Conceptual images and learning obstacles in exponentiation and logarithms: A hermeneutic phenomenological analysis

Authors

  • Yuvita Andriani Kusumadewi Universitas Sebelas Maret
  • Riki Andriatna Universitas Sebelas Maret

DOI:

https://doi.org/10.29408/jel.v10i3.26775

Keywords:

exponential, hermeneutic phenomenological, logarithm, learning obstacle

Abstract

The concept of exponentials and logarithms is one of the essential concepts in mathematics as part of transcendent functions. However, students' understanding of these two concepts has yet to be fully mastered, so there are still errors in solving problems related to these two concepts. This study aims to describe the meaning and meaning process and explore the potential learning obstacles of students based on the meaning and experience of students in obtaining the meaning of exponents and logarithms in senior high school. This qualitative study uses a hermeneutic phenomenological approach with student participants and high school mathematics teachers. Data was collected using tests, documentation, and interviews with students and teachers. Data were analyzed qualitatively to identify learning obstacles and the meaning of exponentials and logarithms. The results showed the meaning of exponents and logarithms according to students, namely exponents as power numbers and logarithms as the opposite of power numbers. In addition, the results also show the existence of learning obstacles in students, both ontogenic, epistemological, and didactic. Based on the findings, these learning obstacles can be considered when developing an appropriate didactic design.

Author Biographies

Yuvita Andriani Kusumadewi, Universitas Sebelas Maret

Department of Mathematics Education

Riki Andriatna, Universitas Sebelas Maret

Department of Mathematics Education

References

Alvidrez, M., Louie, N., & Tchoshanov, M. (2024). From mistakes, we learn? Mathematics teachers’ epistemological and positional framing of mistakes. Journal of Mathematics Teacher Education, 27(1), 111–136. https://doi.org/10.1007/s10857-022-09553-4

Aprizal Bintara, I., & Prabawanto, S. (2024). Learning obstacles of junior high school students on the concept of triangle. KnE Social Sciences, 9(13), 500–509. https://doi.org/10.18502/kss.v9i13.15952

Arthur, Y. D., Dogbe, C. S. K., & Asiedu-Addo, S. K. (2022). Enhancing performance in mathematics through motivation, peer assisted learning, and teaching quality: The mediating role of student interest. Eurasia Journal of Mathematics, Science and Technology Education, 18(2), em2072. https://doi.org/10.29333/ejmste/11509

Beyene, A. B. (2023). Obstacle to students’ learning of the limit concept: A comparative study. [Doctoral dissertation, Stockholm University-Stockholm].

Borji, V., Surynková, P., Kuper, E., & Robová, J. (2024). University students’ understanding of exponential and logarithmic concepts: in case of real-world situations. In P. Drijvers, C. Csapodi, H. Palmér, K. Gosztonyi, & E. Kónya (Eds.), Proceedings of the Thirteenth Congress of the European Society for Research in Mathematics Education (CERME13) (pp. 2291–2298). Alfréd Rényi Institute of Mathematics and ERME.

Brousseau, G. (2002). Theory of didactical situations in mathematics (N. Balacheff, M. Cooper, R. Sutherland, & V. Warfield, Eds.; Vol. 19). Kluwer Academic Publishers. https://doi.org/10.1007/0-306-47211-2

Chesler, J. (2013). Pre-service secondary mathematics teachers making sense of definitions of functions. Mathematics Teacher Education and Development, 14(1), 27–40.

Confrey, J., & Smith, E. (1995). Splitting, covariation, and their role in the development of exponential functions. Journal for Research in Mathematics Education, 26(1), 66–86. https://doi.org/10.2307/749228

Creswell, J. W. (2007). Qualitative inquiry & research design: Choosing among five approaches (2nd ed.). SAGE Publications, Inc.

Dintarini, M. (2018). Understanding logarithm: What are the difficulties that students have? In A. Inam, D. S. Sayogo, Widayat, Isomudin, Latipun, & Zulfatman (Eds.), Proceedings of the 5th International Conference on Community Development (AMCA 2018) (pp. 239–241). Atlantis Press. https://doi.org/10.2991/amca-18.2018.65

Edwards, B. S., & Ward, M. B. (2004). Surprises from mathematics education research: student (mis)use of mathematical definitions. The American Mathematical Monthly, 111(5), 411–424. https://doi.org/10.2307/4145268

Ghasemi, A., Taghinejad, M., Kabiri, A., & Imani, M. (2011). Ricoeur’s theory of interpretation: A method for understanding text (course text). World Applied Sciences Journal, 15(11), 1623–1629.

