Taksir dan demonstrasikan jumlah Riemann untuk [math]f\left(x\right)=2x^3+8x^2+4x-2[/math] dengan mengambil titik sampel [math]a=-3[/math] dan [math]b=-1[/math] dan [math]n=8[/math]. Sketsa grafik fungsinya dan persegi panjang Riemann dan gunakan Geogebra untuk menentukan luas daerahnya.[br]1. Ketik persamaan pada input bar kemudian tekan ENTER[br][img]data:image/png;base64,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[/img][br]2. Ketik perintah berikut ini (atau pilih dari drop down list) di Input Bar dan tekan Enter[br][img]data:image/png;base64,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[/img][br]Perintah ini akan menghasilkan jumlah poligon dalam dari suatu fungsi f pada interval [-3, -1] dengan 8 persegi panjang[br][img]data:image/png;base64,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[/img][br]Perintah yang sama juga tersedia untuk jumlah poligon luar. Jika Anda ingin meningkatkan jumlah persegi panjang, Anda juga dapat membuat suatu Slider.[br][br]