Question
Emma wants to buy some snacks that cost $3 each. She has no more than $18 to spend. Which inequality represents the maximum number of snacks, s, Emma can buy?
Answers
GPT-4o mini
To represent the maximum number of snacks \( s \) that Emma can buy with her budget, you can set up the following inequality based on the information provided:
1. Each snack costs $3, so if Emma buys \( s \) snacks, the total cost would be \( 3s \).
2. Emma has no more than $18 to spend.
Putting these together, the inequality can be formulated as:
\[
3s \leq 18
\]
To find the maximum number of snacks, we can solve this inequality for \( s \):
1. Divide both sides by 3:
\[
s \leq \frac{18}{3}
\]
\[
s \leq 6
\]
So, the inequality \( 3s \leq 18 \) represents the maximum number of snacks \( s \) that Emma can buy, which is at most 6 snacks.
1. Each snack costs $3, so if Emma buys \( s \) snacks, the total cost would be \( 3s \).
2. Emma has no more than $18 to spend.
Putting these together, the inequality can be formulated as:
\[
3s \leq 18
\]
To find the maximum number of snacks, we can solve this inequality for \( s \):
1. Divide both sides by 3:
\[
s \leq \frac{18}{3}
\]
\[
s \leq 6
\]
So, the inequality \( 3s \leq 18 \) represents the maximum number of snacks \( s \) that Emma can buy, which is at most 6 snacks.