Index to OEIS: Section Mu

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Mu Torere: A005655
mu(n): A008683*
mu(n): see Moebius function
MU-numbers: A007335
mult: keyword meaning multiplicative, that is, a(m*n) = a(m)*a(n) whenever g.c.d.(m,n) = 1
multifactorial numbers: A000142, A006882, A007661, A007662, A085157, A085158, A114799, A114800, A114806.
multigraphs, sequences related to :

multigraphs: (1) A000421, A001374, A001399, A002620, A003082, A004102, A004104, A004105, A005965, A005966, A007717, A014395

multigraphs: (2) A014396, A014397, A014398, A020554, A020555, A020556, A020557, A020558, A020559, A020560, A020561, A020562

multigraphs: (3) A020563, A020564, A020565, A050531, A050532, A050535, A050927, A050929, A050930, A052107, A052108, A052111

multigraphs: (4) A052112, A052113, A052114, A052151, A052152, A052170, A052171, A053400, A053420, A053421, A053465, A053466

multigraphs: (5) A053467, A053468, A053513, A053514, A053515, A053516, A053517, A053588, A063841*, A063842, A063843

Multinomial coefficients:: A005651
multiplication table: A003991*
Multiplication-cost:: A005766
Multiplicative encodings:: A007280, A007188, A007190, A007189, A007338
multiplicative means that a(m*n) = a(m)*a(n) whenever g.c.d.(m,n) = 1
multiplicative order , sequences related to :

multiplicative order of 2 mod n, ord(2,n): A002326

multiplicative order of 10 mod n: A002329, A007732, A070682, A084680, A216415

multiplicative order of m mod n, ord(m, n) where GCD(n,m)=1: A002326, A053446, A053447, A053448, A053449, A053450, A053451, A053452, A053453, A054711

multiplicative order of m mod n, ord(m,n), sequences related to: (1) A037226, A046932, A053006, A053453

multiplicative order of m mod n, ord(m,n), sequences related to: (2) A057764, A059499, A059885, A059886, A059887, A059888, A059889, A059890, A059891, A059892, A059907, A059908

multiplicative order of m mod n, ord(m,n), sequences related to: (3) A059909, A059910, A059911

multiplicative, completely , sequences related to :

multiplicative, completely (00): means that a(m*n) = a(m)*a(n) for all m and n >= 1

multiplicative, completely (01): A000004, A000007, A000012, A000027, A000035, A000265, A000290, A000578, A000583, A000584, A001014, A001015, A001016, A001017, A001477, A003958, A003959, A003960

multiplicative, completely (02): A003961, A003962, A003963, A003964, A003965, A006519, A008454, A008455, A008456, A008836, A010801, A010802, A010803, A010804, A010805, A010806, A010807, A010808

multiplicative, completely (03): A010809, A010810, A010811, A010812, A010813, A011582, A011583, A011584, A011585, A011586, A011587, A011588, A011589, A011590, A011591, A011558, A011592, A011593

multiplicative, completely (04): A011594, A011595, A011596, A011597, A011598, A011599, A011600, A011601, A011602, A011603, A011604, A011605, A011606, A011607, A011608, A011609, A011610, A011611

multiplicative, completely (05): A011612, A011613, A011614, A011615, A011616, A011617, A011618, A011619, A011620, A011621, A011622, A011623, A011624, A011625, A011626, A011627, A011628, A011629

multiplicative, completely (06): A011630, A011631, A028310, A034947, A036987, A038500, A038502, A055975, A057427, A060904, A061109, A061142, A061898, A063524, A064553, A064558, A064614, A064988

multiplicative, completely (07): A064989, A065330, A065331, A065332, A065333, A065338, A065371, A065372, A066260, A066261, A071785, A071786, A072010, A072012, A072026, A072027, A072028, A072029

multiplicative, completely (08): A072084, A072085, A072087, A072436, A072438, A072963, A079065, A079579, A079707, A080891, A086299, A089081, A091684, A091685, A091703, A093709, A098108, A101455

multiplicative, completely (09): A102440, A102441, A108548, A108951, A112347, A113175, A120119, A122261, A123667, A122968-A122971

multiplicative, strongly: see multiplicative, completely
multiplicative, totally: see multiplicative, completely
multiplicatively perfect numbers: A007422*
multiply-perfect numbers: A007539*, A007691*
Multiset: A008284 (of A000012), A337009 (of A000045), A033185 (of A000081), A050535 (of A076864), A061260 (of A000041), A089353 (of A000027), A095133 (of A000055), A191970 (of A053419), A201922 (of A001349), A209406 (of A000079), A263864 (of A000608), A271878 (of A038055), A271879 (of A038059), A275414 (of A000244), A275416 (of A110654), A275420 (of A005177), A275421 (of A002905), A275431 (of A000108), A275744 (of A002851), A281446 (of A086345), A342770 (of A126120) A371305 (of A054499)
music, sequences related to : (see also: The multi-faceted reach of the OEIS#Music)

music: Beethoven: A001491, A054245, A123456, A144488

music, drumming: A130198, A132376

music: Evangelist's Series: A001060

music: Mozart: A064172, A027884, A027885

music: Norgard, Per: A004718*, A005811, A073334, A083866, A135564, A135567, A135689, A135690, A135692, A136004

music: scales: A071831/A071832, A071833 ; A131062, A131071 (Pythagorean scale)

mutinous numbers: A027854
mutually orthogonal Latins squares, see Latin squares, mutually orthogonal
M\"{o}bius: see Moebius function
M\'{e}nage: see permutations, menage and polynomials, menage

• This is a section of the Index to the OEIS®.
• For further information see the main Index to OEIS page.
• Please read Index: Instructions For Updating Index to OEIS before making changes to this page.
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