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You would have 7 lines with 8 students in each line. Also have 2 lines with 28 students, or 4 lines with 14 students.

Q: Fifty-six students are lined up for a fire drill. Each line has the same number of studentswhich could be the number of students in each line?

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45

15 or any multiple of 15, including 15 trillion which is greater than the human popluation, but that is maths for you!

the students' financial aid office helped me immensely.

3 boys to 7 girls is 3 boys per 10 students gives class size of 13 too small; 6 boys per 20 students gives class size of 26; 9 boys per 30 students gives class size of 39 too many; class size is 26

It could be an irrational number

Related questions

Buses can only legally carry a certain number of passengers. Therefore, the number of students could be restricted to the number of buses available, or the number of buses could be increased to cater for the full number of students. In some cases, 2 or 3 excess students could travel in a tutor's car.

2

n = number of students in one homeroom who have dogs x number of homeroom classesfrom

It could be 507, to the nearest 20.

All the important information is in the alternative sentence, "Few students attended the meeting." This eliminates five words.

a key code is a number that your school gives you when you can join a website that is on the computer that could only be used by students

You could consider using a random sampling method to select a representative sample of students. This could involve randomly selecting a certain number of students from each grade level or class to participate in the survey. Another option could be to use an online survey platform where students can voluntarily participate. This method provides a broader reach and allows students to respond at their convenience.

45

Since you didn't mention the numbers of students involved, I'll make them up. Let's say there are 18 bass students and 27 violin students. (2 x 9) + (3 x 9) = 5 x 9 = 45

75

We are unable to solve this question. There is not enough information. The number of students who like both subjects could be any number that is more than, or equal to 0; and is less than, or equal to 20. Adding on, the number of people who dislike both subjects cannot exceed 17 people. There is a wide range of answers: There is not a definite answer. ---- There are a total of 40 students. 12 students like English. 23 students like Algebra. (x) students like both subjects. (2x) students dislike both subjects. We need to find what "x" is. ---- [ x < 21 ] ...because (2x) (Students that dislike subjects) would go over the limit of 40 students, if 21 was any higher. [ x > -1 ] ...because it's possible that nobody likes both classes. [ 2x < 18 ] ...because the maximum number of people who dislike both classes could be 17 people.

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