Contoh : konstruksilah suatu garis singgun pada grafik [math]f\left(x\right)=8x^3+4x^2-7x-2[/math][br]1. Ketik grafik fungsi pada input bar kemudian tekan ENTER[br][img]data:image/png;base64,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[/img][br]2. Pilih point pada Toolbar kemudian klik pada grafik[br][img]data:image/png;base64,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[/img][br]3. Pilih Tangents dari toolar dan klik pada grafik dan titik yang telah dibuat tadi 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[/img][br]4. Drag titik pada grafik menggunakan Toolbar move[br][img]data:image/png;base64,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[/img][br][br][br]