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I am trying to figure out what the right parameter in the hist function in R does. The documentation is unfortunately unclear to someone without a deep understanding of statistics such as myself.

The documentation as stated online is:

right logical; if TRUE, the histograms cells are right-closed (left open) intervals.

What does it mean to be right-closed (or left open) intervals?

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Do you understand the concept of intervals? For example, do you know what the intervals (1, 4), [3, 7), (2, 9], and [5, 6] mean? – In silico Dec 27 '11 at 19:03
As used here, 'open' and 'closed' are mathematical terms from set theory. If you haven't run into them before, the documentation sure would be opaque. See here and here for all the background you'll need to understand those terms. – Josh O'Brien Dec 27 '11 at 19:08
@Insilico: I was not familiar with the interval notation though I have used intervals before. The terms I am familiar with that indicate inclusiveness are inclusive and exclusive. These seem analogous to closed and open respectively. – Ryan Taylor Dec 28 '11 at 13:11

3 Answers 3

up vote 10 down vote accepted

When creating histograms of non-categorial data (things like pH, temperature, etc.), you need to specify things called "bins". Each bin has something called an interval specified for it. For example, if I have the data:

11  12  13  14  15  16  17  18  19

I can create 5 bins with right-open, left-closed intervals like this:

1st bin: [10, 12)
2nd bin: [12, 14)
3rd bin: [14, 16)
4th bin: [16, 18)
5th bin: [18, 20)

What this means is that the first bin will "hold" values between 10 and 12, including 10 but not including 12. The interval notation used above is shorthand for this:

1st bin: 10 ≤ x < 12
2nd bin: 12 ≤ x < 14
3rd bin: 14 ≤ x < 16
4th bin: 16 ≤ x < 18
5th bin: 18 ≤ x < 20

So that means the values 11 will go into the 1st bin, but the value 12 will go into the second bin, etc. R will do this binning process for you then draw the histogram based on how many items are in each bin. For the above data, you'll get a rather not-interesting (or interesting, depending on your expectations) histogram that is mostly flat except at the first bin.

The following examples illustrate what the different combinations of brackets and parentheses mean when using interval notation (assume x is an element of the real number line):

(1, 4) --> 1 < x < 4    left-open, right-open
[3, 7) --> 3 ≤ x < 7    left-closed, right-open
(2, 9] --> 2 < x ≤ 9    left-open, right-closed
[5, 6] --> 5 ≤ x ≤ 6    left-closed, right-closed

Note that you can't use brackets for infinities, assuming you're not using the extended real number line

(-∞, ∞)   -->   -∞ < x < ∞ 
(-∞, 20]  -->   -∞ < x ≤ 20 
[20, ∞)   -->   20 ≤ x < ∞
(1000, ∞) --> 1000 < x < ∞
(-∞, ∞]   -->   Invalid
(41, ∞]   -->   Invalid

If I want left-open, right-closed intervals, then the bins would look like this:

1st bin: (10, 12] i.e. 10 < x ≤ 12
2nd bin: (12, 14]      12 < x ≤ 14
3rd bin: (14, 16]      14 < x ≤ 16
4th bin: (16, 18]      16 < x ≤ 18
5th bin: (18, 20]      18 < x ≤ 20

See the difference? In this case, now values 11, and 12 will go into the first bin. This may change in the appearance of the histogram depending on how you bin the data. Now, this time your histogram is still almost flat but now the 5th bin is different from the rest (only 1 data point instead of 2 for the rest).

Now, fortunately in R you don't have to specify the bins yourself, but R is nice enough to ask you whether you want the bins to be left-closed, right-open ([a, b)) or left-open, right-closed ((a, b]). That's the difference you get w.r.t the "right" parameter does in the hist() function.

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I fixed a typo at the very end; normally I would have just left a comment, but given the content of your answer, it seemed an important thing to fix, so I just did it. – joran Dec 27 '11 at 19:31
@joran: Yes, I noticed the copy-pasta, but you beat me to the punch. :-) – In silico Dec 27 '11 at 19:38
What's wrong with using brackets for infinities if you use the extended real line? – Dason Dec 27 '11 at 19:53
@Dason: I'm pretty sure if the OP isn't using the extended real number line, especially with respect to statistics. :-) In the non-extended real number line a closed infinity endpoint is ambiguous. – In silico Dec 28 '11 at 0:50
I just bring it up since Inf and -Inf are defined in R. I felt the section stating that you can't use brackets for infinities slightly misleading without a qualifier. – Dason Dec 28 '11 at 3:40

The default is right = TRUE which gives intervals of the form (a, b]. Let's take an example to see what this means. Let's say that our data has the value 5 in it. Let's also say that the histogram is using break points of 3, 4, 5, 6. The question is which interval should our value 5 fall into? If we use right = TRUE the actual intervals that get used are (3, 4], (4, 5], (5, 6]. The interval notation (4, 5] means that it includes all the values between 4 and 5 - it doesn't include the actual value 4 but it does include the value 5. So our data point of 5 falls into this interval.

If instead we used right = FALSE the intervals would have the form [a, b) so with the same breakpoints of 3, 4, 5, 6 we would have the intervals [3, 4), [4, 5), [5, 6). This time our data point goes into the interval [5, 6) because this interval contains 5 whereas [4, 5) does not contain 5.

Essentially the 'right' parameter tells R what to do when a data point falls exactly where a breakpoint is located.

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R uses half-open intervals for histogram bins. This option controls which of the left or right endpoints is included in each half-open interval.

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