Hello,
I am trying to code a principal component analysis (PCA) on a dataset (8 samples , 2 features) and I can not plot the datapoints' projections on the eigenvector which provide the largest variace (eigenvector of the 1st principal component). The code is as following:
x=[1 1 2 0 5 4 5 3; 3 2 3 3 4 5 5 4]';
X=mean(x);
m=mean(x')';
x_m=x-X;
D=cov(x_m)
[eigenVector,lamda]=eig(D);
lamdasort=sort(lamda);
w2=eigenVector(:,2)'.*x;
robustness=lamda(2,2)/(lamda(1,1)+lamda(2,2))
figure(1)
hold on
scatter(x(:,1),x(:,2),'o')
scatter(x(:,1),x(:,2),'.k')
plot(X(1,1),X(1,2),'.g')
xlabel('x1')
ylabel('x2')
xlim([-2 6])
ylim([-2 6])
figure(2)
hold on
scatter(x(:,1),x(:,2),'o')
scatter(w2(:,1),w2(:,2),'.k')
So I would like w2 to be the projections of the data set (hence eigenVector(:,2)*x) to the eigenvector of the highest-value eigenvalue. I think smth is wrong with this approach, I get somthing like inverse of the dataset (figure (2)). I multiply the k=1 dimension (eigenvector) with the dataset (w2=eigenVector(:,2)'.*x;).
Thank you
Edit: This is the result that I cannot code
This is what i get when multiplying the eigenvector with the dataset.
