LibreOffice is the power-packed personal productivity suite for GNU/Linux (as well as Windows & Macintosh) that gives you six feature-rich applications for all your document production and data processing needs: Writer, Calc, Impress, Draw, Math and Base.
LibreOffice is a fork of OpenOffice.org, which is now called Apache OpenOffice. Because Apache OpenOffice recommends using proprietary extensions, we do not recommends and hosts proprietary software extensions, we do not recommend using it.
DocumentationSee the general documentation page or documentation documentation download page for user documentation to help you get started using all the functionality of LibreOffice.
Further documentation and help
- Mailing lists
- Nabble mailing list interface
- System requirements documentation
- Installation instructions for detailed step-by-step instructions for installing LibreOffice on your operating system.
- Accessibility information
- IRC general channel
- IRC development channel
released on 29 March 2012
Extensions, plug-ins, or add-ons for this program
|Zotero client||Web based client to help you collect, organize, cite, and share your research sources.||https://www.zotero.org/|
|License||Verified by||Verified on||Notes|
|LGPLv3||jgay||14 December 2011|
|MPL||jgay||14 December 2011|
Leaders and contributors
Resources and communication
|VCS Repository Webview||VCS Repository Webview||http://cgit.freedesktop.org/libreoffice|
This entry (in part or in whole) was last reviewed on 5 April 2013.
Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.3 or any later version published by the Free Software Foundation; with no Invariant Sections, no Front-Cover Texts, and no Back-Cover Texts. A copy of the license is included in the page “GNU Free Documentation License”.
The copyright and license notices on this page only apply to the text on this page. Any software described in this text has its own copyright notice and license, which can usually be found in the distribution itself.