A logical treasure hunt in conditional statements.
Click screen to start.
You have entered the "Conditional Maze", an underground system of passages, built to protect an ancient treasure chest, and the only key to open it.
Don't be fooled by the simple square layout. This is a labyrinth made up of labelled rooms. The rooms have doors that can each be opened from one side, or both, or neither.
Your are only equipped with clues based on "conditional" statements.
For instance, the clue "if p then q" means: if you are in room p, then you can open the door to room q.
But that statement alone does not imply that you can return to p once in room q, so be careful, and think logically.
It would be wise to draw your own map as you proceed, and label unlocked doors with conditional and biconditional arrows.
Good luck!
Click on an item to interact with it. Click on a door to go through.
Use the clues you find to guide you through the maze. ( For instance, "if p then q" means: if you are in room p, then the door to room q is unlocked )
To win, you must find the key, and unlock the treasure chest.
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