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Amlak 4.

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Show that the radical of the ideal $I=\left(x, y^{2}\right)$ in $Q[x, y]$ is $(x, y)$ (cf. Exercise 30 , Section 7.4). Deduce that $I$ is a primary ideal that is not a power of a prime ideal (cf. Exercise 41, Section 7.4).

Polynomial Rings

Definitions and Basic Properties

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Dan Quijada

Numerade educator

Let G be a group and { H_{i} I i \in I} a family of subgroups. Then for any $ a\in G $, $ (\cap_{i\in I}H_{i})a = \cap_{i\inI}H_{i}a $

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