Logic Masters Deutschland e.V.

am 20. Juni 2020, 07:50 Uhr von dm_litv
@amitsowani
No. The walls can't touch the final dot. And the walls are 'accumulated' along the path.
For example, when you are in r4c2 the box stack already has the right wall (from r2c1 or r2c2), so you can't move to the final dot r4c3.

am 20. Juni 2020, 06:19 Uhr von amitsowani
I am not able to understand the rules completely. For instance in the example can the arrow in r4c2 point to r4c3 and the arrow in r3c3 point to r3c2?

am 27. August 2013, 21:59 Uhr von zorant
Thank you a lot, I try to solve this puzzle.

am 27. August 2013, 15:02 Uhr von BFaw
@zorant:

(I can not speak English very well. The text was corrected by my sister.)

On every field without a dot (meaning the fields with the stick boxes) you have to draw an arrow. Maximal one arrow can point to every box and every dot (in this puzzle "point" means only the first field directed towards the arrow). If you follow the arrows starting at an arbitrary field, you have to reach a field with a dot at the end.

If you start with a box to which no arrows point, this box gets sticked into the next box according to the direction of the arrow (otherwise it moves to a field with a dot, also in direction of the arrow). To do this, the box into which the other box gets plugged, has to be open on this side, so it can be sticked into the box. The interlocking boxes then get plugged into the next boxes this way, until they reach the dot. Then they get pushed to the dot-field. To do this, all these boxes have to be open on the correspondent side, so that no dividing wall touches the dot while shifting. In this way all boxes have to be able to get pushed to a dot-field.

am 26. August 2013, 19:16 Uhr von zorant
Could you post instructions in English. I do not understand the requirements of the task. Especially the field R2C3. Thanks in advance