Question
Clara wants to have her birthday party at a dine-in movie theater. Her dad calls the theater to let them know 12 kids will attend the party. The theater offers Clara's dad a group rate, which comes out to $16.25 per kid.
Let c represent the total cost for the group. Which equation models the problem?
Solve this equation to find the total cost for the group.
$
Let c represent the total cost for the group. Which equation models the problem?
Solve this equation to find the total cost for the group.
$
Answers
GPT-4o mini
To model the problem using an equation, we can express the total cost \( c \) as a function of the number of kids attending the party and the cost per kid.
Let \( k \) represent the number of kids, which is given as 12. Let \( r \) represent the rate per kid, which is \( 16.25 \).
The equation to model the total cost \( c \) is:
\[
c = k \cdot r
\]
Substituting the values of \( k \) and \( r \):
\[
c = 12 \cdot 16.25
\]
Now let's solve for \( c \):
\[
c = 12 \cdot 16.25 = 195
\]
Therefore, the total cost for the group is:
\[
\boxed{195}
\]
Let \( k \) represent the number of kids, which is given as 12. Let \( r \) represent the rate per kid, which is \( 16.25 \).
The equation to model the total cost \( c \) is:
\[
c = k \cdot r
\]
Substituting the values of \( k \) and \( r \):
\[
c = 12 \cdot 16.25
\]
Now let's solve for \( c \):
\[
c = 12 \cdot 16.25 = 195
\]
Therefore, the total cost for the group is:
\[
\boxed{195}
\]