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![ring theory - Lang's *Algebra*: definition of $F[\alpha]$ and why it's an integral domain? - Mathematics Stack Exchange](https://i.stack.imgur.com/pee7I.png "ring theory - Lang's *Algebra*: definition of $F[\alpha]$ and why it's an integral domain? - Mathematics Stack Exchange")
ring theory - Lang's *Algebra*: definition of $F[\alpha]$ and why it's an integral domain? - Mathematics Stack Exchange
13 IntegralDomains | PDF | Integer | Ring (Mathematics)
SOLVED: Integral domain is a commutative ring with unity and containing no zero divisors True False Only finite field is an integral domain True False M2(Z3) +, is integral domain> True False
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