Mastermind (board game)

Mastermind (board game)

A game of Mastermind completed.
Players 2
Age range 8 and up
Setup time < 5 minutes
Playing time 10-30 minutes
Random chance None

Mastermind or Master Mind is a code-breaking game for two players. The modern game with pegs was invented in 1970 by Mordecai Meirowitz, an Israeli postmaster and telecommunications expert, but the game resembles an earlier pencil and paper game called bulls and cows that may date back a century or more.

Contents

Gameplay and rules

The game is played using:

The two players decide in advance how many games they will play, which must be an even number. One player becomes the codemaker, the other the codebreaker. The codemaker chooses a pattern of four code pegs. Duplicates are allowed, so the player could even choose four code pegs of the same color. The chosen pattern is placed in the four holes covered by the shield, visible to the codemaker but not to the codebreaker.

The codebreaker tries to guess the pattern, in both order and color, within twelve (or ten, or eight) turns. Each guess is made by placing a row of code pegs on the decoding board. Once placed, the codemaker provides feedback by placing from zero to four key pegs in the small holes of the row with the guess. A colored or black key peg is placed for each code peg from the guess which is correct in both color and position. A white peg indicates the existence of a correct color peg placed in the wrong position.

If there are duplicate colours in the guess, they cannot all be awarded a key peg unless they correspond to the same number of duplicate colours in the hidden code. For example, if the hidden code is white-white-black-black and the player guesses white-white-white-black, the codemaker will award two colored pegs for the two correct whites, nothing for the third white as there is not a third white in the code, and a colored peg for the black. No indication is given of the fact that the code also includes a second black.

Once feedback is provided, another guess is made; guesses and feedback continue to alternate until either the codebreaker guesses correctly, or twelve (or ten, or eight) incorrect guesses are made.

The codemaker gets one point for each guess a codebreaker makes. An extra point is earned by the codemaker if the codebreaker doesn't guess the pattern exactly in the last guess. (An alternative is to score based on the number of colored key pegs placed.) The winner is the one who has the most points after the agreed-upon number of games are played.

History

Since 1971, the rights to Mastermind have been held by Invicta Plastics of Oadby, near Leicester, UK. (Invicta always named the game Master Mind.) They originally manufactured it themselves, though they have since licensed its manufacture to Hasbro in most of the world, and two other manufacturers who have the United States and Israel manufacturing rights.

Starting in 1973, the game box featured a photograph of a well-dressed, distinguished-looking white man seated in the foreground, with an attractive Asian woman standing behind him. The two amateur models (Bill Woodward and Cecilia Fung) reunited in June 2003 to pose for another publicity photo.[1]

Games Pioneer Harrison Heath, introduced a very similar version of Mastermind, in which discs were used instead of pins, similar to his previous creation Connect 4. However the version was much less successful than its predecessor and only took a revenue of $360,000.

Algorithms

With four pegs and six colors, there are 64 = 1296 different patterns (allowing duplicate colors).

Six-guess algorithm

The following algorithm solves the (six-color) game in six or fewer guesses. It has a general procedure and a few listed exceptions. In this section the six colours are referred to as letters a through f.

Divide the 1296 possible games into four categories:

The general process is to list all the games that could be correct with the data so far. The list should be sorted by ascending number of duplicates and within each duplicate level alphabetically. Before guess 1, the list is all 1296 games; thus guess 1 is always "abcd." If the reply to guess 1 is "0 0," for example, then the list afterwards comprises the 16 games involving only e and f. Each subsequent guess is the first game remaining in the list, with the following exceptions:

Five-guess algorithm

In 1977, Donald Knuth demonstrated that the codebreaker can solve the pattern in five moves or fewer, using an algorithm that progressively reduced the number of possible patterns.[2] The algorithm works as follows:

  1. Create a set S of remaining possibilities (at this point there are 1296). The first guess is aabb.
  2. Remove all possibilities from S that would not give the same score of colored and white pegs if they were the answer.
  3. For each possible guess (not necessarily in S) calculate how many possibilities from S would be eliminated for each possible colored/white score. The score of the guess is the least of such values. Play the guess with the highest score (minimax).
  4. Go back to step 2 until you have got it right.

