51

I have a explanatory variable that is centered using scale() that is used to predict a response variable:

d <- data.frame(
  x=runif(100),
  y=rnorm(100)
)

d <- within(d, s.x <- scale(x))

m1 <- lm(y~s.x, data=d)

I'd like to plot the predicted values, but using the original scale of x rather than the centered scale. Is there a way to sort of backtransform or reverse scale s.x?

Thanks!

63

Take a look at:

attributes(d$s.x)

You can use the attributes to unscale:

d$s.x * attr(d$s.x, 'scaled:scale') + attr(d$s.x, 'scaled:center')

For example:

> x <- 1:10
> s.x <- scale(x)

> s.x
            [,1]
 [1,] -1.4863011
 [2,] -1.1560120
 [3,] -0.8257228
 [4,] -0.4954337
 [5,] -0.1651446
 [6,]  0.1651446
 [7,]  0.4954337
 [8,]  0.8257228
 [9,]  1.1560120
[10,]  1.4863011
attr(,"scaled:center")
[1] 5.5
attr(,"scaled:scale")
[1] 3.02765

> s.x * attr(s.x, 'scaled:scale') + attr(s.x, 'scaled:center')
      [,1]
 [1,]    1
 [2,]    2
 [3,]    3
 [4,]    4
 [5,]    5
 [6,]    6
 [7,]    7
 [8,]    8
 [9,]    9
[10,]   10
attr(,"scaled:center")
[1] 5.5
attr(,"scaled:scale")
[1] 3.02765
2
  • 1
    nice response +1 Should the attr(s.x, 'scaled:center') be attr(d$s.x, 'scaled:center')? – Tyler Rinker Apr 23 '12 at 21:28
  • @TylerRinker Thanks, it should. Fixed! – Justin Apr 23 '12 at 21:35
15

For a data frame or matrix:

set.seed(1)
x = matrix(sample(1:12), ncol= 3)
xs = scale(x, center = TRUE, scale = TRUE)

x.orig = t(apply(xs, 1, function(r)r*attr(xs,'scaled:scale') + attr(xs, 'scaled:center')))

print(x)
     [,1] [,2] [,3]
[1,]    4    2    3
[2,]    5    7    1
[3,]    6   10   11
[4,]    9   12    8

print(x.orig)
     [,1] [,2] [,3]
[1,]    4    2    3
[2,]    5    7    1
[3,]    6   10   11
[4,]    9   12    8

Be careful when using functions like identical():

print(x - x.orig)
     [,1] [,2]         [,3]
[1,]    0    0 0.000000e+00
[2,]    0    0 8.881784e-16
[3,]    0    0 0.000000e+00
[4,]    0    0 0.000000e+00

identical(x, x.orig)
# FALSE
3
  • 2
    Thanks! This helped me to calculate back the cluster centers after a kMeans clustering with a scaled matrix. centers <- t(apply(clustering$centers, 1, function(r) r * attr(scaled_mat, 'scaled:scale') + attr(scaled_mat, 'scaled:center'))) The accepted answer didn't. – kadrian Dec 9 '15 at 18:58
  • I am on your exact same task @kadrian but why this function does not work on my scaled data?? – Seymour Jan 23 '18 at 9:13
  • this should be the accepted answer, not the one that adds all. So the idea here in this elegant solution is that you multiply the matrix with the scale vector and add the means row-wise before you flip it to get the original matrix right, brilliant! – doctorate Oct 14 '20 at 9:54
9

I felt like this should be a proper function, here was my attempt at it:

