Final answer:
The largest possible weight of a sack of flour is 10 pounds.
Step-by-step explanation:
We can solve this problem using a system of inequalities. Let's define the variables:
S = weight of a sack of sugar (in pounds)
F = weight of a sack of flour (in pounds)
Based on the given information, we can write the following inequalities:
- 2S + 3F ≤ 40 (the total weight of 2 sacks of sugar and 3 sacks of flour must be no more than 40 pounds)
- F ≤ S + 5 (the weight of a sack of flour is no more than 5 pounds more than the weight of two sacks of sugar)
To find the largest possible weight of a sack of flour (F), we need to maximize the value of F while satisfying these inequalities.
Let's solve the system of inequalities:
- From inequality (2), we can substitute F = S + 5 into inequality (1):
- 2S + 3(S + 5) ≤ 40
- 2S + 3S + 15 ≤ 40
- 5S + 15 ≤ 40
- 5S ≤ 25
- S ≤ 5
- From S ≤ 5, we can substitute S = 5 into inequality (2) to find the maximum value of F:
- F ≤ 5 + 5
- F ≤ 10
Therefore, the largest possible weight of a sack of flour is 10 pounds.