freeCodeCamp/curriculum/challenges/espanol/10-coding-interview-prep/project-euler/problem-314-the-mouse-on-the-moon.md

---
id: 5900f4a71000cf542c50ffb9
title: 'Problem 314: The Mouse on the Moon'
challengeType: 5
forumTopicId: 301970
dashedName: problem-314-the-mouse-on-the-moon
---

# --description--

The moon has been opened up, and land can be obtained for free, but there is a catch. You have to build a wall around the land that you stake out, and building a wall on the moon is expensive. Every country has been allotted a 500 m by 500 m square area, but they will possess only that area which they wall in. 251001 posts have been placed in a rectangular grid with 1 meter spacing. The wall must be a closed series of straight lines, each line running from post to post.

The bigger countries of course have built a 2000 m wall enclosing the entire 250 000 m2 area. The Duchy of Grand Fenwick, has a tighter budget, and has asked you (their Royal Programmer) to compute what shape would get best maximum enclosed-area/wall-length ratio.

You have done some preliminary calculations on a sheet of paper. For a 2000 meter wall enclosing the 250 000 m2 area the enclosed-area/wall-length ratio is 125. Although not allowed , but to get an idea if this is anything better: if you place a circle inside the square area touching the four sides the area will be equal to π*2502 m2 and the perimeter will be π*500 m, so the enclosed-area/wall-length ratio will also be 125.

However, if you cut off from the square four triangles with sides 75 m, 75 m and 75√2 m the total area becomes 238750 m2 and the perimeter becomes 1400+300√2 m. So this gives an enclosed-area/wall-length ratio of 130.87, which is significantly better.

Find the maximum enclosed-area/wall-length ratio. Give your answer rounded to 8 places behind the decimal point in the form abc.defghijk.

# --hints--

`euler314()` should return 132.52756426.

```js
assert.strictEqual(euler314(), 132.52756426);
```

# --seed--

## --seed-contents--

```js
function euler314() {

  return true;
}

euler314();
```

# --solutions--

```js
// solution required
```
chore(i8n,learn): processed translations 2021-02-06 04:42:36 +00:00			`---`
			`id: 5900f4a71000cf542c50ffb9`
			`title: 'Problem 314: The Mouse on the Moon'`
			`challengeType: 5`
			`forumTopicId: 301970`
			`dashedName: problem-314-the-mouse-on-the-moon`
			`---`

			`# --description--`

			`The moon has been opened up, and land can be obtained for free, but there is a catch. You have to build a wall around the land that you stake out, and building a wall on the moon is expensive. Every country has been allotted a 500 m by 500 m square area, but they will possess only that area which they wall in. 251001 posts have been placed in a rectangular grid with 1 meter spacing. The wall must be a closed series of straight lines, each line running from post to post.`

			`The bigger countries of course have built a 2000 m wall enclosing the entire 250 000 m2 area. The Duchy of Grand Fenwick, has a tighter budget, and has asked you (their Royal Programmer) to compute what shape would get best maximum enclosed-area/wall-length ratio.`

			`You have done some preliminary calculations on a sheet of paper. For a 2000 meter wall enclosing the 250 000 m2 area the enclosed-area/wall-length ratio is 125. Although not allowed , but to get an idea if this is anything better: if you place a circle inside the square area touching the four sides the area will be equal to π2502 m2 and the perimeter will be π500 m, so the enclosed-area/wall-length ratio will also be 125.`

			`However, if you cut off from the square four triangles with sides 75 m, 75 m and 75√2 m the total area becomes 238750 m2 and the perimeter becomes 1400+300√2 m. So this gives an enclosed-area/wall-length ratio of 130.87, which is significantly better.`

			`Find the maximum enclosed-area/wall-length ratio. Give your answer rounded to 8 places behind the decimal point in the form abc.defghijk.`

			`# --hints--`

			`euler314()` should return 132.52756426.

			```js
			`assert.strictEqual(euler314(), 132.52756426);`
			```

			`# --seed--`

			`## --seed-contents--`

			```js
			`function euler314() {`

			`return true;`
			`}`

			`euler314();`
			```

			`# --solutions--`

			```js
			`// solution required`
			```