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Problem 61 (Unique Factorization Uniqueness Proof)

Suppose that we have factored a polynomial in $\mathbb{Z}[x]$ in two way, namely $$b_1b_2\cdots b_sp_1(x)p_2(x)\cdots p_m(x)=c_1c_2\cdots c_tq_1(x)q_2(x)\cdots q_n(x).$$ Prove that $s=t$, $m=n$, and after renumbering the $c$'s and $q(x)$'s, we have $b_i=\pm c_i$ and $p_j(x)=\pm q_j(x)$ for all $i$ and $j$.

The following pages link to this page.

Problem.UniqueFactorizationUniquenessProof
Schedule.20140226
Schedule.20170227
Schedule.20170301
Schedule.20170306
Schedule.20170313
Schedule.AllProblems442

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Page last modified on February 24, 2017, at 02:04 PM

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HomePage Current Problems All Problems Pictures ProblemsByWeek List of Problems List of Definitions List of Theorems List of Conjectures All Recent changes (use this to find a page that may have been lost)	Problem Unique Factorization Uniqueness Proof Please Login to access more options. Problem 61 (Unique Factorization Uniqueness Proof) Suppose that we have factored a polynomial in $\mathbb{Z}[x]$ in two way, namely $$b_1b_2\cdots b_sp_1(x)p_2(x)\cdots p_m(x)=c_1c_2\cdots c_tq_1(x)q_2(x)\cdots q_n(x).$$ Prove that $s=t$, $m=n$, and after renumbering the $c$'s and $q(x)$'s, we have $b_i=\pm c_i$ and $p_j(x)=\pm q_j(x)$ for all $i$ and $j$. The following pages link to this page. Problem.UniqueFactorizationUniquenessProof Schedule.20140226 Schedule.20170227 Schedule.20170301 Schedule.20170306 Schedule.20170313 Schedule.AllProblems442 Edit Page History Source Attach File Backlinks List Group Page last modified on February 24, 2017, at 02:04 PM
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