A pharmacist has a 10% alcohol solution and a 25% alcohol solution. How many milliliters of each solution will she need to mix together in order to have 200 mL of a 20% alcohol solution?

Question

A pharmacist has a 10% alcohol solution and a 25% alcohol solution. How many milliliters of each solution will she need to mix together in order to have 200 mL of a 20% alcohol solution?

1 Answer

Impact of this question

9076 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-03-10T22:49:37

10% solution $= 66.67 m L$ $= 66.67 mL$
25% solution $= 133.33 m L$ $= 133.33mL$

Explanation:

Let us begin by assigning volume values to each of the solutions.

We will make the $10 %$ $10%$ solution $x$ $x$
This will make the $25 %$ $25%$ solutions $200 - x$ $200-x$
The final $20 %$ $20%$ solution will be $200 m l$ $200ml$

The equation for combining the solutions becomes

$.10 (x) + .25 (200 - x) = .20 (200)$ $.10(x) + .25(200-x) = .20(200)$

$.1 x + 50 - .25 x = 40$ $.1x + 50 -.25x = 40$

$.1x cancel(+ 50) -.25x cancel(- 50) = 40 -50$

$-.15x = -10$

$(cancel(-.15)x)/(cancel(-.15)) = -10/-.15$

$x = 66.67 mL$

$200-x = 133.33mL$

Science

Math

Humanities

... and beyond

A pharmacist has a 10% alcohol solution and a 25% alcohol solution. How many milliliters of each solution will she need to mix together in order to have 200 mL of a 20% alcohol solution?

1 Answer

Explanation:

Related questions

Impact of this question