#' Reverse a scale
#'
#' Computes x = sz+c, which is the inverse of z = (x - c)/s 
#' provided by the \code{scale} function.
#' 
#' @param z a numeric matrix(like) object
#' @param center either NULL or a numeric vector of length equal to the number of columns of z  
#' @param scale  either NULL or a a numeric vector of length equal to the number of columns of z
#'
#' @seealso \code{\link{scale}}
#'  mtcs <- scale(mtcars)
#'  
#'  all.equal(
#'    unscale(mtcs), 
#'    as.matrix(mtcars), 
#'    check.attributes=FALSE
#'  )
#'  
#' @export
unscale <- function(z, center = attr(z, "scaled:center"), scale = attr(z, "scaled:scale")) {
  if(!is.null(scale))  z <- sweep(z, 2, scale, `*`)
  if(!is.null(center)) z <- sweep(z, 2, center, `+`)
  structure(z,
    "scaled:center"   = NULL,
    "scaled:scale"    = NULL,
    "unscaled:center" = center,
    "unscaled:scale"  = scale
  )
}
4
6

tl;dr:

unscaled_vals <- xs + attr(xs, 'scaled:scale') + attr(xs, 'scaled:center')
  • where xs is a scaled object created by scale(x)

Just for those trying to make a bit of sense about this:

How R scales:

The scale function performs both scaling and centering by default.

  • Of the two, the function performs centering first.

Centering is achieved by default by subtracting the mean of all !is.na input values from each value:

data - mean(data, rm.na = T)

Scaling is achieved via:

sqrt( ( sum(x^2) ) / n - 1)

where x is the set of all !is.na values to scale and n = length(x).

  • Importantly, though, when center =T in scale, x is not the original set of data, but the already centered data.

    So if center = T (the default), the scaling function is really calculating:

     sqrt( ( sum( (data - mean(data, rm.na = T))^2) ) / n - 1)
    
    • Note: [when center = T] this is the same as taking the standard deviation: sd(data).

How to Unscale:

Explanation:

  1. first multiply by scaling factor:

    y = x * sqrt( ( sum( (x - mean(x , na.rm = T))^2) ) / (length(x) - 1))
    
  2. then add back mean:

    y + mean(x , na.rm = T)
    

Obviously you need to know the mean of the original set of data for this manual approach to truly be useful, but I place it here for conceptual sake.

Luckily, as previous answers have shown, the "centering" value (i.e., the mean) is located in the attributes of a scale object, so this approach can be simplified to:

How to do in R:

unscaled_vals <- xs + attr(xs, 'scaled:scale') + attr(xs, 'scaled:center')
  • where xs is a scaled object created by scale(x).
1
  • 2
    In unscaled_vals <- xs + attr(xs, 'scaled:scale') + attr(xs, 'scaled:center') you are adding the deviation instead of multiplying. I tried to edit, but it doesn't let me because it's too small of a change xD – mgiormenti Apr 5 '19 at 20:09
4

I came across this problem and I think I found a simpler solution using linear algebra.

# create matrix like object
a <- rnorm(1000,5,2)
b <- rnorm(1000,7,5) 

df <- cbind(a,b)

# get center and scaling values 
mean <- apply(df, 2, mean)
sd <- apply(df, 2, sd)

# scale data
s.df <- scale(df, center = mean, scale = sd)

#unscale data with linear algebra 
us.df <- t((t(s.df) * sd) + mean)
1

Old question, but why wouldn't you just do this:

plot(d$x, predict(m1, d))

As an easier way than manually using the attributes from the scaled object, DMwR has a function for this: unscale. It works like this:

d <- data.frame(
  x=runif(100)
)

d$y <- 17 + d$x * 12

s.x <- scale(d$x)

m1 <- lm(d$y~s.x)

library(DMwR)
unsc.x <- unscale(d$x, s.x)
plot(unsc.x, predict(m1, d))

Importantly, the second argument of unscale needs to have something with the attributes of 'scaled:scale' and 'scaled:center'

0

I am late to the party. But here is a useful tool to scale/unscale data in array format.

