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rosefish289Lv1
9 Apr 2020
Vertical line test: Domain and Range . Use the vertical line test to determine whether the curve is a graph of a function of
.If it is, state the domain and range of the function.
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)
Vertical line test: Domain and Range . Use the vertical line test to determine whether the curve is a graph of a function of .If it is, state the domain and range of the function.
Nestor RutherfordLv2
24 May 2020