Precise Mathematical Language: Exploring the Relationship Between Student Vocabulary Understanding and Student Achievement

In this action research study of my classroom of fifth grade mathematics, I investigate the relationship between student understanding of precise mathematics vocabulary and student achievement in mathematics. Specifically, I focused on students’ understanding of written mathematics problems and on their ability to use precise mathematical language in their written solutions of critical thinking problems. I discovered that students are resistant to change; they prefer to do what comes naturally to them. Since they have not been previously taught to use precise mathematical language in their communication about math, they have great difficulty in adapting to this new requirement. However, with teaching modeling and ample opportunities to use the language of mathematics, students’ understanding and use of specific mathematical vocabulary is increased.

The Importance of Teaching Students How to Read to Comprehend Mathematical Language

In this action research study of my classroom of 8th and 9th grade Algebra I students, I investigated if there are any benefits for the students in my class to learn how to read, translate, use, and understand the mathematical language found daily in their math lessons. I discovered that daily use and practice of the mathematical language in both written and verbal form, by not only me but by my students as well, improved their understanding of the textbook instructions, increased their vocabulary and also increased their understanding of their math lessons. I also found that my students remembered the mathematical material better with constant use of mathematical language and terms. As a result of this research, I plan to continue stressing the use of mathematical language and vocabulary in my classroom and will try to develop new ways to help students to read, understand, and remember mathematical language they find daily in their textbooks.

Understanding the Mathematical Language

In this action research study of my calculus classroom consisting of only 12th grade students, I investigated activities that would affect a student’s understanding of mathematical language. The goal in examining these activities in a systematic way was to see if a student’s deeper understanding of math terms and symbols resulted in a better understanding of the mathematical concepts being taught. I discovered that some students will rise to the challenge of understanding mathematics more deeply, and some will not. In the process of expecting more from students, the frustration level of both the students and the teacher increased. As a result of this research, I plan to see what other activities will enhance the understanding of mathematical language.

An investigation into the tension arising between natural language and mathematical language experienced by mechanical engineering students

This investigation is grounded within the concept of embodied cognition where the mind is considered to be part of a biological system. A first year undergraduate Mechanical Engineering cohort of students was tasked with explaining the behaviour of three balls of different masses being rolled down a ramp. The explanations given by the students highlighted the cognitive conflict between the everyday interpretation of the word energy and its mathematical use. The results showed that even after many years of schooling, students found it challenging to interpret the mathematics they had learned and relied upon pseudo-scientific notions to account for the behaviour of the balls.

A utilização da tecnologia na sala de aula como instrumento de visualização e algebrização dos objetos matemáticos

No presente relatório da Prática de Ensino Supervisionada são referidas opções de ensino, procedimentos e reações dos alunos ao processo de ensino. É dada uma grande ênfase ao ambiente de aprendizagem baseado na tecnologia e suportado por uma comunidade de aprendizagem, que tem lugar na própria sala de aula ou na sala de informática. A tecnologia é assumida como um recurso constante na maior parte das aulas através do recurso a tarefas escolhidas intencionalmente tendo em vista a possibilidade de introdução da tecnologia na sua resolução. Esta implementação assumiu várias formas, tais como a exploração de calculadoras, a manipulação do GeoGebra ou simplesmente através da apresentação de ficheiros acabados, o que constitui uma forma de obter uma boa visualização dos objetos matemáticos. A aplicação dos recursos tecnológicos foi progressivamente tornada mais intensiva, atingindo o seu culminar no Projeto de Estágio, designação atribuída a duas aulas concebidas explicitamente para a exploração da temática: “Estabelecimento de um Paralelismo entre a Geometria Tridimensional Dinâmica e as Funções”; Abstract: The Use of Technology in the Classroom as an Instrument of Visualization and Algebrization of the Mathematical Objects In this paper we refer to teaching options, procedures, and to students’ reactions to the teaching processes. We give a lot of reinforcement in the learning environment based on technology and supported by a community of learners, which take place in their own classroom or in the Informatics Class. Technology is assumed as a constant resource in most part of the classes through the intentional tasks’ choosing taking into account the possibility of technology introduction in their resolution. This implementation has assumed several forms, like calculators’ exploration, GeoGebra manipulation or simply by presenting finished files, which is a way of getting a great visualization of mathematical objects. The technological resources’ application turned itself progressively more intensive, presenting its center point on Practice Project, name who was gave to two classes conceived explicitly for the thematic exploration: “The establishment of a parallelism between Dynamic Tridimensional Geometry and the Functions”.

