2011
DOI: 10.1016/j.learninstruc.2011.03.005
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What fills the gap between discrete and dense? Greek and Flemish students’ understanding of density

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Cited by 42 publications
(34 citation statements)
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“…However, it will lead to an incorrect answer on items that are incongruent (i.e., relying on natural number knowledge leads to a different response than relying on natural number knowledge), unless type 2 processing inhibits the intuitive response tendency. Using paper–pencil tests, previous studies found that people were in fact systematically more accurate on congruent than incongruent items (Vamvakoussi et al ., ; Van Hoof et al ., ). This performance pattern is an indicator of the natural number bias.…”
Section: Introductionmentioning
confidence: 99%
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“…However, it will lead to an incorrect answer on items that are incongruent (i.e., relying on natural number knowledge leads to a different response than relying on natural number knowledge), unless type 2 processing inhibits the intuitive response tendency. Using paper–pencil tests, previous studies found that people were in fact systematically more accurate on congruent than incongruent items (Vamvakoussi et al ., ; Van Hoof et al ., ). This performance pattern is an indicator of the natural number bias.…”
Section: Introductionmentioning
confidence: 99%
“…In the matter of density, students have been found to believe that, as with natural numbers, rational numbers have predecessors and successors (e.g., that 4/5 comes after 3/5), although this is not the case. Similarly, students seem to believe that there are no, or only a finite number of numbers, between two pseudo‐consecutive rational numbers such as 3/5 and 4/5 (Vamvakoussi, Christou, Mertens, & Van Dooren, ; Vamvakoussi & Vosniadou, ). In fact, however, there are always infinitely many numbers between any two rational numbers.…”
Section: Introductionmentioning
confidence: 99%
“…Many previous studies (McMullen, Laakkonen, Hannula-Sormunen & Lehtinen;2015;Prediger, 2008;Vamvakoussi, Christou, Mertens & Van Dooren, 2011;Vamvakoussi & Vosniadou, 2004 have argued that there is conceptual change involved in the process of passing from natural to rational numbers. This means that learning rational numbers requires one to change one's prior conceptions of something, like numbers, in order to be compatible with a new mathematical situation -they cannot simply be adapted but need more fundamental revision.…”
Section: Introductionmentioning
confidence: 99%
“…They were also more likely to say that these infinite intermediate numbers have the same representational form as the interval end points (i.e., infinitely many decimals between decimals, and infinitely many fractions between fractions). These results were replicated in a cross-cultural comparison with Flemish secondary students (Vamvakoussi, Christou, Mertens, & Van Dooren, 2011).…”
Section: Psychological Experimentsmentioning
confidence: 57%