Group Theory/Characteristic subgroups

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We conclude:

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1. Prove that all subgroups of ${\displaystyle {\mathbb{Z}}_6}$ are characteristic.
2. Let ${\displaystyle H,L}$ be two finite simple groups such that ${\displaystyle |L|}$ is divisible by a prime number ${\displaystyle p}$ that does not divide ${\displaystyle |H|}$. Use the structure theorem for characteristically simple groups to prove that ${\displaystyle H\times L}$ is not characteristically simple.
3. Prove that a subgroup of a characteristically simple group need not be characteristically simple.
4. Prove that the product of characteristically simple subgroups whose minimal normal subgroups are not isomorphic is not characteristically simple.

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