curriculum/challenges/portuguese/10-coding-interview-prep/project-euler/problem-91-right-triangles-with-integer-coordinates.md

---
id: 5900f3c71000cf542c50feda
title: 'Problema 91: Triângulos retângulos com coordenadas inteiras'
challengeType: 5
forumTopicId: 302208
dashedName: problem-91-right-triangles-with-integer-coordinates
---

# --description--

Os pontos ${P}(x_1, y_1)$ e ${Q}(x_2, y_2)$ são desenhados em coordenadas de números inteiros e ligadas à origem, ${O}(0, 0)$, para formar ${\Delta}OPQ$.

<img class="img-responsive center-block" alt="um gráfico mostrando os pontos P (x_1, y_1) e Q(x_2, y_2) em coordenadas inteiras ligadas à origem O (0, 0)" src="https://cdn-media-1.freecodecamp.org/project-euler/right-triangles-integer-coordinates-1.png" style="background-color: white; padding: 10px;" />

Há exatamente catorze triângulos contendo um ângulo reto que podem ser formados quando cada coordenada se encontra entre 0 e 2, ou seja, $0 ≤ x_1, y_1, x_2, y_2 ≤ 2$.

<img class="img-responsive center-block" alt="um diagrama mostrando os 14 triângulos contendo um ângulo reto que podem ser formadas quando cada coordenada está entre 0 e 2" src="https://cdn-media-1.freecodecamp.org/project-euler/right-triangles-integer-coordinates-2.png" style="background-color: white; padding: 10px;" />

Considerando $0 ≤ x_1, y_1, x_2, y_2 ≤ limit$, quantos triângulos retângulos podem ser formados?

# --hints--

`rightTrianglesIntCoords(2)` deve retornar um número.

```js
assert(typeof rightTrianglesIntCoords(2) === 'number');
```

`rightTrianglesIntCoords(2)` deve retornar `14`.

```js
assert.strictEqual(rightTrianglesIntCoords(2), 14);
```

`rightTrianglesIntCoords(10)` deve retornar `448`.

```js
assert.strictEqual(rightTrianglesIntCoords(10), 448);
```

`rightTrianglesIntCoords(25)` deve retornar `3207`.

```js
assert.strictEqual(rightTrianglesIntCoords(25), 3207);
```

`rightTrianglesIntCoords(50)` deve retornar `14234`.

```js
assert.strictEqual(rightTrianglesIntCoords(50), 14234);
```

# --seed--

## --seed-contents--

```js
function rightTrianglesIntCoords(limit) {

  return true;
}

rightTrianglesIntCoords(2);
```

# --solutions--

```js
function rightTrianglesIntCoords(limit) {
  function isRightTriangle(points) {
    for (let i = 0; i < points.length; i++) {
      const pointA = points[i];
      const pointB = points[(i + 1) % 3];
      const pointC = points[(i + 2) % 3];
      const vectorAB = [pointB[0] - pointA[0], pointB[1] - pointA[1]];
      const vectorAC = [pointC[0] - pointA[0], pointC[1] - pointA[1]];

      if (isRightAngleBetween(vectorAB, vectorAC)) {
        return true;
      }
    }
    return false;
  }

  function isRightAngleBetween(vector1, vector2) {
    return vector1[0] * vector2[0] + vector1[1] * vector2[1] === 0;
  }

  function getSetKey(points) {
    return (
      '0.0,' +
      points
        .sort((a, b) => a[0] - b[0])
        .map(point => point.join('.'))
        .join(',')
    );
  }

  const pointO = [0, 0];
  const rightTriangles = new Set();
  for (let x1 = 1; x1 <= limit; x1++) {
    for (let y1 = 0; y1 <= limit; y1++) {
      const pointP = [x1, y1];
      for (let x2 = 0; x2 <= limit; x2++) {
        for (let y2 = 1; y2 <= limit; y2++) {
          const pointQ = [x2, y2];
          if (pointP[0] === pointQ[0] && pointP[1] === pointQ[1]) {
            continue;
          }
          if (isRightTriangle([pointO, pointP, pointQ])) {
            rightTriangles.add(getSetKey([pointP, pointQ]));
          }
        }
      }
    }
  }
  return rightTriangles.size;
}
```
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			`---`
			`id: 5900f3c71000cf542c50feda`
chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`title: 'Problema 91: Triângulos retângulos com coordenadas inteiras'`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			`challengeType: 5`
			`forumTopicId: 302208`
			`dashedName: problem-91-right-triangles-with-integer-coordinates`
			`---`

