Araştırma Makalesi
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Mathematical Reasoning Activity: Compare, Generalize and Justify

Yıl 2024, , 291 - 323, 27.12.2024
https://doi.org/10.17522/balikesirnef.1506921

Öz

The significance of mathematical reasoning skills is often highlighted in national and international curricula. In recent years, the process aspect of mathematical reasoning has been examined through comparison, generalization, and justification. Emphasizing these process abilities is crucial for creating learning settings that develop mathematical thinking and enhance teacher's understanding. This study assessed middle school students' comparation, generalization, and justification within reasoning activities. The participants were 27 sixth-grade students engaged in a mathematical reasoning workshop. The research data were gathered via a reasoning activity including three open-ended sub-problems addressed by the students. The data were analyzed using content analysis. The results showed that middle school students were capable of comparison, although they had difficulties in generalization and justification. Upon comprehensive evaluation, it was concluded that the number of students who completed these three steps cohesively was considerably low.

Etik Beyan

Study-specific approval by the appropriate ethics committee for research involving humans and/or animals (The research study that underpins this publication was provided by Ataturk University, Registration number 05.07.2023/7).

Kaynakça

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  • Ayber, G. (2017). An analysis of secondary school mathematics textbooks from the perspective of fostering algebraic thinking through generalization (Publication No. 463446) [Master’s thesis, Anadolu University]. Council of Higher Education Thesis Center.
  • Blanton, M., & Kaput, J. (2003). Developing elementary teachers’ algebra “eyes and ears”. Teaching Children Mathematics, 10(2), 70–77. https://doi.org/10.5951/TCM.10.2.0070
  • Bozkurt, A., Kılıç, P., & Özmantar, M. F. (2017). An investigation of the question types in mathematics instruction of middle school classrooms. Yıldız Journal of Educational Research, 2 (1), 1-29. https://dergipark.org.tr/en/download/article-file/2088927
  • Bragg, L. A., & Herbert, S. (2018). What can be learned from teachers assessing mathematical reasoning: A case study. Making waves, opening spaces: Proceedings of the 41st annual conference of the Mathematics Education Research Group of Australasia, 178–185. https://files.eric.ed.gov/fulltext/ED592480.pdf
  • Brodie, K. (2010). Teaching mathematical reasoning in secondary school classrooms. Springer Science+Business Media.
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  • Çoban, H. (2010). Investigating the relationship between the level of students? Using mathematical reasoning skills and using metacognitive learning strategies (Publication No. 258052) [Master’s thesis, Gaziosmanpaşa University]. Council of Higher Education Thesis Center.
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  • Carraher, D. W., Schliemann, A. D., Brizuela, B. M., & Earnest, D. (2006). Arithmetic and algebra in early mathematics education. Journal for Research in Mathematics Education, 37(2), 87–115. https://doi.org/10.2307/30034843
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  • Dikkartın-Övez, F.T., & İnce, İ. (2024). Examination of seven grade students’; pattern generalızatıon processes and preferred, International Journal of Education Technology and Scientific Researches, 9(26), 84-129. http://dx.doi.org/10.35826/ijetsar.728
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  • Ellis, A., Özgür, Z., & Reiten, L. (2019). The teacher moves to support student reasoning. Mathematics Education Research Journal, 31, 107-132. https://doi.org/10.1007/s13394-018-0246-6
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Matematiksel Akıl Yürütme Etkinliği: Karşılaştır, Genelle, Gerekçele

Yıl 2024, , 291 - 323, 27.12.2024
https://doi.org/10.17522/balikesirnef.1506921

Öz

Matematiksel akıl yürütme becerisinin önemi hem ulusal hem de uluslararası müfredatlarda sıklıkla vurgulamaktadır. Özellikle son yıllarda, matematiksel akıl yürütmenin süreç yönü, karşılaştırma, genelleme ve gerekçelendirme açısından ele alınmıştır. Bu süreç becerilerine odaklanmak, matematiksel akıl yürütme becerilerinin geliştirilmesi için öğrenme ortamlarının hazırlanmasında ve öğretmenlerin farkındalığının artırılmasında oldukça önemlidir. Bu çalışma ile ortaokul öğrencilerinin akıl yürütme etkinliği kapsamında karşılaştırma, genelleme ve gerekçelendirme durumları incelenmiştir. Araştırmanın katılımcılarını matematiksel akıl yürütme atölyesine katılan 6. sınıf seviyesindeki 27 öğrenci oluşturmaktadır. Araştırma verileri öğrencilerin cevaplandırdığı 3 açık uçlu alt problemden oluşan akıl yürütme etkinliği ile toplanmıştır. Veriler içerik analizi ile analiz edilmiştir. Araştırmanın sonuçlarına göre, ortaokul öğrencilerinin karşılaştırma yapabildiklerini fakat genelleme ve gerekçelendirme basamaklarında problem yaşadıklarını göstermektedir. Bir bütün olarak düşünüldüğünde ise bu üç süreci de bağlantılı bir şekilde tamamlayan öğrenci sayısının çok az olduğu sonucuna varılmıştır.

