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1 given a b c in a group g not necessarily abelian show


1) Given a, b, c in a group G (not necessarily abelian), show that there exists a unique element x such that axb = c. Be sure to show that x exists, and also that x is unique.

2) Give an example of a group G along with an element a ∈ G such that x^2 = a has no solutions.

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Mathematics: 1 given a b c in a group g not necessarily abelian show
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