TEACHING MULTIPLICATION OF NUMBERS FROM 1 TO 10 TO STKIP SURYA STUDENTS USING MATEMATIKA GASING
Abstract
Multiplication of numbers from 1 to 10 is very important as it provides the basis for learning multiplication of other larger numbers as well as other related mathematical operations. How do students learn multiplication? Usually students just memorize the results of multiplication. This is often performed without a complete comprehension of the concept of multiplication. This study aimed to discuss how to teach multiplication of numbers from 1 to 10 to STKIP Surya students using Matematika GASING. GASING stands for Gampang, ASyIk dan menyenaNGkan which is translated as easy, fun and enjoyable. The materials are taught according to its unique way of teaching mathematics which follows three stages: concrete, abstract and mental calculation. The first stage (concrete) encourages students to explore using concrete objects. This is done prior to the second stage called the abstract stage. Students are then able to move on to the third stage where they can do mathematical calculation mentally and instantly. By following these stages in this order, students can understand mathematics more easily and clearly. The research method used in this study was design research. It consists of three phases; they are preliminary design, teaching experiment and retrospective analysis.The sample was fourteen first-year undergraduate students (matriculation level) at STKIP Surya (Surya College of Education), Tangerang, Banten. The instruments used were both oral and written tests. They were used to measure the ability of performing mental computation as well as the ability to teach this material. This study showed that Matematika GASING helpedthese students to understand and be able to teach multiplication of numbers from 1 to 10 better.
Keywords: multiplication of numbers from 1 to 10, Matematika GASING, design research
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Beishuizen, M. & Anghileri, J. (1998). Which Mental Strategies in the Early Number Curriculum? A Comparison of British Ideas and Dutch Views. British Educational Research Journal, 24 (5), 519-538.
Bustang, Zulkardi, Darmawijoyo, Dolk, M., & Van Eerde, D. (2013). Developing a Local Instruction Theory for Learning the Concept of Angle through Visual Field Activities and Spatial Representations. International Education Studies, 6 (8), 58-70.
Ibrahim & Suparmi. (2012). Pembelajaran Matematika Teori dan Aplikasinya. Yogyakarta: SUKAPress.
Gravemeijer, K. (2009). Local Instruction Theories as Means of Supports for Teachers in Reform Mathematics Education. Mathematical Thinking and Learning Journal, 6 (2), 105-128.
Gravemeijer, K. & Van Eerde, D. (2009). Design Research as a Means for Building a Knowledge Base for Teachers and Teaching in Mathematics Education. The Elementary School Journal, 109 (5), 510-524.
Raharjo, M., Waluyati, A., Sutanti, T. (2009). Pembelajaran Operasi Hitung Perkalian dan Pembagian Bilangan Cacah di SD. Depdiknas: Pusat Pengembangan dan Pemberdayaan Pendidikan dan Tenaga Kependidikan (PPPPTK) Matematika.
Reys, B. J. (1985). Mental Computation. The Arithmetic Teacher, 32 (6), 43-46.
Surya, Y. & Moss, M. (2012). Mathematics Education in Rural Indonesia. Proceeding in the 12th International Congress on Mathematics Education: Topic Study Group 30, 6223-6229.
Surya, Y. (2013). Modul Pelatihan Matematika GASING SD Bagian 1. Tangerang: PT. Kandel.
Van den Akker, J., Gravemeijer, K., McKenney, S., & Nieveen, N. (2006). Educational Design Research. London: Routledge Taylor and Francis Group
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