# Difference between revisions of "Vieta's Formulas"

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We now have two different expressions for <math>P(x)</math>. These ''must'' be equal. However, the only way for two polynomials to be equal for all values of <math>x</math> is for each of their corresponding coefficients to be equal. So, starting with the coefficient of <math> x^n </math>, we see that | We now have two different expressions for <math>P(x)</math>. These ''must'' be equal. However, the only way for two polynomials to be equal for all values of <math>x</math> is for each of their corresponding coefficients to be equal. So, starting with the coefficient of <math> x^n </math>, we see that | ||

− | <center><math> a_n = a_n</math></center> | + | <center><math>\displaystyle a_n = a_n</math></center> |

<center><math> a_{n-1} = -a_n(r_1+r_2+\cdots+r_n)</math></center> | <center><math> a_{n-1} = -a_n(r_1+r_2+\cdots+r_n)</math></center> | ||

<center><math> a_{n-2} = a_n(r_1r_2+r_1r_3+\cdots+r_{n-1}r_n)</math></center> | <center><math> a_{n-2} = a_n(r_1r_2+r_1r_3+\cdots+r_{n-1}r_n)</math></center> |

## Revision as of 16:15, 12 July 2006

## Introduction

Let , where the coefficient of is . As a consequence of the Fundamental Theorem of Algebra, we can also write , where are the roots of . We thus have that

Expanding out the right hand side gives us

We can see that the coefficient of will be the th symmetric sum. The th symmetric sum is just the sum of the roots taken at a time. For example, the 4th symmetric sum is Notice that every possible combination of four roots shows up in this sum.

We now have two different expressions for . These *must* be equal. However, the only way for two polynomials to be equal for all values of is for each of their corresponding coefficients to be equal. So, starting with the coefficient of , we see that

More commonly, these are written with the roots on one side and the on the other (this can be arrived at by dividing both sides of all the equations by ).

If we denote as the th symmetric sum, then we can write those formulas more compactly as , for .