(1/1×3)+(1/3×5)+(1/5×7)+……+(1/2005×2007))
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∵1/[n(n+2)]=(1/2)[1/n-1/(n+2)]
∴1/(1×3)+1/(3×5)+1/(5×7)+…+1/(2005×2007)
=(1/2)(1/1-1/3)+(1/2)(1/3-1/5)+(1/2)(1/5-1/7)+…+(1/2)(1/2005-1/2007)
=(1/2)[1/1+(-1/3+1/3)+(-1/5+1/5)+…+(-1/2005+1/2005)-1/2007)]
=(1/2)(1/1-1/2007)
=(1/2)(2006/2007)
=1003/2007
∴1/(1×3)+1/(3×5)+1/(5×7)+…+1/(2005×2007)
=(1/2)(1/1-1/3)+(1/2)(1/3-1/5)+(1/2)(1/5-1/7)+…+(1/2)(1/2005-1/2007)
=(1/2)[1/1+(-1/3+1/3)+(-1/5+1/5)+…+(-1/2005+1/2005)-1/2007)]
=(1/2)(1/1-1/2007)
=(1/2)(2006/2007)
=1003/2007
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