The aim of this research was to develop a teaching and learning module using Van Hiele theories for quadrilateral topics in grade VII students in middle school, which is valid, practical, and effective. Literatures explain that nowadays the students over generalize the concept of geometry without further understanding about the concept of geometry and the skills of proving and reasoning that geometry field try to improved. The method used was research and development with modification of Borg and Gall and Plump method. The initial investigation stage result stated that only 22.6% of students reached level 2 informal deduction, 35.5% students reached level 1 analysis and the rest of students were still in level 0 visualization. In order to solve this problem, the design and realization stages developed a module which was written based on phase of learning geometry. Next, the module was verified through trial test in a class of students grade VII in order to get data of validity and effectivity. Lastly, the module was tested through experimental research by comparing experimental and control class. The module was valid based on validator review. The module was effective because it can increase students geometry thinking level by 48%. The nonparametric test using K-S and Man Whitney show that the result of level of geometry thinking in experimental class was better than the control class. Overall result state that the module valid and effective

Geometry, Quadrilateral, Van Hiele, Research and Development Method, Kolmogrov Smirnov Nonparamametric test

Bieber, C., Tuna, A., & Korkmaz, S. (2013). The Mistakes and the Misconceptions of The Eighth Grade Students On The Subject of Angles. European Journal of Science and Mathematics Education, 1 (2), 50-59. Diakses dari scimath.net/articles/12/122.pdf

Clements, D. H., & Battista, M. T. (1992). Geometry and Spatial Reasoning. Diakses dari http://psycnet.apa.org/psycinfo/1992-97586-018

Crowley, M. L. (1987). The Van Hiele Model of The Develeopment Geoemtric Thought. Yearbook of The National Council of Teachers of Mathematics. Accessed from http://www.csmate.colostate.edu/docs/math/mathactivities /june2007/The%20van%20Hiele%20Model%20of%20the%20Development%20of%20Geometric%20Thought.pdf

Mistretta, R M. (2000). Enhancing Geometric Reasoning. Adolescence, 35 (138), 365-379. San Diegeo: Libra Publisher

Okazaki, M. & Fujita, T. (2007) Prototype phenomena dan cognitive path in the understanding of the inclusion relation between quadrilateral in Japan and Scotland. Dalam Ho Woo dkk. Proceedings of The 31st Conference ot The International Group for The Psychology of Mathematics Education, 4. Korea: The Korea Soeciety of Educational Studies in Mathematics.

Fujita, T. & Jones, K. (2007). Learners' Understanding of Definition and Hierarcial Classification of Quadrilateral: Towards A Theoreitical Framing. Research in Mathematics Education, 9 (1&2), 3-20. Accessed from http://eprints. soton.ac.uk/49731/1/Fujita_Jones_RME_vol9_2007.pdf

Erez, M. M. & Yerushalmy, M. (2006). “If You Can Turn a Rectangle into a Square, You Can Turn a Square into a Rectangle...” Young Students Experience the Dragging Tool. International Journal of Computers for Mathematical Learning, 11(3), 271-299

Burger, W. F. (1986). Characterizing the Van Hiele levels of developmetn in geometry. Journal for Research in Mathematics Education, 17 (1), 31-48. Accessed from http://math.buffalostate.edu/~MED595/Casestudy1.pdf

Daryanto. (2002). Menyusun Modul Bahan Ajar untuk Persiapan Guru dalam Mengajar. Yogyakarta: Gava Media

Feza, N. (2005). Assessment Standards, Van Hiele Levels, and Grade Seven Learners' Understanding of Geometry. Pythagoras, 62, 36-47.

Sunardi. (2005). Pengembangan Model Pembelajaran Geometri Berbasis Teori Van Hiele. Disertasi UNESA

Sugiyono. (2009). Statistik Non Parametris Untuk Penelitian. Bandung: Alfabeta.

Sheskin, D. J. (2003). Handbook of Parametric and Nonparametric Statistical Procedures. America: Chapman & Hall/CRC.

Sukmadinata, N. S. (2005). Metode Penelitian Pendidikan. Bandung: PT Remaja Rosda Karya

Wintarti, A., Rahaju, E. B., Sulaiman, R., Yakob, C., & Kusrini. (2008). Contextual Teaching and Learning Matematika: Sekolah Menengah Pertama/ Madrasah Tsanawiyah Kelas VII Edisi 4. Jakarta: Departemen Pendidikan Nasional.

Koberlein, A. (2011). Elementary Geometry for College Students. Canada: Nelson Education, Ltd.

Fuys, D., Geddes, D., & Tischler, R. (1988). The Van Hiele Model of Thinking in Geometry Among Adolescents. Monograph, i-196. Accessed from http://www.jstor.org/ stable/749957