MAT401 Homework 4
代做数学Homework Determine whether or not each of the following polynomials is irreducible over Q. Explain what method you used
Read: Gallian, Chapters 17 and 18 (Omit the material on Euclidean domains)
Problems: 代做数学Homework
These problems are due on Crowdmark by 6pm on Wednesday, February 16. The solutions will be discussed in tutorials that week.
- Consider polynomials in R = Z2[x] and recall that non-constant polynomials in this ring have a unique factorization into irreducibles. In homework 3 you found the irreducibles of degree at most 3.
(i) Find all irreducible polynomials of degree 4. Explain your answer. (There are 3 of them.)
(ii) Find the factorization into irreducibles of the following polynomials:
- Determine whether or not each of the following polynomials is irreducible over Q. Explain what method you used. 代做数学Homework
- Suppose that r is a non-zero real number such that the quantity r + 1/r is three times an integer. Show that r is irrational.
(ii) Show that the elements 2 and 1 + √ 5 are both irreducible inR.
(iii) Show that R is not a UFD. 代做数学Homework
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