Question

A group of 29 campers is going on a field trip. Each car that goes on the trip can

take 4 campers. Write an inequality that shows the minimum number of cars that will be sufficient to transport all the campers.
2. The camp parking lot has room for 10 cars. The camp counselors have already
parked their 2 cars in the lot. Write an inequality to show the additional number
of cars that can park in the lot.
3. Solve both inequalities. What number is a solution of both inequalities? If 29
campers need to be transported, and the cars need to gather in the camp parking
lot before driving out, how many cars should be used for the trip?

Answer 1

[AI-generated answer — Bot GPT 3.5]

1. Let x be the number of cars needed to transport 29 campers.

The inequality is: 4x ≥ 29

2. Let y be the additional number of cars that can park in the lot.
The inequality is: y ≤ 10 - 2 = 8

3.
From inequality 1:
4x ≥ 29
x ≥ 29/4
x ≥ 7.25
Since x must be a whole number, x ≥ 8

From inequality 2:
y ≤ 8

Thus, the solution to both inequalities is 8 cars.
Therefore, 8 cars should be used for the trip.

Answer 2

make it like 6th grader wrote it

Answer 3

[AI-generated answer — Bot GPT 3.5]

1. At least 8 cars are needed to take 29 campers on the field trip.

2. The parking lot can fit 10 cars. With the 2 counselor cars already parked, there is room for 8 more cars.

3.
To transport 29 campers and have all cars parked, 8 cars should be used for the trip.

Answer 4

make it longer and like a 6th grader wrote it

Answer 5

[AI-generated answer — Bot GPT 3.5]

1. So, like, if there are 29 campers going on a field trip and each car can take 4 campers, the minimum number of cars needed will be at least 8. This is because you need to divide the total number of campers by the number of campers each car can take, which is 29 divided by 4, which equals 7.25. Since you can't have a fraction of a car, you gotta round up to the next whole number, which is 8.

2. The camp parking lot can fit 10 cars. The counselors already parked 2 cars there, so that leaves space for 8 more cars to park. It's like math magic, you subtract the cars already there from the total parking lot space to figure out how many more cars can fit.

3. To make sure all 29 campers can go on the trip and all cars can park at the camp lot, you gotta use 8 cars. It's simple math - 29 campers divided by 4 campers per car equals 7.25, but since you can't have a part of a car, you gotta use 8 cars to make sure everyone fits in and has a place to park.