SAME THING AS FIRST ONE

Mr Russo has 2856 raffle tickets that he will distribute evenly to some of his neighbors. he wants to give the tickets to at least 3 neighbors but no more than 10 neighbors. to how many neighbors can he give raffle tickets so there are none left over? how many tickets will each neighbor get?

i got 3 because he can give 952 to the 3. 2856/3 gets 952

is that right???????????????

What about sharing the wealth farther and give them to 6 neighbors?

To find out how many neighbors Mr Russo can give raffle tickets to, we need to determine the factors of 2856.

First, we should find the prime factorization of 2856. We can do this by dividing it by prime numbers until we cannot divide any further.

Dividing 2856 by 2, we get 1428. Dividing 1428 by 2, we get 714. Continuing, we divide 714 by 2 and get 357. Next, dividing 357 by 3 gives us 119. Finally, dividing 119 by 7, we obtain 17.

Therefore, the prime factorization of 2856 is: 2 * 2 * 2 * 3 * 7 * 17.

To distribute the tickets evenly, we need to divide the total number of tickets (2856) by the number of neighbors. We want to distribute the tickets to at least 3 neighbors and no more than 10 neighbors.

Let's try dividing the total number of tickets by each number between 3 and 10 to see if there are any remainders:

If Mr Russo distributes the tickets to 3 neighbors: 2856 / 3 = 952 tickets per neighbor.
If Mr Russo distributes the tickets to 4 neighbors: 2856 / 4 = 714 tickets per neighbor.
If Mr Russo distributes the tickets to 5 neighbors: 2856 / 5 = 571 tickets per neighbor.
If Mr Russo distributes the tickets to 6 neighbors: 2856 / 6 = 476 tickets per neighbor.
If Mr Russo distributes the tickets to 7 neighbors: 2856 / 7 = 408 tickets per neighbor.
If Mr Russo distributes the tickets to 8 neighbors: 2856 / 8 = 357 tickets per neighbor.
If Mr Russo distributes the tickets to 9 neighbors: 2856 / 9 = 317 tickets per neighbor.
If Mr Russo distributes the tickets to 10 neighbors: 2856 / 10 = 285 tickets per neighbor.

From the above calculations, we can see that Mr Russo can distribute the tickets evenly to 4, 5, or 6 neighbors. In these cases, each neighbor will receive either 714, 571, or 476 tickets, respectively.