adrianparvino/Lang.org

Created March 24, 2018 11:09

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A homomorphism whose kernel is trivial is injective. Proof: Given \(f(x) = f(y)\), then \(f(xy^-1) = f(x)f(y^-1) = e’\) Therefore \(xy^-1 = e\) and \(x = y\)