Open Access

On the existence of Spot It! decks that are not projective planes


Cite

[ABR11] Muatazz Abdolhadi Bashir and Andrew Rajah. On projective planes of order 12. World Applied Sciences Journal, 14 (7):967–972, 2011. Search in Google Scholar

[BR49] R. H. Bruck and H. J. Ryser. The nonexistence of certain finite projective planes. Canad. J. Math., 1:88–93, 1949. Search in Google Scholar

[CM13] Rebekah Coggin and Anthony Meyer. The mathematics of “Spot it!”. Pi Mu Epsilon J., 13(8):459–467, 2013. Search in Google Scholar

[Gaz12] Arnaud Gazagnes. Des dobble mathèmatiques. APMEP, 499:275–282, 2012. Search in Google Scholar

[Hee14] Marcus Heemstra. The mathematics of spot it. The Journal of Undergraduate Research, 12, 2014. Search in Google Scholar

[JC16] Calvin Jongsma and Tom Clark. Analyzing unique-matching games using elementary mathematics. Math Teachers’ Circle Network, 2016. Search in Google Scholar

[Lam97] C. W. H. Lam. The search for a finite projective plane of order 10 [ MR1103185 (92b:51013)]. In Organic mathematics (Burnaby, BC, 1995), volume 20 of CMS Conf. Proc., pages 335–355. Amer. Math. Soc., Providence, RI, 1997. Search in Google Scholar

[Pol15] Burkard Polster. The intersection game. Math Horiz., 22(4):8–11, 2015. Search in Google Scholar

[Sen16] Deepu Sengupta. A mathematical analysis of spot it!, 2016. Search in Google Scholar

eISSN:
2182-1976
Language:
English
Publication timeframe:
2 times per year
Journal Subjects:
Mathematics, General Mathematics