[img]data:image/png;base64,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[/img][br]Gunakan slider atau kotak isian untuk mengatur panjang ruas garis sesuai pertanyaan. Kemudian buatlah segitiga dari ketiga ruas garis tersebut.
Bisakah kita membuat segitiga yang panjang sisinya adalah 4, 6, dan 8 satuan?[br]Jika ya, tunjukkan pada gambar berikut.
Bisakah kita membuat segitiga yang panjang sisinya 3, 5, dan 10 satuan?[br]Jika ya, tunjukkan pada gambar berikut.
Berdasarkan kegiatan di atas, apakah sembarang 3 ruas garis pasti dapat dijadikan sisi-sisi suatu segitiga?[br]Adakah syarat khusus untuk sisi-sisi pembentuk segitiga?[br]Jelaskan jawabanmu secara singkat.