Question:

Consider the ring Z of integers. Then, Z is a mod- ule over

Last updated: 8/5/2022

Consider the ring Z of integers. Then, Z is a mod- ule over

Consider the ring Z of integers. Then, Z is a mod- ule over itself. For each positive integer n, prove that the Z-module Z has an n-element generating set X such that no proper subset of X generates Z.