beatty sequences : for a constant c, the two Beatty sequences are the main sequence floor(n*c) and the complementary sequence floor(n*c') where c' = c/(c-1)).
Beatty sequences for: (n+1/2)/2 (A038707 ), (n+1/2)/4 (A038709 ), Feigenbaum's constant (A038123 ), Brun's constant (A038124 )
Beatty sequences for: (sqrt(5)+5)/2 (A003231 ), (1 + sqrt 3)/2 (A003511 ), sqrt 3 + 2 (A003512 ), (3+Sqrt[3])/2 (A054406 )
Beatty sequences for: 1+1/Pi (A059531 ), 1+Pi (A059532 ), 1+Catalan's constant (A059533 ), 1+1/Catalan's constant (A059534 )
Beatty sequences for: 1+gamma A001620 (A059555 ), 1+1/gamma (A059556 ), 1+gamma^2, (A059557 ), 1+1/gamma^2 (A059558 ), 1-ln(1/gamma), (A059559 ), 1-1/ln(1/gamma) (A059560 )
Beatty sequences for: 3/4, 2/5, 3/5, 2/7, 3/7, 4/7, 5/7, 3/8, 5/8, 5/13, 8/13, 8/21, 13/21, 7/19, 11/30 (A057353 -A057367 )
Beatty sequences for: 3^(1/3) (A059539 ), 3^(1/3)/(3^(1/3)-1) (A059540 ), 1+ln(2) (A059541 ), 1+1/ln(2) (A059542 ), ln(3) (A059543 ), ln(3)/(ln(3)-1) (A059544 )
Beatty sequences for: e (A022843 ), e/(e-1) (A054385 ), 1/(e-2) (A000062 ), 1/e (A032634 ), e-1 (A000210 ), e+1 (A000572 ), (e+1)/e (A006594 ), e^(1/e) (A037087 )
Beatty sequences for: e^gamma (A059565 ), e^gamma/(e^gamma-1) (A059566 ), 1-ln(ln(2)) (A059567 ), 1-1/ln(ln(2)) (A059568 )
Beatty sequences for: e^pi (A038152 ), pi^e (A038153 ), 2^sqrt(2) (A038127 ), Euler's gamma (A038128 ), 2^(1/3) (A038129 )
Beatty sequences for: Gamma(1/3) (A059551 ), Gamma(1/3)/(Gamma(1/3)-1) (A059552 ), Gamma(2/3) (A059553 ), Gamma(2/3)/(Gamma(2/3)-1) (A059554 )
Beatty sequences for: ln(10) (A059545 ), ln(10)/(ln(10)-1) (A059546 ), 1+1/ln(3) (A059547 ), 1+ln(3) (A059548 ), 1+1/ln(10) (A059549 ), 1+ln(10) (A059550 )
Beatty sequences for: ln(Pi) (A059561 ), ln(Pi)/(ln(Pi)-1) (A059562 ), e+1/e (A059563 ), (e^2+1)/(e^2-e+1) (A059564 )
Beatty sequences for: Pi (A022844 ), Pi/(Pi-1) (A054386 ), 1/Pi (A032615 ), pi^2 (A037085 ), sqrt(pi) (A037086 ), 2*pi (A038130 ), sqrt(2 pi) (A038126 )
Beatty sequences for: Pi^2/6, or zeta(2) (A059535 ), zeta(2)/(zeta(2)-1) (A059536 ), zeta(3) (A059537 ), zeta(3)/(zeta(3)-1) (A059538 )
Beatty sequences for: sqrt(2) (A001951 ), 2 + sqrt(2) (A001952 ), 1 + 1/sqrt(11) (A001955 ), 1 + sqrt(11) (A001956 )
Beatty sequences for: sqrt(3) (A022838 ), sqrt(5) (A022839 ), sqrt(6) (A022840 ), sqrt(7) (A022841 ), sqrt(8) (A022842 )
Beatty sequences for: sqrt(5) - 1 (A001961 ), sqrt(5) + 3 (A001962 ), 1+sqrt(2) (A003151 ), 1/(2-sqrt(2)) (A003152 )
Beatty sequences for: tau (A000201 ), tau^2 (A001950 ), tau^3 (A004976 ), tau^(4+n) (n=0..16) (A004919 +n)
Beatty sequences: references about: see especially A000201
Beatty sequences: see also (1) A014245 A014246 A022803 A022804 A022805 A022806 A022879 A022880 A023541 A023542 A045671 A045672
Beatty sequences: see also (2) A045681 A045682 A045749 A045750 A045774 A045775
Beethoven: A001491 , A054245
beginning with t: A006092 , A005224
Bell numbers: A000110 *
Bell numbers: see also A007311
bell ringing , sequences related to (start)
bell ringing: (1) A090277 A090278 A090279 A090280 A090281 A090282 A090283 A090284
bell ringing: (2) A057112 A060112 A060135
Bell's formula: A002575 , A002576
bending: see folding
Benford numbers: A004002 *
Benny, Jack: A056064
benzene: A000639
Berlekamp's switching game: A005311 *
Bernoulli numbers , sequences related to (start):
Bernoulli numbers B_n: A027641 **/A027642 *. A027641 has all the references, links and formulae.
