Respuesta :
Answer:
[tex]x+y=12[/tex]
[tex]21.50x+14.75y=204[/tex]
Step-by-step explanation:
Let x be the number of adult tickets and y be the number of children's tickets.
We are given that there are total 12 people. Therefore, we can set:
[tex]x+y=12[/tex]
Moreover, we are given that an adult ticket costs $21.50 and a child's ticket costs $14.75, therefore, cost of x adult tickets will be [tex]21.50x[/tex] and cost of y children's ticket will be [tex]14.75y[/tex]. We can form the second equation by setting the total cost of tickets as:
[tex]21.50x+14.75y=204[/tex]
Therefore, the required system of equations that could be used to find x and y will be:
[tex]x+y=12[/tex]
[tex]21.50x+14.75y=204[/tex]
Answer:
[tex]x+y = 12[/tex]
[tex]21.50x+14.75y=204.00[/tex]
Step-by-step explanation:
Given :
A local amusement park charges $21.50 per daily adult ticket and $14.75 per daily child's ticket.
Group of 12 people paid $204.00 for tickets.
To Find : System of equations could be used to find x, the number of adult tickets purchased, and y, the number of children's tickets purchased.
Solution :
Since group contains 12 people so no. of tickets are 12 .
Let out of 12 people no. of adults's tickets are x.
Let out of 12 people no. of children's ticket are y .
⇒[tex]x+y = 12[/tex]
Since charge of one adult ticket = $21.50
So, charge of x adult tickets = $21.50 x
Since charge of one child ticket = $14.75
So, charge of y children tickets =$14.75 y
And we are given that total amount paid by these 12 people = $204.00
Thus [tex]21.50x+14.75y=204.00[/tex]
Hence , System of equations could be used to find x, the number of adult tickets purchased, and y, the number of children's tickets purchased:
[tex]x+y = 12[/tex]
[tex]21.50x+14.75y=204.00[/tex]
