Gavin has 2 containers. Container P and Container Q are of different capacities. If Container P is filled by a tap at a rate of 4 litres per minute and Container Q is filled by a tap at a rate of 6 litres per minute, when Container P is completely filled, 6 litres of water flowed out from Container Q. If Container P is filled by a tap at a rate of 4 litres per minute and Container Q is filled by a tap at a rate of 2 litres per minute, when Container P is completely filled, Container Q is only half-filled. What is the capacity of Container Q? Express your answer in litres.
|
Scenario 1 |
Scenario 2 |
Container type |
Container P |
Container Q |
Container P |
Container Q |
Volume of the container |
4 u |
6 u - 6 |
4 p |
2 p x 2 = 4 p |
Let 1 u be the time taken for Scenario 1.
Let 1 p be the time taken for Scenario 2.
4 u = 4 p --- (1)
6 u - 6 = 4 p
6 u = 4 p + 6 --- (2)
Make u the same.
(1) x 3
12 u = 12 p --- (3)
(2) x 2
12 u = 8 p + 12 --- (4)
(3) = (4)
12 p = 8 p + 12
12 p - 8 p = 12
4 p = 12
1 p = 12 ÷ 4 = 3
Volume of Container Q
= 4 p
= 4 x 3
= 12 ℓ
Answer(s): 12 ℓ