Bernoulli numbers B_{2n}: A000367 */A002445 *, but see especially A027641
Bernoulli numbers (n+1)B_n: A050925 /A050932 , A002427 /A006955
Bernoulli numbers, generalized: A006568 , A006569 , A002678 , A002679
Bernoulli numbers, higher order: A001904 , A001905
Bernoulli numbers, irregularity index of primes: A061576 , A091888 , A007703 , A000928 , A091887 , A073276 , A073277 , A060975
Bernoulli numbers, numerators and their factorizations: (1) A000367 = numerators, A000928 = irregular primes, A001067 A001896 A002427 A002431 A002443 A002657 A007703 A017329 A027641 A027643
Bernoulli numbers, numerators and their factorizations: (2) A027645 A027647 A029762 A029764 A033470 A033474 A035078 A035112 A043295 A043303 A046988 A050925
Bernoulli numbers, numerators and their factorizations: (3) A053382 A060054 A067778 A068206 A068399 A068528 A069040 A069044 A070192 A070193 A071020 A071772
Bernoulli numbers, numerators and their factorizations: (4) A073276 A075178 A076547 A076549 A079294 = number of prime factors, A083687 A084217 A085092 A085737 A089170 A089644 A089655
Bernoulli numbers, numerators and their factorizations: (5) A090177 A090179 A090495 A090496 A090629 A090789 A090790 A090791 A090793 A090798 A090800 A090817
Bernoulli numbers, numerators and their factorizations: (6) A090818 A090823 A090825 A090865 A090943 = squareful numerators, A090947 = largest prime factor, A091216 A091888 A092132 A092133 A092194 A092195
Bernoulli numbers, numerators and their factorizations: (7) A092221 A092222 A092223 A092224 A092225 A092226 A092227 A092228 A092229 A092230 A092231 A092291
Bernoulli numbers, numerators and their factorizations: (8) A090997 A090987
Bernoulli numbers, poly-Bernouli numbers: A027643 A027644 A027645 A027646 A027647 A027648 A027649 A027650 A027651
Bernoulli numbers, see also (1): A000146 A000182 A000928 A001469 A001896 A001947 A002105 A002208 A002316 A002431 A002443 A002444
Bernoulli numbers, see also (2): A002657 A002790 A002882 A003245 A003264 A003272 A003326 A003414 A003457 A004193 A006863 A006953
Bernoulli numbers, see also (3): A006954 A014509 A020527 A020528 A020529 A029762 A029763 A029764 A029765 A030076 A033469 A033470
Bernoulli numbers, see also (4): A033471 A033473 A033474 A033475 A035077 A035078 A035112 A045979 A046094 A046968 A047680 A047681
Bernoulli numbers, see also (5): A047682 A047683 A047872 A051222 A051225 A051226 A051227 A051228 A051229 A051230
Bernoulli numbers, see also (6): A027762
Bernoulli numbers, triangles that generate: A051714 /A051715 , A085737 /A085738
Bernoulli polynomials, coefficients of: A053382 */A053383 *, A048998 *, A048999 *
Bernoulli polynomials, see also A001898 A002558 A020527 A020528 A020529 A020543 A020544 A020545 A020546
Bernstein squares: A097871
Berstel sequence: A007420 *
Bertrand's Postulate: A035250 *, A036378 , A006992 , A051501
Bessel function or Bessel polynomial , sequences related to (start):
Bessel function or Bessel polynomial: (1) A000134 A000155 A000167 A000175 A000249 A000275 A000331 A001880
Bessel function or Bessel polynomial: (2) A001881 A002190 A002506 A006040 A006041 A014401 A039699 A046960 A046961 A046962 A046963
Bessel function or Bessel polynomial: (3) A051148 A051149
Bessel functions: J_0: A002454 , J_1: A002474 , J_2: A002506 , J_3: A014401 , J_4: A061403 , J_5: A061404 , J_6: A061405 , J_7: A061407 , J_9: A061440 J_10: A061441
Bessel numbers: A006789 , A111924 , A100861
Bessel polynomial, coefficients of: A001497 , A001498
Bessel polynomial, defined: A001515 , A001497 , A001498
Bessel polynomial, values of: (1) A001515 , A001517 , A001518 , A065919 , A001514 , A065920 , A065921 , A065922 , A006199 , A065707 , A000806 , A002119
Bessel polynomial, values of: (2) A065923 , A001516 , A065944 , A065945 , A065946 , A065947 , A065948 , A065949 , A065950 , A065951
Bessel triangle: A001497 *, A000369 , A001498 , A011801 , A013988 , A004747 , A049403 , A065931 , A065943
betrothed numbers: A003502 *, A003503 *, A005276 *

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