A Cognitive Characteristic in Generating Incomplete Proofs with Inversive Inference in Geometrical Proof Problems: Analyzing Epistemic Value and Status of Proposition in Deductive Organization

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  • 図形の証明問題での逆転推論を含む未完成な証明の生成過程の認知的特徴 演繹的組織化における命題の認識値とステータスの分析を通して
  • ズケイ ノ ショウメイ モンダイ デ ノ ギャクテン スイロン オ フクム ミカンセイ ナ ショウメイ ノ セイセイ カテイ ノ ニンチテキ トクチョウ : エンエキテキ ソシキカ ニ オケル メイダイ ノ ニンシキチ ト ステータス ノ ブンセキ オ トオシテ

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<p>We often see incomplete proof with inversive inference generated when junior high school students solve the problem of geometrical proof. The purpose of this study is to clarify the reason why incomplete proof with inversive inference is generated. We designed a semi-structured task-based interview survey from the viewpoint of the epistemic value and the status of a proposition, which are components of a proposition’s meaning, and conducted it on 20 pairs of ninth graders. The data from the survey was divided into three types and the frequency of emergence of the codes related to the epistemic value and the status of the proposition for each type was investigated. As a result, the students who generated an incomplete proof understood that the epistemic value based on perception was insufficient and that the epistemic value “necessary” was needed in order to obtain the logical value “true”. Also, it was found that incomplete proof with inversive inference is generated by two patterns, and that some aspects of the epistemic value and the understanding of the status of the proposition generate an incomplete proof. Finally, based on these findings, we provided teaching implications to control the generation of incomplete proofs with inversive inference.</p>

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