[b]Nama : Ainil Mardhiah[br][/b][b]NIM : 19029003[br][br][br]Satuan Pendidikan : SMP[br]Mata Pelajaran   : Matematika[br]Kelas/Semester   : IX/1[br]Materi Pokok   : Persamaan Kuadrat[br]Alokasi Waktu    : 3x40 menit (1 x Pertemuan)[br][/b][b][br]1. Kompetensi Dasar[br][/b]3.2 Menjelaskan persamaan kuadrat dan karakteristiknya berdasarkan akar-akarnya serta cara penyelesaiannya.[br]4.2 Menyelesaikan masalah yang berkaitan dengan persamaan kuadrat.[br][b][br]2. Indikator Pencapaian Kompetensi[/b][br]3.2.1 Menentukan akar persamaan kuadrat dengan memfaktorkan. [br]3.2.2 Mengidentifikasi jumlah dan hasil kali akar-akar dari persamaan kuadrat berdasarkan koefisien-koefisiennya. [br][br][b]3. Tujuan Pembelajaran[br][/b]1. Siswa dapat menentukan akar persamaan kuadrat dengan memfaktorkan.[br]2. Siswa dapat mengidentifikasi jumlah dan hasil kali akar-akar dari persamaan kuadrat berdasarkan koefisien-koefisiennya.[br][br][b]Petunjuk Penggunaan LKPD[br][/b]1. Berdo'alah sebelum memulai mengerjakan LKPD.[br]2. Baca dan pahamilah petunjuk penggunaan sarta acuan pembelajaran.[br]3. Cermati dan pahamilah materi yang ada pada LKPD.[br]4. Tanyakanlah pada pendidik jika ada materi yang kurang dipahami.[br]5. Kerjakanlah soal-soal yang diberikan dengan teliti.[br][br][img]data:image/png;base64,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[/img][br][b][br]MATERI[/b][br]Persamaan kuadrat merupakan suatu persamaan yang pangkat terbesar variabelnya adalah 2. [br]Secara umum, bentuk persamaan kuadrat adalah ax²+bx+c=0 dengan a ≠ 0, a, b, c ∈ R. [br]Dimana a, b adalah koefisien, c adalah konstanta, dan x merupakan variabelnya.[br]

Tahap inti dari metode ini adalah memfaktorkan persamaan kuadrat ax[sup]2[/sup]+bx+c=0 dengan a=1 menjadi (x+p)(x+q) atau bisa dituliskan[br] x²+bx+c=(x+p)(x+q)[br] x²+bx+c=x²+(p+q)x+(p x q)[br]Jadi, untuk memfaktorkan harus dicari bilangan p dan q sedemikian sehingga [br]p + q = b dan p x q = c[br][br][b]Contoh : [/b]Tentukan akar-akar dari persamaan kuadrat x²+5x+6=0![br][b]Penyelesaian :[/b][br]Didapat b= 5 dan c = 6, sehingga harus dicari bilangan p dan q sedemikian hingga p + q = 5 dan p x q = 6. Dalam hal ini dilihat syarat p x q = 6 terlebih dahulu, sehingga pasangan nilai p dan q yang mungkin adalah[br][br][img]data:image/png;base64,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[/img][br][br]Kemudian karena juga harus menutupi p+q=5, maka berdasarkan tabel pada baris kedua didapat p=2 dan q=3 atau berdasarkan pada baris ketiga dituliskan p=3 dan q=2 (dua hasil ini merupakan[br]hasil yang sama).[br]Sehingga didapat pemfaktorannya : [br]    x²+5x+6 =0[br]    (x+2)(x+3)=0[br]    x+2=0 atau x+3=0[br]Dengan demikian akar-akarnya adalah x=-2 dan x=-3

[justify][b]Jumlah dan Hasil Kali Akar-akar dari Persamaan Kuadrat[br][br][/b]Pada langkah penyelesaian persamaan kuadrat ax²+bx+c=0 dengan a=1 (bisa ditulis x[sup]2[/sup]+[math]\frac{b}{a}[/math]x+[math]\frac{c}{a}[/math]=0)[br]menggunakan pemfaktoran harus ditentukan p dan q sedemikian hingga memenuhi[br] [b] [/b]x²+[math]\frac{b}{a}[/math]x+[math]\frac{c}{a}[/math]=(x+p)(x+q)[br] x²+[math]\frac{b}{a}[/math]x+[math]\frac{c}{a}[/math]=x²+(p+q)x+(pxq)[br]Dengan cara ini didapatkan penyelesaiannya adalah x[sub]1[/sub]=-p dan x[sub]2[/sub]=-q [br]Sehingga, x[sub]1[/sub]+x[sub]2[/sub]=-p-q=-(p+q)=-b/a dan x[sub]1[/sub].x[sub]2 [/sub]=(-p)(-q)=pq=c/a[/justify]