2018-10-10 18:03:03 -04:00
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---
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id: 5900f5231000cf542c510034
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2020-12-16 00:37:30 -07:00
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title: 问题438:多项式方程解的整数部分
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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-438-integer-part-of-polynomial-equations-solutions
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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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对于整数的n元组t =(a1,...,an),let(x1,...,xn)是多项式方程xn + a1xn-1 + a2xn-2 + ... +的解。 an-1x + an = 0。
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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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考虑以下两个条件:x1,...,xn都是真实的。如果x1,...,xn被排序,则⌊xi⌋= i,1≤i≤n。 (⌊·⌋:地板功能。)
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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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在n = 4的情况下,有12个n元组的整数满足两个条件。我们将S(t)定义为t中整数绝对值的总和。对于n = 4,我们可以验证满足两个条件的所有n元组t的ΣS(t)= 2087。
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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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找到ΣS(t)为n = 7。
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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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`euler438()`应该返回2046409616809。
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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(euler438(), 2046409616809);
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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 euler438() {
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return true;
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}
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euler438();
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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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