freeCodeCamp/curriculum/challenges/portuguese/10-coding-interview-prep/project-euler/problem-330-eulers-number.md

---
id: 5900f4b71000cf542c50ffc9
title: 'Problema 330: Números de Euler'
challengeType: 5
forumTopicId: 301988
dashedName: problem-330-eulers-number
---

# --description--

Uma sequência infinita de números reais $a(n)$ é definida para todos os números inteiros $n$ da seguinte forma:

$$ a(n) = \begin{cases} 1                                                       & n < 0 \\\\
\displaystyle \sum_{i = 1}^{\infty} \frac{a(n - 1)}{i!} & n \ge 0 \end{cases} $$

Por exemplo:

$$\begin{align}   & a(0) = \frac{1}{1!} + \frac{1}{2!} + \frac{1}{3!} + \ldots = e − 1 \\\\
  & a(1) = \frac{e − 1}{1!} + \frac{1}{2!} + \frac{1}{3!} + \ldots = 2e − 3 \\\\ & a(2) = \frac{2e − 3}{1!} + \frac{e − 1}{2!} + \frac{1}{3!} + \ldots = \frac{7}{2} e − 6 \end{align}$$

com $e = 2.7182818\ldots$ sendo a constante de Euler.

Pode-se mostrar que $a(n)$ está no formato $\displaystyle\frac{A(n)e + B(n)}{n!}$ para os números inteiros $A(n)$ e $B(n)$.

Por exemplo, $\displaystyle a(10) = \frac{328161643e − 652694486}{10!}$.

Encontre $A({10}^9)$ + $B({10}^9)$ e dê sua resposta $\bmod 77\\,777\\,777$.

# --hints--

`eulersNumber()` deve retornar `15955822`.

```js
assert.strictEqual(eulersNumber(), 15955822);
```

# --seed--

## --seed-contents--

```js
function eulersNumber() {

  return true;
}

eulersNumber();
```

# --solutions--

```js
// solution required
```
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
+								---
 								id: 5900f4b71000cf542c50ffc9
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								title: 'Problema 330: Números de Euler'
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
+								challengeType: 5
 								forumTopicId: 301988
 								dashedName: problem-330-eulers-number
 								---
 								# --description--
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								Uma sequência infinita de números reais $a(n)$ é definida para todos os números inteiros $n$ da seguinte forma:
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,learn): processed translations (#45626)


											
										
										
											2022-04-05 23:36:59 +05:30
+								$$ a(n) = \begin{cases} 1                                                       & n < 0 \\\\
 								\displaystyle \sum_{i = 1}^{\infty} \frac{a(n - 1)}{i!} & n \ge 0 \end{cases} $$
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								Por exemplo:
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,learn): processed translations (#45626)


											
										
										
											2022-04-05 23:36:59 +05:30
+								$$\begin{align}   & a(0) = \frac{1}{1!} + \frac{1}{2!} + \frac{1}{3!} + \ldots = e − 1 \\\\
 								  & a(1) = \frac{e − 1}{1!} + \frac{1}{2!} + \frac{1}{3!} + \ldots = 2e − 3 \\\\ & a(2) = \frac{2e − 3}{1!} + \frac{e − 1}{2!} + \frac{1}{3!} + \ldots = \frac{7}{2} e − 6 \end{align}$$
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								com $e = 2.7182818\ldots$ sendo a constante de Euler.
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								Pode-se mostrar que $a(n)$ está no formato $\displaystyle\frac{A(n)e + B(n)}{n!}$ para os números inteiros $A(n)$ e $B(n)$.
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								Por exemplo, $\displaystyle a(10) = \frac{328161643e − 652694486}{10!}$.
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								Encontre $A({10}^9)$ + $B({10}^9)$ e dê sua resposta $\bmod 77\\,777\\,777$.
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
 								# --hints--
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								`eulersNumber()` deve retornar `15955822`.
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
 								```js
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								assert.strictEqual(eulersNumber(), 15955822);
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
+								```
 								# --seed--
 								## --seed-contents--
 								```js
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								function eulersNumber() {
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
 								  return true;
 								}
-												chore(i18n,curriculum): processed translations (#44221)


											
										
										
											2021-11-19 10:31:54 -08:00
+								eulersNumber();
-												feat: enable new langs (#42491)

Enable italian and portuguese
											
										
										
											2021-06-15 00:49:18 -07:00
+								```
 								# --solutions--
 								```js
 								// solution required
 								```