freeCodeCamp/curriculum/challenges/portuguese/10-coding-interview-prep/project-euler/problem-446-retractions-b.md

---
id: 5900f52c1000cf542c51003d
title: 'Problema 446: Retrações B'
challengeType: 5
forumTopicId: 302118
dashedName: problem-446-retractions-b
---

# --description--

Para cada número inteiro $n > 1$, a família de funções $f_{n, a, b}$ é definida por:

$f_{n, a, b}(x) ≡ ax + b\bmod n$ para $a, b, x$ sendo números inteiros e $0 \lt a \lt n$, $0 \le b \lt n$, $0 \le x \lt n$.

Chamaremos $f_{n, a, b}$ de retração se $f_{n, a, b}(f_{n, a, b}(x)) \equiv f_{n, a, b}(x)\bmod n$ para cada $0 \le x \lt n$.

Considere $R(n)$ como o número de retrações para $n$.

$F(N) = \displaystyle\sum_{n = 1}^N R(n^4 + 4)$.

$F(1024) = 77.532.377.300.600$.

Encontre $F({10}^7)$. Dê a sua resposta modulo $1.000.000.007$.

# --hints--

`retractionsB()` deve retornar `907803852`.

```js
assert.strictEqual(retractionsB(), 907803852);
```

# --seed--

## --seed-contents--

```js
function retractionsB() {

  return true;
}

retractionsB();
```

# --solutions--

```js
// solution required
```
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			`---`
			`id: 5900f52c1000cf542c51003d`
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`title: 'Problema 446: Retrações B'`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			`challengeType: 5`
			`forumTopicId: 302118`
			`dashedName: problem-446-retractions-b`
			`---`

			`# --description--`

chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`Para cada número inteiro $n > 1$, a família de funções $f_{n, a, b}$ é definida por:`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`$f_{n, a, b}(x) ≡ ax + b\bmod n$ para $a, b, x$ sendo números inteiros e $0 \lt a \lt n$, $0 \le b \lt n$, $0 \le x \lt n$.`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`Chamaremos $f_{n, a, b}$ de retração se $f_{n, a, b}(f_{n, a, b}(x)) \equiv f_{n, a, b}(x)\bmod n$ para cada $0 \le x \lt n$.`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`Considere $R(n)$ como o número de retrações para $n$.`

			`$F(N) = \displaystyle\sum_{n = 1}^N R(n^4 + 4)$.`

			`$F(1024) = 77.532.377.300.600$.`

			`Encontre $F({10}^7)$. Dê a sua resposta modulo $1.000.000.007$.`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			`# --hints--`

chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`retractionsB()` deve retornar `907803852`.
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			```js
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`assert.strictEqual(retractionsB(), 907803852);`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			```

			`# --seed--`

			`## --seed-contents--`

			```js
chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`function retractionsB() {`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00
			`return true;`
			`}`

chore(i18n,curriculum): update translations (#44283) 2021-11-29 08:32:04 -08:00			`retractionsB();`
feat: enable new langs (#42491) Enable italian and portuguese 2021-06-15 00:49:18 -07:00			```

			`# --solutions--`

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