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Question

Chứng minh:  $\sqrt{2019^2+2019^2.2020^2+2020^2}\in N$

tran nguyen bao quan · Accepted Answer

$\sqrt{2019^2+2019^2.2020^2+2020^2}=\sqrt{2019^2+\left(2020-1\right)^2.2020^2+2020^2}=\sqrt{2019^2+2020^4-2.2020.2020^2+2020^2+2020^2}=\sqrt{2020^4+2.2020^2-2.\left(2019+1\right).2020^2+2019^2}=\sqrt{2020^4+2.2020^2-2.2019.2020^2-2.2020^2+2019^2}=\sqrt{2020^4-2.2019.2020^2+2019^2}=\sqrt{\left(2020^2-2019\right)^2}=\left|2020^2-2019\right|=2020^2-2019$

Vì 20202-2019$\in N$

Vậy $\sqrt{2019^2+2019^2.2020^2+2020^2}$$\in N$Câu trả lời: $\sqrt{2019^2+2019^2.2020^2+2020^2}=\sqrt{2019^2+\left(2020-1\right)^2.2020^2+2020^2}=\sqrt{2019^2+2020^4-2.2020.2020^2+2020^2+2020^2}=\sqrt{2020^4+2.2020^2-2.\left(2019+1\right).2020^2+2019^2}=\sqrt{2020^4+2.2020^2-2.2019.2020^2-2.2020^2+2019^2}=\sqrt{2020^4-2.2019.2020^2+2019^2}=\sqrt{\left(2020^2-2019\right)^2}=\left|2020^2-2019\right|=2020^2-2019$

Vì 20202-2019$\in N$

Vậy $\sqrt{2019^2+2019^2.2020^2+2020^2}$$\in N$

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