# WordCount: how inefficient is McIlroy's solution?

Long story short: in 1986 an interviewer asked Donald Knuth to write a program that takes a text and a number N in input, and lists the N most used words sorted by their frequencies. Knuth produced a 10-pages Pascal program, to which Douglas McIlroy replied with the following 6-lines shell script:

``````tr -cs A-Za-z '\n' |
tr A-Z a-z |
sort |
uniq -c |
sort -rn |
sed \${1}q
``````

Read the full story at http://www.leancrew.com/all-this/2011/12/more-shell-less-egg/ .

Of course they had very different goals: Knuth was showing his concepts of literate programming and built everything from scratch, while McIlroy used a few common UNIX utilities to achieve the shortest source code.

My question is: how bad is that?
(Purely from a runtime-speed point of view, since I'm pretty sure we all agree that 6 lines of code is easier to understand/maintain than 10 pages, literate programming or not.)

I can understand that `sort -rn | sed \${1}q` may not be the most efficient way to extract the common words, but what's wrong with `tr -sc A-za-z '\n' | tr A-Z a-z`? It looks pretty good to me. About `sort | uniq -c`, is that a terribly slow way to determine the frequencies?

A few considerations:

• `tr` should be linear time (?)
• `sort` I'm not sure of, but I'm assuming it's not that bad
• `uniq` should be linear time too
• spawning processes should be linear time (in the number of processes)

The `Unix` script has a few linear operations and 2 sorts. It will be calculation order `O(n log(n))`.
So Knuth could be faster. Certainly because the English dictionary has limited size. It could turn `log(n)` in some large constant, though maybe consuming a lot of memory.