Three, Rule of

a rule for solving arithmetic problems involving numbers in a proportion or an inverse proportion (seePROPORTIONALITY). Let us consider the two quantities x₁ and x₂, where x₁ has the two values a₁ and a₂ and x₂ has the two values b₁ and b₂. If the four values are in the proportion a₁:b₂ = a₂:b₂ or in the inverse proportion a₁:b₁ = b₂:a₂ and if a₁, a₂, and b₁ are known, then the simple rule of three permits b₂ to be found. In the case of a proportion we have

In the case of an inverse proportion we have

What is called the compound rule of three permits the solution of proportion problems involving n quantities x₁, x₂, . . ., x_n-1, x_n (n > 2). Here, two values a₁, a₂, b₁, b₂, . . ., l₁, l₂ are known for each of the n-1 quantities x₁, x₂, . . ., x_n-1, and only one value k₁ is known for the quantity x_n. The value k₂ is to be found. In practice the compound rule of three consists in the successive application of the rule of three.