Abstract
When the National Benchmark Tests (NBTs) were first considered, it was suggested that the results would assess entry-level students’ academic and quantitative literacy, and mathematical competence, assess the relationships between higher education entry-level requirements and school-level exit outcomes, provide a service to higher education institutions with regard to selection and placement, and assist with curriculum development, particularly in relation to foundation and augmented courses. We recognise there is a need for better communication of the findings arising from analysis of test data, in order to inform teaching and learning and thus attempt to narrow the gap between basic education outcomes and higher education requirements. Specifically, we focus on identification of mathematical errors made by those who have performed in the upper third of the cohort of test candidates. This information may help practitioners in basic and higher education. The NBTs became operational in 2009. Data have been systematically accumulated and analysed. Here, we provide some background to the data, discuss some of the issues relevant to mathematics, present some of the common errors and problems in conceptual understanding identified from data collected from Mathematics (MAT) tests in 2012 and 2013, and suggest how this could be used to inform mathematics teaching and learning. While teachers may anticipate some of these issues, it is important to note that the identified problems are exhibited by the top third of those who wrote the Mathematics NBTs. This group will constitute a large proportion of first-year students in mathematically demanding programmes. Our aim here is to raise awareness in higher education and at school level of the extent of the common errors and problems in conceptual understanding of mathematics. We cannot analyse all possible interventions that could be put in place to remediate the identified mathematical problems, but we do provide information that can inform choices when planning such interventions.
Highlights
IntroductionAt the end of Grade 12 all school leavers write the National Senior Certificate (NSC); those wishing to enter higher education write the NBTs if required to do so by the institutions to which they intend applying
The NBTP was commissioned in 2005 by Higher Education South Africa (HESA), called Universities South Africa, with the following objectives (Griesel, 2006, p. 4): To assess entry-level academic and quantitative literacy and mathematics proficiency of students. To assess the relationship between higher education entry-level requirements and school-level exit outcomes. To provide a service to higher education institutions requiring additional information to assist in admission of students. To assist with curriculum development, in relation to foundation and augmented courses.At the end of Grade 12 all school leavers write the National Senior Certificate (NSC); those wishing to enter higher education write the NBTs if required to do so by the institutions to which they intend applying
While the criterion-referenced NBT MAT tests do not test anything outside the school curriculum, they are not constrained to include all NSC mathematics topics, and focus on those aspects of the school curriculum that have a greater bearing on performance in first-year mathematics courses
Summary
At the end of Grade 12 all school leavers write the National Senior Certificate (NSC); those wishing to enter higher education write the NBTs if required to do so by the institutions to which they intend applying. The MAT tests assess the degree to which learners have achieved the ability to manipulate numbers, synthesise a number of different mathematical concepts and draw strictly http://www.pythagoras.org.za logical conclusions in abstract symbolic contexts. Lecturers agree that these higher-order skills underlie success in higher education mathematics. Is it really justifiable to introduce something else? (Paton, 2009)
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