# Multiplication of two polynomials [closed]

I have two polynomials p1 and p2. How do I multiply and print the result?

This is what i have:

``````class Polynomal:
def __init__(self, coefficients):
self.coefficients=coefficients

def coeff(self,i):
if(i>=len(self.coefficients)):
return 0
else:
return self.coefficients[(len(self.coefficinets)-i-1)]

p1=Polynomal([1,-7,10,-4,6])
p2=Polynomal([-4,5])
``````
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What have you tried? –  Aram Kocharyan Mar 11 '12 at 19:35
Can you provide an example of what you're trying to do? –  prelic Mar 11 '12 at 19:36
What have you tried? How are the polynomials stored in Python? Do you have any sort of example that we can go off of to help you? We can't be expected to write a solution for you; please provide more information. –  Makoto Mar 11 '12 at 19:37
-1 Please include examples of what you've tried, and if this is homework, tag it as such. –  Joel Cornett Mar 11 '12 at 19:57
So, what is `Polynomal([-4,5])`? `-4+5x`? `-4x+5`? Anything else? –  Avaris Mar 11 '12 at 20:14
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## closed as not a real question by HaskellElephant, RichardTheKiwi, bstpierre, jonsca, S.L. BarthOct 2 '12 at 13:22

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

I'm not sure what is representation of your polynominals. But look at http://code.google.com/p/sympy/ maybe it will help.

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Note: The order in which you store your coefficients, with the lowest index in the array corresponding to the highest degree in the polynomial, is not something I'd have used. Consider switching that.

That said, you can multiply polynomials `a` and `b` along the following lines:

``````# Compute c = a * b
c = Polynomial(a.deg() + b.deg()) # Polynomial of given degree
for i in range(a.deg() + 1):
for j in range(b.deg() + 1):
c.addToCoefficient(i + j, a.coeff(i)*b.coeff(j))
c.normalize()
``````

The key point is that a single multiplication of two monomials is performed like this:

ai xi · bj xj = (ai · bj) xi+j

So if you do this for every pair of monomials, and make sure to add the resulting coefficients for the same degree, then you end up with the product polynomial.

The above code assumes a few functions your code doesn't provide yet:

• A branch in the constructor to create a polynomial of a given degree, with all coefficients initialized to zero, if the argument is a single number representing that degree
• A method `deg` to compute the degree of the polynomial
• A method `addToCoefficient` which will take an index and a value and add the value to the coefficient of the given index
• A method `normalize` which will remove leading zero terms

All of these should be fairly easy to implement. And by using this abstract notation, the above code remains unmodified and readable no matter how you store coefficients internally.

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