Câu hỏi của Monkey D Luffy

Question

Cho A = $51^n+47^{102}$ (n $\in$ N) . Chứng minh A chia hết cho 10

Nguyễn Quốc Việt · Accepted Answer

Ta có:$A=51^n+47^{102}$$\Rightarrow A=\overline{...1}+47^{100}.47^2$$\Rightarrow A=\overline{...1}+\left(47^4\right)^{25}.\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\left(\overline{...1}\right)^{25}.\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\left(\overline{...1}\right).\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\overline{...9}$$\Rightarrow A=\overline{...0}$Vì $\overline{....0}\text{⋮}10$ nên $A\text{⋮}10$Vậy $A\text{⋮}10\left(đpcm\right)$Câu trả lời: Ta có:$A=51^n+47^{102}$$\Rightarrow A=\overline{...1}+47^{100}.47^2$$\Rightarrow A=\overline{...1}+\left(47^4\right)^{25}.\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\left(\overline{...1}\right)^{25}.\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\left(\overline{...1}\right).\left(\overline{...9}\right)$$\Rightarrow A=\overline{...1}+\overline{...9}$$\Rightarrow A=\overline{...0}$Vì $\overline{....0}\text{⋮}10$ nên $A\text{⋮}10$Vậy $A\text{⋮}10\left(đpcm\right)$

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