To find the corresponding \( y \)-value for \( x = 4 \) in the function \( y = 4.25(6x) \), we first need to substitute \( x = 4 \) into the equation.
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Substitute \( x = 4 \): \[ y = 4.25(6 \cdot 4) \]
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Calculate \( 6 \cdot 4 \): \[ 6 \cdot 4 = 24 \]
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Substitute back into the equation: \[ y = 4.25(24) \]
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Calculate \( 4.25 \cdot 24 \): \[ y = 102 \]
So, for \( x = 4 \), the corresponding \( y \)-value is \( 102 \).
To summarize:
- The function is \( y = 4.25(6x) \).
- When \( x = 4 \), \( y = 102 \).
If you would like to see a graph of the function, keep in mind that it is a linear function. You can plot additional points by substituting other values for \( x \). If you need further assistance with graphing or additional points, feel free to ask!