Example:

> (data <- array(1:8, c(2, 4)))            # create data
     [,1] [,2] [,3] [,4]
[1,]    1    3    5    7
[2,]    2    4    6    8
> obj <- Scale(data)                       # create object
> (data_scaled <- obj$scale(data))         # scale data
           [,1]       [,2]       [,3]       [,4]
[1,] -0.7071068 -0.7071068 -0.7071068 -0.7071068
[2,]  0.7071068  0.7071068  0.7071068  0.7071068
> (obj$unscale(data_scaled))               # unscale scaled data
     [,1] [,2] [,3] [,4]
[1,]    1    3    5    7
[2,]    2    4    6    8

## scale or unscale another dataset
## using the same mean/sd parameters
> (data2 <- array(seq(1, 24, 2), c(3, 4))) # create demo data
     [,1] [,2] [,3] [,4]
[1,]    1    7   13   19
[2,]    3    9   15   21
[3,]    5   11   17   23
> (data2_scaled <- obj$scale(data2))       # scale data
           [,1]      [,2]     [,3]     [,4]
[1,] -0.7071068  4.949747 10.60660 16.26346
[2,]  2.1213203  7.778175 13.43503 19.09188
[3,]  4.9497475 10.606602 16.26346 21.92031
> (obj$unscale(data2_scaled))              # unscale scaled data
     [,1] [,2] [,3] [,4]
[1,]    1    7   13   19
[2,]    3    9   15   21
[3,]    5   11   17   23

Function Scale():

Scale <- function(data, margin=2, center=TRUE, scale=TRUE){
    stopifnot(is.array(data), is.numeric(data),
              any(mode(margin) %in% c("integer", "numeric")),
              length(margin) < length(dim(data)),
              max(margin) <= length(dim(data)),
              min(margin) >= 1,
              !any(duplicated(margin)),
              is.logical(center), length(center)==1,
              is.logical(scale), length(scale)==1,
                  !(isFALSE(center) && isFALSE(scale)))
    margin <- as.integer(margin)

    m <- if(center) apply(data, 2, mean, na.rm=TRUE) else NULL
    s <- if(scale)  apply(data, 2, sd, na.rm=TRUE) else NULL
    ldim <- length(dim(data))
    cdim <- dim(data)[margin]
    data <- NULL # don't store the data

    Scale <- function(data){
        stopifnot(is.array(data), is.numeric(data),
                  length(dim(data)) == ldim,
                  dim(data)[margin] == cdim)
        if(center)
            data <- sweep(data, margin, m, `-`)
        if(scale)
            data <- sweep(data, margin, s, `/`)
        data
    }

    Unscale <- function(data){
        stopifnot(is.array(data), is.numeric(data),
                  length(dim(data)) == ldim,
                  dim(data)[margin] == cdim)
        if(scale)
            data <- sweep(data, margin, s, `*`)
        if(center)
            data <- sweep(data, margin, m, `+`)
        data
    }
    list(scale=Scale, unscale=Unscale, mean=m, sd=s)
}

Note: data.frames are not support yet.

0

Just inspired by Fermando´s answer, but unscaling line with less code:

set.seed(1)
x = matrix(sample(1:12), ncol= 3)
xs = scale(x, center = TRUE, scale = TRUE)
center <- attr(xs,"scaled:center")
scale <- attr(xs,"scaled:scale")
x.orig <- t(t(xs) * scale + center) # code is less here

print(x)
[1,]    9    2    6
[2,]    4    5   11
[3,]    7    3   12
[4,]    1    8   10

print(x.orig)
[1,]    9    2    6
[2,]    4    5   11
[3,]    7    3   12
[4,]    1    8   10
attr(,"scaled:center")
[1] 5.25 4.50 9.75
attr(,"scaled:scale")
[1] 3.50 2.65 2.63
0

I found that an easy way to reverse the scale() function is to call twice back the scale() function:

X_scaled <- scale(X,center=TRUE,scale=TRUE)
X_reversed <- scale(X_scaled,center=FALSE,scale=1/attr(X_scaled,'scaled:scale'))
X_reversed <- scale(X_reversed,center=-attr(X_scaled,'scaled:center'),scale=FALSE)

If you don't mind calling a function within the arguments of a function (which I do mind), you could end up with the following solution:

X_scaled <- scale(X,center=TRUE,scale=TRUE)
X_reversed <- scale(scale(X_scaled,center=FALSE,scale=1/attr(X_scaled,'scaled:scale')),
                    center=-attr(X_scaled,'scaled:center'),scale=FALSE)

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