Paper 3, Section II, E
(a) Define what is meant by an algebraic integer . Show that the ideal
in is generated by a monic irreducible polynomial . Show that , considered as a -module, is freely generated by elements where .
(b) Assume satisfies . Is it true that the ideal (5) in is a prime ideal? Is there a ring homomorphism ? Justify your answers.
(c) Show that the only unit elements of are 1 and . Show that is not a UFD.
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