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I would like to get the number of different values found in a List.

For example:

The output for the List a={1,2,3,4,5} would be 5 whereas it would be 2 for b={1,1,1,2,2}.

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3 Answers 3

up vote 12 down vote accepted

Just for amusement, all the following commands also give the desired result:

Length@Gather@l

Length@Union@l

Length@Tally@l

Count[BinCounts@l, Except@0]

Count[BinLists@l, Except@{}]

Length@Split@Sort@l

Length@GatherBy[l, # &]

Length@Split@SortBy[l, # &]

And many more, of course.

Edit

Here is a little timing experiment (not serious)

l = RandomInteger[{1, 10^2}, 10^7];
t2[x_] := {Timing[x], ToString[HoldForm@x]};
SetAttributes[t2, HoldAll]
Grid[Reverse /@
  {t2[Length@DeleteDuplicates[l]],
   t2[Length@Tally[l]],
   t2[Length@Gather[l]],
   t2[Count[BinCounts[l], Except@0]],
   t2[Length@Union[l]],
   t2[Length@Split@Sort@l],
   t2[Count[BinLists[l], Except@0]]},
 Frame -> All]

enter image description here

BTW: Note the difference between BinLists[ ] and BinCounts[ ]

Edit

A more detailed view of DeleteDuplicates vs Tally

t = Timing;
ListLinePlot@Transpose@
  Table[l = RandomInteger[{1, 10^i}, 10^7];
   {Log@First@t@Length@DeleteDuplicates@l,
    Log@First@t@Length@Tally@l},
   {i, Range[7]}]

Beware! Log Plot!

enter image description here

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Thank you Belisarius ! What would be your favorite ? Fastest ? –  500 May 27 '11 at 20:29
    
@500 As it was mentioned before,DeleteDuplicates[ ] is the fastest AFAIK. These are just for showing to the OP some other ways to do the same. –  belisarius May 27 '11 at 20:32
1  
@500 See edit, please –  belisarius May 27 '11 at 22:45
1  
@Belisarius : This is impressive. I also discover that very elegant HoldForm, thank you. –  500 May 28 '11 at 1:56
1  
@500 Changed HoldForm to ToString for code brevity –  belisarius May 28 '11 at 4:38

Use DeleteDuplicates (or Union in older versions) to remove duplicate elements. You can then count the elements in the returned list.

In[8]:= Length[DeleteDuplicates[a]]
Out[8]= 5

In[9]:= Length[DeleteDuplicates[b]]
Out[9]= 2
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Length[DeleteDuplicates[a]]

would do the trick. Depending on what else you're going to do, you could use Union or Tally instead of DeleteDuplicates.

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5  
It may be good to note that DeleteDuplicates can be 20 times as fast as Union. Union returns a sorted list whereas DeleteDuplicates keeps the resulting values in their original order. –  Sjoerd C. de Vries May 27 '11 at 16:10
    
Thank You Brett ! –  500 May 27 '11 at 16:11
    
@Sjoerd, great point. It can be far more, if the list is mostly duplicates. Try: RandomInteger[999, 150000]. –  Mr.Wizard May 27 '11 at 18:27
2  
@Sjoerd, @Mr.Wizard What you observed is entirely due to the packed nature of the data on which this is so. If we take @Mr's example rnd = RandomInteger[999, 150000]; and do rnd[[100000]] = 1/2;, and then do the benchmarks, DeleteDuplicates is still faster but only by a factor of 3 or so, which is probably due to its linear complexity as compared to the n log n complexity of Union. –  Leonid Shifrin May 29 '11 at 10:05

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