Ask Question
28 July, 20:51

Suppose a lab needs to make 400 liters of a 39% acid solution, but the only solutions available to the lab are 20% acid and 50% acid. What system of equations can be used to find the number of liters of each solution that should be mixed to make the 39% solution? Let c represent the number of liters of 20% acid solution and let d represent the number of liters of 50% acid solution.

+5
Answers (1)
  1. 28 July, 23:49
    0
    Mixture problem.

    Ratio of 20% : 50% acids

    =50-39 : 39-20

    =11:19

    total volume

    =400L

    vol. of 20% acid=400 * (11 / (11+19) = 400 * (11/30) = 146.667 L

    vol. of 50% acid=400 * (19 / (11+19) = 253.333 L

    Alternatively, use c=volume of 20%, d=vol of 50%

    then

    0.2c+0.5d=400*0.39

    Since c+d=400, we have

    0.2c+0.5 (400-c) = 400*0.39=156

    solve for c:

    0.3c=44

    c=146.667 and d=400-c=253.333 as before.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Suppose a lab needs to make 400 liters of a 39% acid solution, but the only solutions available to the lab are 20% acid and 50% acid. What ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers