A rectangular container measuring 71 cm by 59 cm by 22 cm was to be filled with water by two taps, W and X. Tap W which fills the tank at a rate of 6 ℓ per minute was first turned on for 4 minutes before Tap X was turned on as well. If the tank was filled to the brim in a total of 6 minutes from the time when Tap W was first turned on, what is the rate at which Tap X fills the tank? Give your answer in ℓ per minute correct to 1 decimal place.
Total volume of the container
= 71 x 59 x 22
= 92158 cm
3 1 ℓ = 1000 cm
3 6 ℓ = 6000 cm
3 Volume of water filled by Tap W
= 6000 x 6
= 36000 cm
3 Volume of water filled by Tap X
= 92158 - 36000
= 56158 cm
3 Rate in which Tap X fills the container
= 56158 ÷ 2
= 28079 cm3/min
28079 mℓ/min
= 28.079 ℓ/min
≈ 28.1 ℓ/min (Correct to 1 decimal place)
Answer(s): 28.1 ℓ/min