Answer:
There are two solutions:
Explanation:
This problem has a second question that is missing: Do you think there are any different answers?
You can create a system of two equations.
1. Name the variables:
2. Translate the verbal statements into algebraic expressions:
3. Solution
Since there is one equation and two variables there could be many possible solutions, to the equation. But since x and y are restricted to positive integer numbers, the situation may be different.
You can test some numbers.
First, realize that the greatest possible value of y is when x = 0. Thus 7y has to be less than 55. The multiples of 7 that are less than 55 are 14, 21, 28, 35, 42, and 49.
Thus, the only possible values of y are 1, 2, 3, 4, 5, 6, and 7.
If y = 1: 4x = 55 - 7(1) = 48 ⇒ x = 48/4 = 12. Thus, this is your first solution: (12,5).
If y = 2: 4x = 55 -7(2) = 41. Since 41 is not muliple of 4. This is not a solution.
If y = 3: 4x = 55 - 21 = 34. 34 is not a multiple of 4. Not a solution.
If y = 4: 4x = 55 - 28 = 27. Not a solution, either.
If y = 5: 4x = 55 - 35 = 20 ⇒ x = 20/4 = 5. This is a second solution: (5,5)
If y = 6: 4x = 55 - 42 = 13. Not a multiple of 4.
If y = 7: 4x = 55 - 49 = 6. Not a multiple of 6.
There are two solutions:
