{"id":26102442,"url":"https://github.com/jancarauma/fatorial","last_synced_at":"2025-06-26T11:34:51.988Z","repository":{"id":197502113,"uuid":"698772382","full_name":"jancarauma/fatorial","owner":"jancarauma","description":"CΓ‘lculo do fatorial de nΓΊmeros gigantes","archived":false,"fork":false,"pushed_at":"2024-11-30T15:08:52.000Z","size":157,"stargazers_count":2,"open_issues_count":0,"forks_count":0,"subscribers_count":1,"default_branch":"main","last_synced_at":"2025-06-02T09:07:06.909Z","etag":null,"topics":["biginteger","bignumber","bignumbers","fatorial","logarithm","math","stirling"],"latest_commit_sha":null,"homepage":"https://artientista.blogspot.com/2022/04/blog-post.html","language":"C","has_issues":true,"has_wiki":null,"has_pages":null,"mirror_url":null,"source_name":null,"license":"cc0-1.0","status":null,"scm":"git","pull_requests_enabled":true,"icon_url":"https://github.com/jancarauma.png","metadata":{"files":{"readme":"README.md","changelog":null,"contributing":null,"funding":null,"license":"LICENSE","code_of_conduct":null,"threat_model":null,"audit":null,"citation":null,"codeowners":null,"security":null,"support":null,"governance":null,"roadmap":null,"authors":null,"dei":null,"publiccode":null,"codemeta":null}},"created_at":"2023-09-30T23:19:57.000Z","updated_at":"2025-02-22T01:50:11.000Z","dependencies_parsed_at":null,"dependency_job_id":"23f24b50-b5f7-4b9d-8b33-bda909fce86a","html_url":"https://github.com/jancarauma/fatorial","commit_stats":null,"previous_names":["engjango/fatorial","jancarauma/fatorial"],"tags_count":0,"template":false,"template_full_name":null,"purl":"pkg:github/jancarauma/fatorial","repository_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories/jancarauma%2Ffatorial","tags_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories/jancarauma%2Ffatorial/tags","releases_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories/jancarauma%2Ffatorial/releases","manifests_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories/jancarauma%2Ffatorial/manifests","owner_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/owners/jancarauma","download_url":"https://codeload.github.com/jancarauma/fatorial/tar.gz/refs/heads/main","sbom_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories/jancarauma%2Ffatorial/sbom","host":{"name":"GitHub","url":"https://github.com","kind":"github","repositories_count":262056555,"owners_count":23251696,"icon_url":"https://github.com/github.png","version":null,"created_at":"2022-05-30T11:31:42.601Z","updated_at":"2022-07-04T15:15:14.044Z","host_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub","repositories_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repositories","repository_names_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/repository_names","owners_url":"https://repos.ecosyste.ms/api/v1/hosts/GitHub/owners"}},"keywords":["biginteger","bignumber","bignumbers","fatorial","logarithm","math","stirling"],"created_at":"2025-03-09T19:10:37.285Z","updated_at":"2025-06-26T11:34:51.963Z","avatar_url":"https://github.com/jancarauma.png","language":"C","funding_links":[],"categories":[],"sub_categories":[],"readme":"# πŸš€ GigaFac: Unleash the Power of Massive Factorials! \n\n## πŸ”’ What Makes GigaFac Unique?\nPrepare to witness the ultimate factorial computation tool! GigaFac is a mathematical revolution that calculates factorials of truly MASSIVE numbers.\n\n![Factorial Magic](https://img.shields.io/badge/Factorial-EXTREME-blueviolet)\n![C Language](https://img.shields.io/badge/Language-C-blue)\n![Computation Power](https://img.shields.io/badge/Computation-UNLIMITED-red)\n\n## 🌟 Why GigaFac Will Blow Your Mind\n- **Computational Titan**: Calculate factorials up to tens of thousands of digits\n- **Lightning Fast**: Optimized algorithm for maximum performance\n- **Memory Efficient**: Intelligent big-number handling\n- **Open Source**: 100% free and ready to customize\n\n## πŸ”₯ How Big Can YOU Go?\n\n## πŸ›  Quick Start\n\n### Installation\n```bash\ngit clone https://github.com/engjango/fatorial\ncd fatorial\ngcc big-fac.c -o big-fac -lm\n./big-fac\n```\n\n### πŸš€ Pro Tips\n- Adjust `MAX_DIGITS_NUMBER` to expand computational limits\n- Share your most impressive factorial results!\n\n## πŸ’‘ How It Works\nGigaFac uses a revolutionary array-based approach to calculate factorials beyond traditional integer limitations. Our algorithm predicts result size before computation, ensuring maximum efficiency.\n\n## 🌐 Community \u0026 Contributions\n- **Star** this repo if you love mathematical computing!\n- **Fork** and **Contribute**\n- **Share** your most extreme factorial computations\n\n## πŸ† Achievements\n- Computed factorials where standard calculators surrender\n- Pushed computational boundaries\n- Made mathematics exciting again!\n\n## πŸ“Š Performance Metrics\n- **Max Digits**: 100,000+\n- **Computation Speed**: Blazing Fast\n- **Memory Optimization**: Cutting-Edge\n\n## πŸ“ License\nPublic Domain - Compute Without Limits! πŸš€\n\n**Disclaimer**: With great computational power comes great responsibility! 😎\n\n## πŸ”— Connect\n- GitHub: [@engjango](https://github.com/engjango)\n- Challenge the Limits! πŸ’₯\n","project_url":"https://awesome.ecosyste.ms/api/v1/projects/github.com%2Fjancarauma%2Ffatorial","html_url":"https://awesome.ecosyste.ms/projects/github.com%2Fjancarauma%2Ffatorial","lists_url":"https://awesome.ecosyste.ms/api/v1/projects/github.com%2Fjancarauma%2Ffatorial/lists"}