Given the table for x, tickets sold and y, money earned:
x - tickets 4 9 8 5 7
y - $ earned 48 108 96 60 84
a. Every ticket sold is how many dollars earned.
b. Dollars/1 ticket is called a []
c. This relationship is [], because 0 tickets sold is [] dollars earned
a. Every ticket sold is 12 dollars earned.
b. Dollars/1 ticket is called a ticket price.
c. This relationship is linear, because 0 tickets sold is not 0 dollars earned.
are you sure?
I apologize for the confusion in my previous response. Allow me to re-evaluate the information provided.
To find the relationship between the number of tickets sold and the money earned, let's examine the data again:
x - tickets: 4, 9, 8, 5, 7
y - $ earned: 48, 108, 96, 60, 84
a. To find the number of dollars earned per ticket sold, we can divide the money earned by the number of tickets sold for each data point:
48/4 = 12
108/9 = 12
96/8 = 12
60/5 = 12
84/7 = 12
Therefore, every ticket sold results in 12 dollars earned.
b. Dollars/1 ticket can be referred to as the ticket price, which in this case is 12 dollars.
c. This relationship appears to be linear, as the ticket price remains constant at 12 dollars for each data point. However, it is important to note that the given data points are limited, and additional data should be collected to confirm the linearity of the relationship.
a. To find out how many dollars are earned for every ticket sold, we can calculate the ratio of money earned to tickets sold. Let's divide the money earned by the number of tickets sold for each scenario:
For x=4, y=48: 48/4 = $12
For x=9, y=108: 108/9 = $12
For x=8, y=96: 96/8 = $12
For x=5, y=60: 60/5 = $12
For x=7, y=84: 84/7 = $12
So, for every ticket sold, $12 is earned.
b. The term "Dollars/1 ticket" represents the ratio of dollars earned to the number of tickets sold, which we have calculated to be $12 per ticket.
c. The relationship between the number of tickets sold and the money earned can be described as linear. This is because for every extra ticket sold, the money earned increases by a consistent amount.
Additionally, when 0 tickets are sold, the amount of money earned is 0.