1 Sjoelbak board (wooden board 2 metres x 0.4 metres with three sides about 5cm high),
30 disks (Wooden disks of diameter 5.2cm).
In the first sub-turn, the player slides all 30 disks. At the end of the sub-turn, any disks that end up in compartments stay in the compartments but are stacked in piles at the rear of the container to clear any obstruction from the compartment entrances. Traditionally, the first pile consisting of 4 disks is pushed into the rear corner of the container and subsequent piles of 3 disks are placed diagonally against the previous piles. If all disks entered compartments the turn is over but otherwise the remaining disks are brought back to be played again by the player for the second sub-turn. At the end of the second sub-turn, the same thing happens again: disks in compartments are stacked neatly and any remaining disks are returned to the player for the third sub-turn. The third sub-turn is the player’s final chance to slide the remaining disks down the board after which the turn ends and the points are counted.
A disk is counted as being in a compartment if the whole disk has passed across the front face of the gate bar. To settle disputes, a straight “gate stopper” should be pushed flat against the front the gate bar. If the disk moves, it was not in the container.
Once a disk has passed completely under the start bar, it is considered to be in play and should not be touched until the end of that sub-turn except in the following situations: A disk enters a container via a route other than through that container’s arch; A disk leaves the board; A disk exits a container other than through that container’s arch; A disk returns under the start bar. In all four cases, the offending disk is removed from play but can be used in a subsequent sub-turn.
9 disks in compartment 2, 5 disks in compartment 3, 7 disks in compartment 4, 5 disks in compartment 1.
5 complete sets of 4 disks scores 100. 4 extra disks in compartment 2 scores 8. 2 extra disks in compartment 4 which scores 8. Total score is 116 points.
The maximum score in one turn is therefore 148 points = (20 X 7) + (2 X 4)