Gunawan, M. S., & Fitra, D. (2021). Kesulitan siswa dalam mengerjakan soal-soal eksponen dan logaritma [Students' difficulties in working on exponent and logarithm problems]. Mosharafa: Jurnal Pendidikan Matematika, 10(2), 257–268. https://doi.org/10.31980/mosharafa.v10i2.875

Hardian, M. Y. (2019). Analisis kemampuan matematis dalam memahami materi eksponen dan logaritma pada siswa kelas X MIPA SMA Negeri 7 Mallawa Kabupaten Maros [Analysis of mathematical ability in understanding exponents and logarithms in X MIPA class students of SMA Negeri 7 Mallawa, Maros Regency]. Universitas Muhammadiyah Makassar.

Harel, G. (2008). What is mathematics? A pedagogical answer to a philosophical question. In B. Gold & R. A. Simons (Eds.), Proof and Other Dilemmas: Mathematics and Philosophy (pp. 265–290). Mathematical Association of America.

Hindi, A. N. AM., & Muthahharah, I. (2021). Teacher’s perception of student’s mathematics learning difficulties. Daya Matematis: Jurnal Inovasi Pendidikan Matematika, 9(3), 170–177. https://doi.org/10.26858/jdm.v9i3.23661

Karlina, T., Saltifa, P., & Sari, R. K. (2021). The correlation between learning interest and mathematics achievement in grade VII SMP PGRI Bengkulu. Journal of Physics: Conference Series, 1731(1), 012051. https://doi.org/10.1088/1742-6596/1731/1/012051

Kuper, E., & Carlson, M. (2020). Foundational ways of thinking for understanding the idea of logarithm. The Journal of Mathematical Behavior, 57, 100740. https://doi.org/10.1016/j.jmathb.2019.100740

Leikin, R., & Winicki-Landman, G. (2001). Defining as a vehicle for professional development of secondary school mathematics teachers. Mathematics Education Research Journal, 3, 62–73.

Mazana, M. Y., Montero, C. S., & Casmir, R. O. (2019). Investigating students’ attitude towards learning mathematics. International Electronic Journal of Mathematics Education, 14(1), 207–231. https://doi.org/doi.org/10.29333/iejme/3997

Melhuish, K., Lew, K., Hicks, M. D., & Kandasamy, S. S. (2020). Abstract algebra students’ evoked concept images for functions and homomorphisms. The Journal of Mathematical Behavior, 60, 100806. https://doi.org/10.1016/j.jmathb.2020.100806

Noto, M. S., Priatna, N., & Dahlan, J. A. (2019). Mathematical proof: The learning obstacles of pre-service mathematics teachers on transformation geometry. Journal on Mathematics Education, 10(1), 117–126. https://doi.org/10.22342/jme.10.1.5379.117-126

Nurwahyu, B., & Tinungki, G. M. (2020). Concept image and its influence on beliefs: Case study on undergraduate engineering students in solving of calculus concept problems. International Journal of Advanced Science and Technology, 29(05), 2227–2243.

Nurwahyu, B., Tinungki, G. M., & Mustangin, M. (2020). Students’ concept image and its impact on reasoning towards the concept of the derivative. European Journal of Educational Research, 9(4), 1723–1734. https://doi.org/10.12973/eu-jer.9.4.1723

Ojo, A., & Olanipekun, P. (2023). Examining students’ concept images in mathematics: The case of undergraduate calculus. Voice of the Publisher, 9(4), 242–256. https://doi.org/10.4236/vp.2023.94019

Oktavihari, D., & Priatna, N. (2023). Concept image of students on exponential functions material in the Covid-19 pandemic era. In R. Rosjanuardi, S. M. Gozali, Al Jupri, A. B. D. Nandiyanto, A. Samsudin, & L. S. Riza (Eds.), The 8th Mathematics, Science, and Computer Science Education International Seminar (MSCEIS 2021) (p. 090020). American Institute of Physics. https://doi.org/10.1063/5.0156574

Oliveira, S. M. de, & Lopes, R. (2024). Exponential functions and their derivatives in the light of conceptual image and conceptual definition. Revemop, 6, e2024007. https://doi.org/10.33532/revemop.e2024007

Prihandhika, A., Suryadi, D., & Prabawanto, S. (2022). The investigation of concept image towards derivative representation: A case study of prospective mathematics teachers. Mathematics Teaching-Research Journal, 14(4), 148–164.

