삼각기둥 위의 위치 관계

[문제1]
[img]data:image/png;base64,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[/img] 스타일 바를 이용하여 직선 AB 위에 있는 삼각기둥의 꼭짓점들 색을 다른색으로 바꾸세요.
문제1. 직선 위의 점
[문제2]
[img]data:image/png;base64,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[/img] 스타일 바를 이용하여 직선 AB 위에 있지 않은 삼각기둥의 꼭짓점들 색을 다른색으로 바꾸세요.
문제2. 직선 위에 있지 않은 점
[문제3]
직선도구[icon]/images/ggb/toolbar/mode_join.png[/icon]를 이용하여 직선 AB와 한 점에서 만나는 한 직선을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제3. 직선과 한 점에서 만나는 직선
[문제4]
직선도구[icon]/images/ggb/toolbar/mode_join.png[/icon]를 이용하여 직선 AB와 평행한 한 직선을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제4. 직선과 평행한 직선
[문제5]
직선도구[icon]/images/ggb/toolbar/mode_join.png[/icon]를 이용하여 직선 AB와 일치하는 한 직선을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제5. 직선과 일치하는 직선
[문제6]
직선도구[icon]/images/ggb/toolbar/mode_join.png[/icon]를 이용하여 직선 AB와 꼬인 위치에 있는 한 직선을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제6. 직선과 꼬인 위치에 있는 직선
[문제7]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 직선 AB와 한 점에서 만나는 한 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제7. 직선과 한 점에서 만나는 평면
[문제8]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 직선 AB와 평행한 한 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제8. 직선과 평행한 평면
[문제9]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 직선 AB를 포함하는 한 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제9. 직선을 포함하는 평면
[문제10]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 직선 AB에서 만나는 두 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제10. 직선에서 만나는 두 평면
[문제11]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 평면 ABC와 평행한 한 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제11. 평면과 평행한 평면
[문제12]
평면도구[icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon]를 이용하여 평면 ABC와 일치하는 한 평면을 삼각기둥의 꼭짓점을 이용하여 나타내세요.
문제12

Information: 삼각기둥 위의 위치 관계