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Three containers X, Y and Z have capacities of 10, 20 and 30 litres respectively. X, which is empty is filled with water from Y. Y is then filled with the wine from Z. X is now emptied into Z. The entire operation is repeated. What would be the strength of wine in the container Z?
Table given shows the operations given:
Operations |
Containers X (Water: Wine) |
Container Y (Water: Wine) |
Containers Z (Water: Wine) |
Initially |
0 |
Water = 20 |
30 (Wine) |
X is completely filled by Y |
Water = 10 |
Water = 10 |
30 |
Y is completely filled by Z |
Water = 10 |
Water = 10 Wine = 10 |
20 |
X is poured into Z |
0 |
Water = 10 Wine = 10 |
10: 20 |
X is completely filled by Y |
Water = 5 Wine = 5 |
Water = 5 Wine = 5 |
10: 20 |
Y is completely filled by Z |
Water = 5 Wine = 5 |
Water= 5 + $$\frac{10}{3} = \frac{25}{3}$$ |
Water= 10 - $$\frac{10}{3} = \frac{20}{3}$$ |
X is poured into Z |
0 |
Water = $$\frac{25}{3}$$ |
Water = $$\frac{20}{3} + 5 = \frac{35}{3}$$ |
Total quantity in container Z = $$\frac{35}{3} + \frac{55}{3} = 30$$
Required percent = $$\frac{\frac{55}{3}}{30} * 100$$ = 61% (Approx)
