평면의 결정조건

[size=150]공간에서 서로 다른 두 점 [math]\large \mathrm{A},\,\mathrm{B}[/math]를 지나는 평면은 무수히 많지만 한 직선 위에 있지 않은 세 점 [math]\large\mathrm{A},\,\mathrm{B},\,\mathrm{C} [/math]를 지나는 평면은 하나뿐이다.[br][br][center][img]data:image/png;base64,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[/img][br][/center][br]따라서 한 직선 위에 있지 않은 서로 다른 세 점은 단 하나의 평면을 결정한다.[br]이때 두 점 [math]\large \mathrm{A},\,\mathrm{B}[/math]는 한 직선을 결정하므로 직선 [math]\large \mathrm{AB}[/math]와 직선 [math]\large \mathrm{AB}[/math] 위에 있지 않은 한 점 [math]\large \mathrm{C}[/math]는 한 평면을 결정한다. 또 공간에서 두 직선이 한 점에서 만나거나 평행한 경우에도 이 두 직선은 한 평면을 결정한다.[br][br][center][img]data:image/png;base64,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[/img][br][/center][br]아래 지오지브라 애플릿에서 [b]평면[/b] [icon]/images/ggb/toolbar/mode_plane.png[/icon] 도구를 이용하여 평면의 결정조건을 만족하는 대상을 선택하여 평면을 만들어보자.[/size]
한 직선 위에 있지 않은 세점
한 직선과 그 직선 위에 있지 않은 한 점
한 점에서 만나는 두 직선
평행한 두 직선
[b][size=150]아래 지오지브라 애플릿에 있는 사각뿔에서 평면을 결정할 수 있는 것을 모두 말하시오.[br][/size][/b][size=150](평면 도구를 이용하여 평면이 만들어지는지 확인해 보세요.)[/size]
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Information: 평면의 결정조건