Abstract: The purpose of this study is to describe the mathematical connection processes of Junior High School students in solving open-ended problems. The type of this research is descriptive qualitative. The data of this research were obtained through tests and interviews. The mathematical connections processes can be seen when students solve open ended mathematics story problems. The connection processes are based on three types of connections, namely concepts connections, procedures connection, and modelling connections. The research concluded that students can use all known information and connect the information so that they get the solution. The process of students’ mathematical connection is happened when the students were able to  change the mathematical story problem into mathematical model and to connect mathematical concepts and procedures. However, in general, students only solve one solution even the problem was open ended. The reason is that the students rarely have experience in solving open ended mathematics problem.

Abstrak: Tujuan penelitian ini untuk mendiskripsikan proses koneksi matematis siswa SMP dalam menyelesaikan masalah open-ended. Sumber data penelitian ini dari hasil tes masalah open-ended dan hasil wawancara. Koneksi matematis dapat dilihat ketika siswa menyelesaikan soal cerita matematika yang open ended. Proses koneksi matematis siswa dianalisis berdasarkan tiga tipe koneksi, yaitu koneksi konsep, koneksi prosedur dan koneksi pemodelan matematika. Penelitian ini menyimpulkan bahwa siswa dapat menggunakan informasi yang diketahui dan mengoneksikan informasi tersebut sehingga diperoleh penyelesaian. Proses koneksi matematis siswa terjadi ketika siswa mampu mengubah soal ke dalam model matematis dan siswa mampu menghubungkan konsep dan prosedur matematika. Tetapi umumnya siswa hanya menjawab satu penyelesaian walaupun soalnya open ended. Alasannya adalah karena siswa jarang memperoleh pengalaman menyelesaikan soal open-ended.

koneksi matematis; soal open-ended; koneksi pemodelan; koneksi konsep; koneksi prosedur

Aini, K. N., Purwanto, P., & Sa’dijah, C. (2016). Proses Koneksi Matematika Siswa Berkemampuan Tinggi dan Rendah Dalam Memecahkan Masalah Bangun Datar. Jurnal Pendidikan: Teori, Penelitian, dan Pengembangan, 1(3), 377–388. https://doi.org/10.17977/JP.V1I3.6164

Argarini, D. F. (2018). Analisis Pemecahan Masalah Berbasis Polya pada Materi Perkalian Vektor Ditinjau dari Gaya Belajar. Matematika Dan Pembelajaran, 6(1), 91. https://doi.org/10.33477/mp.v6i1.448

Carson, J. (2007). A problem with problem solving. Teaching Thinking without Teaching Knowledge, 17(2), 7–14.

Elly, M., Sa’dijah, C., Abd, Q., & Lathiful, A. (2020). Practicality and Effectiveness of Realistic Mathematical Learning Materials to Support Mathematical Literacy Skill of Junior High School Students. AIP Conference Proceedings, 2215(1). https://doi.org/10.1063/5.0000844

Handayani, U. F., Sa’dijah, C., & Susanto, H. (2018). Analisis Kemampuan Berpikir Kreatif Matematis Siswa SMP Dalam Menyelesaikan Soal Adopsi ‘PISA.’ Jurnal Math Educator Nusantara: Wahana Publikasi Karya Tulis Ilmiah di Bidang Pendidikan Matematika, 4(2), 143. https://doi.org/10.29407/jmen.v4i2.12109

Hidajat, F. A., Sa’dijah, C., Sudirma, & Susisw. (2019). Exploration of students’ arguments to identify perplexity from reflective process on mathematical problems. International Journal of Instruction, 12(2), 573–586. https://doi.org/10.29333/iji.2019.12236a

Jenkins, O. F. (2010). Developing teachers’ knowledge of students as learners of mathematics through structured interviews. Journal of Mathematics Teacher Education, 13(2), 141–154. https://doi.org/10.1007/s10857-009-9129-9

Kemendikbud. (2016). Permendikbud Nomor 21 Tahun 2016 Tentang Standar Isi Pendidikan Dasar Dan Menengah (Lampiran). 1–234.

Kesumawati, N. (2008). Pemahaman Konsep Matematik dalam Pembelajaran Matematika. Pendidikan Matematika, 2(2), 229–235.

Kristayulita, K., Nusantara, T., As’Ari, A. R., & Sa’Dijah, C. (2018). Identification of Students Errors in Solving Indirect Analogical Problems Based on Analogical Reasoning Components. Journal of Physics: Conference Series, 1028(1). https://doi.org/10.1088/1742-6596/1028/1/012154

Malasari. (2017). A Development of Mathematical Connecting Ability of Students in Junior High School through a Problem-Based Learning with Course Review Horay Method A Development of Mathematical Connecting Ability of Students in Junior High School through a Problem-Based. https://doi.org/10.1088/1742-6596/755/1/011001

NCTM. (2000). Executive summary - Principals and standards for school mathematics. 1–6. https://doi.org/10.1111/j.1949-8594.2001.tb17957.x

Nurdiansyah, I., & Muhsetyo, G. (2018). Pengembangan Lembar Kegiatan Siswa Berbantuan Tangram Bercirikan Open-Ended pada Pokok Bahasan Segiempat dan Segitiga Kelas VII SMP. Jurnal Pendidikan:Teori, Penelitian, dan Pengembangan, 3(6), 829–837.

Sa’Dijah, C., Afriyani, D., Subanji, Muksar, M., & Anwar, L. (2018). Assessing students’ pseudo-mathematical translation using translation-verification model. AIP Conference Proceedings, 2014(October), 1–10. https://doi.org/10.1063/1.5054548

Sari, F. K., & Chandra, T. D. (2018). Proses Koneksi Matematis Siswa SMP dalam Menyelesaikan Soal Cerita. Jurnal Pendidikan:Teori, Penelitian, dan Pengembangan, 3(6), 715–722.

Sholihah, U., Nusantara, T., Sa’Dijah, C., & Susanto, H. (2019). The Ability of Students’ Visual Thinking in Solving Integral Problems. Journal of Physics: Conference Series, 1157(3). https://doi.org/10.1088/1742-6596/1157/3/032090

Stylianou, D. A. (2013). An Examination of Connections in Mathematical Processes in Students ’ Problem Solving : Connections between Representing and Justifying. 2(2), 23–35. https://doi.org/10.5539/jel.v2n2p23

Susanti, E. (2012). Meningkatkan Penalaran Siswa melalui Koneksi Matematika. Prosiding, 8(7), 978–979.

Syam, H., Sutawidjaja, A., Sa’dijah, C., & Abadyo. (2018). The Critical Thinking Profile of Junior High School Students in Solving Geometry Problems. International Journal of Multidisciplinary Research and Development, 5(7), 33–37.

Tohir, M. (2019). Hasil PISA Indonesia Tahun 2018. Paper of Matematohir, 2(1), 1–2. https://doi.org/10.31219/osf.io/pcjvx

Utami, A. D., Sa’dijah, C., Subanji, & Irawati, S. (2019). Students’ Pre-Initial Mental Model: The Case of Indonesian First-Year of College Students. International Journal of Instruction, 12(1), 1173–1188. https://doi.org/10.29333/iji.2019.12175a

Yuliana, E. (2015). Pengembangan Soal Open Ended pada Pembelajaran Matematika untuk Mengidentifikasi Kemampuan Berpikir Kreatif Siswa. Prosiding Seminar Nasional Pendidikan Matematika (SNAPTIKA) 2015, Palembang 16 Mei 2015