I'm a bit of a newby so apologies if this question has already been answered, I've had a look and couldn't find specifically what I was looking for.
I have some more or less linear data of the form
x = [0.1, 0.2, 0.4, 0.6, 0.8, 1.0, 2.0, 4.0, 6.0, 8.0, 10.0, 20.0, 40.0, 60.0, 80.0] y = [0.50505332505407008, 1.1207373784533172, 2.1981844719020001, 3.1746209003398689, 4.2905482471260044, 6.2816226678076958, 11.073788414382639, 23.248479770546009, 32.120462301367183, 44.036117671229206, 54.009003143831116, 102.7077685684846, 185.72880217806673, 256.12183145545811, 301.97120103079675]
I am using
scipy.optimize.leastsq to fit a linear regression to this:
def lin_fit(x, y): '''Fits a linear fit of the form mx+b to the data''' fitfunc = lambda params, x: params * x + params #create fitting function of form mx+b errfunc = lambda p, x, y: fitfunc(p, x) - y #create error function for least squares fit init_a = 0.5 #find initial value for a (gradient) init_b = min(y) #find initial value for b (y axis intersection) init_p = numpy.array((init_a, init_b)) #bundle initial values in initial parameters #calculate best fitting parameters (i.e. m and b) using the error function p1, success = scipy.optimize.leastsq(errfunc, init_p.copy(), args = (x, y)) f = fitfunc(p1, x) #create a fit with those parameters return p1, f
And it works beautifully (although I am not sure if scipy.optimize is the right thing to use here, it might be a bit over the top?).
However, due to the way the data points lie it does not give me a y-axis interception at 0. I do know though that it has to be zero in this case,
if x = 0 than y = 0.
Is there any way I can force this?