Rina and her best friend, Dani, sat on the floor of the school library, flipping through a worn-out math book. It was Matematika Kelas 9 , and they needed page 55 for their homework.
( 4 \times 64 = 256 ) amoeba.
“Two hours = 120 minutes,” Rina calculated. “120 ÷ 20 = 6 divisions.” matematika kelas 9 halaman 55
Then they recalled a word problem: Sebuah amoeba membelah diri menjadi dua setiap 20 menit. Jika mula-mula ada 4 amoeba, berapa banyak setelah 2 jam? (“An amoeba splits into two every 20 minutes. Initially there are 4 amoeba, how many after 2 hours?”)
Rina laughed, closing the book. “Or maybe… page 55 was inside us all along.” If you can tell me the exact from that page (e.g., "perkalian bilangan berpangkat" or "notasi ilmiah"), I’ll write a story specifically matching that content. Rina and her best friend, Dani, sat on
“It’s torn out!” Rina groaned.
“See?” Dani smiled. “We didn’t need page 55. We just needed to think like page 55.” “Two hours = 120 minutes,” Rina calculated
I’d love to help, but I don’t have access to specific textbooks or their page numbers, including “Matematika kelas 9 halaman 55” (which appears to be an Indonesian Grade 9 math textbook). Page 55 could contain different topics depending on the publisher (e.g., Kemendikbud, Erlangga, Yudhistira).
Dani scribbled a memory-fragment: ( \frac{3^7}{3^4} ). “Subtract exponents,” she said. ( 3^{7-4} = 3^3 = 27 ).
From Rina’s memory, the first problem was: ( 2^3 \times 2^5 ). “That’s ( 2^{3+5} = 2^8 = 256 ),” Rina said quickly. “Too easy. The next one must be harder.”
“But each amoeba doubles each time,” Dani added. “Start: ( 4 ) → after 1 split: ( 4 \times 2 = 8 ), after 2 splits: ( 8 \times 2 = 16 ), etc. That’s ( 4 \times 2^6 ).”