Subsequent mathematicians have been finding various algorithms that reduce the average number of turns needed to solve the pattern: in 1993, Mami Koyama and Tony W. Lai found a method that required an average of 4.340 turns to solve, with a worst case scenario of six turns.[3]

Mastermind satisfiability problem

The Mastermind satisfiability problem is a decision problem that asks, "Given a set of guesses and the number of colored and white pegs scored for each guess, is there at least one secret pattern that generates those exact scores?" (If not, then the codemaker must have incorrectly scored at least one guess.) In December 2005, Jeff Stuckman and Guo-Qiang Zhang showed in an arXiv article that the Mastermind satisfiability problem is NP-complete.[4]

Variations

Varying the number of colors and the number of holes results in a spectrum of Mastermind games of different levels of difficulty. Another common variation is to support different numbers of players taking on the roles of codemaker and codebreaker. The following are some examples of Mastermind games produced by Invicta, Parker Brothers, Pressman, Hasbro, and other game manufacturers:

Game Year Colors Holes Comments
Mastermind 1972 6 4 Original version
Royale Mastermind 1972 5 colors × 5 shapes 3
Mastermind44 1972 6 5 For four players
Grand Mastermind 1974 5 colors × 5 shapes 4
Super Mastermind (a.k.a. Deluxe Mastermind; a.k.a. Advanced Mastermind) 1975 8 5
Word Mastermind 1975 26 letters 4 Only valid words may be used as the pattern and guessed each turn.
Number Mastermind 1976 6 digits 4 Uses numbers instead of colors. The codemaker may optionally give, as an extra clue, the sum of the digits.
Electronic Mastermind (Invicta) 1977 10 digits 3,4,or5 Uses numbers instead of colors. Handheld electronic version. Solo or multiple players vs. the computer. Invicta branded.
Walt Disney Mastermind 1978 5 3 Uses Disney characters instead of colors
Mini Mastermind (a.k.a. Travel Mastermind) 1988 6 4 Travel-sized version; room for only six guesses
Mastermind Challenge 1993 8 5 Both players simultaneously play code maker and code breaker.
Parker Mastermind 1993 8 4
Mastermind for Kids 1996 6 3 Animal theme
Mastermind Secret Search 1997 26 letters 3-6 Valid words only; clues are provided letter-by-letter using up/down arrows for earlier/later in the alphabet.
Electronic Hand-Held Mastermind (Hasbro) 1997 6 4 Handheld electronic version. Hasbro.
New Mastermind 2004 8 4 For up to five players
Purble Shop (Advanced Mode) 2006 5 5

The difficulty level of any of the above can be increased by treating “empty” as an additional color or decreased by requiring only that the code's colors be guessed, independent of position.

Computer and Internet versions of the game have also been made, sometimes with variations in the number and type of pieces involved and often under different names to avoid trademark infringement. Mastermind can also be played with paper and pencil. There is a numeral variety of the Mastermind in which 4-digit number is guessed [5].

See also

References

  1. ^ "Landmark Reunion for Mastermind Box Models". http://www.le.ac.uk/press/press/landmarkreunion.html. Retrieved 2006-10-05. 
  2. ^ Knuth, Donald (1976–77). "The Computer as a Master Mind". J. Recr. Math. (9): 1–6. http://www.dcc.fc.up.pt/~sssousa/RM09101.pdf 
  3. ^ Koyama, Mami; Lai, Tony (1993). "An Optimal Mastermind Strategy". Journal of Recreational Mathematics (25): 251–256 
  4. ^ Mastermind is NP-Complete Retrieved 2010-09-02.
  5. ^ "Bulls and Cows Classic". http://www.mastermind.idhost.kz/. 

External links