[b]Tujuan Pembelajaran :[/b][br][list=1][*]Mampu mengetahui dan memahami kesebangunan dan kekongruenan bangun datar.[/*][*]Mampu menyelesaikan masalah yang berkaitan dengankesebangunan dan kekongruenan antar bangun datar.[/*][/list]

[b]Coba amati gambar berikut ini![/b][br] [img]data:image/jpeg;base64,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[/img][br]Pada gambar tersebut dapat terlihat bahwa ukuran dari foto ke foto berikutnya mempunyai jarak antar sudut yang sama. Sesuai dengan konsep kesebangunan yaitu suatu benda dikatakan sebangun jika memenuhi dua syarat : [br][list=1][*]Panjang sisi-sisi yang bersesuaian dari kedua bangun memiliki perbandingan senilai[/*][*]Sudut-sudut yang bersesuaian dari kedua bangun itu sama besar.[br][/*][/list][br]Untuk lebih jelasnya perhatikan Applet berikut![br][b]Petunjuk :[/b][br][list=1][*]Geserlah slider sesuai ukuran yang diinginkan dengan batas maksimal yaitu 2[br][/*][/list][br]Dari pergeseran slider tersebut dapat dilihat perubahan ukuran dari bangun datarnya.