			`# --description--`

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`Os pontos ${P}(x_1, y_1)$ e ${Q}(x_2, y_2)$ são desenhados em coordenadas de números inteiros e ligadas à origem, ${O}(0, 0)$, para formar ${\Delta}OPQ$.`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`<img class="img-responsive center-block" alt="um gráfico mostrando os pontos P (x_1, y_1) e Q(x_2, y_2) em coordenadas inteiras ligadas à origem O (0, 0)" src="https://cdn-media-1.freecodecamp.org/project-euler/right-triangles-integer-coordinates-1.png" style="background-color: white; padding: 10px;" />`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`Há exatamente catorze triângulos contendo um ângulo reto que podem ser formados quando cada coordenada se encontra entre 0 e 2, ou seja, $0 ≤ x_1, y_1, x_2, y_2 ≤ 2$.`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`<img class="img-responsive center-block" alt="um diagrama mostrando os 14 triângulos contendo um ângulo reto que podem ser formadas quando cada coordenada está entre 0 e 2" src="https://cdn-media-1.freecodecamp.org/project-euler/right-triangles-integer-coordinates-2.png" style="background-color: white; padding: 10px;" />`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`Considerando $0 ≤ x_1, y_1, x_2, y_2 ≤ limit$, quantos triângulos retângulos podem ser formados?`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			`# --hints--`

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`rightTrianglesIntCoords(2)` deve retornar um número.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
			`assert(typeof rightTrianglesIntCoords(2) === 'number');`
			```

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`rightTrianglesIntCoords(2)` deve retornar `14`.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
			`assert.strictEqual(rightTrianglesIntCoords(2), 14);`
			```

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`rightTrianglesIntCoords(10)` deve retornar `448`.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
			`assert.strictEqual(rightTrianglesIntCoords(10), 448);`
			```

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`rightTrianglesIntCoords(25)` deve retornar `3207`.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
			`assert.strictEqual(rightTrianglesIntCoords(25), 3207);`
			```

chore(i18n,curriculum): update translations (#44122) 2021-11-04 07:53:18 -07:00			`rightTrianglesIntCoords(50)` deve retornar `14234`.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
			`assert.strictEqual(rightTrianglesIntCoords(50), 14234);`
			```

			`# --seed--`

			`## --seed-contents--`

			```js
			`function rightTrianglesIntCoords(limit) {`

			`return true;`
			`}`

			`rightTrianglesIntCoords(2);`
			```

			`# --solutions--`

			```js
			`function rightTrianglesIntCoords(limit) {`
			`function isRightTriangle(points) {`
			`for (let i = 0; i < points.length; i++) {`
			`const pointA = points[i];`
			`const pointB = points[(i + 1) % 3];`
			`const pointC = points[(i + 2) % 3];`
			`const vectorAB = [pointB[0] - pointA[0], pointB[1] - pointA[1]];`
			`const vectorAC = [pointC[0] - pointA[0], pointC[1] - pointA[1]];`

			`if (isRightAngleBetween(vectorAB, vectorAC)) {`
			`return true;`
			`}`
			`}`
			`return false;`
			`}`

			`function isRightAngleBetween(vector1, vector2) {`
			`return vector1[0] * vector2[0] + vector1[1] * vector2[1] === 0;`
			`}`

			`function getSetKey(points) {`
			`return (`
			`'0.0,' +`
			`points`
			`.sort((a, b) => a[0] - b[0])`
			`.map(point => point.join('.'))`
			`.join(',')`
			`);`
			`}`

			`const pointO = [0, 0];`
			`const rightTriangles = new Set();`
			`for (let x1 = 1; x1 <= limit; x1++) {`
			`for (let y1 = 0; y1 <= limit; y1++) {`
			`const pointP = [x1, y1];`
			`for (let x2 = 0; x2 <= limit; x2++) {`
			`for (let y2 = 1; y2 <= limit; y2++) {`
			`const pointQ = [x2, y2];`
			`if (pointP[0] === pointQ[0] && pointP[1] === pointQ[1]) {`
			`continue;`
			`}`
			`if (isRightTriangle([pointO, pointP, pointQ])) {`
			`rightTriangles.add(getSetKey([pointP, pointQ]));`
			`}`
			`}`
			`}`
			`}`
			`}`
			`return rightTriangles.size;`
			`}`
			```