Het was weer correct!
En nu heben we er 2 gekregen. We mogen zelf kiezen welke we oplossen, maar ze zijn allebei niet mijn kopje thee.
PUZZLE A
The four remaining players own soccer team's that participate in a
round-robin soccer match, which means each team plays one game against
each other team. If a team wins a game, they get 3 points for the
tournament. If a game is tied, each team gets one point each. The
attached table shows the final results of the tournament.
(klik hier voor die tabel) To decide which two teams proceed to the final, each team is ranked
from 1 to 4. This is determined by how many points is earned. If two
teams have the same number of tournament points, the ranking is
determined by the difference of the total number of goals the team has
scored and the total number of goals scored against them. In the
tournament table, cells that have an arrow drawn between them contain
the same number. Determine the results of all the games in this
tournament.
OR
PUZZLE B
There are twelve teams in a unique competition called "Mole Madness" a
game where four teams battle it out simultaneously in any one game.
The twelve teams are evenly distributed amongst four owners (David,
Reggy, Robbie & Yves). The competition is played in a round robin
competition where each team plays every other team the same number of
times. However, no teams from the same owner ever play against each
other.
Create a tournament with the smallest number of games possible,
ensuring every team plays every other team from every other owner an
equal amount of times, making sure each game has four teams each.