Um estudo sobre o ensino-aprendizagem das demonstrações matemáticas

Demonstrations are fundamental instruments for Mathematics and, as such, are frequently used by mathematicians, math teachers and students. In fact, demonstrations are part of every Mathematics teaching environment, because Mathematics considers something true when it can be demonstrated. This is in contrast to other fields of knowledge that employ observation and experimentation to validate truth. This dissertation presents a study of the teaching and learning of demonstrations in Mathematics, describing a Teaching Module applied in a course on the Theory of Numbers offered by the Mathematics Department of the Universidade Federal do Rio Grande do Norte for mathematics majors. The objective of the dissertation was to propose and test a Teaching Module that can serve as a model for teaching demonstrations. The Teaching Module consisted of the following five steps: the application of a survey to determine the students‟ profiles and their previous knowledge of mathematical language and techniques of demonstration; the analysis of a series of dialogues containing arguments in everyday language; the investigation and analysis of the structure of some important techniques of demonstration; a written assessment; and, finally, an interview to further verify the principal results of the Teaching Module. The analysis of the data obtained though the classroom activities, written assessments and interviews led to the conclusion that there was a significant amount of assimilation of the issue at the level of relational understanding, (SKEMP, 1980). These instruments verified that the students attained considerable improvement in their use of mathematical language and of the techniques of demonstration presented. Thus, the evidence supports the conclusion that the proposed Teaching Module is an effective means for the teaching/learning of mathematical demonstration and, as such, provides a methodological guide which may lay the foundations for a new approach to this important subject

A expressão no ciberespaço: um voltar-se fenomenologicamente para o diálogo acerca de conteúdos matemáticos

Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES)

Vocabulary Instruction as a Tool for Helping Students of Diverse Backgrounds and Ability Levels to Understand Mathematical Concepts

This action research project describes a research project designed and implemented specifically with an emphasis on the instruction of mathematical vocabulary. The targeted population was my second period classroom of sixth grade students. This group of seventeen students represented diverse socioeconomic backgrounds and abilities. The school is located in a community of a population of approximately 5,000 people in the Midwest. My research investigation focused on the use of specific methods of vocabulary instruction and students’ use of precise mathematical vocabulary in writing and speaking. I wanted to see what effects these strategies would have on student performance. My research suggested that students who struggle with retention of mathematical knowledge have inadequate language skills. My research also revealed that students who have a sound knowledge of vocabulary and are engaged in the specific use of content language performed more successfully. Final analysis indicated that students believed the use of specific mathematical language helped them to be more successful and they made moderate progress in their performance on assessments.

THE EFFECT OF PURPOSEFUL MATHEMATICS DISCOURSE IN THE CLASSROOM ON STUDENTS’ MATHEMATICS LANGUAGE IN THE CONTEXT OF PROBLEM SOLVING

This study examines how one secondary school teacher’s use of purposeful oral mathematics language impacted her students’ language use and overall communication in written solutions while working with word problems in a grade nine academic mathematics class. Mathematics is often described as a distinct language. As with all languages, students must develop a sense for oral language before developing social practices such as listening, respecting others ideas, and writing. Effective writing is often seen by students that have strong oral language skills. Classroom observations, teacher and student interviews, and collected student work served as evidence to demonstrate the nature of both the teacher’s and the students’ use of oral mathematical language in the classroom, as well as the effect the discourse and language use had on students’ individual written solutions while working on word problems. Inductive coding for themes revealed that the teacher’s purposeful use of oral mathematical language had a positive impact on students’ written solutions. The teacher’s development of a mathematical discourse community created a space for the students to explore mathematical language and concepts that facilitated a deeper level of conceptual understanding of the learned material. The teacher’s oral language appeared to transfer into students written work albeit not with the same complexity of use of the teacher’s oral expression of the mathematical register. Students that learn mathematical language and concepts better appear to have a growth mindset, feel they have ownership over their learning, use reorganizational strategies, and help develop a discourse community.

Using blogs to enhance the capacity of mathematical communication in High School

The aim of this investigation is to analyze the use of the blog as an educational resource for the development of the mathematical communication in secondary education. With this aim, four aspects are analyzed: organization of mathematical thinking through communication; communication of mathematical thinking; analysis and evaluation of the strategies and mathematical thought of others; and expression of mathematical ideas using mathematical language. The research was conducted from a qualitative approach on an exploratory level, with the case study method of 4 classrooms of second grade of secondary education in a private school in Lima. The observational technique of 20 publications in the blog of the math class was applied; a study of a focal group with a sample of 9 students with different levels of academic performance; and an interview with the academic coordinator of the school was conducted. The results show that the organization of mathematical thinking through communication is carried out in the blog in a written, graphical and oral way through explanations, schemes and videos. Regarding communication of mathematical thinking, the blog is used to describe concepts, arguments and mathematical procedures with words and examples of the students. The analysis and evaluation of the strategies and mathematical thinking is performed through comments and debates about the publications. It was also noted that the blog does not facilitate the use of mathematical language to express mathematical ideas, since it does not allow direct writing of symbols nor graphic representation.

