Two water pumps, working simultaneously at their respective constant rates, took exactly 4 hours to fill a certain swimming pool. If the constant rate of one pump was 1.5 times the constant rate of the other, how many hours would it have taken the faster pump to fill the pool if it had worked alone at it's constant rate?
A. 5
B. 16/3
C. 11/2
D. 6
E. 20/3
Let's pick some nice numbers that adhere to the given information.
...the constant rate of one pump was 1.5 times the constant rate of the other
So, the fast pump has a pumping rate that's 1.5 faster then the slow pump.
So, let's say the SLOW pump pumps at
2 gallons per hour
This means the FASTER pump pumps at
3 gallons per hour
Note: we don't know the volume of the pool yet.
Two water pumps, working together at their respective constant rates, took exactly 4 hours to fill a certain swimming pool
Their COMBINED RATE =
2 +
3 =
5 gallons per hour
If it took 4 hours for both pumps to fill the pool, then the volume of the pool = (4)(
5) =
20 GALLONS
How many hours would it have taken the faster pump to fill the pool if it had worked alone at its constant rate?
The pool holds
20 GALLONS and the FASTER pump pumps at
3 gallons per hour
Time = output/rate
=
20/
3
Answer:
E
