Category:Examples of Modulo Polynomial Division
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This category contains examples of Modulo Polynomial Division.
Let $\map f x$ and $\map g x$ be integral polynomials.
The operation of polynomial division modulo $m$ is defined as:
- $\map f x \div_m \map g x$ equals the integral polynomial $\map h x$ such that:
- $\map g x \times_m \map h x \equiv \map f x \pmod m$
where:
- $m \in \Z$ is an integer
- $\equiv$ means that the respective coefficients are congruent modulo $m$
provided such a polynomial exists.
Pages in category "Examples of Modulo Polynomial Division"
The following 4 pages are in this category, out of 4 total.