## 编译环境 操作系统 * [ ] Windows 7/8/10 Tex发行版 * [ ] TexLive 2017 * [ ] ## 我的问题 我想给一段文本,倾斜。就像 rotate 可以设置旋转多少度一样。我想能设置倾斜,以及倾斜度。
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``` \documentclass{ctexart} \newCJKfontfamily[fzss]\fzss{FZShuSong-Z01}[AutoFakeSlant=0.9] \begin{document} \fzss\slshape 你好 \end{document} ``` 在这个例子中,我给方正书宋做了一个伪斜,倾斜的程度靠改 0.9 那个数字来实现。
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用tikz实现了下,使用slant选项(pgfmanual sec 25.3 Coordinate Transformations) ```tex \documentclass{ctexart} \usepackage{tikz} \newcommand{\slant}[2][0]{% \tikz[baseline=(a.base)] \node[inner sep=0pt, xslant=#1] (a) {#2};% } \begin{document} \slant{测试}\slant[.5]{测试}\slant[1]{测试} \end{document} ``` 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)
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