# How to project a new point to PCA new basis?

For example, I have 9 variables and 362 cases. I've made PCA calculation, and found out that first 3 PCA coordinates are enough for me.

Now, I have new point in my 9-dimensional structure, and I want to project it to principal component system coordinate. How to get its new coordinates?

``````%# here is data (362x9)

[W, Y] = pca(data, 'VariableWeights', 'variance', 'Centered', true);

%# orthonormal coefficient matrix
W = diag(std(data))\W;

% Getting mean and weights of data (for future data)
[data, mu, sigma] = zscore(data);
sigma(sigma==0) = 1;

%# New point in original 9dim system
%# For example, it is the first point of our input data
x = data(1,:);
x = bsxfun(@minus,x, mu);
x = bsxfun(@rdivide, x, sigma);

%# New coordinates as principal components
y0 = Y(1,:); %# point we should get in result
y = (W*x')'; %# our result

%# error
sum(abs(y0 - y)) %# 142 => they are not the same point

%# plot
figure()
plot(y0,'g'); hold on;
plot(y,'r');
``````

How to get coordinates of a new point projected to new principal component basis?

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Do you have any documentation for the `pca()` function? Normally in matlab I use `princomp()`. –  Isaac Nov 9 '12 at 6:56
Are `Y(1,:)` and `y` in the same direction? –  Isaac Nov 9 '12 at 7:00
Now, I'm trying in a new version of Matlab. There function `princomp()` is routed to `pca()`. Ok, I'll try in older versions, all the more so I need it to work in old Matlab –  Evghenii Nov 9 '12 at 7:01
@Isaac, yes, both `Y(1,:)` and `y` are `1x9`. –  Evghenii Nov 9 '12 at 7:02
Direction, not dimension. Is `Y(1,:)` approximately a multiple of `y`? –  Isaac Nov 9 '12 at 7:10

Main fallacy was in operation that converts points to new basis:

``````y = (W*x')';
``````

Wikipedia says:

The projected vectors are the columns of the matrix

``````Y = W*·Z,
``````

where `Y is L×N, W is M×L, Z is M×N`,

but `pca()` returns `W` of size `L×M` and `Y` of size `NxL`

so, correct equation in Matlab is:

``````y = x*W
``````

Below is the corrected code:

``````[W, Y] = pca(data, 'VariableWeights', 'variance', 'Centered', true);
W = diag(std(data))\W;

%# Getting mean and weights of data (for future data)
[~, mu, we] = zscore(data);
we(we==0) = 1;

%# New point in original 9dim system
%# For example, it is the first point of our input data
x = data(1,:);
x = bsxfun(@minus,x, mu);
x = bsxfun(@rdivide, x, we);

%# New coordinates as principal components
y = x*W;
y0 = Y(1,:);
sum(abs(y0 - y)) %# 4.1883e-14 ~= 0
``````
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