backtransform `scale()` for plotting

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

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).

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
  )
}

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

Tags:

R