The members of a bridge club are divided into tables of 4 to play bridge. There are 19 bridge tables at the club. What inequality expresses how many people can come to play on a given night?(1 point)

Question

The members of a bridge club are divided into tables of 4 to play bridge. There are 19 bridge tables at the club. What inequality expresses how many people can come to play on a given night?(1 point)
Responses

p≤19 / 4
  p less-than-or-equal-to Start Fraction 19 over 4 End Fraction

p4≤19
Start Fraction p over 4 End Fraction less-than-or-equal-to 19

p4>19
  Start Fraction p over 4 End Fraction greater than 19

4p≤19

GPT-4o mini · Answer

To determine how many people $ p $ can come to play on a given night at the bridge club, we need to consider that each table accommodates 4 players and there are 19 tables. Therefore, the maximum number of players that can be accommodated is $ 19 \times 4 = 76 $. Thus, we can express this as an inequality: $$ p \leq 76 $$ However, the options provided in your question appear to be set up differently. Let's analyze each option: 1. **$ p \leq \frac{19}{4} $**: This means the number of players cannot exceed $ 4.75 $, which doesn't make sense for a bridge club scenario. 2. **$ \frac{p}{4} \leq 19 $**: This means that if we divide the number of players by 4, it should not exceed 19, which simplifies to $ p \leq 76 $. This is correct. 3. **$ \frac{p}{4} > 19 $**: This means the number of players would have to exceed $ 76 $, which is incorrect. 4. **$ 4p \leq 19 $**: This means the product of 4 and the number of players cannot exceed 19, which doesn't make sense in this context. Based on this analysis, the correct expression from your options is: $$ \frac{p}{4} \leq 19 $$