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Numpy Beginner's Guide (Update)

You're reading from   Numpy Beginner's Guide (Update) Build efficient, high-speed programs using the high-performance NumPy mathematical library

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Product type Paperback
Published in Jun 2015
Publisher
ISBN-13 9781785281969
Length 348 pages
Edition 1st Edition
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Author (1):
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Ivan Idris Ivan Idris
Author Profile Icon Ivan Idris
Ivan Idris
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Table of Contents (16) Chapters Close

Preface 1. NumPy Quick Start 2. Beginning with NumPy Fundamentals FREE CHAPTER 3. Getting Familiar with Commonly Used Functions 4. Convenience Functions for Your Convenience 5. Working with Matrices and ufuncs 6. Moving Further with NumPy Modules 7. Peeking into Special Routines 8. Assuring Quality with Testing 9. Plotting with matplotlib 10. When NumPy Is Not Enough – SciPy and Beyond 11. Playing with Pygame A. Pop Quiz Answers B. Additional Online Resources C. NumPy Functions' References
Index

Time for action – fitting to polynomials


The NumPy polyfit() function fits a set of data points to a polynomial, even if the underlying function is not continuous:

  1. Continuing with the price data of BHP and VALE, look at the difference of their close prices and fit it to a polynomial of the third power:

    bhp=np.loadtxt('BHP.csv', delimiter=',', usecols=(6,), unpack=True)
    vale=np.loadtxt('VALE.csv', delimiter=',', usecols=(6,), unpack=True)
    t = np.arange(len(bhp))
    poly = np.polyfit(t, bhp - vale, 3)
    print("Polynomial fit", poly)

    The polynomial fit (in this example, a cubic polynomial was chosen) is as follows:

    Polynomial fit [  1.11655581e-03  -5.28581762e-02   5.80684638e-01   5.79791202e+01]
    
  2. The numbers you see are the coefficients of the polynomial. Extrapolate to the next value with the polyval() function and the polynomial object that we got from the fit:

    print("Next value", np.polyval(poly, t[-1] + 1))

    The next value we predict will be this:

    Next value 57.9743076081
    
  3. Ideally, the difference...

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