Kaynakça

  • Angraini, L. M., Larsari, V. N., Muhammad, I., & Kania, N. (2023). Generalizations and analogical reasoning of junior high school viewed from Bruner's learning theory. Infinity Journal, 12(2), 291-306. https://doi.org/10.22460/infinity.v12i2.p291-306
  • Ayber, G. (2017). An analysis of secondary school mathematics textbooks from the perspective of fostering algebraic thinking through generalization (Publication No. 463446) [Master’s thesis, Anadolu University]. Council of Higher Education Thesis Center.
  • Blanton, M., & Kaput, J. (2003). Developing elementary teachers’ algebra “eyes and ears”. Teaching Children Mathematics, 10(2), 70–77. https://doi.org/10.5951/TCM.10.2.0070
  • Bozkurt, A., Kılıç, P., & Özmantar, M. F. (2017). An investigation of the question types in mathematics instruction of middle school classrooms. Yıldız Journal of Educational Research, 2 (1), 1-29. https://dergipark.org.tr/en/download/article-file/2088927
  • Bragg, L. A., & Herbert, S. (2018). What can be learned from teachers assessing mathematical reasoning: A case study. Making waves, opening spaces: Proceedings of the 41st annual conference of the Mathematics Education Research Group of Australasia, 178–185. https://files.eric.ed.gov/fulltext/ED592480.pdf
  • Brodie, K. (2010). Teaching mathematical reasoning in secondary school classrooms. Springer Science+Business Media.
  • Chazan, D. (1993). High school geometry students' justification for their views of empirical evidence and mathematical proof. Educational Studies in Mathematics, 24(4), 359–387. https://doi.org/10.1007/BF01273371
  • Çoban, H. (2010). Investigating the relationship between the level of students? Using mathematical reasoning skills and using metacognitive learning strategies (Publication No. 258052) [Master’s thesis, Gaziosmanpaşa University]. Council of Higher Education Thesis Center.
  • Carpenter, T. P., Franke, M., & Levi, L. (2003). Thinking mathematically: Integrating arithmetic and algebra in elementary school. Heineman.
  • Carraher, D. W., Schliemann, A. D., Brizuela, B. M., & Earnest, D. (2006). Arithmetic and algebra in early mathematics education. Journal for Research in Mathematics Education, 37(2), 87–115. https://doi.org/10.2307/30034843
  • Chua, B. L. (2013). Pattern generalisation in secondary school mathematics: students’ strategies, justifications and beliefs and the influence of task features [Doctoral dissertation, London University]. UCL Discovery.
  • Çiftci, Z. (2015). The analysis of mathematical reasoning skills of middle school math teacher candidates (Publication No. 418254) [Doctoral dissertation, Atatürk University]. Council of Higher Education Thesis Center.
  • Dikkartın-Övez, F.T., & İnce, İ. (2024). Examination of seven grade students’; pattern generalızatıon processes and preferred, International Journal of Education Technology and Scientific Researches, 9(26), 84-129. http://dx.doi.org/10.35826/ijetsar.728
  • Dreyfus, T. (1999). Why Johnny can't prove. Educational Studies in Mathematics, 38(1), 85-109. https://doi.org/10.1023/A:1003660018579
  • Ellis, A. B. (2007). Connections between generalizing and justifying: Students' reasoning with linear relationships. Journal for Research in Mathematics Education, 38(3), 194 - 229. https://doi.org/10.2307/30034866
  • Ellis, A., Özgür, Z., & Reiten, L. (2019). The teacher moves to support student reasoning. Mathematics Education Research Journal, 31, 107-132. https://doi.org/10.1007/s13394-018-0246-6
  • English, L., & Warren, E. (1995). General reasoning processes and elementary algebraic understanding: Implications for instruction. Focus on Learning Problems in Mathematics, 17(4), 1–19. https://eric.ed.gov/?id=EJ526526
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  • Francisco, J. M., & Maher, C. A. (2011). Teachers attending to students’ mathematical reasoning: Lessons from an after-school research program. Journal of Mathematics Teacher Education, 14, 49-66. https://doi.org/10.1007/s10857-010-9144-x
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  • MoNE, (2013). Ortaokul matematik dersi (5, 6, 7 ve 8. Sınıflar) öğretim programı.
