I am currently doing a python exercise for my University studies. I am very stuck at this task:
The taylor polynomial of degree N for the exponential function e^x is given by:
N p(x) = Sigma x^k/k! k = 0
Make a program that (i) imports class Polynomial (found under), (ii) reads x and a series of N values from the command line, (iii) creates a Polynomial instance representing the Taylor polynomial, and (iv) prints the values of p(x) for the given N values as well as the exact value e^x. Try the program out with x = 0.5, 3, 10 and N = 2, 5, 10, 15, 25.
import numpy class Polynomial: def __init__(self, coefficients): self.coeff = coefficients def __call__(self, x): """Evaluate the polynomial.""" s = 0 for i in range(len(self.coeff)): s += self.coeff[i]*x**i return s def __add__(self, other): # Start with the longest list and add in the other if len(self.coeff) > len(other.coeff): result_coeff = self.coeff[:] # copy! for i in range(len(other.coeff)): result_coeff[i] += other.coeff[i] else: result_coeff = other.coeff[:] # copy! for i in range(len(self.coeff)): result_coeff[i] += self.coeff[i] return Polynomial(result_coeff) def __mul__(self, other): c = self.coeff d = other.coeff M = len(c) - 1 N = len(d) - 1 result_coeff = numpy.zeros(M+N+1) for i in range(0, M+1): for j in range(0, N+1): result_coeff[i+j] += c[i]*d[j] return Polynomial(result_coeff) def differentiate(self): """Differentiate this polynomial in-place.""" for i in range(1, len(self.coeff)): self.coeff[i-1] = i*self.coeff[i] del self.coeff[-1] def derivative(self): """Copy this polynomial and return its derivative.""" dpdx = Polynomial(self.coeff[:]) # make a copy dpdx.differentiate() return dpdx def __str__(self): s = '' for i in range(0, len(self.coeff)): if self.coeff[i] != 0: s += ' + %g*x^%d' % (self.coeff[i], i) # Fix layout s = s.replace('+ -', '- ') s = s.replace('x^0', '1') s = s.replace(' 1*', ' ') s = s.replace('x^1 ', 'x ') #s = s.replace('x^1', 'x') # will replace x^100 by x^00 if s[0:3] == ' + ': # remove initial + s = s[3:] if s[0:3] == ' - ': # fix spaces for initial - s = '-' + s[3:] return s def simplestr(self): s = '' for i in range(0, len(self.coeff)): s += ' + %g*x^%d' % (self.coeff[i], i) return s def _test(): p1 = Polynomial([1, -1]) p2 = Polynomial([0, 1, 0, 0, -6, -1]) p3 = p1 + p2 print p1, ' + ', p2, ' = ', p3 p4 = p1*p2 print p1, ' * ', p2, ' = ', p4 print 'p2(3) =', p2(3) p5 = p2.derivative() print 'd/dx', p2, ' = ', p5 print 'd/dx', p2, p2.differentiate() print ' = ', p5 p4 = p2.derivative() print 'd/dx', p2, ' = ', p4 if __name__ == '__main__': _test()
Now I'm really stuck at this, and I would love to get an explaination! I am supposed to write my code in a separate file. I'm thinking about making an instance of the Polynomial class, and sending in the list in argv[2:], but that doesn't seem to be working. Do I have to make a def to calculate the taylor polynomial for the different values of N before sending it in to the Polynomial class?
Any help is great, thanks in advance :)