# Fitting a line that passes through the origin (0,0) to data

I have a set of points `(x,y)` and I need to find the line of best-fit that passes through the origin using MATLAB.

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How do you define your criterion for a "best fit"? Least square error? –  Eitan T Sep 19 '12 at 14:13
Yes that's right - thanks for pointing that out as its important. –  dr_rk Sep 20 '12 at 5:27

In short: Your function must be in the form of `y=ax+0`, which makes `polyfit` useless. But you can use the least squares method:

`````` a = x(:)\y(:);
``````

Explanation:

You have `n` equations and one variable `a` that is needed to be found:

`````` a*x1 = y1;
a*x2 = y2;
...
a*xn = yn;
``````

The operator `\` finds the least squares solution.

Alternatively, you can find the solution manually:

`````` a = (x'*x) \ (x'*y);
``````

or in Pseudo code:

``````     (x1*y1 + x2*y2  + ... xn*yn)
a =  ----------------------------
(x1*x1 + x2*x2  + ... xn*xn)
``````

This is useful if you are not using Matlab - for example in C code.

Example and code snippet:

``````function FindLSSolution()
a = 2.5;
x = rand(100,1)*10;
y = a*x + randn(100,1);
figure;scatter(x,y);

A = x(:)\y(:);
hold on;plot(x, A*x,'g');
end
``````
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`a = pinv(x)*y` Would this work too? –  dr_rk Sep 19 '12 at 13:25
@dr_rk, Yes, but it is not recommended because it is slower and less stable numerically –  Andrey Sep 19 '12 at 13:29
``````f = fit( x, y, 'a*x' );