Pengungkit Pemahaman

[center][/center]1. Perhatikan sudut A dan sudut B 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[/img][br][justify][/justify]Sudut A dan Sudut B bukan sudut saling berpelurus karena letaknya terpisah.[br]
2. Dalam matematika, matriks adalah susunan bilangan berbentuk persegi panjang yang tersusun dalam [u]baris dan kolom[/u]. Dengan demikian tidak ada matriks yang hanya berisi satu bilangan, karena tidak ada baris dan kolom.[br][br]Apakah pernyataan tersebut benar?
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