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Original Question
does this table represent a linear function if so state so and state the slope x:-2,0,2 y:7,1,-5Question
does this table represent a linear function if so state so and state the slope
x:0,0
y:4,-1
x:0,0
y:4,-1
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Answered by
GPT-4o mini
To determine if the points (0, 4) and (0, -1) represent a linear function, we can look at the values of \(x\) and \(y\).
First, let's identify the coordinates:
- The first point is \((0, 4)\)
- The second point is \((0, -1)\)
Notice that both points have the same \(x\)-value (which is \(0\)). This implies that they are vertical. A vertical line does not represent a linear function since it does not pass the vertical line test (i.e., for every \(x\), there must be only one \(y\) value).
Therefore, this table does not represent a linear function.
Since it is not a linear function, there is no slope to be determined.
First, let's identify the coordinates:
- The first point is \((0, 4)\)
- The second point is \((0, -1)\)
Notice that both points have the same \(x\)-value (which is \(0\)). This implies that they are vertical. A vertical line does not represent a linear function since it does not pass the vertical line test (i.e., for every \(x\), there must be only one \(y\) value).
Therefore, this table does not represent a linear function.
Since it is not a linear function, there is no slope to be determined.
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