Pengantar Konsep Kesebangunan [b][br]Coba amati gambar berikut ini![/b][br] 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gambar tersebut dapat terlihat bahwa ukuran dan bentuk dari suatu benda terhadap hasil pencerminannya sama. Sesuai dengan konsep kekongruenan yaitu suatu benda dikatakan kongruen jika memenuhi dua syarat : [br]1. Panjang sisi-sisi yang bersesuaian sama panjang.[br]2. Sudut-sudut yang bersesuaian dari kedua bangun itu sama besar.[br][br]Untuk lebih jelasnya perhatikan Applet berikut![br]Petunjuk :[br]1. Geserlah slider sesuai ukuran yang diinginkan dengan batas maksimal yaitu 7[br][br]Dari pergeseran slider tersebut dapat dilihat perubahan ukuran dari bangun datarnya.[br]Konsep Kesebangunan Pada Bangun Datar