Lah number mathematics , the Lah numbers , discovered by Ivo Lah in 1954 , are coefficients expressing rising factorials in terms of falling factorials. They are also the coefficients of the th derivatives of.Unsigned Lah numbers have an interesting meaning in combinatorics: they count the number of ways a set of n elements can be partitioned into k nonempty linearly ordered subsets. Lah numbers are related to Stirling numbers .Signed Lah numbers :L is always n ! ; in the interpretation above, the only partition of into 1 set can have its set ordered in 6 ways:L corresponds to the 6 partitions with two ordered parts:L is always 1 since, e.g., partitioning into 3 non-empty subsets results in subsets of length 1.notation for Stirling numbers, it has been proposed to use the following alternative notation for Lah numbers:Rising and falling factorialsrising factorial and let represent the falling factorial .row of the table of values .Table of values Below is a table of values for the Lah numbers:1 2 3 4 5 6 7 8 9 10 11 12 1 1 - - - - - - - - - - - 2 2 1 - - - - - - - - - - 3 6 6 1 - - - - - - - - - 4 24 36 12 1 - - - - - - - - 5 120 240 120 20 1 - - - - - - - 6 720 1800 1200 300 30 1 - - - - - - 7 5040 15120 12600 4200 630 42 1 - - - - - 8 40320 141120 141120 58800 11760 1176 56 1 - - - - 9 362880 1451520 1693440 846720 211680 28224 2016 72 1 - - - 10 3628800 16329600 21772800 12700800 3810240 635040 60480 3240 90 1 - - 11 39916800 199584000 299376000 199584000 69854400 13970880 1663200 11880 4950 110 1 - 12 479001600 2634508800 4390848000 3293136000 1317254400 307359360 43908480 3920400 217800 7260 132 1
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