Practice Problems: Calculating Mixture Ratios With Alligation Medial

Concentrations: 60%, 20%, desired 50%

Differences: |60 – 50| = 10, |20 – 50| = 30

Ratio of solutions: 20% : 60% = 10 : 30 = 1:3

Solution to Problem 3

Concentrations: 80%, 50%, desired 65%

Differences: |80 – 65| = 15, |50 – 65| = 15

Ratio of dyes: 50% : 80% = 15 : 15 = 1:1

Summary

Alligation medial is a simple and effective method for calculating mixture ratios. Practice solving various problems to strengthen your understanding and improve accuracy in real-world applications.

Understanding how to calculate mixture ratios is essential in many fields such as chemistry, pharmacy, and food industry. The alligation medial method provides a straightforward way to determine the ratio of components in a mixture. This article presents practice problems to help students master this technique.

What Is Alligation Medial?

Alligation medial is a method used to find the ratio in which two or more ingredients are mixed to obtain a mixture of a desired concentration. It involves comparing the individual concentrations of the ingredients with the concentration of the final mixture.

Basic Steps in Alligation Medial

Identify the concentrations of the two ingredients and the desired mixture.
Calculate the difference between each ingredient’s concentration and the desired concentration.
Use these differences to determine the ratio of the ingredients.
Simplify the ratio if necessary.