# How to compute di or tri bit counts [closed]

For a randomly generated 100 Bernoulli trials:

``````11010101....
``````
1. How to use "R" to compute di-bit counts, namely the number of times one sees in the sequence each of 00, 01,10,11
2. How to use "R" to compute tri-bit counts, namely the number of times one sees in the sequence each of 000, 001, 010, 011,100,101,110,111

Note that if you pasted together the first 99 random draws with the last 99 that you would have all di-bit draws:

``````set.seed(144)
trials <- rbinom(100, 1, c(.5, .5))
# 00 01 10 11
# 21 28 28 22
``````

To get the tri-bit counts, you could extend this by pasting together the first 98, the middle 98, and the last 98 observations:

``````table(paste0(head(trials, -2), head(tail(trials, -1), -1), tail(trials, -2)))
# 000 001 010 011 100 101 110 111
#   9  11  14  14  12  16  14   8
``````

Riffing off of @MrFlick's comment below about the possibility of using `embed`, you could generate the counts for n consecutive bits in a vectorized way (aka calling `paste0` once instead of once per row) with:

``````nbit <- function(dat, n) {
e <- embed(dat, n)
table(do.call(paste0, rev(split(e, col(e)))))
}
nbit(trials, 2)
# 00 01 10 11
# 21 28 28 22
nbit(trials, 3)
# 000 001 010 011 100 101 110 111
#   9  11  14  14  12  16  14   8
``````
• It worked amazingly! But, why? Would you explain it to me a bit more? Nov 3 '15 at 21:15
• The `embed` function can help create the pairs/triplets. The only catch is that it puts them in reverse order: `apply(embed(trials,2),1,paste0, collapse="")` Nov 3 '15 at 21:39