# Extrapolation from data plotted using matplotlib

I have 10 values of x and y in my file.

Is there any way that I can extrapolate the graph ie make it into a continous function and increasing its range for other x-values in matplotlib ??

I would even be thankful if anyone can tell me if there is any other software that I can use. I basically want that these 10 values get approximated to a continous function so that I can know the y-value at some random x point.

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below i use Scipy, but the same functions (polyval and polyfit) are also in NumPy; NumPy is a Matplotlib dependency so you can import those two functions from there if you don't have SciPy installed.

``````import numpy as NP
from scipy import polyval, polyfit
from matplotlib import pyplot as PLT

n=10   # 10 data points
# make up some data
x = NP.linspace(0, 1, n)
y = 7*x**2 - 5*x + 3
noise = NP.random.normal(.5, .3, 10)
y += noise

# the shape of the data suggests a 2d polynomial, so begin there
# a, b, c are the polynomial coefficients: ax^2 + bx + c
a, b, c = polyfit(x, y, 2)
y_pred = polyval([a, b, c], x)    # y_pred refers to predicted values of y

# how good is the fit?
# calculate MSE:
MSE = NP.sqrt( NP.sum((y_pred-y)**2)/10 )
# MSE = .2

# now use the model polynomial to generate y values based on x values outside
# the range of the original data:
x_out = NP.linspace(0, 2, 20)   # choose 20 points, 10 in, 10 outside original range
y_pred = polyval([a, b, c], x_out)

# now plot the original data points and the polynomial fit through them
fig = PLT.figure()

ax1.plot(x, y, 'g.', x_out, y_pred, 'b-' )

PLT.show()
``````

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If you are using `SciPy` (Scientific Python) you can try `scipy.interp1d`. See the manual for an example.

Otherwise, any decent spreadsheet software should be able to do spline interpolation and give you a nice smooth graph.

Beware of extrapolation, though. If you don't have a good model for your data you might get completely unrelated data when extrapolating outside your input range.

Example (EDIT):

``````from scipy.interpolate import interp1d

# the available data points
x = [1, 2, 3]
y = [10, 20, 30]

# return a function f, such that f(x) is the interpolated value at 'x'
f = interp1d(x, y, kind='cubic')
``````

You can now compute the function `f(x)` at any point `x`. For example `print f(2.5)` will return the interpolated value for x=2.5.

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Most of what you want can be found here: http://docs.scipy.org/doc/scipy/reference/tutorial/interpolate.html

But don't extrapolate, at least until you are absolutely sure that you know what you are doing.

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