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Question 6(vi-ix), Exercise 6.1: 5 Hits, Last modified: 2 months ago; $ (n!+1)$ is not divisible by any natural number between $2$ and $n$. ** Solution. ** We know $$n!=n(n-1... s 3.2.1$$ Hence $n!$ is divisible by every number between $1$ and $n$.\\ $n!$ can also divides by any natural number between $2$ and $n$.\\ For $(n!+1)$, $1$ is not divisible by any natural number between $2$ and $n$.\\ So $ (n!+1)$ is not divisible by a
Exercise 6.1 (Solutions): 1 Hits, Last modified: 2 months ago; ) $(n!+1)$ is not divisible by any natural number between 2 and $n$. (ix) $\quad(n!)^{2} \leq n^{n} . n!<(2
Question 8 and 9, Exercise 6.2: 1 Hits, Last modified: 2 months ago; -1)! arrangements\\ while $4$ men can be adjusted between seats of women in $41$ ways,\\ so total possible
Question 20 and 21, Exercise 6.2: 1 Hits, Last modified: 2 months ago; ssible arrangements\\ and $6$ men may be adjusted between in $6!$ possible arrangements\\ and hence total p
Question 9 and 10, Exercise 6.3: 1 Hits, Last modified: 2 months ago; etermined by $n$-points \\ and all possible lines between $n$ points is $C_{2}$\\ but $n$ lines are sides o

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