I have a question regarding to the differentiation, in my coding I define `p`

as a list of polynomial of `x`

, however, when I tried to differentiate it with `x`

, it does work, why is that so? thank you.

```
import csv
import numpy
from sympy import *
import numpy as np
from numpy import *
reader=csv.reader(open("/Users/61/Desktop/pythonlearning/generator1.csv","rU"),delimiter=',')
a=list(reader)
result=numpy.array(a)
print a
print result
from operator import add
class Poly:
def __init__(self,coeffs):
self.degree = len(coeffs)-1
self.rep = self.__str(coeffs)
coeffs.reverse()
self.coeffs = coeffs
def __str(self,coeffs):
terms = [" + ("+str(coeffs[k])+"*x**" + \
str(self.degree-k)+")" \
for k in range(len(coeffs)) \
if coeffs[k]<>0]
return reduce(add,terms)
def __repr__(self):
return self.rep
def __call__(self,val):
sum = 0
return reduce(add,[self.coeffs[i]*val**i \
for i in range(len(self.coeffs))])
def __add__(self,other):
"""Adds two polynomials together, assuming the coeffs are
ordered by ascending degree."""
sum_terms = [0] * max(len(self.coeffs),
len(other.coeffs))
for i in range(len(self.coeffs)):
sum_terms[i] = self.coeffs[i]
for i in range(len(other.coeffs)):
sum_terms[i] = sum_terms[i] + other.coeffs[i]
sum_terms.reverse()
return Poly(sum_terms)
p = []
for n in range(3):
p.append(Poly(a[n+1][0:3]))
print p[0]
i = diff(p,x)
```

`x`

anywhere. In any case, what you are doing here is completely misguided. I don't know how you expect Python to magically know how to differentiate your`Poly`

class. – interjay Mar 10 '13 at 16:12stringx in the`__str__`

method. You are not using sympy at any point in your code. Your`Poly`

class has no means to talk to sympy or nympy. By the way, these libraries already have polynomial objects that you can directly use. – Krastanov Mar 10 '13 at 20:43