Menentukan Gradien Suatu Garis

A. MENENTUKAN GRADIEN DARI GAMBAR GARIS
1. Gambarkan [b]2 titik[/b] yang terletak pada garis sedemikian hingga koordinat dari kedua titik relatif mudah dibaca (berupa bilangan bulat)![br]2. Tentukan [math]\Delta y[/math] dan tuliskan pada Input Box [math]\Delta y[/math]![br]3. Tentukan [math]\Delta x[/math] dan tuliskan pada Input Box [math]\Delta x[/math]![br]4. Hitunglah [math]\frac{\Delta y}{\Delta x}[/math] dan tuliskan hasilnya pada Input Box Gradien Garis[br]5. Jika jawaban benar untuk bagian gradien garis, maka akan muncul “GOOD JOB”[br]
Berapa gradien garis yang sejajar dengan sumbu [math]x[/math]?
Berapa gradien garis yang sejajar dengan sumbu [math]y[/math]?
B. MENENTUKAN GRADIEN GARIS JIKA DIKETAHUI DUA TITIK YANG MELALUI GARIS
1. Dengan menggambar garis terlebih dahulu, tentukan gradien dari garis yang melalui pasangan titik-titik berikut dengan langkah:[br]a. Gambarlah garis yang melalui sepasang titik yang ada pada soal! [br] (Langkah sama dengan menggambar garis dari dua titik diketahui)[br]b. Hitunglah gradien yang dimiliki garis tersebut! [br] (Langkah sama dengan menghitung gradien dari gambar garis)[br]
Ingat kembali pertanyaan pada task 16 di bagian materi prasyarat.[br]Bagaimana syarat-syarat agar tiga titik dapat dihubungkan menjadi satu garis?[br]Adakah syarat yang hubungannya dengan nilai gradien? Jika ada jelaskan![br][br][br][br]
2. Tanpa menggambar garis, tentukan gradien garis yang melalui pasangan titik berikut!
Bagaimana cara yang paling efektif untuk menentukan gradien garis yang diketahui dua titik yang melaluinya?
Ingat kembali pertanyaan task 16 di bagian materi prasyarat. [br]Bagaimana syarat-syarat agar tiga titik dapat dihubungkan menjadi satu garis? Adakah syarat yang hubungannya dengan nilai gradien? Jika ada jelaskan!
Dari keempat komponen yang ada disusun dengan cara yang berbeda menjadi Gambar 1 dan Gambar 2. Namun mengapa saat disusun dengan susunan berbeda, seolah-olah Gambar2 memiliki luasan yang lebih luas dari Gambar 1? [br][br]Gambar 1                  Gambar 2[br][br][img]data:image/png;base64,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[/img] 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[/img]
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