[br][br][b]J[/b][center][b]JARAK, SUDUT, VOLUME BANGUN RUANG[br][/b][/center][b]jarak Garis tegak lurus bidang[/b][br]Merupakan sebuah garis yang posisinya tegak lurus pada suatu bidang dimana garis tersebut tegak lurus terhadap setiap garis yang ada pada bidang tersebut.[br][br] 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[/img][br][/size][/size][br][br][b]Jarak titik dan bidang[/b][br]Jarak antara titik A dan bidang merupakan panjang dari ruas garis AA’ dimana titik A’ adalah proyeksi dari titik A pada bidang.[br][br] [img]data:image/png;base64,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[/img][br][br][br][b]Jarak antara dua garis sejajar[/b][br]Untuk mengetahui jarak antara dua garis sejajar, kita harus menggambar sebuah garis lurus diantara keduanya. Jarak titik potong yang dihasilkan merupakan jarak dari kedua garis itu.[br][br] [img]data:image/png;base64,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[/img][br][br][br][b]Jarak garis dan bidang yang sejajar[/b][br]Untuk menentukan jarak antara garis dan bidang adalah dengan membuat proyeksi garis pada bidang.[br]Jarak antara garis dengan bayangannya adalah jarak garis terhadap bidang.[br][br] [img]data:image/png;base64,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[/img][br][br][br][b]Sudut [/b][br][br][b]Sudut antara garis dan bidang[/b][br]Sudutantara garis dan bidang adalah sudut yang terbentuk antara garis dengan bayangannyaapabila garis itu diproyeksikan terhadap bidang yang ada dibawahnya.[br][br] [img]data:image/png;base64,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[/img][br][br][br][b]Sudut antara dua bidang[/b][br]Sudut antara dua bidang merupakan sudut yang terbentuk oleh dua buah garis lurus yang posisinya tegak lurus dengan garis potong pada bidang alfa dan beta.[br][br] [img]data:image/png;base64,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[/img][br][br][br][b]Volume bangun ruang[/b][br]Volume bangun ruang adalah ukurang ruang tiga dimensi yang dapat ditempati oleh suatu benda atau zat, secara umum dihitung dengan mengalikan luas alas bangun ruang dengan tingginya. Satuan volume biasanya diukur dalam satuan kubik, seperti meter kubik (m[sup]3[/sup]), sentimeter kubik (cm[sup]3[/sup]) . [br][br]Rumus umum volume adalah [br]Volume= Luas alas x tinggi[br][br][br] [br][br][br] [br][br][br][br][br] [br][br][br] [br][br][br] [br][br][br][br][br] [br][br][br][br][br][br][br] [center][/center][center][/center][center][/center][br][left][/left][br][br][br]