Math 360, Fall 2014, Assignment 13
From cartan.math.umb.edu
Algebra begins with the unknown and ends with the unknowable.
- - Anonymous
Carefully define the following terms, then give one example and one non-example of each:[edit]
- Group of units (of a unital ring).
- Euler $\phi$-function.
- Field of fractions (of an integral domain).
Carefully state the following theorems (you do not need to prove them):[edit]
- Chinese remainder theorem at the level of rings.
- Theorem describing the group of units of a product of two unital rings.
- Formula describing $\phi(nm)$ when $n$ and $m$ are relatively prime.
- Formula for $\phi(p^n)$ when $p$ is prime.
- Euler's Theorem.
- Fermat's Theorem.
- Theorem describing which rings can be embedded in fields.
Solve the following problems:[edit]
- Section 20, problems 5, 7, and 10.
- Section 21, problem 1.
Questions:[edit]
Does anyone know the theorem number of the chinese remainder theorem in the book? The book doesn't refer to it as the chinese remainder theorem.
- I don't think the book even states the CRT at ring level. Here it is: $\mathbb{Z}_n\times\mathbb{Z}_m$ is isomorphic (as a ring) to $\mathbb{Z}_{nm}$ if and only if $n$ and $m$ are relatively prime. - Steven.Jackson (talk) 12:40, 7 December 2014 (UTC)
