Câu hỏi của Vân Trần Thị

Question

Tìm $x\in N$ sao cho $\left(2^x-8\right)^3+\left(4^x+13\right)^3=\left(4^x+2^x+5\right)^3$

Nguyễn Anh Kim Hân · Accepted Answer

(2x−8)3 + (4x+13)3 = (4x+2x+5)3

$\Leftrightarrow$(2x - 8 + 4x + 13) [(2x - 8)2 + (2x-8)(4x + 13) + (4x + 13)2] = (4x + 2x +5)3

$\Leftrightarrow$(2x + 4x + 5) [(2x - 8)2 + (2x-8)(4x + 13) + (4x + 13)2] = (4x + 2x +5)3

$\Leftrightarrow$(2x - 8)2 + (2x-8)(4x + 13) + (4x + 13)2= (4x + 2x +5)2

$\Leftrightarrow$(2x -8 + 4x + 13)2 - (2x -8)(4x + 13)  = (4x + 2x +5)2

$\Leftrightarrow$(4x +2x + 5)2 - (2x -8)(4x +13)  = (4x + 2x +5)2

$\Leftrightarrow$ (2x - 8) (4x + 13) = 0

$\Leftrightarrow\left[{}\begin{matrix}2^x-8=0\4^x+13=0\end{matrix}\right.\Leftrightarrow}x=4$

Vậy x = 4.Câu trả lời: (2x−8)3 + (4x+13)3 = (4x+2x+5)3