Rule of Three Calculator

The Rule of Three is a mathematical method to calculate an unknown value when three values of a ratio are known. It is one of the most important tools in everyday mathematics, used in many areas such as shopping, cooking, finance, and technology.

For the proportional Rule of Three: 1) Write down the known values (a units = b value). 2) Divide by a to get the value for 1 unit. 3) Multiply by the desired quantity c. The formula is: x = (b × c) / a.

In proportional Rule of Three, both quantities increase together (twice as much → twice the price). In inverse Rule of Three, one quantity increases while the other decreases (twice as many workers → half the time). The inverse formula is: x = (a × b) / c.

You need the inverse Rule of Three when one value increases and the other decreases as a result. Typical examples: more workers → less time, higher speed → shorter travel time, more machines → less production time per unit.

A compound Rule of Three is used when more than two quantities are involved. It is solved step by step: first adjust the first quantity (proportional or inverse), then the second. The result from step 1 becomes the starting value for step 2.

Yes! Percentage calculation is a special case of the Rule of Three. Example: 100% = €500, find: 15%. Solution: €500 ÷ 100 × 15 = €75. The Rule of Three is often simpler because you don't need to distinguish between base value, percentage value, and rate.

The Rule of Three is typically introduced in grade 6 or 7. The proportional version comes first, the inverse version usually follows one school year later. The compound Rule of Three is often covered in grade 8 or 9.

Ask yourself: 'If one quantity increases, does the other increase or decrease?' If it increases → proportional. If it decreases → inverse. Example: buying more apples → higher price (proportional). More people share a pizza → less per person (inverse).

Mathematically, both are equivalent. The Rule of Three solves the problem step by step (calculate for 1, then scale up), the ratio equation sets a:b = c:x and solves for x. The Rule of Three is more intuitive, while the ratio equation is more concise.

For proportional Rule of Three, check that the ratio stays the same: a/b must equal c/x. For inverse Rule of Three, check that the products are equal: a × b must equal c × x. If the check passes, your result is correct.