# Numeric comparison difficulty in R

I'm trying to compare two numbers in R as a part of a if-statement condition:

`(a-b) >= 0.5`

In this particular instance, a = 0.58 and b = 0.08... and yet `(a-b) >= 0.5` is false. I'm aware of the dangers of using `==` for exact number comparisons, and this seems related:

`(a - b) == 0.5)` is false, while

`all.equal((a - b), 0.5)` is true.

The only solution I can think of is to have two conditions: `(a-b) > 0.5 | all.equal((a-b), 0.5)`. This works, but is that really the only solution? Should I just swear off of the `=` family of comparison operators forever?

Edit for clarity: I know that this is a floating point problem. More fundamentally, what I'm asking is: what should I do about it? What's a sensible way to deal with greater-than-or-equal-to comparisons in R, since the `>=` can't really be trusted?

-
i could be way off but could this be a floating point problem? –  Dan May 4 '10 at 23:16
Indeed. I just don't know what to do about it. –  Matt Parker May 4 '10 at 23:20
Or rather, I don't know what people more savvy than me do about it. –  Matt Parker May 4 '10 at 23:21
Why do you need to check for the equality? Bear in mind that most numb ers (including, I think, 0.08) cannot be represented exactly as floating point values, so the equality component of the test is meaningless. I think really you need to define some suitably small value "epsilon", and then check abs((a-b) - 0.5) < epsilon. –  James McLeod May 5 '10 at 0:19

I've never been a fan of `all.equal` for such things. It seems to me the tolerance works in mysterious ways sometimes. Why not just check for something greater than a tolerance less than 0.05

``````tol = 1e-5

(a-b) >= (0.05-tol)
``````

In general, without rounding and with just conventional logic I find straight logic better than all.equal

If `x == y` then `x-y == 0`. Perhaps `x-y` is not exactly 0 so for such cases I use

``````abs(x-y) <= tol
``````

You have to set tolerance anyway for `all.equal` and this is actually more compact and straightforward than `all.equal`.

-

You could create this as a separate operator or overwrite the original >= function (probably not a good idea) if you want to use this approach frequently:

``````# using a tolerance
epsilon <- 1e-10 # set this as a global setting
`%>=%` <- function(x, y) (x + epsilon > y)

# as a new operator with the original approach
`%>=%` <- function(x, y) (all.equal(x, y)==TRUE | (x > y))

# overwriting R's version (not advised)
`>=` <- function(x, y) (isTRUE(all.equal(x, y)) | (x > y))

> (a-b) >= 0.5
[1] TRUE
> c(1,3,5) >= 2:4
[1] FALSE FALSE  TRUE
``````
-
Personally I think this is the best approach, because you don't have to decide on the epsilon yourself. You could even take a page from Perl, and give them names like `ge`, `le`, and `ne`. –  Ken Williams May 5 '10 at 18:15

For completeness' sake, I'll point out that, in certain situations, you could simply round to a few decimal places (and this is kind of a lame solution by comparison to the better solution previously posted.)

``````round(0.58 - 0.08, 2) == 0.5
``````
-
I think it's best solution and for original problem I will use `round(a-b, 10) >= 0.5` (10 digits should be enough for future extends). –  Marek May 5 '10 at 11:53

Choose some tolerance level:

``````epsilon <- 1e-10
``````

Then use

``````(a-b+epsilon) >= 0.5
``````
-