Câu hỏi của Bình Trương

Question

Chứng tỏ rằng : 5 mũ 20 + 25 mũ 11 + 125 mũ 7 chia hết cho 31.

Tran Nguyen Anh Thu · Accepted Answer

$=5^{20}+\left(5^2\right)^{11}+\left(5^{ }^3\right)^7$=$5^{^{ }20}+5^{22}+5^{21}$$=5^{20}\cdot\left(1+5^2+5^1\right)$=$5^{20}\cdot\left(1+25+5\right)$=$5^{20}\cdot31$Vì 31 chia hết chó 31 nên$5^{20}+25^{^{ }11}+125^7$chia hết cho 31Câu trả lời: $=5^{20}+\left(5^2\right)^{11}+\left(5^{ }^3\right)^7$=$5^{^{ }20}+5^{22}+5^{21}$$=5^{20}\cdot\left(1+5^2+5^1\right)$=$5^{20}\cdot\left(1+25+5\right)$=$5^{20}\cdot31$Vì 31 chia hết chó 31 nên$5^{20}+25^{^{ }11}+125^7$chia hết cho 31

Satou Kimikaze · Answer

$^{5^{20}+25^{11}+125^7}$=$1.5^{20}+25.25^{10}+\left(5^3\right)^7$=$1.5^{20}+25.\left(5^2\right)^{10}+5^{21}$=$1.5^{20}+25.5^{20}+5.5^{20}$=$^{5^{20}.\left(1+25+5\right)}$=$5^{20}.31$chia hết cho 31Vậy $5^{20}+25^{11}+125^7$chia hết cho 31Câu trả lời: $^{5^{20}+25^{11}+125^7}$=$1.5^{20}+25.25^{10}+\left(5^3\right)^7$=$1.5^{20}+25.\left(5^2\right)^{10}+5^{21}$=$1.5^{20}+25.5^{20}+5.5^{20}$=$^{5^{20}.\left(1+25+5\right)}$=$5^{20}.31$chia hết cho 31Vậy $5^{20}+25^{11}+125^7$chia hết cho 31

Lâm Thùy Ngân · Answer

5^20+25^11+125^7=5^20+(5^2)^11+(5^3)^7= 5^20+5^22+5^21=5^20(1+5^2+5)=5^20.31Vậy 5^20+25^11+125^7 chia hết cho 31Câu trả lời: 5^20+25^11+125^7=5^20+(5^2)^11+(5^3)^7= 5^20+5^22+5^21=5^20(1+5^2+5)=5^20.31Vậy 5^20+25^11+125^7 chia hết cho 31

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