A puzzling Le Monde mathematical puzzle for which I could find no answer in the allotted time!: A most democratic electoral system allows every voter to have at least one representative by having each of the N voters picking exactly m candidates among the M running candidates and setting the size n of the representative […]

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## Le Monde puzzle [#1021]

September 17, 2017## Le Monde puzzle [#1020]

September 15, 2017A collection of liars in this Le Monde mathematical puzzle: A circle of 16 liars and truth-tellers is such that everyone states that their immediate neighbours are both liars. How many liars can there be? A circle of 12 liars and truth-tellers is such that everyone state that their immediate neighbours are one liar plus […]

## Le Monde puzzle [#1019]

September 7, 2017A gamey (and verbose) Le Monde mathematical puzzle: A two-player game involves n+2 cards in a row, blue on one side and red on the other. Each player can pick any blue card among the n first ones and flip it plus both following ones. The game stops when no blue card is left to […]

## Le Monde puzzle [#1018]

August 29, 2017An arithmetic Le Monde mathematical puzzle (that first did not seem to involve R programming because of the large number of digits in the quantity involved): An integer x with less than 100 digits is such that adding the digit 1 on both sides of x produces the integer 99x. What are the last nine […]

## Le Monde puzzle [#1707]

July 28, 2017A geometric Le Monde mathematical puzzle: Given a pizza of diameter 20cm, what is the way to cut it by two perpendicular lines through a point distant 5cm from the centre towards maximising the surface of two opposite slices? Using the same point as the tip of the four slices, what is the way to […]