# Count number of alternations in a coin flip sequence

I have a sequence of ones and zeros and I would like to count the number of alternations. e.g.

``````x <- rbinom(10, 1, 1/2)
> x
[1] 0 0 1 1 1 1 1 0 1 0
``````

Thus I would like to count (in R) how many times the sequence alternates (or flips) from one to zero. In the above sequence the number of alternations (counted by hand) is 4.

-
is that homework? –  vartec Sep 8 '10 at 11:01
It's not homework. It's my own research and unfortunately I'm barely maths literate! –  Frank_Zafka Sep 8 '10 at 11:06

You can use diff() :

``````> x <- rbinom(10,1,1/2)

> x
[1] 0 0 0 1 1 1 1 0 1 0

> sum(diff(x)!=0)
[1] 4
``````
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Thanks. Seems to work perfectly. –  Frank_Zafka Sep 8 '10 at 11:23
+1: very elegant use of `diff` –  nico Sep 8 '10 at 12:54

The rle function will count the number of 'runs' of the same value in a vector. Hence the length of this vector (minus 1) gives you the number of alterations:

``````> x
[1] 0 0 0 1 1 1 1 0 1 0
> rle(x)
Run Length Encoding
lengths: int [1:5] 3 4 1 1 1
values : num [1:5] 0 1 0 1 0
> length(rle(x)\$lengths)-1
[1] 4
``````

Might be quicker or slower than the diff() method, but it also gives you the run lengths if you need them...

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Good to know. Thanks. –  Frank_Zafka Sep 8 '10 at 11:41
Very interesting, as you also have the values. I was actually looking for this function, thx for the info. –  Joris Meys Sep 8 '10 at 12:33
The diff method is much faster and independent of the number of alternations. –  John Sep 8 '10 at 13:30

It definitely doesn't beat diff in terms of elegance but another way:

``````sum(x[-1] != head(x, n=-1))
``````

On my system, this seems to be a teeny bit faster:

``````> x <- rbinom(1e6, 1, 0.5)
> system.time(replicate(100, sum(x[-1] != head(x, n=-1))))
user  system elapsed
8.421   3.688  12.150
> system.time(replicate(100, sum(diff(x) != 0)))
user  system elapsed
9.431   4.525  14.248
``````

It seems like there ought to be a nice analytic solution for the distribution of the number of unequal adjacent elements in the sequence.

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Nice use of `head`. –  Marek Sep 9 '10 at 10:04

Pseudocode (sequence is an array with your coin flips):

``````variable count = 0
variable state = sequence[0]
iterate i from sequence[1] to sequence[n]
if (state not equal sequence[i])
state = 1 - state
count++
``````