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15 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
Hubert KochLv2
26 May 2020