The last set of ordered pairs, [tex]\{(1.2),(2,3), (3,4),(4.5)\}[/tex], would still be a function even if its x- and y-coordinates where reversed.
Reversing the x- and y-coordinates is like finding the inverse relation.
An inverse relation will be a function if the original function were one-to-one. The only set of ordered pairs that satisfies this condition is
[tex]\{(1.2),(2,3), (3,4),(4.5)\}[/tex]
The other options are many-to-one relations. On reversing their x- and y-coordinates, they each become one-to-many relations. All functions are either one-to-one, or many-to-one.
So, the answer is the last set of ordered pairs [tex]\{(1.2),(2,3), (3,4),(4.5)\}[/tex]
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