Why Are 10-adics Not a Field?

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10-adics are not a field because they contain zero divisors, which disqualifies them from being a field as defined in abstract algebra. A field is a commutative ring where every nonzero element is invertible and has no zero divisors. To determine if a set is a field, one must verify that it meets these criteria, particularly the absence of zero divisors. The discussion highlights the importance of understanding the structure of rings and fields in mathematics. An example of zero divisors in 10-adics would clarify this point further.
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I've got a question and I really need the answer! Why 10-adics are not a field? And generally, How can you be sure that a given set is a field or not? For example rational numbers are a field, but what about the others and how can you be sure?
 
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You cannot decide whether a given set is a field. You can decide whether a given ring is a field. After all, a field is by definition a special kind of ring, namely a commutative ring in which every nonzero element is invertible. In particular, a field has no zero divisors (i.e. a field is a domain). If you can show that a certain ring has zero divisors, then it is not a field.
 
@Landau:
My bad, you're right. But what is the zero divisors for 10-adics? Is there any example?
 

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