[size=200][b]1. 다음과 같은 사각형 OABC가 있습니다.[br][/b][/size]대수창에 다음과 같이 입력합니다. [br][size=200][b]R90={{0,-1},{1,0}}[br]행렬적용(R90, q1)[br][/b][/size][size=200][b]ApplyMatrix(R90,q1)[/b][/size][br]

[size=200][b]대수창에 다음과 같이 입력합니다.[br]R45={{[/b][math]\frac{\sqrt{2}}{2}[/math][b], [/b][math]-\frac{\sqrt{2}}{2}[/math][b]},{[/b][math]\frac{\sqrt{2}}{2}[/math][b], [/b][math]\frac{\sqrt{2}}{2}[/math][b]}}[br]행렬적용(R45,q1)[br][br][math]\frac{\sqrt{2}}{2}[/math][size=100]를 입력하는 방법: [br][/size][img]data:image/png;base64,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[/img][br][size=100]여기서 2행 3열의 루트 표시된 것을 선택한 후[br]안의 네모에 커서를 두고 2를 입력하고[br]화살표 오른쪽을 눌러서 옆으로 한 칸 이동 후[br] /2라고 쓰면 이분의루트이가 입력됨[br][/size][size=150]다시 화살표 오른쪽을 누르면 분모에서 빠져나옴[/size][br][br][/b][/size][br][br]