题目内容

(1+
1
1999
+
1
2000
+
1
2001
)×(
1
1999
+
1
2000
+
1
2001
+
1
2002
)-(1+1999→
1
2000
+
1
2001
+
1
2002
)×(
1
1999
+
1
2000
+
1
2001
)
分析:
1
1999
+
1
2000
+
1
2001
=a,则原式=(1+a)×(a+
1
2002
)-(1+a+
1
2002
)×a,然后化简即可得出结论.
解答:解:设
1
1999
+
1
2000
+
1
2001
=a,则原式=(1+a)×(a+
1
2002
)-(1+a+
1
2002
)×a
=(1+a)×a+(1+a)×
1
2002
-(1+a)×a-
1
2002
×a
=(1+a)×
1
2002
-
1
2002
×a
=
1
2002
点评:解答此题可以用假设法,运用假设法,是解答此类题的一个重要方法.
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两千多年前,古埃及人总喜欢把分数转化为分子是1的分数来计算,所以后人常把分子是1的分数称为埃及分数.埃及分数在计算中有着一些什么规律呢?请观察下面几组算式并填空:
(1)
1
3
-
1
4
=
(4)-(3)
3×4
=
1
3×4

1
7
-
1
8
=
(    )-(    )
7×8
=
1
7×8

1
20
-
1
21
=
(    )-(   )
20×21
=
1
20×21

1
100
-
1
101
=
(     )
(     )


1
a
-
1
a+1
=
a+1
a?a+1
-
1
a?(a+1)
=
1
a?(a+1)

(2)请你根据上面的规律,把下面各个分数写成两个分数的差.
1
2×3
=
1
(    )
-
1
(    )

1
5×6
=
1
(    )
-
1
(     )

1
40×41
=
1
(     )
-
1
(     )

1
1999×2000
=
1
(    )
-
1
(    )

1
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=
1
(     )
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1
(    )

1
9900
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1
(    )
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1
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1
72
=
1
(     )
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1
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1
n?(n+1)
=
1
(     )
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1
(       )

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