Question
Using permutation or otherwise, prove that \displaystyle{\left({n}^{{2}}\right)}\frac{!}{{\left({n}!\right)}^{{n}}}{i}{s}{a}{n}\int{e}\ge{r},{w}{h}{e}{r}{e}{n}{i}{s}{a}{p}{o}{s}{i}{t}{i}{v}{e}\int{e}\ge{r}.{\left({J}\exists-{2004}\right]}
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Question Text | Using permutation or otherwise, prove that \displaystyle{\left({n}^{{2}}\right)}\frac{!}{{\left({n}!\right)}^{{n}}}{i}{s}{a}{n}\int{e}\ge{r},{w}{h}{e}{r}{e}{n}{i}{s}{a}{p}{o}{s}{i}{t}{i}{v}{e}\int{e}\ge{r}.{\left({J}\exists-{2004}\right]} |