Fitting Cumulative Normal Distribution Function to Data

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Jake
Jake on 20 Jun 2017
Commented: Rohit Sinha on 8 Jun 2022
Hello, I have the following data and would like to fit a cumulative normal distribution to it.
X = [-75, -50, -17, -9, 11, 25, 43, 67]; Y = [5, 0, 25, 25, 65, 80, 70, 75];
By dividing by 100, these values can be normalized such that X goes from -1 to 1 and Y goes from 0 to 1.
I'd like to fit this data so that the error is minimized between my recorded Y values and the values of an appropriate cumulative normal distribution function. How can I determine the values for Mu and Sigma? I tried using normfit, but that only used my X values and nothing changed when my data changed.
I'd also like to get an R-squared metric for the goodness of fit if possible.
Thanks in advance, Jake

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Answers (1)

Star Strider
Star Strider on 20 Jun 2017
This seems to work:
X = [-75, -50, -17, -9, 11, 25, 43, 67];
Y = [5, 0, 25, 25, 65, 80, 70, 75];
fcn = @(b,x) normcdf(x, b(1), b(2)); % Objective Function
NRCF = @(b) norm(Y/100 - fcn(b,X)); % Norm Residual Cost Function
B = fminsearch(NRCF, [0; 10]); % Estimate Parameters
Xplot = linspace(min(X), max(X));
figure(1)
plot(X, Y/100, 'pg')
hold on
plot(Xplot, fcn(B,Xplot))
hold off
grid
text(-50, 0.65, sprintf('\\mu = %.1f\n\\sigma = %.1f', B))
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Rohit Sinha
Rohit Sinha on 8 Jun 2022
@Star Strider I tried using your function, however, the starting values of probability even though are zero, or approximately zero, there is a slight difference in the initial point of the fitted curve as shown

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