---
title: Gamma function
id: 5a23c84252665b21eecc7e76
challengeType: 5
forumTopicId: 302271
---
## Description
Implement one algorithm (or more) to compute the Gamma ($\Gamma$) function (in the real field only).
The Gamma function can be defined as:
$\Gamma(x) = \displaystyle\int_0^\infty t^{x-1}e^{-t} dt$
## Instructions
## Tests
```yml
tests:
- text: gamma should be a function.
testString: assert(typeof gamma=='function')
- text: gamma(.1) should return a number.
testString: assert(typeof gamma(.1)=='number')
- text: gamma(.1) should return 9.513507698668736.
testString: assert.equal(round(gamma(.1)), round(9.513507698668736))
- text: gamma(.2) should return 4.590843711998803.
testString: assert.equal(round(gamma(.2)), round(4.590843711998803))
- text: gamma(.3) should return 2.9915689876875904.
testString: assert.equal(round(gamma(.3)), round(2.9915689876875904))
- text: gamma(.4) should return 2.218159543757687.
testString: assert.equal(round(gamma(.4)), round(2.218159543757687))
- text: gamma(.5) should return 1.7724538509055159.
testString: assert.equal(round(gamma(.5)), round(1.7724538509055159))
```
## Challenge Seed
```js
function gamma(x) {
}
```
### After Test
```js
function round(x) {
return Number(x).toPrecision(13);
}
```
## Solution
```js
function gamma(x) {
var p = [0.99999999999980993, 676.5203681218851, -1259.1392167224028,
771.32342877765313, -176.61502916214059, 12.507343278686905,
-0.13857109526572012, 9.9843695780195716e-6, 1.5056327351493116e-7
];
var g = 7;
if (x < 0.5) {
return Math.PI / (Math.sin(Math.PI * x) * gamma(1 - x));
}
x -= 1;
var a = p[0];
var t = x + g + 0.5;
for (var i = 1; i < p.length; i++) {
a += p[i] / (x + i);
}
var result=Math.sqrt(2 * Math.PI) * Math.pow(t, x + 0.5) * Math.exp(-t) * a;
return result;
}
```