题目内容

1、9、9、1、4、1、4、1、9、9、1、4、1、4…共1991个数.其中共有
853
853
个1,
568
568
个4,这些数的和是
8255
8255
分析:把“1、9、9、1、4、1、4”这7个数字看成一组,一组中有3个1,2个4和2个9;先求出1991个数里面有几个这样的一组,还余几,余下的数字都是几,进而求出1的个数、4的个数和9的个数,进而求出这些数的和.
解答:解:把“1、9、9、1、4、1、4”这7个数字看成一组,
1991÷7=284(组)…3(个);
余下的3个数是1,9,9,有1个1和2个9;
所以1的个数是:284×3+1=853(个);
4的个数是:284×2=568(个);
9的个数是:284×2+2=570(个);
这些数的和是:
853×1+568×4+570×9,
=853+2272+5130,
=8255;
故答案为:853,568,8255.
点评:解决这类问题往往是把重复出现的部分看成一组,先找出排列的周期性规律,再根据规律求解.
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一串数:1,9,9,1,4,1,4,1,9,9,1,4,1,4,1,9,9,1,4,…共有1991个数.
(1)其中共有
853
853
个1,
570
570
个9
568
568
个4;
(2)这些数字的总和是
8255
8255
根据条件列出算式并计算:
(1)如果甲数是9,甲数比乙数多
1
2
,那么乙数=
9÷(1+
1
2
9÷(1+
1
2
=
6
6

(2)如果乙数是6,甲数比乙数多
1
2
,那么甲数=
6×(1+
1
2
6×(1+
1
2
=
9
9

(3)如果甲数是9,乙数比甲数少
1
3
,那么乙数=
9×(1-
1
3
9×(1-
1
3
=
6
6

(4)如果乙数是6,乙数比甲数少
1
3
,那么甲数=
6÷(1-
1
3
6÷(1-
1
3
=
9
9

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