A truck rental store charges $50 plus $14 each hour. Use an algebraic expression to find the cost of the truck rental for 5 hours.
Let \( C \) be the cost of the truck rental for 5 hours.
The truck rental store charges $14 for each of the 5 hours, so the cost for those 5 hours is \( 5 \times 14 = 70 \) dollars.
The total cost of the truck rental is $50 plus the cost for the 5 hours, so \( C = 50 + 70 = \boxed{120} \) dollars.
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To find the cost of the truck rental for 5 hours, you can use the given information that the store charges $50 plus $14 for each hour.
Let's use the variable x to represent the number of hours rented.
The cost of the truck rental can be calculated using the expression:
Cost = 50 + 14x
Substituting x with 5 (since we want to find the cost for 5 hours), the expression becomes:
Cost = 50 + 14(5)
Evaluating this expression gives:
Cost = 50 + 70
Simplifying further,
Cost = 120
Therefore, the cost of the truck rental for 5 hours is $120.
To find the cost of the truck rental for 5 hours, we first need to calculate the charge for the 5 hours. The truck rental store charges $14 for each hour, so for 5 hours, the charge would be 5 multiplied by $14, which is 5 * $14 = $70.
Now, to find the total cost of the truck rental, we add this charge to the base cost of $50. So, the algebraic expression to find the cost of the truck rental for 5 hours is 50 + (5 * 14), which simplifies to:
50 + 70 = $120
Therefore, the cost of the truck rental for 5 hours would be $120.