Admission to the country fair cost $9per person the ride tickets cost $2.50 each. Write an equation representing total cost
Admission = $9 charged once
each ride = $2.5x (x=number of rides)
Total cost for x rides
=2.5x+9
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Sure, here's an equation that represents the total cost:
Total Cost = (Number of People * Cost per Person) + (Number of Ride Tickets * Cost per Ride Ticket)
Let's say there were 'p' people and 'r' ride tickets purchased. The equation becomes:
Total Cost = (p * $9) + (r * $2.50)
Let's represent the number of people attending the fair as 'p' and the number of ride tickets as 't'.
The cost of admission to the country fair for each person is $9, so the total cost for admission would be 9p.
The cost of each ride ticket is $2.50, so the total cost of ride tickets would be 2.50t.
To calculate the total cost, we add the cost of admission to the cost of ride tickets, so the equation representing the total cost would be:
Total cost = 9p + 2.50t
To write an equation representing the total cost, we need to consider the admission cost and the cost of ride tickets. Let's use the variable "x" to represent the number of ride tickets purchased.
The admission cost is $9 per person, which means it remains constant regardless of the number of tickets purchased. So, the cost of admission can be represented as 9.
The cost of ride tickets is $2.50 each, and since the number of ride tickets purchased is represented by "x", the cost of ride tickets can be represented as 2.50x.
Adding these two costs together will give us the total cost, which can be represented by the equation:
Total Cost = Admission Cost + Ride Ticket Cost
So, the equation representing the total cost is:
Total Cost = 9 + 2.50x