题目内容

1
15
2
15
3
15
,…,
499
15
这499个数中所有不是整数的分数的和是
7755
2
3
7755
2
3
分析:这499个数中所有是整数的分数的满足分子是15的1倍、2倍、3倍…,这些分数的值就是1、2、3、4…,用499除以15最后的商的整数部分就是最后一个整数,然后用这499个数的和减去整数的和.
解答:解:499÷15≈33.3,那么最后一个整数就是33;
1
15
+
2
15
+
3
15
+…+
499
15
)-(1+2+…+33),
=
[(1+499)×499÷2]
15
-(1+33)×33÷2,
=
124750
15
-561,
=7755
2
3

故答案为:7755
2
3
点评:先后找到整数部分的规律,再利用等差数量求和的方法求解.
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