Respuesta :
As given,
Admission to the fair costs = $12.99
Cost of each ride = $1.75
Total money present = $35
Let the number of rides a person can take be x
Part A: The inequality that represents this situation is
35≤ 12.99 + x(1.75) where x represent the number of rides a person can take.
Part B:
Solving the equation we get,
35 = 12.99 + x(1.75)
1.75x = 35-12.99
1.75x = 22.01
x = [tex]\frac{22.01}{1.75}[/tex]
x = 12.577
Hence a person can take upto 12 rides.
Answer:
The required inequality is [tex]12.99+1.75x\leq 35[/tex].
You can ride maximum 12 rides.
Step-by-step explanation:
Consider the provided information.
Part(A)
Admission to the fair costs $12.99 and each ride costs $1.75.
Let you rides x number of rides.
Thus the expression for the total cost will be:
[tex]12.99+1.75x[/tex]
It is given that you have $35 to spend at the fair including admission.
That means you can pay $35 or less than it. So the required inequality is:
[tex]12.99+1.75x\leq 35[/tex]
Thus, the required inequality is [tex]12.99+1.75x\leq 35[/tex].
Part(A) Now we need to find the maximum number of rides you can enjoy at the Hot Summer Fair.
Solve the inequity for x as shown:
[tex]12.99+1.75x\leq 35[/tex]
[tex]1.75x\leq 35-12.99[/tex]
[tex]1.75x\leq 22.01[/tex]
[tex]x\leq \frac{22.01}{1.75}[/tex]
[tex]x\leq 12.58[/tex]
Thus, the number of ride should be less than or equal to 12.
Hence, you can ride maximum 12 rides.
