How many liters of each of a 15% acid solution and a 25% acid solution must be used to produce 80 liters of a 20% acid solution?

Question

asked Jul 20, 2023 204k views

1 Answer

Teemu Risikko · Answer 1 · 2023-07-24T22:24:19+0000

Given:

Total produce = 80 liters

15% Acid solution and 25% acid solution

Find-:

How many litres of each

Explanation-:

Let

$\begin{gathered} x=\text{ Liters of }15\% \\ \\ y=\text{ Liters of }25\% \end{gathered}$

Total 80 litres

$\begin{gathered} 15x+25y=80*20 \\ \\ 3x+5y=320..............(2) \end{gathered}$

eq(2) - 3eq(1) is:

$\begin{gathered} x+y=80 \\ \\ 3x+3y=240..........(1^(\prime)) \end{gathered}$

So, the value of "y" is:

$\begin{gathered} 3x+5y-3x-3y=320-240 \\ \\ 2y=80 \\ \\ y=(80)/(2) \\ \\ y=40 \end{gathered}$

So x is 40

Then,

$\begin{gathered} 40\text{ liters of }15\%\text{ acid solution } \\ \\ 40\text{ liters of }25\%\text{ acid soluion} \end{gathered}$