1. Diberikan grafik fungsi dan garis sebagai berikut[br][br][img]data:image/png;base64,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[/img][br][br]Gradien garis g sama dengan nilai turunan pertama di titik A.

2. Hasil dari integral[br][center][/center][img]data:image/png;base64,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[/img][br][br]benar karena memanfaatkan sifat [br][img]data:image/png;base64,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[/img]

3. Matriks O adalah matriks nol yaitu matriks yang seluruh elemennya 0. Setiap matriks A dan matriks O akan berlaku [br][center]A + O = O + A = A[/center]

4. Setiap bilangan asli m, n dan bilangan real a maka berlaku[br][img]data:image/png;base64,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[/img]

5. Untuk setiap fungsi f(x) dan g(x) berlaku [br][img]data:image/png;base64,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[/img][br][br]

limit berikut[br] [img]data:image/png;base64,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[/img][br] tidak ada karena limit kiri tidak sama dengan limit kanan[br][br][br][br]