Hello, community,
I am trying to fit a series of points with a power function with and without the tool, using the same starting points and having different results. Maybe it is an obvious question but I would like to know why. Here are the two codes and the data attached:
function y = myfunction(x,a1,b1)
ft5 = fittype( 'myfunction(x,a1,c1)' )
f5 = fit( x_inter',y_inter', ft5,'StartPoint', [8.64593401687141e-71 16.7561500073752] )
plot( f5, x_inter, y_inter )
With the following results:
General model:
f5(x) = myfunction(x,a1,c1)
Coefficients (with 95% confidence bounds):
a1 = 3.368e-71 (-1.784e-70, 2.458e-70)
c1 = 16.76 (16.13, 17.38)
An this is the code generated by the tool:
[xData, yData] = prepareCurveData( x_inter, y_inter );
ft = fittype( 'power1' );
opts = fitoptions( 'Method', 'NonlinearLeastSquares' );
opts.StartPoint = [8.64593401687141e-71 16.7561500073752];
[fitresult, gof] = fit( xData, yData, ft, opts );
figure( 'Name', 'untitled fit 1' );
h = plot( fitresult, xData, yData, 'predobs', 0.99 );
legend( h, 'y_inter vs. x_inter', 'untitled fit 1', 'Lower bounds (untitled fit 1)', 'Upper bounds (untitled fit 1)', 'Location', 'NorthEast', 'Interpreter', 'none' );
xlabel( 'x_inter', 'Interpreter', 'none' );
ylabel( 'y_inter', 'Interpreter', 'none' );
Getting the results:
General model Power1:
f(x) = a*x^b
Coefficients (with 95% confidence bounds):
a = 9.531e-154 (-3.249e-153, 5.155e-153)
b = 35.54 (35.1, 35.97)
Goodness of fit:
SSE: 1.796e+07
R-square: 0.9771
Adjusted R-square: 0.9771
RMSE: 94.82
Thank you!
