Students' understandings of multiplication

Multiplicative reasoning permeates many mathematical topics, for example fractions and functions. Hence there is consensus on the importance of acquiring multiplicative reasoning. Multiplication is typically introduced as repeated addition, but when it is extended to include multi-digits and decimal...

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Main Author: Larsson, Kerstin
Format: Doctoral Thesis
Language:English
Published: Stockholms universitet, Institutionen för matematikämnets och naturvetenskapsämnenas didaktik 2016
Subjects:
Online Access:http://urn.kb.se/resolve?urn=urn:nbn:se:su:diva-134768
http://nbn-resolving.de/urn:isbn:978-91-7649-515-5
http://nbn-resolving.de/urn:isbn:978-91-7649-516-2
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record_format oai_dc
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language English
format Doctoral Thesis
sources NDLTD
topic Multiplication
students’ understanding
connections
multiplicative reasoning
models for multiplication
calculations
arithmetical properties
spellingShingle Multiplication
students’ understanding
connections
multiplicative reasoning
models for multiplication
calculations
arithmetical properties
Larsson, Kerstin
Students' understandings of multiplication
description Multiplicative reasoning permeates many mathematical topics, for example fractions and functions. Hence there is consensus on the importance of acquiring multiplicative reasoning. Multiplication is typically introduced as repeated addition, but when it is extended to include multi-digits and decimals a more general view of multiplication is required. There are conflicting reports in previous research concerning students’ understandings of multiplication. For example, repeated addition has been suggested both to support students’ understanding of calculations and as a hindrance to students’ conceptualisation of the two-dimensionality of multiplication. The relative difficulty of commutativity and distributivity is also debated, and there is a possible conflict in how multiplicative reasoning is described and assessed. These inconsistencies are addressed in a study with the aim of understanding more about students’ understandings of multiplication when it is expanded to comprise multi-digits and decimals. Understanding is perceived as connections between representations of different types of knowledge, linked together by reasoning. Especially connections between three components of multiplication were investigated; models for multiplication, calculations and arithmetical properties. Explicit reasoning made the connections observable and externalised mental representations. Twenty-two students were recurrently interviewed during five semesters in grades five to seven to find answers to the overarching research question: What do students’ responses to different forms of multiplicative tasks in the domain of multi-digits and decimals reveal about their understandings of multiplication? The students were invited to solve different forms of tasks during clinical interviews, both individually and in pairs. The tasks involved story telling to given multiplications, explicit explanations of multiplication, calculation problems including explanations and justifications for the calculations and evaluation of suggested calculation strategies. Additionally the students were given written word problems to solve. The students’ understandings of multiplication were robustly rooted in repeated addition or equally sized groups. This was beneficial for their understandings of calculations and distributivity, but hindered them from fluent use of commutativity and to conceptualise decimal multiplication. The robustness of their views might be explained by the introduction to multiplication, which typically is by repeated addition and modelled by equally sized groups. The robustness is discussed in relation to previous research and the dilemma that more general models for multiplication, such as rectangular area, are harder to conceptualise than models that are only susceptible to natural numbers. The study indicated that to evaluate and explain others’ calculation strategies elicited more reasoning and deeper mathematical thinking compared to evaluating and explaining calculations conducted by the students themselves. Furthermore, the different forms of tasks revealed various lines of reasoning and to get a richly composed picture of students’ multiplicative reasoning and understandings of multiplication, a wide variety of forms of tasks is suggested. === <p>At the time of the doctoral defense, the following papers were unpublished and had a status as follows: Paper 3: Manuscript. Paper 4: Manuscript.</p>
author Larsson, Kerstin
author_facet Larsson, Kerstin
author_sort Larsson, Kerstin
title Students' understandings of multiplication
title_short Students' understandings of multiplication
title_full Students' understandings of multiplication
title_fullStr Students' understandings of multiplication
title_full_unstemmed Students' understandings of multiplication
title_sort students' understandings of multiplication
publisher Stockholms universitet, Institutionen för matematikämnets och naturvetenskapsämnenas didaktik
publishDate 2016
url http://urn.kb.se/resolve?urn=urn:nbn:se:su:diva-134768
http://nbn-resolving.de/urn:isbn:978-91-7649-515-5
http://nbn-resolving.de/urn:isbn:978-91-7649-516-2
work_keys_str_mv AT larssonkerstin studentsunderstandingsofmultiplication
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spelling ndltd-UPSALLA1-oai-DiVA.org-su-1347682016-11-18T05:58:20ZStudents' understandings of multiplicationengLarsson, KerstinStockholms universitet, Institutionen för matematikämnets och naturvetenskapsämnenas didaktikStockholm : Department of Mathematics and Science Education, Stockholm University2016Multiplicationstudents’ understandingconnectionsmultiplicative reasoningmodels for multiplicationcalculationsarithmetical propertiesMultiplicative reasoning permeates many mathematical topics, for example fractions and functions. Hence there is consensus on the importance of acquiring multiplicative reasoning. Multiplication is typically introduced as repeated addition, but when it is extended to include multi-digits and decimals a more general view of multiplication is required. There are conflicting reports in previous research concerning students’ understandings of multiplication. For example, repeated addition has been suggested both to support students’ understanding of calculations and as a hindrance to students’ conceptualisation of the two-dimensionality of multiplication. The relative difficulty of commutativity and distributivity is also debated, and there is a possible conflict in how multiplicative reasoning is described and assessed. These inconsistencies are addressed in a study with the aim of understanding more about students’ understandings of multiplication when it is expanded to comprise multi-digits and decimals. Understanding is perceived as connections between representations of different types of knowledge, linked together by reasoning. Especially connections between three components of multiplication were investigated; models for multiplication, calculations and arithmetical properties. Explicit reasoning made the connections observable and externalised mental representations. Twenty-two students were recurrently interviewed during five semesters in grades five to seven to find answers to the overarching research question: What do students’ responses to different forms of multiplicative tasks in the domain of multi-digits and decimals reveal about their understandings of multiplication? The students were invited to solve different forms of tasks during clinical interviews, both individually and in pairs. The tasks involved story telling to given multiplications, explicit explanations of multiplication, calculation problems including explanations and justifications for the calculations and evaluation of suggested calculation strategies. Additionally the students were given written word problems to solve. The students’ understandings of multiplication were robustly rooted in repeated addition or equally sized groups. This was beneficial for their understandings of calculations and distributivity, but hindered them from fluent use of commutativity and to conceptualise decimal multiplication. The robustness of their views might be explained by the introduction to multiplication, which typically is by repeated addition and modelled by equally sized groups. The robustness is discussed in relation to previous research and the dilemma that more general models for multiplication, such as rectangular area, are harder to conceptualise than models that are only susceptible to natural numbers. The study indicated that to evaluate and explain others’ calculation strategies elicited more reasoning and deeper mathematical thinking compared to evaluating and explaining calculations conducted by the students themselves. Furthermore, the different forms of tasks revealed various lines of reasoning and to get a richly composed picture of students’ multiplicative reasoning and understandings of multiplication, a wide variety of forms of tasks is suggested. <p>At the time of the doctoral defense, the following papers were unpublished and had a status as follows: Paper 3: Manuscript. Paper 4: Manuscript.</p>Doctoral thesis, comprehensive summaryinfo:eu-repo/semantics/doctoralThesistexthttp://urn.kb.se/resolve?urn=urn:nbn:se:su:diva-134768urn:isbn:978-91-7649-515-5urn:isbn:978-91-7649-516-2Doctoral thesis from the department of mathematics and science education ; 14application/pdfinfo:eu-repo/semantics/openAccess