Respuesta :
Answer: it will take them 28 minutes to fill the tank.
Step-by-step explanation:
The first pipe alone can fill the tank in 84 minutes. This means that the rate at which the first pipe fills the tank per minute is 1/84
The second pipe can fill the tank in 42 minutes by itself. This means that the rate at which the second pipe fills the tank per minute is 1/42
If they work together, they would work simultaneously and their individual rates are additive. This means that their combined rate of filling the tank would be
1/84 + 1/42
Assuming it takes t hours for both pipes to fill the tank working together, the working rate per minute would be 1/t. Therefore,
1/84 + 1/42 = 1/t
3/84 = 1/t
t = 84/3
t = 28 minutes
Answer:
28 minutes
Step-by-step explanation:
The aquarium tank can hold 6300 litres of water.
First pipe can fill the tank in 84 minutes.
So in 1 minute it fills [tex]\[\frac{6300}{84}\][/tex] litres of water.
That is, in 1 minute it fills [tex]\[75\][/tex] litres of water.
Second pipe can fill the tank in 42 minutes.
So in 1 minute it fills [tex]\[\frac{6300}{42}\][/tex] litres of water.
That is, in 1 minute it fills [tex]\[150\][/tex] litres of water.
When the two pipes are working together they are adding [tex]\[75+ 150 = 225\][/tex] litres of water per minutes to the tank.
So to fill the tank of capacity 6300 litre it will take [tex]\[\frac{6300}{225}\][/tex] minutes.
In other words, it will take 28 minutes to fill the complete tank.
