The mathematics associated with division is discussed, working from a theorem for the real division algorithm. Real-world, geometric, and algebraic approaches are discussed, as are related topics. (MNS)

Described is a student-discovered algorithm for solving a problem involving division by a fraction. (RS)

The method described here converts a given problem in a base other than ten to a related problem in base ten, solves the related problem in base ten, and converts the answer back to the original base. Limitations are discussed. (MP)

A rationale is given for the Russian-peasant algorithm for multiplication indicating why it works as well as how it works. (DT)

An algorithm is provided for generating as many desired digits in the decimal representation of a rational number on a calculator. It may be used whenever the number of digits displayed on the calculator exceeds the number of digits in the denominator. (JT)

A "neat and general" divisibility algorithm for prime numbers is presented. Five illustrative examples are included. (MNS)