### Percentile based on count of items

```
a = [1,2,3,4,5,6,10,11,12,13,14,15,20,30,40,50,60,61,91,99,120]
def percentile_by_count(array,percentile)
count = (array.length * (1.0-percentile)).floor
array.sort[-count..-1]
end
# 80th percentile (21 items*80% == 16.8 items are below; pick the top 4)
p percentile_by_count(a,0.8) #=> [61, 91, 99, 120]
```

### Percentile based on range of values

```
def percentile_by_value(array,percentile)
min, max = array.minmax
range = max - min
min_value = (max-min)*percentile + min
array.select{ |v| v >= min_value }
end
# 80th percentile (119 * 80% = 95.2; pick values above this)
p percentile_by_value(a,0.8) #=> [99, 120]
```

^{Interestingly, Excel's PERCENTILE function returns 60 as the first value for the 80th percentile. If you want this result—if you want an item falling on the cusp of the limit to be included— then change the .floor above to .ceil.}

"There is no standard definition of percentile..."and that includes three+ ways of calculating it? – Phrogz Aug 2 '12 at 20:28