Transformasi Refleksi

Aktivitas 1. Refleksi terhadap sumbu x
1. Letakkan titik (3,4) (misal disebut titik A) pada bidang koordinat Kartesius.[br]2. Pilih refleksi objek pada garis pada 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[/img][br]3. Klik titik A kemudian klik garis sumbu x (mirror) maka didapatlah bayangan titik A. [br]4. Tentukan titik lain misal disebut nama B, C dan D.[br]4. Tentukan bayangan B, C dan D dengan melakukan langkah 3.[br]5. Gambarkan dan tuliskan hasil pekerjaan kalian pada LKPD Aktivitas 1.
Aktivitas 2. Refleksi terhadap sumbu y
1. Letakkan titik (3,4) (misal dissebut dengan titik P) pada bidang koordinat Kartesius.[br]2. Pilih refleksi objek pada garis pada 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[/img][br]3. Klik titik P kemudian klik garis (mirror) maka didapatlah bayangan titik P. [br]4. Tentukan 3 titik lain dengan koordinat yang berbeda misal P, Q dan R.[br]5. Tentukan bayangan P, Q dan R dengan melakukan langkah 3.[br]6. Gambarkan dan tuliskan hasil pekerjaan kalian pada LKPD Aktivitas 2.
Aktivitas 3. Refleksi terhadap garis y = x
1. Letakkan titik (3,4) (misal dissebut dengan titik P) pada bidang koordinat Kartesius.[br]2. Pilih refleksi objek pada garis pada 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[/img][br]3. Klik titik P kemudian klik garis (mirror) maka didapatlah bayangan titik P. [br]4. Tentukan 3 titik lain dengan koordinat yang berbeda misal P, Q dan R.[br]5. Tentukan bayangan P, Q dan R dengan melakukan langkah 3.[br]6. Gambarkan dan tuliskan hasil pekerjaan kalian pada LKPD Aktivitas 3.
Aktivitas 4. Refleksi terhadap garis y = -x
1. Letakkan titik (3,4) (misal dissebut dengan titik P) pada bidang koordinat Kartesius.[br]2. Pilih refleksi objek pada garis pada 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[/img][br]3. Klik titik P kemudian klik garis (mirror) maka didapatlah bayangan titik P. [br]4. Tentukan 3 titik lain dengan koordinat yang berbeda misal P, Q dan R.[br]5. Tentukan bayangan P, Q dan R dengan melakukan langkah 3.[br]6. Gambarkan dan tuliskan hasil pekerjaan kalian pada LKPD Aktivitas 4.
TRI EMIANDRIYANI, Jed Butler

Information: Transformasi Refleksi