LCM , sequences related to (start):
LCM of binomial coefficients: A002944
LCM(x,y): A003990 *, A051173 *, A000793 *, A003418 *, A048691 *
LCM: see also A002944 , A007463 , A006580 , A051426 , A051193 , A048619 , A048671 , A045948 , A025557 , A025556 , A025527 , A025558 , A034890 , A035105 , A049073
LCM: the canonical spelling for "least common divisor" in the OEIS is LCM (not lcm) (except of course in Maple and PARI lines)
lcm: the canonical spelling for "least common divisor" in the OEIS is LCM (not lcm) (except of course in Maple and PARI lines)
LCM{1,2,...,n}: A003418 *, A002944
LCM{1,3,5,...,2n+1}: A025547 *
least common multiple: see entries under LCM
least k such that the remainder when X^k is divided by k is n where X = 2..32 , sequences related to (start):
least k such that the remainder when X^k is divided by k is n where X = 2..32 (01): A036236 , A078457 , A119678 , A119679 , A127816 , A119715 , A119714 , A127817 , A127818 , A127819 , A127820 , A127821 ,
least k such that the remainder when X^k is divided by k is n where X = 2..32 (02): A128154 , A128155 , A128156 , A128157 , A128158 , A128159 , A128160 , A128361 , A128362 , A128363 , A128364 , A128365 ,
least k such that the remainder when X^k is divided by k is n where X = 2..32 (03): A128366 , A128367 , A128368 , A128369 , A128370 , A128371 , A128372 ,
least k such that the remainder when X^k is divided by k is n where X = 2..32 (04): see also: A126762
Least number of powers to represent n:: A002828 , A002377 , A151925
least significant bit (lsb): A000035
Leech , sequences related to (start):
Leech lattice, odd: A027859 *
Leech lattice, shorter: A004537 *, A029754 *
Leech lattice, theta series of: A008408 *
Leech lattice: see also A001942 , A004034 , A029754
Leech triangle: A001293 *
Leech's path-labeling problem: A034470 *
Leech's path-labeling problem: see also Golomb rulers
Leech's tree-labeling problem: A007187 *
left factorials: A003422 *
left factorials: see also factorial numbers
Legendre , sequences related to (start):
Legendre polynomials:: A008316 *, A001797 , A001798 , A001801 , A002461 , A001796 , A001800 , A002463 , A001802 , A001795 , A001799 , A006750 , A002462
Legendre's conjecture: A007491 , A014085 , A053000 , A053001
LEGO blocks, sequences related to (start):
LEGO blocks: A007575 , A007576
Lehmer's constant: A002665 *, A030125 *, A002794 */A002795 *, A002065
Lehmer's polynomial: A070178
Leibniz's triangle: see harmonic triangle of Leibniz
lemniscate function, or Weierstrass P-function: A002306 */A047817 *, A002770
Lemoine's conjecture: A046927
length of n in binary: A070939
Length of runs:: A000002 , A001250 , A001251 , A001252 , A001253 , A000303 , A000402 , A000434 , A000456 , A000467 , A000517
Leonardo logarithms: A001179
Les Marvin sequence: A007502
letters in n , sequences related to (start):
letters in n (in English): A005589 *, A006944
letters in n (in other languages) (1): A001050 (Finnish), A001368 (Irish Gaelic), A003078 (Danish), A006968 or A092196 (Roman numerals), A007005 or A006969 (French), A006994 (Russian), A007208 (German), A007292 (Hungarian), A007485 or A090589 (Dutch),
letters in n (in other languages) (2): A008962 (Polish), A010038 (Czech), A011762 (Spanish), A027684 (Hebrew, dotted), A051785 (Catalan), A026858 (Italian), A056597 (Serbian or Croatian), A057435 (Turkish), A132984 (Latin), A140395 (Hindi),
letters in n (in other languages) (3): A053306 (Galego), A057696 (Brazilian Portuguese), A057853 (Esperanto), A059124 (Swedish), A030166 , A112348 , A112349 and A112350 (Chinese), A030166 (Japanese Kanji), A140396 (Welsh), A140438 (Tamil)
letters in n (in other languages) (4): A014656 (Bokmal), A028292 (Nynorsk)
Levenshtein distance (1); A010097 , A080910 , A080950 , A081230 , A081355 , A081356 , A081732 , A083311 , A083381 , A091090 ,
Levenshtein distance (2); A091091 , A091092 , A091093 , A091110 , A091111 , A097720 , A097721 , A097722 , A106028 , A106432 ,
Levenshtein distance (3); A109378 , A109380 , A109382 , A109809 , A109811 , A115777 , A115778 , A115779 , A115780 , A118757 , A118763
Levine's sequence: A011784 *
Levy's conjecture: A046927