1/[n(n+1)]+1/[(n+1)(n+2)]+1/[(n+2)(n+3)]+1/[(n+3)(n+4)]+[(n+4)(n+5)}怎么算谢谢了,
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1/[n(n+1)]+1/[(n+1)(n+2)]+1/[(n+2)(n+3)]+1/[(n+3)(n+4)]+[(n+4)(n+5)}怎么算谢谢了,1/[n(n+1)]+1/[(n+1)(n+2)]
1/[n(n+1)]+1/[(n+1)(n+2)]+1/[(n+2)(n+3)]+1/[(n+3)(n+4)]+[(n+4)(n+5)}怎么算谢谢了,
1/[n(n+1)]+1/[(n+1)(n+2)]+1/[(n+2)(n+3)]+1/[(n+3)(n+4)]+[(n+4)(n+5)}怎么算谢谢了,
1/[n(n+1)]+1/[(n+1)(n+2)]+1/[(n+2)(n+3)]+1/[(n+3)(n+4)]+[(n+4)(n+5)}怎么算谢谢了,
1/[n(n+1)]=1/n-1/(n+1) 因此,上式=(1/n-1/(n+1))+(1/(n+1)-1/(n+2))+...+(1/(n+4)-1/(n+5)) =1/n-1/(n+5) =5/[n(n+5)]
n^(n+1/n)/(n+1/n)^n
2^n/n*(n+1)
(n+1)^n-(n-1)^n=?
化简:(n+1)!/n!-n!/(n-1)!
(n-1)*n!+(n-1)!*n
推导 n*n!=(n+1)!-n!
证明不等式:(1/n)^n+(2/n)^n+(3/n)^n+.+(n/n)^n
根号(n+1)+n
n.(n-1).
(n+2)!/(n+1)!
判断 当n>1时,n*n*n>3n.( )
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[3n(n+1)+n(n+1)(2n+1)]/6+n(n+2)化简
9题 = 101 (n+1)!- = n*n!n(n+1)!- n*n!
化简n分之n-1+n分之n-2+n分之n-3+.+n分之1
化简n分之n-1+n分之n-2+n分之n-3+.+n分之1
f(x)=e^x-x 求证(1/n)^n+(2/n)^n+...+(n/n)^n
证明[n/(n+1)]^(n+1)