Langauge Model for Mathematics

The construction of a fundamental understanding of numeration and place value concepts forms the foundation for all additional branches of mathematics (Booker, et al., 2010). Computational processes and patterns of thinking require a clear understanding of these concepts, as they underpin the learning and use of mathematics (Booker et al., 2010).
Developing mathematical thinking from an early age is extremely important in establishing students understanding of number concepts. Clements (2001, p271) concludes that children “are self-motivated to investigate patterns, shapes, measurement, the meaning of numbers, and how numbers work, but they need assistance to bring these ideas to an explicit level of awareness.” Children learn mathematical ways of thinking, such as counting, subitising and patterning from a young age. The absence of mathematical understanding and ways of thinking, restricts children from grasping the concepts and processes they are learning. Booker et al. (2010) says children who lack early mathematical thinking are unable to link ideas and instead are provided with the skills of obtaining answers in unrelated ways. Developing mathematical thinking from a young age provides a meaningful basis for children to make connections between the full range of mathematical concepts (Booker et al., 2010).
The development of mathematical learning and understanding, through a variety of different techniques and strategies, is particularly significant. One of the crucial early learning ideas associated with number is the connection between language, symbols and materials (Larkin, 2013a). Booker et al. (2010) states that language is a key aspect to mathematical learning from the conceptual formation of processing and problem-solving, to the development of numerate students. The Language Model For Mathematics - See Figure 1 (Larkin, 2013b), is purpose built around this idea. It emphasises that when teaching mathematics teachers should progress from the

References: ACARA Australian Curriculum, Assessment and Reporting Authority. (2012). The Australian Curriculum. Retrieved from www.australiacurriculum.edu.au/Mathematics/Curriculum/F-10 Booker, G., Bond, D., Sparrow, L., & Swan, P., (2010). Teaching Primary Mathematics. Sydney: Pearson. Clements, D. H., & Sarama, J. (2004). Engaging young children in mathematics: Standards for early childhood mathematics education. Mahwah, N.J: Lawrence Erlbaum  Gowers, T., Barrow-Green, J., Leader, I., & Princeton University. (2008). The Princeton companion to mathematics. Princeton, NJ, USA: Princeton University Press. Larkin, K. (2013a) 1091EDN Lecture 1: Addition [PowerPoint slides]. Retrieved from Mathematics Education 1 course Web site: https://learning.griffith.edu.a/ Larkin, K. (2013b) 1091EDN Lecture 2: Subtraction [PowerPoint slides]. Retrieved from Mathematics Education 1 course Web site: https://learning.griffith.edu.a/