2018-10-10 18:03:03 -04:00
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---
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id: 5900f3ef1000cf542c50ff01
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2020-12-16 00:37:30 -07:00
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title: 问题129:重新划分可分性
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2018-10-10 18:03:03 -04:00
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challengeType: 5
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videoUrl: ''
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2021-01-13 03:31:00 +01:00
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dashedName: problem-129-repunit-divisibility
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2018-10-10 18:03:03 -04:00
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---
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2020-12-16 00:37:30 -07:00
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# --description--
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2018-10-10 18:03:03 -04:00
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2020-12-16 00:37:30 -07:00
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完全由1组成的数字称为repunit。我们将R(k)定义为长度k的重新定位;例如,R(6)= 111111.假设n是正整数且GCD(n,10)= 1,则可以证明总是存在一个值k,其中R(k)可被n整除让A(n)成为k的最小值;例如,A(7)= 6且A(41)= 5.A(n)首先超过10的n的最小值是17.求出A(n)首先超过1的n的最小值 - 百万。
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2018-10-10 18:03:03 -04:00
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2020-12-16 00:37:30 -07:00
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# --hints--
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2018-10-10 18:03:03 -04:00
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2020-12-16 00:37:30 -07:00
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`euler129()`应该返回1000023。
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2018-10-10 18:03:03 -04:00
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```js
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2020-12-16 00:37:30 -07:00
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assert.strictEqual(euler129(), 1000023);
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2018-10-10 18:03:03 -04:00
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```
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2021-01-13 03:31:00 +01:00
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# --seed--
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## --seed-contents--
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```js
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function euler129() {
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return true;
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}
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euler129();
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```
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2020-12-16 00:37:30 -07:00
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# --solutions--
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2020-08-13 17:24:35 +02:00
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2021-01-13 03:31:00 +01:00
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```js
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// solution required
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```
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