  • MoNE, (2018). Ortaokul matematik dersi (5, 6, 7 ve 8. Sınıflar) öğretim programı.
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  • NCTM (2000). Principles and Standards for School Mathematics. NCTM.
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  • Özmusul, B., & Bindak, R. (2022). Examining mathematical justification levels of 7th grade students. Acta Didactica Napocensia, 15(2), 185-197. https://doi.org/10.24193/adn.15.2.12
  • Pedemonte, B. (2002). Etude didactique et cognitive des rapports de l’argumentation et de la démonstration dans l’apprentissage des mathématiques (Publication No. 00004579) [Doctoral dissertation, Genova University]. HALL Thesis.
  • Pedemonte, B. (2007). How can the relationship between argumentation and proof be analysed?. Educational Studies in Mathematics, 66(1), 23-41. https://doi.org/10.1007/s10649-006-9057-x
  • Pengmanee, S. (2016). Developing students’ mathematical reasoning ability based on constructivist approach. Journal of Advances in Humanities and Social Sciences, 2(4), 221-231. https://doi.org/10.20474/jahss-2.4.3
  • Peker, S. (2020). Investigation secondary school students' generalization skills (Publication No. 609365) [Master’s thesis, Cumhuriyet University]. Council of Higher Education Thesis Center.
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  • Reyes-Hernandez, L., & Mooney, E. (2021). Examining middle school students' methods of justification. https://ir.library.illinoisstate.edu/urs2021mat/3
  • Rodrigues, M., Brunheira, L., & Serrazina, L. (2021). A framework for prospective primary teachers’ knowledge of mathematical reasoning processes. International Journal of Educational Research, 107, Article 101750. https://doi.org/10.1016/j.ijer.2021.101750
  • Putra, A., Fauzi, K.M., & Landong, A. (2020). Differences in the improvement of students' mathematical reasoning ability and self-confidence between metacognitive approaches and realistic mathematical approaches in mts negeri balige. Journal of Education and Practice,11 (36), 138-146. https://www.iiste.org/Journals/index.php/JEP/article/view/55142/56955
  • Säfström, A. I., Lithner, J., Palm, T., Palmberg, B., Sidenvall, J., Andersson, C., Boström, E., & Granberg, C. (2024). Developing a diagnostic framework for primary and secondary students’ reasoning difficulties during mathematical problem solving. Educational Studies in Mathematics, 115(2), 125-149. https://doi.org/10.1007/s10649-023-10278-1
  • Santos, L., Mata-Pereira, J., da Ponte, J. P., & Oliveira, H. (2022). Teachers’ understanding of generalizing and justifying in a professional development course. Eurasia Journal of Mathematics, Science and Technology Education, 18(1), 1-14. https://doi.org/10.29333/ejmste/11488
  • Serrazina, L., Brunheira, L., & Rodrigues, M. (2024). Developing elementary mathematics teachers’ knowledge of mathematical reasoning processes. In Thirteenth Congress of the European Society for Research in Mathematics Education (CERME13), Hungary, https://hal.science/hal-04421415/document Small, M. (2011). One, two, infinity. http://www.onetwoinfinity.ca/
  • Smit, R., Dober, H., Hess, K., Bachmann, P., & Birri, T. (2023). Supporting primary students’ mathematical reasoning practice: the effects of formative feedback and the mediating role of self-efficacy. Research in Mathematics Education, 25(3), 277-300. https://doi.org/10.1080/14794802.2022.2062780
  • Staples, M., & Newton, J. (2016). Teachers’ contextualization of argumentation in the mathematics classroom. Theory into Practice, 55(4), 294–301. https://doi.org/10.1080/00405841.2016.1208070
  • Stebbing, L. S. (1952). A modern elementary logic. University Publishers.
  • Stein, M. K., Engle, R. A., Smith, M., & Hughes, E. K. (2008). Orchestrating productive mathematical discussions: Five practices for helping teachers move beyond show and tell. Mathematical Thinking and Learning, 10(4), 313–340. https://doi.org/10.1080/10986060802229675
  • Stylianides, A. J. (2007). The notion of proof in the context of elementary school mathematics. Educational Studies in Mathematics, 65(1), 1-20. https://doi.org/10.1007/s10649-006-9038-0
