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@ -427,8 +427,8 @@ written $\dec{Im}(f)$, is the set of values that it can return, i.e. |
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\item Injective: $\forall a,a' \in A$ if $f(a) = f(a')$ then $a = a'$. |
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\item Surjective: $\forall b \in B,\exists a \in A$ such that $f(a) = b$. |
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\end{itemize} |
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If a function $f$ is both injective and surjective, then it is said |
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to be a bijective. |
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If a function is both injective and surjective, then it is said to |
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be a bijective. |
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\end{definition} |
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% |
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An injective function guarantees that each element in its image is |
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