Let y represent the number of minutes it takes for the vats to have an equal amount of liquid.
At time x, the first vat will have a volume of 6x gallons.
At time x, the second vat will have a volume of 10 + 4x gallons.
To find the time when the two vats will have an equal amount of liquid, we set up the equation:
6x = 10 + 4x
Simplifying the equation:
6x - 4x = 10
2x = 10
Dividing both sides of the equation by 2:
x = 5
Therefore, the equation to show when the two vats will have an equal amount of liquid is:
5 minutes.
Two pumps are filling large vats of liquid. One vat is empty, and the pump is filling it at a rate of 6 gallons per minute. The other is already filled with 10 gallons, and it is continuing to fill at a rate of 4 gallons per minute. Write an equation to show when the two vats will have an equal amount of liquid. Use x as your variable.
Plz answer
3 answers
That is incorrect
Apologies for the mistake. Here is the correct equation:
Let x represent the number of minutes it takes for the vats to have an equal amount of liquid.
At time x, the first vat will have a volume of 6x gallons.
At time x, the second vat will have a volume of 10 + 4x gallons.
To find the time when the two vats will have an equal amount of liquid, we set up the equation:
6x = 10 + 4x
Subtracting 4x from both sides:
2x = 10
Dividing both sides by 2:
x = 5
Therefore, the correct equation to show when the two vats will have an equal amount of liquid is:
6x = 10 + 4x
Let x represent the number of minutes it takes for the vats to have an equal amount of liquid.
At time x, the first vat will have a volume of 6x gallons.
At time x, the second vat will have a volume of 10 + 4x gallons.
To find the time when the two vats will have an equal amount of liquid, we set up the equation:
6x = 10 + 4x
Subtracting 4x from both sides:
2x = 10
Dividing both sides by 2:
x = 5
Therefore, the correct equation to show when the two vats will have an equal amount of liquid is:
6x = 10 + 4x
1 answer