1.9 KiB
1.9 KiB
| id | challengeType | title | videoUrl | localeTitle |
|---|---|---|---|---|
| 5900f4361000cf542c50ff48 | 5 | Problem 201: Subsets with a unique sum | 问题201:具有唯一总和的子集 |
Description
sum({1,3,6})= 10,sum({1,3,8})= 12,sum({1,3,10})= 14,sum({1,3,11})= 15,sum({1,6,8})= 15,sum({1,6,10})= 17,sum({1,6,11})= 18,sum({1,8,10} )= 19,sum({1,8,11})= 20,sum({1,10,11})= 22,sum({3,6,8})= 17,sum({3,6, 10})= 19,sum({3,6,11})= 20,sum({3,8,10})= 21,sum({3,8,11})= 22,sum({3, 10,11})= 24,sum({6,8,10})= 24,sum({6,8,11})= 25,sum({6,10,11})= 27,sum({ 8,10,11})= 29。
其中一些总和不止一次出现,有些则是独一无二的。对于集合A,设U(A,k)是A的k元素子集的唯一和的集合,在我们的例子中我们发现U(B,3)= {10,12,14,18,21,25 ,27,29}和和(U(B,3))= 156。
现在考虑100个元素集S = {12,22,...,1002}。 S具有100891344545564193334812497256 50个元素子集。
确定所有整数的和,它们是S的50个元素子集中的一个的总和,即求和(U(S,50))。
Instructions
Tests
tests:
- text: <code>euler201()</code>应返回115039000。
testString: 'assert.strictEqual(euler201(), 115039000, "<code>euler201()</code> should return 115039000.");'
Challenge Seed
function euler201() {
// Good luck!
return true;
}
euler201();
Solution
// solution required