There are basically four (or five) main steps involved in model fitting problems like this:

- Define your forward model,
*yhat = F(P, x)*, that takes a set of parameters *P* and your independent variable *x*, and estimates your response variable *y*
- Define your loss function,
*loss = L(P, x, y)* that you'd like to minimize over your parameters
*Optional*: define a function that returns the Jacobian matrix, i.e. the partial derivatives of your loss function w.r.t. your model parameters.*
- Make an initial guess at your model parameters
- Plug all these into one of the optimizers and get the fitted parameters for your model

Here's a worked example to get you started:

```
import numpy as np
from scipy.optimize import minimize
from matplotlib import pyplot as pp
# function that defines the model we're fitting
def gaussian(P, x):
a, b, c = P
return a*np.exp(-(x-b)**2 /( 2*c**2))
# objective function to minimize
def loss(P, x, y):
yhat = gaussian(P, x)
return ((y - yhat)**2).sum()
# generate a gaussian distribution with known parameters
amp = 1.3543
pos = 64.546
var = 12.234
P_real = np.array([amp, pos, var])
# we use the vector of real parameters to generate our fake data
x = np.arange(100)
y = gaussian(P_real, x)
# add some gaussian noise to make things harder
y_noisy = y + np.random.randn(y.size)*0.5
# minimize needs an initial guess at the model parameters
P_guess = np.array([1, 50, 25])
# minimize provides a unified interface to all of scipy's solvers. you
# can also access them individually in scipy.optimize, but the
# standalone versions have annoying differences in their syntax. for now
# we'll use the Nelder-Mead solver, which doesn't use the Jacobian. we
# also need to hand it x and y_noisy as additional args to loss()
res = minimize(loss, P_guess, method='Nelder-Mead', args=(x, y_noisy))
# res is a dict containing the results of the optimization. in particular we
# want the optimized model parameters:
P_fit = res['x']
# we can pass these to gaussian() to evaluate our fitted model
y_fit = gaussian(P_fit, x)
# now let's plot the results:
fig, ax = pp.subplots(1,1)
ax.hold(True)
ax.plot(x, y, '-r', lw=2, label='Real')
ax.plot(x, y_noisy, '-k', alpha=0.5, label='Noisy')
ax.plot(x, y_fit, '--b', lw=5, label='Fit')
ax.legend(loc=0, fancybox=True)
```

*Some solvers, e.g. conjugate gradient methods, take the Jacobian as an additional argument, and by and large these solvers are faster and more robust, but if you're feeling lazy and performance isn't all that critical then you can usually get away without providing the Jacobian, in which case it will use the finite differences method to estimate the gradients.

You can read more about the different solvers here