___

• [1] Akça, Z. and Kaya, R., On the taxicab trigonometry. Jour. of Inst. of Math. Comp. Sci. (Math. Ser.) 10 (1997), no.3, 151-159.
• [2] Çolako˘ glu, H.B. and Kaya, R., A generalization of some well-known distances and related isometries. Math. Commun. 16 (2011), 21-35.
• [3] Ekmekçi, E., Bayar, A. and Altınta¸s, A.K., On the group of isometries of the generalized taxicab plane. International Journal of Contemporary Mathematical Sciences 10 (2015), no.4, 159-166.
• [4] Ekmekçi, S., Akça, Z. and Altınta¸s, A.K., On trigonometric functions and norm in the generalized taxicab metric. Mathematical Sciences And Applications E-Notes 3 (2015), no.2, 27-33.
• [5] Geli¸sgen, Ö. and Kaya, R., The taxicab space group. Acta Math. Hung. 122 (2009), no.1-2, 187-200.
• [6] Kaya, R., Akça, Z., Günaltılı, ˙I. and Ö zcan, M., General equation for taxicab conics and their classification. Mitt. Math. Ges. Hamburg 19 (2000), 135-148.
• [7] Kocayusufoglu, ˙I. and Özdamar, E., Isometries of taxicab geometry. Commum. Fac. Sci. Univ. Ank. Series A1 47 (1998), 73-83. [8] Krause, E.F., Taxicab Geometry. Dover, New York, 1986.
• [9] Martin, G.E., Transformation Geometry. Springer-Verlag, New York Inc., 1997.
• [10] Menger, K., You Will Like Geometry. Guidebook of Illinois Institute of Technology Geometry Exhibit, Museum of Science and Industry, Chicago, Illinois, 1952.
• [11] Richard, S. M. and George, D.P., Geometry, A Metric Approach With Models. Springer-Verlag, New York, 1981.
• [12] Schattschneider, D.J., The taxicab group. American Mathematical Monthly 91 (1984), no.7, 423-428.
• [13] Thompson, K.P. and Dray T., Taxicab Angles and Trigonometry. The Pi Mu Epsilon Journal 11 (2000), no.2, 87-96.
• [14] Thompson, K.P., The nature of length, area, and volume in taxicab geometry. International Electronic Journal of Geometry 4 (2011), no.2, 193-207.
• [15] Wallen, L.J., Kepler, the taxicab metric, and beyond: An isoperimetric primer. The College Mathematics Journal 26 (1995), no.3, 178-190.