Answer:
Part a) [tex]a=4g+10[/tex] (see the explanation)
Part b) see the explanation
Part c) The graph in the attached figure
Step-by-step explanation:
The complete question is
With a family bowling pass, families can bowl for $4 per game. The pass costs $10 per year. Use an equation, a table, and a graph to explain the relationship between the total amount of money spent on bowling in a year, a, and the number of games a family plays in a year, g. Part A Use words and an equation to represent this problem. Part B Create a table to show values for g and a. Part C Use the values from your table to draw a graph.
Part A) Use words and an equation to represent this problem
Let
a ----> the total amount of money spent on bowling in a year
g ---> the number of games a family plays in a year
we know that
The linear equation in slope intercept form is equal to
[tex]a=mg+b[/tex]
where
m is the slope or unit rate
b is the a-intercept or initial value
In this problem we have
[tex]m=\$4\ per\ game[/tex]
[tex]b=\$10[/tex]
substitute
[tex]a=4g+10[/tex]
Part b) Create a table to show values for g and a
Assume different values of g and calculate the corresponding values of a
For g=0 ----> [tex]a=4(0)+10=\$10[/tex]
For g=1 ----> [tex]a=4(1)+10=\$14[/tex]
For g=2 ----> [tex]a=4(2)+10=\$18[/tex]
For g=3 ----> [tex]a=4(3)+10=\$22[/tex]
For g=4 ----> [tex]a=4(4)+10=\$26[/tex]
The table is
[tex]\left[\begin{array}{ccc}g&a\\0&10\\1&14\\2&18\\3&22\\4&26\end{array}\right][/tex]
Part c) Use the values from your table to draw a graph
we have the ordered pairs
[tex](0,10),(1,14),(2,18),(3,22),(4,26)[/tex]
Plot the ordered pairs and join them to graph the line
The graph in the attached figure
