True/False
Any finite portion of a Penrose tiling can be found in another Penrose tiling.
Correct Answer:
Verified
Related Questions
Q87: At the vertex of a tiling of
Q88: Escher No. 128 [Bird], Figure 20.10 in
Q89: The interior angle of a regular pentagon
Q90: If you attempt to tile a non-Euclidean
Q91: The interior angle of a regular hexagon
Q93: Which of the following is a semiregular
Q94: Escher No. 67 [Horseman], Figure 20.11a in
Q95: Penrose tilings are nonperiodic.
Q96: Portions of Penrose tilings can have rotational
Q97: Can the tile below be used to
Unlock this Answer For Free Now!
View this answer and more for free by performing one of the following actions
Scan the QR code to install the App and get 2 free unlocks
Unlock quizzes for free by uploading documents