Câu hỏi của Nguyễn Thu Hải

Question

$y=\frac{101^{102}+1}{101^{103}+1}$           $x=\frac{101^{103}+1}{101^{104}+1}$So sánh y và x

Nguyễn Thảo · Accepted Answer

Ta có:$y=\frac{101^{102}+1}{101^{102}+1}$. $\Rightarrow$$101y=\frac{101\left(101^{102}+1\right)}{101^{103}+1}=\frac{101^{103}+101}{101^{103}+1}=1+\frac{100}{101^{103}+1}$          $x=\frac{101^{103}+1}{101^{104}+1}\Rightarrow101x=\frac{101\left(101^{103}+1\right)}{101^{104}+1}=\frac{101^{104}+101}{101^{104}+1}=1+\frac{100}{101^{104}+1}$     Vì $\frac{100}{101^{103}+1}>\frac{100}{101^{104}+1}$nên $1+\frac{100}{101^{^{103}}+1}>1+\frac{100}{101^{104}+1}$hay 101y>101x. Suy ra y>xCâu trả lời: Ta có:$y=\frac{101^{102}+1}{101^{102}+1}$. $\Rightarrow$$101y=\frac{101\left(101^{102}+1\right)}{101^{103}+1}=\frac{101^{103}+101}{101^{103}+1}=1+\frac{100}{101^{103}+1}$          $x=\frac{101^{103}+1}{101^{104}+1}\Rightarrow101x=\frac{101\left(101^{103}+1\right)}{101^{104}+1}=\frac{101^{104}+101}{101^{104}+1}=1+\frac{100}{101^{104}+1}$     Vì $\frac{100}{101^{103}+1}>\frac{100}{101^{104}+1}$nên $1+\frac{100}{101^{^{103}}+1}>1+\frac{100}{101^{104}+1}$hay 101y>101x. Suy ra y>x

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