Commutative ring/Residue class ring/Definition

Let ${\displaystyle {}R}$ be a commutative ring, and let ${\displaystyle {}I\subseteq R}$ be an ideal in ${\displaystyle {}R}$. Then the residue class ring ${\displaystyle {}R/I}$ (R modulo I) is a commutative ring that is determined by the following data.

1. As a set, ${\displaystyle {}R/I}$ is the set of all cosets to ${\displaystyle {}I}$.
2. An addition of cosets is defined by

   ${\displaystyle {}(a+I)+(b+I):=(a+b+I)\,.}$

3. A multiplication of cosets is defined by

   ${\displaystyle {}(a+I)\cdot (b+I):=(a\cdot b+I)\,.}$

4. ${\displaystyle {}{\bar {0}}=0+I=I}$ is the neutral element of the addition (the zero class).
5. ${\displaystyle {}{\bar {1}}=1+I}$ is the neutral element of the multiplication (the unit class).