The Quotient by the Kernel Induces an Injective Homomorphism
Problem 4
Let $G$ and $G’$ be a group and let $\phi:G \to G’$ be a group homomorphism.
Show that $\phi$ induces an injective homomorphism from $G/\ker{\phi} \to G’$.
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Let $G$ and $G’$ be a group and let $\phi:G \to G’$ be a group homomorphism.
Show that $\phi$ induces an injective homomorphism from $G/\ker{\phi} \to G’$.
Add to solve later