Pulumbarit, C. B. (2022). Motivational styles and instructional practices in teaching mathematics: their impact on students’ learning. International Journal of Learning and Teaching, 8(2), 71–79. https://doi.org/10.18178/ijlt.8.2.71-79

Regan, P. (2012). Hans-Georg Gadamer’s philosophical hermeneutics: Concepts of reading, understanding and interpretation. Meta: Research in Hermeneutics, Phenomenology, and Practical Philosophy, 4(2), 286–303.

Schukajlow, S., Rakoczy, K., & Pekrun, R. (2023). Emotions and motivation in mathematics education: Where we are today and where we need to go. ZDM – Mathematics Education, 55(2), 249–267. https://doi.org/10.1007/s11858-022-01463-2

Sfard, A. (1991). On the dual nature of mathematical conceptions: Reflections on processes and objects as different sides of the same coin. Educational Studies in Mathematics, 22(1), 1–36. https://doi.org/10.1007/BF00302715

Siagian, M. D., Suryadi, D., Nurlaelah, E., Tamur, M., & Sulastri, R. (2021). Investigating students’ concept image in understanding variables. Journal of Physics: Conference Series, 1882(1), 012058. https://doi.org/10.1088/1742-6596/1882/1/012058

Sugiyono. (2015). Metode penelitian pendidikan (Pendekatan kuantitatif, kualitatif, dan R&D) [Educational research methods (quantitative, qualitative, and R&D approaches)]. Penerbit Alfabeta.

Suryadi, D. (2019). Penelitian desain didaktis (DDR) dan implementasinya [Didactical design research (DDR) and its implementation]. Gapura Press.

Susanti, E., Zulkardi, Z., & Hartono, Y. (2018). Building student’s understanding of exponent concept using the growth of the human. Jurnal Cakrawala Pendidikan, 37(1), 97–106.

Tall, D. (1996). Functions and calculus. In A. J. Bishop, K. Clements, C. Keitel, J. Kilpatrick, & C. Laborde (Eds.), International Handbook of Mathematics Education (Vol. 4, pp. 289–325). Springer.

Tall, D., & Vinner, S. (1981). Concept image and concept definition in mathematics with particular reference to limits and continuity. Educational Studies in Mathematics, 12(2), 151–169. https://doi.org/10.1007/BF00305619

Unaenah, E., Suryadi, D., & Turmudi, T. (2024). Epistemological learning obstacles on fractions in elementary school. Jurnal Elemen, 10(1), 1–12. https://doi.org/10.29408/jel.v10i1.18306

Uriarte, F. (2008). Introduction to knowledge management. Asean Foundation.

Valtoribio, D. C., Gurat, M. G., & Bautista, G. H. (2018). Exploring students’ image concepts of mathematical functions through error analysis. International Journal of Advanced Research and Publications, 2(9), 33–46.

Vinner, S., & Dreyfus, T. (1989). Images and definitions for the concept of function. Journal for Research in Mathematics Education, 20(4), 356–366. https://doi.org/10.2307/749441

Weber, K. (2002). Students’ understanding of exponential and logarithmic functions. Roceedings of the Annual Meeting of the North American Chapter of the International Group for the Psychology of Mathematics Education, 2–10.

Zuhra, K. (2022). Analisis kesalahan dalam menjawab soal logaritma siswa kelas X SMA Negeri 5 Banda Aceh [Error analysis in answering logarithm problems of class X students of SMA Negeri 5 Banda Aceh]. Universitas Islam Negeri Ar-Raniry.

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Published

01-10-2024

How to Cite

Kusumadewi, Y. A., & Andriatna, R. (2024). Conceptual images and learning obstacles in exponentiation and logarithms: A hermeneutic phenomenological analysis. Jurnal Elemen, 10(3), 630–651. https://doi.org/10.29408/jel.v10i3.26775

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