[br][br][b][center]Menghitung Diagonal Sisi dan Diagonal Ruang Balok[/center][/b][br]Balok merupakan bangun ruang yang dibatasi oleh tiga pasang sisi sejajar yang berbentuk persegi atau persegi panjang dengan setidaknya terdapat satu pasang sisi sejajar yang memiliki[br]ukuran yang berbeda.[br][br]Beberapa informasi mengenai balok yaitu:[br][list][*]Mempunyai 6 sisi, sisi yang berhadapan memiliki bentuk dan ukuran yang sama.[/*][*]Mempunyai 8 titik sudut.[/*][*]Mempunyai 12 rusuk.[/*][/list]Seain itu Balok mempunyai 12 diagonal sisi dan 4 diagonal ruang.[br]Diagonal sisi balok adalah ruas garis yang menghubungkan dua titik sudut berhadapan pada sebuah sisi. Terdapat 12 buah diagonal sisi balok.[br][br][img]data:image/png;base64,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[/img][br]Diagonal ruang balok adalah ruas garis yang menghubungkan dua titik sudut berhadapan dalam balok. Diagonal ruang balok saling berpotongan di tengah-tengah dan membagi dua diagonal ruang sama[br]panjang. Terdapat 4 buah diagonal ruang pada sebuah balok dengan panjang yang sama. [br][br][br][img]data:image/png;base64,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[/img][br][br]
[b][center][b]Irisan Kubus dengan Sumbu [/b][b]Afinitas[/b][/center][/b][br]Sumbu Afinitas adalah garis perpotongan antara bidang pengiris dengan bidang alas atau bidang atas bangun ruang. Sumbu afinitas digunakan sebagai patokan untuk menarik garis-garis bidang irisan lainnya didalam bangun ruang itu. [br][br]Untuk memudahkan dalam melukis bidang irisan dengan sumbu afinitas ini,[br]ada beberapa aksioma yang harus dipenuhi, yaitu :[br][list=1][*]Garis dapat dibuat melalui dua titik[/*][*]Garis dapat diperpanjang pada kedua ujungnya[/*][*]Bidang dapat diperluas[/*][/list]Dengan menggunakan Aksioma diatas maka kita bisa melukis bidang irisan[br]Balok dengan sumbu afinitas.[br][br]Berikut ini adalah angkah-langkah melukis bidang irisan dengan sumbu afinitas :[br][list=1][*]Gambarlah garis yang melalui dua titik yang sebidang pada bangun ruang[/*][*]Perpanjang garis-garis (rusuknya) pada bidang alas atau bidang atas bangun ruang sehingga memotong garis pada langkah 1[/*][*]Hubungkan dua titik baru pada bidang alas atau bidang atas yang terbentuk. Garis yang terbentuk pada langkah 3 ini adalah sumbu afinitasnya[/*][*]Lengkapi gambar bidang irisannya[/*][/list]