SOLUTION: A dehydrated patient needs a 3.82% saline IV. Unfortunately, the hospital only has bags of 4% and 3% saline solutions. How many liters of each of these solutions should be mixed to
Question 354752: A dehydrated patient needs a 3.82% saline IV. Unfortunately, the hospital only has bags of 4% and 3% saline solutions. How many liters of each of these solutions should be mixed together to yield 5 liters of the desired concentration?
So far I've come up with this:
x= 4% solution; y= 3% solution
x + y = 5
4x + 3(5-x) = 3.82
4x + 15 -3x = 3.82 subtracting 15 from both sides
1x = -11.18
x= -11.18 Found 2 solutions by stanbon, scott8148:Answer by stanbon(75887) (Show Source):
You can put this solution on YOUR website! A dehydrated patient needs a 3.82% saline IV. Unfortunately, the hospital only has bags of 4% and 3% saline solutions. How many liters of each of these solutions should be mixed together to yield 5 liters of the desired concentration?
So far I've come up with this:
x= 4% solution; y= 3% solution
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Quantity Eq::: x + y = 5 liters
Salt Eq::::::::4x + 3(5-x) = 3.82*5
4x + 15 -3x = 19.1
x = 4.1 liters (amt. of 4% solution needed in the mixture)
y = 5-4.1 = 0.9 liters (amt of 3% solution needed in the mixture)
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Cheers,
Stan H.
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