Authors:Basanta Raj Lamichhane, Niroj Dahal Pages: 1 - 7 Abstract: Engaged learning in mathematics is essential to students' success and has a significant role in creating a transformative path in mathematics education. Considering this, this editorial attempts to highlight the role of behavioural, cognitive, affective and agentic aspects of engaged learning. It is impossible to bring all aspects of this complex and multidimensional construct in this short editorial; however, we try to open a new avenue by bringing the issue of engaged learning into pedagogical practices of mathematics in the context of Nepal. The discourse opens up how disengaged learning creates a mathematical Othering and its detrimental effects on mathematics education. Moreover, this discourse binds with the major features of classroom engagement, conceptualize and the impact of engaged learning on students' success. The editorial ends with a brief overview of the issue. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42395 Issue No:Vol. 6, No. 6 (2021)

Authors:Kedar Nepal , Krishna Pokharel, Deepak Basyal, Debendra Banjade, Manoj Lamichhane Pages: 8 - 29 Abstract: Research shows that college students make numerous algebra and other prerequisite content-related errors in Calculus courses. Most of these errors are common, persistent, and often observed in simple mathematical tasks. This qualitative study is an attempt to identify the potential sources of such errors. Based on our observations of student errors, we wrote a Precalculus and a Calculus test and administered them in twelve sections of four different undergraduate mathematics courses for which either Precalculus, Calculus I or both were a prerequisite. The tests were announced on the first day of the class and administered the following week. All the questions on the test were True or False questions. Based on our experience as college mathematics instructors, we assumed that many students would perceive the True answers as False and the False as True. Therefore, if students’ selected a given answer, mathematical statement, process or solution as True, they were asked to justify why that was not False and vice-versa. They were instructed to provide logical explanations and avoid plugging in numbers to check for correctness. Analysis of data using grounded theory approach resulted in the following three possible external sources of common and persistent student errors: a) Difficulty with symbols and/or lack of attendance to the meaning of those symbols, b) Instructional practices, and c) Lack of knowledge. We will provide examples to illustrate how such errors could have originated from these sources. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42397 Issue No:Vol. 6, No. 6 (2021)

Authors:Raj Kumar Tyata, Niroj Dahal, Binod Prasad Pant, Bal Chandra Luitel Pages: 30 - 49 Abstract: The declining interest of learners in mathematics in the learning process has resulted in poor achievement (Yeh et al., 2019). To get rid of these poor achievements, we explored project-based teaching in four topical areas (e.g., mathematical concepts of coordinate geometry, trigonometry, sequence, and series) in the school mathematics. This paper results from observing changes in engagement of learners in learning mathematics by motivating them through the project-based learning (PBL) guided by two theories – knowledge constitutive interests (Habermas, 1972), and collaborative and cooperative learning under the paradigms of interpretivism and criticalism. In this ethos, PBL is an “engaging and learner-directed approach that provides equal opportunities for students to explore their knowledge and understanding” (Thomas, 2000, p. 12). More specifically, we adopted the 'action research' method with the secondary level students (Grade IX) of one of the institutional schools in their classrooms. The information was collected by observing and recording the changes seen in consecutive seventeen days. The research landed that project-based learning is an appropriate pedagogy for engaged learning. The study revealed that the students were motivated while they got opportunities to interact in the projects. Moreover, the findings show that PBL is helpful to engage the learners through questioning, pair/group discussion, discovery learning, and concept mapping. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42398 Issue No:Vol. 6, No. 6 (2021)

Authors:Ganesh Prasad Adhikari Pages: 50 - 65 Abstract: The main objectives of this study were to identify the teachers’ perceptions and challenges of using ICT tools in the mathematics classroom at the secondary level in Kathmandu. The major tool of the study was a closed-ended questionnaire consisting of 19 items. The quantitative descriptive survey design was used in this study. The researcher selected 158 teachers by using simple random method from 261 government teachers who teach compulsory mathematics at grade X of Kathmandu district in Nepal. The standardized questionnaire was administered to the sample teachers. The SPSS-25 version database was used to analyze and interpret the collected data. Teachers’ perception of using ICTs in the mathematics classroom was positive with insignificant difference in terms of gender. There were some challenges: lack of knowledge, confidence, enough experience, training, interest and access to ICT tools, lack of technical support, lack of genuine ICT Software and unstable and unreliable internet connection at the schools. Due to these challenges, teachers did not use ICT in the classroom. Therefore, teachers should learn more to improve their knowledge and skills in ICT. The government should focus on management strategies and policies to reduce the challenges faced by teachers in mathematics classrooms. By these policies, they can use the ICT tools in the classroom. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42405 Issue No:Vol. 6, No. 6 (2021)

Authors:Laxman Luitel, Binod Prasad Pant Pages: 66 - 81 Abstract: Higher education practices in Nepal have been playing an important role to train and develop pre-service school teachers. This paper critically reflects on the curricular and pedagogical practices of mathematics education based on the first author's experiences of learning at the undergraduate level from the perspective of mathematics curriculum images and pedagogical implications. Subscribing to autoethnography as a research methodology, we analysed the first author's experiences as an undergraduate student in one of the public campuses in Nepal which point to two major images of mathematics curriculum: curriculum as a prescription and curriculum as a cultural reproduction. Considering Habermasian Knowledge Constitutive Interest as a theoretical referent, the paper concludes that the transformation of curricular and pedagogical practices in teacher education is essential. The transformative practice in teacher education is insightful to improve pre-service and in-service school teachers' pedagogical and content knowledge in Nepal. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42409 Issue No:Vol. 6, No. 6 (2021)

Authors:Krishna Kanta Parajuli Pages: 82 - 94 Abstract: The South Asian region has a long history of discovering new ideas, ideologies, and technologies. Since the Vedic period, the land has been known as a fertile place for innovative discoveries. The Vedic technique used by Bharati Krishna Tirthaji is unique among South Asian studies. The focus of this study was mostly on algebraic topics, which are typically taught in our school level. The study also looked at how Vedic Mathematics solves issues of elementary algebra using Vedic techniques such as Paravartya Yojayet, Sunyam Samyasamuccaye, Anurupye Sunyamanyat, Antyayoreva and Lopanasthapanabhyam. The comparison and discussion of the Vedic with the conventional techniques indicate that the Vedic Mathematics and its five unique formulas are more beneficial and realistic to those learners who are experiencing problems with elementary level algebra utilizing conventional methods. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42410 Issue No:Vol. 6, No. 6 (2021)

Authors:Mohammad Asfaque, Jeevan Kafle Pages: 95 - 101 Abstract: This paper aims to propose an algorithm that can predict the values of logarithmic function for any domain and for any bases with minimum possible error using basic mathematical operations. It talks about a univariate quadratic function that overlaps with the graph of the common logarithmic function to some extent, and using this resemblance to fullest advantage. It proposes a formula and certain algorithms based on the same formula. PubDate: 2021-12-31 DOI: 10.3126/mefc.v6i6.42412 Issue No:Vol. 6, No. 6 (2021)