利用1/n*(n+1) = 1/n - 1/(n+1)计算1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
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利用1/n*(n+1) = 1/n - 1/(n+1)计算1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
利用1/n*(n+1) = 1/n - 1/(n+1)计算1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
利用1/n*(n+1) = 1/n - 1/(n+1)计算1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
=1/(x-3)-1/(x-2)-[1/(x-3)-1/(x-1)]+1/(x-2)-1/(x-1)
=1/(x-3)-1/(x-2)-1/(x-3)+1/(x-1)+1/(x-2)-1/(x-1)
=0
0
运用的是裂项的知识:
1/(x-2)(x-3)-2/(x-1)(x-3)+1/(x-1)(x-2)
=1/(x-2)-1/x-3-1/(x-1)+1/(x-3)+1/(x-1)-1/(x-2)
=0
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