Câu hỏi của Nguyễn Ngọc Gia Hân

Question

Cho : A= 10²⁰¹¹ + 10²⁰¹²+ ...+ 10²⁰¹⁸ + 16 . Chứng minh A chia hết cho 48?

Quìn · Accepted Answer

$10A=10^{2012}+10^{2013}+10^{2014}+...+10^{2019}+160$

$9A=10A-A=10^{2019}-10^{2011}+160-16$

$9A=10^{2011}\left(10^8-1\right)+9\cdot16$

$9A=10^{2011}.99999999+9.16$

$9A=10^{2011}.11111111.9+9.16$

$A=10^{2011}.11111111+16$
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$A⋮48\Rightarrow A⋮16;A⋮3$ (1)

$10:3$ dư 1

$10^2:3$ dư 1

...

$\Rightarrow10^{2011}:3$ dư 1

$11111111=11100000+11100+11$

$11100000⋮3;11100⋮3;11:3$ dư 2

$\Rightarrow11111111:3$ dư 2

$16:3$ dư 1

$\Rightarrow A:3$ dư $1.2+1=3$

$\Rightarrow A⋮3$ (2)
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$10^{2011}=2^{2011}.5^{2011}=2^4.2^{2007}.5^{2011}⋮2^4=16$

Vì $10^{2011}⋮16$ $\Rightarrow10^{2011}.11111111⋮16$

$16⋮16$

$\Rightarrow A⋮16$ (3)

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Từ (1), (2) và (3) suy ra: $A⋮48$ (đpcm)

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