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The following code is obviously wrong. What's the problem?

i <- 0.1
i <- i + 0.05
i
## [1] 0.15
if(i==0.15) cat("i equals 0.15") else cat("i does not equal 0.15")
## i does not equal 0.15
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1  
See also stackoverflow.com/q/6874867 and stackoverflow.com/q/2769510. The R Inferno is also another great read. –  Aaron Mar 1 '12 at 2:10

4 Answers 4

up vote 60 down vote accepted

General (language agnostic) reason

Since not all numbers can be represented exactly in IEEE floating point arithmetic (the standard that almost all computers use to represent decimal numbers and do math with them), you will not always get what you expected. This is especially true because some values which are simple, finite decimals (such as 0.1 and 0.05) are not represented exactly in the computer and so the results of arithmetic on them may not give a result that is identical to a direct representation of the "known" answer.

This is a well known limitation of computer arithmetic and is discussed in several places:

Comparing scalars

The standard solution to this in R is not to use ==, but rather the all.equal function. Or rather, since all.equal gives lots of detail about the differences if there are any, isTRUE(all.equal(...)).

if(isTRUE(all.equal(i,0.15))) cat("i equals 0.15") else cat("i does not equal 0.15")

yields

i equals 0.15

Some more examples of using all.equal instead of == (the last example is supposed to show that this will correctly show differences).

> 0.1+0.05==0.15
[1] FALSE
> isTRUE(all.equal(0.1+0.05, 0.15))
[1] TRUE
> 1-0.1-0.1-0.1==0.7
[1] FALSE
> isTRUE(all.equal(1-0.1-0.1-0.1, 0.7))
[1] TRUE
> 0.3/0.1 == 3
[1] FALSE
> isTRUE(all.equal(0.3/0.1, 3))
[1] TRUE
> 0.1+0.1==0.15
[1] FALSE
> isTRUE(all.equal(0.1+0.1, 0.15))
[1] FALSE

Some more detail, directly copied from an answer to a similar question:

The problem you have encountered is that floating point cannot represent decimal fractions exactly in most cases, which means you will frequently find that exact matches fail.

while R lies slightly when you say:

> 1.1-0.2
[1] 0.9
> 0.9
[1] 0.9

You can find out what it really thinks in decimal:

> sprintf("%.54f",1.1-0.2)
[1] "0.900000000000000133226762955018784850835800170898437500"
> sprintf("%.54f",0.9)
[1] "0.900000000000000022204460492503130808472633361816406250"

You can see these numbers are different, but the representation is a bit unwieldy. If we look at them in binary (well, hex, which is equivalent) we get a clearer picture:

> sprintf("%a",0.9)
[1] "0x1.ccccccccccccdp-1"
> sprintf("%a",1.1-0.2)
[1] "0x1.ccccccccccccep-1"
> sprintf("%a",1.1-0.2-0.9)
[1] "0x1p-53"

You can see that they differ by 2^-53, which is important because this number is the smallest representable difference between two numbers whose value is close to 1, as this is.

We can find out for any given computer what this smallest representable number is by looking in R's machine field:

 > ?.Machine
 ....
 double.eps  the smallest positive floating-point number x 
 such that 1 + x != 1. It equals base^ulp.digits if either 
 base is 2 or rounding is 0; otherwise, it is 
 (base^ulp.digits) / 2. Normally 2.220446e-16.
 ....
 > .Machine$double.eps
 [1] 2.220446e-16
 > sprintf("%a",.Machine$double.eps)
 [1] "0x1p-52"

You can use this fact to create a 'nearly equals' function which checks that the difference is close to the smallest representable number in floating point. In fact this already exists: all.equal.

> ?all.equal
....
all.equal(x,y) is a utility to compare R objects x and y testing ‘near equality’.
....
all.equal(target, current,
      tolerance = .Machine$double.eps ^ 0.5,
      scale = NULL, check.attributes = TRUE, ...)
....

So the all.equal function is actually checking that the difference between the numbers is the square root of the smallest difference between two mantissas.

This algorithm goes a bit funny near extremely small numbers called denormals, but you don't need to worry about that.

Comparing vectors

The above discussion assumed a comparison of two single values. In R, there are no scalars, just vectors and implicit vectorization is a strength of the language. For comparing the value of vectors element-wise, the previous principles hold, but the implementation is slightly different. == is vectorized (does an element-wise comparison) while all.equal compares the whole vectors as a single entity.

Using the previous examples

a <- c(0.1+0.05, 1-0.1-0.1-0.1, 0.3/0.1, 0.1+0.1)
b <- c(0.15,     0.7,           3,       0.15)

== does not give the "expected" result and all.equal does not perform element-wise

> a==b
[1] FALSE FALSE FALSE FALSE
> all.equal(a,b)
[1] "Mean relative difference: 0.01234568"
> isTRUE(all.equal(a,b))
[1] FALSE

Rather, a version which loops over the two vectors must be used

> mapply(function(x, y) {isTRUE(all.equal(x, y))}, a, b)
[1]  TRUE  TRUE  TRUE FALSE

If a functional version of this is desired, it can be written

elementwise.all.equal <- Vectorize(function(x, y) {isTRUE(all.equal(x, y))})

which can be called as just

> elementwise.all.equal(a, b)
[1]  TRUE  TRUE  TRUE FALSE
share|improve this answer

Adding to Brian's comment (which is the reason) you can over come this by using all.equal instead:

# i <- 0.1
# i <- i + 0.05
# i
#if(all.equal(i, .15)) cat("i equals 0.15\n") else cat("i does not equal 0.15\n")
#i equals 0.15

Per Joshua's warning here is the updated code (Thanks Joshua):

 i <- 0.1
 i <- i + 0.05
 i
if(isTRUE(all.equal(i, .15))) { #code was getting sloppy &went to multiple lines
    cat("i equals 0.15\n") 
} else {
    cat("i does not equal 0.15\n")
}
#i equals 0.15
share|improve this answer
    
I missed Brian's link which explains my response succinctly. –  Tyler Rinker Feb 29 '12 at 23:57
4  
all.equal doesn't return FALSE when there are differences, so you need to wrap it with isTRUE when using it in an if statement. –  Joshua Ulrich Mar 1 '12 at 0:49
    
@JoshuaUlrich good call. I added an edit but retained the original for historical perspective. –  Tyler Rinker Mar 1 '12 at 1:03

Some interesting example - even the order of numbers can make a difference!

> 1/6+1/3+1/2==1
[1] TRUE
> 1/2+1/3+1/6==1
[1] FALSE
share|improve this answer

This is hackish, but quick:

if(round(i, 10)==0.15) cat("i equals 0.15") else cat("i does not equal 0.15")
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