fix(curriculum): rework Project Euler 87 (#42194)

* fix: rework challenge to use argument in function * fix: add solution * fix: position equations evenly between paragraphs
2021-05-27 09:44:40 +02:00
parent 00b76c0389
commit 2f901f9ffe
1 changed files with 88 additions and 10 deletions
--- a/curriculum/challenges/english/10-coding-interview-prep/project-euler/problem-87-prime-power-triples.md
+++ b/curriculum/challenges/english/10-coding-interview-prep/project-euler/problem-87-prime-power-triples.md
@ -8,29 +8,53 @@ dashedName: problem-87-prime-power-triples
 # --description--
-The smallest number expressible as the sum of a prime square, prime cube, and prime fourth power is 28. In fact, there are exactly four numbers below fifty that can be expressed in such a way:
+The smallest number expressible as the sum of a prime square, prime cube, and prime fourth power is `28`. In fact, there are exactly four numbers below fifty that can be expressed in such a way:
 <div style='margin-left: 4em;'>
  28 = 2<sup>2</sup> + 2<sup>3</sup> + 2<sup>4</sup><br>
  33 = 3<sup>2</sup> + 2<sup>3</sup> + 2<sup>4</sup><br>
  49 = 5<sup>2</sup> + 2<sup>3</sup> + 2<sup>4</sup><br>
  47 = 2<sup>2</sup> + 3<sup>3</sup> + 2<sup>4</sup>
-</div>
+</div><br>
-How many numbers below fifty million can be expressed as the sum of a prime square, prime cube, and prime fourth power?
+How many numbers below `n` can be expressed as the sum of a prime square, prime cube, and prime fourth power?
 # --hints--
-`primePowerTriples()` should return a number.
+`primePowerTriples(50)` should return a number.
 ```js
-assert(typeof primePowerTriples() === 'number');
+assert(typeof primePowerTriples(50) === 'number');
 ```
-`primePowerTriples()` should return 1097343.
+`primePowerTriples(50)` should return `4`.
 ```js
-assert.strictEqual(primePowerTriples(), 1097343);
+assert.strictEqual(primePowerTriples(50), 4);
 ```
 `primePowerTriples(10035)` should return `684`.
 ```js
 assert.strictEqual(primePowerTriples(10035), 684);
 ```
 `primePowerTriples(500000)` should return `18899`.
 ```js
 assert.strictEqual(primePowerTriples(500000), 18899);
 ```
 `primePowerTriples(5000000)` should return `138932`.
 ```js
 assert.strictEqual(primePowerTriples(5000000), 138932);
 ```
 `primePowerTriples(50000000)` should return `1097343`.
 ```js
 assert.strictEqual(primePowerTriples(50000000), 1097343);
 ```
 # --seed--
@ -38,16 +62,70 @@ assert.strictEqual(primePowerTriples(), 1097343);
 ## --seed-contents--
 ```js
-function primePowerTriples() {
+function primePowerTriples(n) {
  return true;
 }
-primePowerTriples();
+primePowerTriples(50);
 ```
 # --solutions--
 ```js
-// solution required
+function primePowerTriples(n) {
  function getSievePrimes(max) {
    const primes = [];
    const primesMap = new Array(max).fill(true);
    primesMap[0] = false;
    primesMap[1] = false;
    for (let i = 2; i <= max; i += 2) {
      if (primesMap[i]) {
        primes.push(i);
        for (let j = i * i; j <= max; j = j + i) {
          primesMap[j] = false;
        }
      }
      if (i === 2) {
        i = 1;
      }
    }
    return primes;
  }
  function getPowersSummed(numbers, powers, limit, curSum) {
    if (curSum >= limit) {
      return [];
    } else if (powers.length === 0) {
      return [curSum];
    }
    const powersSummed = [];
    const curPower = powers[0];
    const powersLeft = powers.slice(1);
    for (let i = 0; i < numbers.length; i++) {
      const curNumber = numbers[i];
      const nextSum = curSum + curNumber ** curPower;
      if (nextSum >= limit) {
        return powersSummed;
      }
      const result = getPowersSummed(
        numbers,
        powersLeft,
        limit,
        curSum + curNumber ** curPower
      );
      powersSummed.push(...result);
    }
    return powersSummed;
  }
  const maximumBaseNumber = Math.floor(Math.sqrt(n - 2 ** 3 - 2 ** 4)) + 1;
  const primes = getSievePrimes(maximumBaseNumber);
  const uniqueSums = new Set(getPowersSummed(primes, [2, 3, 4], n, 0));
  return uniqueSums.size;
 }
 ```