To model the situation with an equation, we start with the initial fee and the cost per mile. The taxi driver charges a $4 initial fee and $2 for every mile traveled.
- Let \( x \) be the number of miles traveled.
- The initial fee is $4.
- The cost for \( x \) miles is \( 2x \).
- The total cost for the ride is given as $28.
Thus, the equation that models this situation is:
\[ 4 + 2x = 28 \]
Now, to solve for \( x \):
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Subtract 4 from both sides: \[ 2x = 28 - 4 \] \[ 2x = 24 \]
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Divide both sides by 2: \[ x = \frac{24}{2} \] \[ x = 12 \]
So, the correct equation that models this situation is \( 4 + 2x = 28 \), and the correct value for \( x \) is 12.
Therefore, the correct choice is:
D. \( 4 + 2x = 28; , x = 12 \)
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