# Z-scores using specified mu and sigma

I have converted my training data matrix into z-scores for each column. I have `mu` and `sigma` for each column from the output of `zscore`.

I also have another matrix (my test data) and I want to convert it into z-scores using the `mu` and `sigma` obtained in previous the step. My implementation uses `for` loops as shown below:

``````TEST_DATA = zeros(num_rows,num_cols,'double');

for rowIdx = 1:num_rows,
for colIdx = 1:num_cols,
TEST_DATA(rowIdx,colIdx)=(input(rowIdx,colIdx)-MU(colIdx))/SIGMA(colIdx);
end
end
``````

Is there any faster way of achieving this in MATLAB?

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Be more specific. Explain what a z-score is, and explain what operation you want to do to your data. –  Peter Sep 11 '13 at 14:46
@Peter please see edited OP –  Khurram Majeed Sep 11 '13 at 14:49

You can use `bsxfun`:

``````%// Sample data
matrix = rand(10, 10);
testData = rand(10, 10);

%// Obtain mu and sigma
mu = mean(matrix, 1);
sigma = std(matrix, [], 1);
%// or use: [Z, mu, sigma] = zscore(matrix);

%// Convert into z-scores using precalculated mu and sigma
C = bsxfun(@rdivide, bsxfun(@minus, testData, mu), sigma);
``````
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+1: Instead of `@times` and `1 ./ sigma`, you could use `@rdivide` and `sigma`. –  Eitan T Sep 11 '13 at 15:03
@H.Muster Correct me if I am wrong... The `bsxfun` runs on all elements of matrix (rows * cols) and can be used to replace 2 for-loops as in my example code in OP? –  Khurram Majeed Sep 11 '13 at 15:57
@EitanT: Thanks for reminding me. I mostly use `@times` because I always forget whether `@rdivide` or `@ldivide` is necessary. And thanks for adding comments and links. –  H.Muster Sep 11 '13 at 16:40
@KhurramMajeed: yes, each `bsxfun` replaces one loop, but they do not run on the individual elements, but on each row of testData, if I am not mistaken. –  H.Muster Sep 11 '13 at 16:42
@H.Muster You are correct indeed. Here's a related question: Is bsxfun really applied element-wise? –  Eitan T Sep 11 '13 at 16:48

The documentation of zscore explains that it simply subtracts the mean and divides by the standard deviation. The only tricky part is apply the vectors of mu/sigma to each column. But if you don't know how to do the fancy way, do it with a for loop. I'll leave it this way for readability. If you need faster, look into `bsxfun`.

``````for ii=1:size(mat,1)
mat(ii,:) = (mat(ii,:) - mu) ./ sigma;
end
``````
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