Answer:
The LARGEST POSSIBLE SACK of flour is 11.24 pounds.
Explanation:
Let us assume the weight of 1 sack of sugar = m pounds
And the weight of 1 sack of flour = n pounds
Now, weight of 2 sacks of sugar = 2 x ( Weight of 1 sack of sugar)
= 2 x (m) = 2 m
Also, weight of 3 sacks of flour = 3 x ( Weight of 1 sack of flour)
= 3 x (n) = 3 n
Given : Weight of (2 sacks of sugar + 3 sacks of flour) ≤ 40 pounds
⇒ 2 m + 3 n ≤ 40 ..... (1)
Similarly, Weight of (1 sack of flour) ≤ 2 sacks of sugar + 5 pounds
⇒ n ≤ 2 m + 5 .... (2)
Now, solving (1) and (2) for the values of m and n, we get:
2 m + 3 n ≤ 40
n ≤ 2 m + 5
Put n = 2 m + 5 in (1)
We get: 2 m + 3 n = 40 ⇒ 2 m + 3 (2 m + 5) = 40
or, 2 m + 6 m + 15 = 40
or, 8 m = 25
or, m = 25/8 = 3.12
So, m CAN NOT BE MORE THAN 3.12 pounds
Solving for n = 2 m + 5 = 2(3.12) + 5 = 11.24 pounds
So, n CAN NOT BE MORE THAN 11.24 pounds
Hence, the LARGEST POSSIBLE SACK of flour is 11.24 pounds.