Pre-Calc/Chapter 1: Functions and Graphs/1.5 Parametric Relations and Inverses Determine if the function is one-to-one. Determine if the function is one-to-one.


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 1.0000000 0.3333333 0 true true abc Yes Incorrect No Correct