[br][br][center][b]Kedudukan Titik, Gris, dan Bidang dalam Dimensi Tiga[/b][br][/center][br][b] [/b][b]Kedudukan titik terhadap garis[br][br][/b] [img]data:image/png;base64,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[/img][br][br][b]Suatu titik,garis, ataupun bidang memiliki suatu posisi atau kedudukannya satu sama lain.kedudukan ini mempunyai syarat syarat khusus yaitu sebagai berikut[br][br][/b]A.Titik terletak pada garis[br]Titik berada pada garis karena garis itu melalui titik A, P, dan titik B pada gambar 2[br][br]B.Titik berada di luar garis[br]Titik berada diluar garis karena garis itu tidak melalui titik. Contohnya titik Q [br] [br] [img]data:image/png;base64,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[/img][br][br][br][b]Kedudukan titik terhadap bidang[/b][br][br]Titikberada pada bidang terjadi karena [br]1. Bidang melaui titik[br]2. Titik berada pada garis yang terletak pada bidang itu[br][br]Contohnya titik Q[br][br] [img]data:image/png;base64,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[/img][br][br][br]Kedudukan garis terhadap bidang adalah sebagai berikut:[br]1. Garis berada terletak pada bidang contohnya garis AB,AC, dll (gambar 4). Garis beradapada bidang karena ada dua titik yang dilalui garis pada bidang itu[br][br]2. Garismemotong atau menembus bidang yaitu garis PQ. Garis menembus atau memotongbidang karena ada satu titik yang dilalui garis pada bidang itu (titik tembus).[br][b][br][/b]3[b]. [/b]Garis sejajar dengan bidang contohnya garis RS. Garissejajar dengan bidang karena garis itu sejajar dengan salah satu garis padabidang itu atau tidak memiliki satupun [b]titikpersekutuan.[/b][br][br][br][b] [/b][b]Kedudukan Bidang terhadapBidang lain[/b][br][br]a. Dua bidang yang saling sejajar[br]Dua bidang sejajar apabila tidak ada satupun garis berpotongan bidang dari kedua bidang.[br][br] [img]data:image/png;base64,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[/img][br][br][br]b. Dua bidang saling berpotongan [br]Dua bidang berpotongan apabila terdapat garis perpotongan bidang, yaitu garis persekutuan yang merupakan bagian dari kedua bidang.[br] [img]data:image/png;base64,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[/img][br][br][br]c. Dua bidang saling berimpit[br]Dua bidang saling berimpit apabila setiap titik yang terletak pada bidang [math]\alpha[/math] juga terletak pada bidang [math]\beta[/math] atau setiap titik yang terletak pada bidang[math]\beta[/math] juga terletak pada bidang [math]\alpha[/math].[br] [img]data:image/png;base64,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[/img][br]Kedudukan titik, garis,dan bidang memiliki suatu aksioma. Aksioma adalah suatu pernyataan dimana pernyataan yang kita terima sebagai suatu kebenaran dan bersifat umum, sebagai berikut:[br][br]1. Apabila dua buah bidang berpotongan tegak lurus m maka seluruh garis dari bidang 1terhadap bidang 2 juga tegak lurus.[br][br]2.Hasil perpotongan dua bidang adalah garis sedangkan hasil perpotongan tiga bidang dapat berupa garis atau titik.[br][br][br][br][br][br]                       [br][br][br][br] [br][br][br][br][br][br][br][br][br]