  • Stylianides, G. J. (2008). An analytic framework of reasoning-and-proving. For the Learning of Mathematics, 28(1), 9–16. https://www.jstor.org/stable/40248592
  • Staples, M. E., Bartlo, J., & Thanheiser, E. (2012). Justification as a teaching and learning practice: Its (potential) multifaceted role in middle grades mathematics classrooms. The Journal of Mathematical Behavior, 31(4), 447–462. https://doi.org/10.1016/j.jmath b.2012.07.001
  • Thanheiser, E., Melhuish, K., Sugimoto, A., Rosencrans, B., & Heaton, R. (2021). Networking frameworks: a method for analyzing the complexities of classroom cultures focusing on justifying. Educational Studies in Mathematics, 107, 285-314. https://doi.org/10.1007/s10649-021-10026-3
  • Vale, C., Bragg, L. A., Widjaja, W., Herbert, S., & Loong, E. Y. K. (2017a). Children's mathematical reasoning: opportunities for developing understanding and creative thinking. Australian Primary Mathematics Classroom, 22(1), 3-8. https://search.informit.org/doi/abs/10.3316/informit.735199590694733
  • Vale, C., Widjaja, W., Herbert, S., Bragg, L. A., & Loong, E.Y. K. (2017b). Mapping Variation in Children’s Mathematical Reasoning: The Case of ‘What Else Belongs?’. International Journal of Science and Mathematics Education, 15, 873–894. https://doi.org/10.1007/s10763-016-9725-y
  • Venenciano, L., & Heck, R. (2016). Proposing and testing a model to explain traits of algebra preparedness. Educational Studies in Mathematics, 92, 21-35. https://doi.org/10.1007/s10649-015-9672-5
  • Visnovska, J., & Cobb, P. (2009). Learning about building mathematics instruction from students’ reasoning: a professional development study. In Hunter, R., Bicknell,B., & Burgess, T. (Eds.), Proceedings of the 32nd annual conference of the Mathematics Education Research Group of Australasia (pp. 547-554). https://www.researchgate.net/profile/Jana-Visnovska/publication/43515267_Learning_about_building_mathematics_instruction_from_students'_reasoning_A_professional_development_study/links/0deec528afe9ebf661000000/Learning-about-building-mathematics-instruction-from-students-reasoning-A-professional-development-study.pdf
  • Waluyo, S., Armanto, D., & Mansyur, A. (2021). Analysis of mathematic reasoning ability and self-confidence students using models pbl reviewed from intelligence intrapersonal in smpn 5 youth vocationality. Journal of Education and Practice, 12(16), 59-64. https://doi.org/10.7176/JEP/12-16-08
  • Watson, F. R. (1980). The role of proof and conjecture in mathematics and mathematics teaching. International Journal of Mathematical Educational in Science and Technology, 11(2), 163-167. https://doi.org/10.1080/0020739800110202
  • Widjaja, W., Vale, C., Herbert, S., Loong, E. Y., & Bragg, L. A. (2021). Linking comparing and contrasting, generalizing and justifying: a case study of primary students’ levels of justifying. Mathematics Education Research Journal, 33, 321-343. https://doi.org/10.1007/s13394-019-00306-w
  • Widjaja, W., & Vale, C. (2021). Counterexamples: Challenges faced by elementary students when testing a conjecture about the relationship between perimeter and area. Journal on Mathematics Education, 12(3), 487-506.https://doi.org/10.22342/jme.12.3.14526.487-506
  • Yeşildere, S., & Türnüklü, E. B. (2007). Examination of students’ mathematical thinking and reasoning processes. Ankara University Journal of Faculty of Educational Sciences, 40(1), 181-213. https://doi.org/10.1501/Egifak_0000000156
  • Yin, R. K. (2009). Case study research: Design and methods (4th ed.). Sage.
Toplam 90 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Matematik Eğitimi
Bölüm Makaleler
Yazarlar

Tuba Öz 0000-0003-0536-9360

Zeynep Çiftci 0000-0002-3828-6230

Erken Görünüm Tarihi 27 Aralık 2024
Yayımlanma Tarihi 27 Aralık 2024
Gönderilme Tarihi 28 Haziran 2024
Kabul Tarihi 23 Ağustos 2024
Yayımlandığı Sayı Yıl 2024

Kaynak Göster

APA Öz, T., & Çiftci, Z. (2024). Mathematical Reasoning Activity: Compare, Generalize and Justify. Necatibey Faculty of Education Electronic Journal of Science and Mathematics Education, 18(2), 291-323. https://doi.org/10.17522/balikesirnef.1506921