Canonical URI: https://w3id.org/kmath/textbook_problem/jihak_vision_p137_unit_review_09
| rdf:type | math:TextbookProblem |
|---|---|
| rdfs:label | 지학사 p137 대단원 마무리평가 09 |
| rdfs:comment | 지학사 공통수학1 교과서 p137에서 이미지 판독으로 추출한 문항. |
| math:achievementStandard | achievement_standard:cm1_10_04_02 |
| math:bodyText | 이차 정사각행렬 \(A\)가 \(A\begin{pmatrix}1\\0\end{pmatrix}=\begin{pmatrix}1\\2\end{pmatrix}\), \(A\begin{pmatrix}0\\1\end{pmatrix}=\begin{pmatrix}3\\1\end{pmatrix}\)을 만족시킬 때, 행렬 \(A\begin{pmatrix}-2&3\\1&-1\end{pmatrix}\)을 구하시오. |
| math:extractionConfidence | 1.0 |
| math:hasSolution | textbook_solution:jihak_solution_p157_p137_unit_review_09 |
| math:pageStart | 137 |
| math:problemKind | unit_review |
| math:problemNumber | 09 |
| math:problemType | problem_type:matrix_multiplication |
| math:reviewStatus | reviewed |
| math:sourceSection | textbook_section:jihak_matrix_operations |
| math:targets | concept:matrix |
| math:targets | concept:matrix_element |
| math:targets | concept:matrix_multiplication |
| math:textbook | textbook_source:jihak_common_math_1 |