# Finding x values for known y values from a gaussian fit in Matlab

I have some data that I've fit to a Gaussian of the form:

`y = a1*exp(-((x-b1)/c1)^2) + a2*exp(-((x-b2)/c2)^2)`, (the coefficients `a`,`b`,`c` are all known). Unfortunately I can't post an image, but it looks like a standard Gaussian, just with one of the tails not quite dropping down to zero.

What I would like to do is have Matlab determine the `x` values for any `y` value that I specify. Since the fit is Gaussian, there will be two values for nearly every `y` value.

If anyone can help me out, I'd appreciate it. Thanks!

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A very naive but straightforward way of doing this is `x(y == y0)`, where `y0` is some fixed y-value. Or are you looking for an analytic solution? –  zroth Jan 9 at 3:56

You need to solve non-linear equation for given y and unknown x. `fsolve` is one way of doing this, but it only returns one solution. You would need to iterate with different starting values. You can also use newtzero from file exchange that can find more solutions. This is one example:

``````[a1,b1,c1] = deal(2, 3, 4);
[a2,b2,c2] = deal(2, 3, 4);

yValue  = 3; % example of known y value

f = @(x) a1*exp(-((x-b1)/c1).^2) + a2*exp(-((x-b2)/c2).^2) - yValue ;

x =  newtzero(f, [0]); % search for roots of f function

xT = linspace(-20, 20, 100);
yT = arrayfun(f, xT);

figure, plot(xT, yT, '-'); hold on; grid on;
plot(xT, zeros(1, numel(xT)), 'k-');

% plot found roots
plot(x, zeros(1, numel(x)), 'ro');
``````

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