Chebanov law and Vakar formula in mathematical models of complex systems

Ecological models written in a mathematical language L(M) or model language, with a given style or methodology can be considered as a text. It is possible to apply statistical linguistic laws and the experimental results demonstrate that the behaviour of a mathematical model is the same of any literary text of any natural language. A text has the following characteristics: (a) the variables, its transformed functions and parameters are the lexic units or LUN of ecological models; (b) the syllables are constituted by a LUN, or a chain of them, separated by operating or ordering LUNs; (c) the flow equations are words; and (d) the distribution of words (LUM and CLUN) according to their lengths is based on a Poisson distribution, the Chebanov's law. It is founded on Vakar's formula, that is calculated likewise the linguistic entropy for L(M). We will apply these ideas over practical examples using MARIOLA model. In this paper it will be studied the problem of the lengths of the simple lexic units composed lexic units and words of text models, expressing these lengths in number of the primitive symbols, and syllables. The use of these linguistic laws renders it possible to indicate the degree of information given by an ecological model.

Year 7 students’ approaches to understanding and solving NAPLAN numeracy problems

This study investigated how the interpretation of mathematical problems by Year 7 students impacted on their ability to demonstrate what they can do in NAPLAN numeracy testing. In the study, mathematics is viewed as a culturally and socially determined system of signs and signifiers that establish the meaning, origins and importance of mathematics. The study hypothesises that students are unable to succeed in NAPLAN numeracy tests because they cannot interpret the questions, even though they may be able to perform the necessary calculations. To investigate this, the study applied contemporary theories of literacy to the context of mathematical problem solving. A case study design with multiple methods was used. The study used a correlation design to explore the connections between NAPLAN literacy and numeracy outcomes of 198 Year 7 students in a Queensland school. Additionally, qualitative methods provided a rich description of the effect of the various forms of NAPLAN numeracy questions on the success of ten Year 7 students in the same school. The study argues that there is a quantitative link between reading and numeracy. It illustrates that interpretation (literacy) errors are the most common error type in the selected NAPLAN questions, made by students of all abilities. In contrast, conceptual (mathematical) errors are less frequent amongst more capable students. This has important implications in preparing students for NAPLAN numeracy tests. The study concluded by recommending that increased focus on the literacies of mathematics would be effective in improving NAPLAN results.

Greek or not : the use of symbols and abbreviations in mathematics

The use of symbols and abbreviations adds uniqueness and complexity to the mathematical language register. In this article, the reader’s attention is drawn to the multitude of symbols and abbreviations which are used in mathematics. The conventions which underpin the use of the symbols and abbreviations and the linguistic difficulties which learners of mathematics may encounter due to the inclusion of the symbolic language are discussed. 2010 NAPLAN numeracy tests are used to illustrate examples of the complexities of the symbolic language of mathematics.

O que há de metafísica na mecânica do século XVIII?

Ao contrário do período precedente de criação da chamada ciência moderna, o século XVIII parece não desempenhar um papel fundamental no desenvolvimento da física. Na visão de muitos autores, o século das luzes é considerado como uma fase de organização da mecânica que teve seu coroamento com as obras de Lagrange, imediatamente precedidas por Euler e dAlembert. Muitos autores afirmam que na formulação da mecânica racional houve uma eliminação gradual da metafísica e também da teologia e que o surgimento da física moderna veio acompanhado por uma rejeição da metafísica aristotélica da substância e qualidade, forma e matéria, potência e ato. O ponto central da tese é mostrar que, no século XVIII, houve uma preocupação e um grande esforço de alguns filósofos naturais que participaram da formação da mecânica, em determinar como seria possível descrever fenômenos através da matemática. De uma forma geral, a filosofia mecanicista exigia que as mudanças observadas no mundo natural fossem explicadas apenas em termos de movimento e de rearranjos das partículas da matéria, uma vez que os predecessores dos filósofos iluministas conseguiram, em parte, eliminar da filosofia natural o conceito de causas finais e a maior parte dos conceitos aristotélicos de forma e substância, por exemplo. Porém, os filósofos mecanicistas divergiam sobre as causas do movimento. O que faria um corpo se mover? Uma força externa? Uma força interna? Força nenhuma? Todas essas posições tinham seus adeptos e todas sugeriam reflexões filosóficas que ultrapassavam os limites das ciências da natureza. Mais ainda: conceitos como espaço, tempo, força, massa e inércia, por exemplo, são conceitos imprescindíveis da mecânica que representam uma realidade. Mas como a manifestação dessa realidade se torna possível? Como foram definidos esses conceitos? Embora não percebamos explicitamente uma discussão filosófica em muitos livros que versam sobre a mecânica, atitudes implícitas dessa natureza são evidentes no tratamento das questões tais como a ambição à universalidade e a aplicação da matemática. Galileu teve suas motivações e suas razões para afirmar que o livro da natureza está escrito em liguagem matemática. No entanto, embora a matemática tenha se tornado a linguagem da física, mostramos com esta tese que a segunda não se reduz à primeira. Podemos, à luz desta pesquisa, falarmos de uma mecânica racional no sentido de ser ela proposta pela razão para organizar e melhor estruturar dados observáveis obtidos através da experimentação. Porém, mostramos que essa ciência não foi, como os filósofos naturais pretendiam que assim fosse, obtidas sem hipóteses e convenções subjetivas. Por detrás de uma representação explicativa e descritiva dos fenômenos da natureza e de uma consistência interna de seus próprios conteúdos confirmados através da matemática, verificamos a presença da metafísica.