Materi yang akan dibahas kali ini yaitu Fungsi Eksponen yang terdiri dari[br]1. Menentukan nilai fungsi eksponen, [br]2. Mengetahui karakteristik grafik fungsi eksponen, [br]3. Menggambar sketsa grafik fungsi eksponen, dan [br]4. Mengaplikasinya dalam kehidupan nyata.[br][br]Materi ini dapat kalian terapkan dalam kehidupan sehari-hari, seperti misalnya dalam bidang kesehatan, ekonomi, fisika, kimia, biologi, teknik, dan lain sebagainya. Seperti contohnya penyebaran virus corona yang telah kita alami bersama maupun virus lainnya. Peneyabaran suatu virus apabila tidak segera diatasi dengan baik maka akan mengakibatkan jumlah orang yang tertular akan semakin melonjak mengikuti grafik fungsi eksponen. Berikut adalah contoh simulasi grafik peningkatan yang dilakukan oleh alumni jurusan matematika UI jumlah orang-orang yang tertular jika pemerintah tidak melakukan intervensi dalam meminimalisir interaksi antar manusia akan tampak seperti grafik fungsi eksponen. [br][img]https://cdn0-production-images-kly.akamaized.net/R2yJzDLvfCKejnRXf_Gev-P38t4=/673x379/smart/filters:quality(75):strip_icc():format(jpeg)/kly-media-production/medias/3089560/original/005595800_1585626748-IMG-20200331-WA0010-01.jpeg[/img][br]Gambar 1: kurva kasus positif jika tidak ada intervensi pemerintah dan physicl distancing.[br]sumber: https://www.liputan6.com/tekno/read/4215379/alumni-matematika-ui-buat-simulasi-3-skenario-pandemi-covid-19-di-indonesia [br][br]

Sebelum mempelajari materi fungsi eksponen ini, kalian harus mengingat materi-materi yang sudah kalian pelajari, seperti sifat-sifat eksponen (bilangan berpangkat) dan operasi eksponen.[br][br][b]Sifat-Sifat Eksponen[/b][br][img]data:image/png;base64,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[/img][br]

Bentuk umum fungsi eksponen yaitu [math]y=n\left(a^x\right)[/math]. Fungsi eksponen merupakan fungsi yang menonton. [br]Dari fungsi [math]y=n\left(a^x\right)[/math], kemonotonannya dapat dibedakan menjadi dua yaitu,[br]1. Monoton naik, [i]a[/i] < 1[br]2. Monoton turun, 0 < [i]a [/i]< 1[br][br]Untuk lebih memahami kemonotonan suatu grafik fungsi eksponen, silakan eskplor applet berikut.

Selanjutnya, kita akan menggambar grafik fungsi eksponen [math]y=n\left(a^x\right)[/math], berikut adalah langkah-langkahnya.[br]1. Cari titik potong terhadap sumbu y[br]2. Buat tabel koordinat x dan y dari fungsi [math]y=n\left(a^x\right)[/math][br]3. Plotkan titik-tititiknya dan hubungkan[br]Sebagai latihan, gambarlah grafik fungsi [math]f\left(x\right)=2^x[/math] dan [math]g\left(x\right)=\left(\frac{1}{2}\right)^x[/math]

Sama seperti grafik fungsi lainnya, kita juga dapat menganalisi pergeseran dari dua buah grafik fungsi eksponen. [br]Misalkan bentuk umum dari fungsi eksponen yaitu [math]y=n\left(a^x\right)+b[/math] dan bentuk modifikasinya yaitu [math]y=N\left(A^x\right)+B[/math]. Untuk menganalisis pergeserannya silakan eksplor applet berikut.