The Simple Solution to Rubik's Cube | |
Author: | James G. Nourse |
Illustrator: | Dusan Krajan |
Language: | English |
Publisher: | Bantam Books |
Release Date: | June 1981 |
Media Type: | Print Paperback |
Pages: | 64 |
Isbn: | 0-553-14017-5 |
Oclc: | 7627746 |
The Simple Solution to Rubik's Cube by James G. Nourse is a book that was published in 1981. The book explains how to solve the Rubik's Cube. The book became the best-selling book of 1981, selling 6,680,000 copies that year. It was the fastest-selling title in the 36-year history of Bantam Books.
Nourse wrote the book at the age of 33 while on the staff of the Chemistry Department at Stanford University.[1] Shortly before Christmas 1980 he bought a Rubik's Cube intending to give it away as a present.[2] Instead he spent the holiday season working out a solution (a "Layer by Layer" method), which he published as a 32-page pamphlet for the university bookstore.[2] It reached the hands of a publisher at Bantam who persuaded Nourse to expand the guide into a 64-page book.[2]
The book was published June 1981.[2] It became the best-selling book of 1981, selling 6,680,000 copies that year.[1] It was the fastest-selling title in the 36-year history of Bantam Books.[1]
In November 1981 Nourse published a sequel, The Simple Solutions to Cubic Puzzles, as an aid to the numerous puzzles that were spawned by the Cube-craze.[2]
The book begins with a summary of the history of the development of the Rubik's cube by Ernö Rubik and apparently independently by Terutoshi Ishige. The James Nourse method has several features that distinguish it from others:
The book's solution to the cube was considered to be one of the easiest, simplest, and most straightforward solutions to solving the cube.
Many later solutions to Rubik's Cube published on the internet seem to be based at least in part on the solution in this book.
The relatively few sequences one is required to memorize makes it one of the easiest solutions to remember — but this incurs the cost of a relatively high number of moves for a solution — about 100 moves average according to the book on page 54. The author claims he can solve random cube problems by this method in about 2 1/2 minutes (IBID p.54).
However, this ease and simplicity involves a tradeoff in that this solution takes longer than other solutions that are harder and more complex.[3]
In his book, Nourse used an original notation different from that of David Singmaster, which was not yet widely known in 1981. What Nourse called T and B (for Top and Bottom), became popularly known as U and D (for Up and Down). To avoid single-letter ambiguity, the rear face is called Posterior, represented by P (although none of the algorithms presented in the book actually uses the posterior face in its move sequences).
Clockwise and counterclockwise moves are made explicit with + and − (instead of relying on primes to denote counterclockwise, and their absence to denote clockwise).
Thus, for example, Nourse gives the algorithm for rotating three corners of the bottom face anticlockwise (solving the position Lars Petrus named the "Sune"[4]) as follows:
R− B− R+ B− R− B2 R+ B2
In Singmaster's notation, the same move sequence would be written:
R' D' R D' R' D2 R D2
The book mentions speed cubing on page 56 — citing the following times:
Given the method requires an average of 100 moves for a solve (IBID p.54), this would be fairly reasonable for the time. However as better methods (i.e. more complex but faster), and better cubes have become available — in 2023 this would have to be revised:
The better methods allow solves in 50-70 moves, and optimal solutions exist at around 20 moves — this greatly improves the ability to solve a cube quickly independently of how dexterous a cuber may be.
The book ends with a section detailing various patterns one can create with the cube, including: Shooting Star, Boxes, spelling the words 'OHIO', and 'JACK', and a cubic alphabet to form 3x3 letters of the alphabet from A-Z. (IBID p.59)
The following HelpCard provides a one-page synopsis of the solution detailed in the book.