
<oai_dc:dc xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:oai_dc="http://www.openarchives.org/OAI/2.0/oai_dc/">
  <dc:title xml:lang="eng">Young pupils’ intuitive understanding and strategies of area measurement</dc:title>
  <dc:date>2022</dc:date>
  <dc:type>info:eu-repo/semantics/conferenceProceedings</dc:type>
  <dc:publisher>Institute for Educational Research</dc:publisher>
  <dc:description xml:lang="eng">Introduction:
Learning area measurement in mathematics instruction implies certain phases
that entail rhetorical and symbolical generalizations in terms of mathematical
formulas (Smith III &amp; Barrett, 2017; Zacharos, 2006; Zeljić &amp; Ivančević,
2019). It is through mathematical formulas that geometry is represented in Serbian
mathematics curricula and this fact is the starting point of our research.
When pupils have to solve mathematical tasks, they use various strategies that
differ in terms of the correctness of their solution, the time needed for completing the
task, and task requirements and scope (Siegler, 1991).
To measure the area of a rectangular and overcome the problems arising from
pupils’ misunderstanding of the area formula, it is recommended to take a closer look
at the structure of the rectangular array by covering the area of the rectangular with
a mathematical manipulative in the form of a unit of measurement that pupils are
intuitively familiar with from the onset (Đokić, 2014, 2017; Van de Walle, Karp &amp; Bay-Williams, 2013). The concept of covering would enable pupils to conceptualize the
relationship between the unit’s dimensions and the dimensions of the rectangular. After
this phase, through length measurement and multiplication, pupils can solve the area
measurement task using mathematical formulas with understanding.
Apart from the covering strategy, the paper looks at the ways pupils conceptualize
area (Outhred &amp; Mitchelmore, 2000; Reynolds &amp; Wheatley, 1996; Nunes, Light &amp;
Mason, 1993). Can an actual misunderstanding of the structure of a rectangular array
be found in our mathematics curricula and, if so, can it be overcome by applying the
idea of covering the area of a rectangular array?
We conducted an empirical study on pupils’ strategic approaches to covering the
area of a rectangular in order to understand how pupils calculate its area. We identified
the strategies used by pupils and examined their stages of development.</dc:description>
  <dc:rights>All rights reserved</dc:rights>
  <dc:creator id="https://orcid.org/0000-0002-2025-3596">Ђокић, Оливера</dc:creator>
  <dc:source>The State, Problems, and Needs of the Modern Education Community</dc:source>
  <dc:identifier>https://phaidrabg.bg.ac.rs/o:27911</dc:identifier>
  <dc:identifier>cobiss:84360457 </dc:identifier>
  <dc:format>application/pdf</dc:format>
  <dc:format>850494 bytes</dc:format>
  <dc:language>eng</dc:language>
</oai_dc:dc>