By solving a system of equations, we will see that the pail originally contained 382.9 ml.
How to write the system of equations?
First, we need to define the variables, we will use:
- T = amount of water in the tank.
- P = amount of water in the pail.
First, we know that the total amount of water is 962 ml, then we have:
P + T = 962 ml.
We also know that if we pour 250 ml from the pail to the tank, the amount of water in the tank will be 12 times the amount of water in the pail, this is written as:
T + 250ml = 12*(P - 250ml)
Then the system of equations is:
P + T = 962 ml
T + 250ml = 12*(P - 250ml)
To solve this, first, we need to isolate one of the variables in one of the equations, I will isolate T in the first one:
T = 962 ml - P
Now we replace this into the other equation to get:
(962 ml - P) + 250ml = 12*(P - 250ml)
Now we can solve this for P.
962 ml + 250 ml - P = 12*P - 12*250 ml
1,212 ml - P = 12*P - 3,000 ml
1,212 ml + 3,000 ml = 12*P - P
(4,212 ml)/11 = P = 382.9 ml
So the pail originally contained 382.9 ml
If you want to learn more about systems of equations, you can read:
https://brainly.com/question/13729904
