https://antiwhole.github.io/CIDAxu.github.ioshare thingking of mathematics and art of designCIDA_xu bloghttp://www.rssboard.org/rss-specificationpython-feedgendata:image/png;base64,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://antiwhole.github.io/CIDAxu.github.ioTue, 28 Apr 2026 17:49:29 +0000CIDA_xu blog60CIDA_xu bloghttps://antiwhole.github.io/CIDAxu.github.io/post/gou-jian-san-bu-jie-ti-fang-fa.html当你想要解决某一类问题时，你首先想到的是什么？是了解问题产生的原因，这是第一步；第二步就是根据问题的性质和特点备齐解决问题要用的工具；第三部才是根据问题和已有的条件着手解决实际问题。https://antiwhole.github.io/CIDAxu.github.io/post/gou-jian-san-bu-jie-ti-fang-fa.htmlThu, 29 Jan 2026 06:26:19 +0000https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-xuan-ze-xing-bi-xiu-er-%EF%BC%89-zhi-shi-kuang-jia.html> 第五章 一元函数的导数及其应用 **课标要求** - 导数概念及其意义： ①通过实例分析，经历由平均变化率过渡到瞬时变化率的过程，了解导数概念的实际背景，知道导数是关于瞬时变化率的数学表达，体会导数的内涵与思想。https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-xuan-ze-xing-bi-xiu-er-%EF%BC%89-zhi-shi-kuang-jia.htmlSat, 24 Jan 2026 19:51:32 +0000https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-xuan-ze-xing-bi-xiu-yi-%EF%BC%89-zhi-shi-kuang-jia.html> 第一章 空间向量与立体几何 **课标要求** - 空间直角坐标系： ①在平面直角坐标系的基础上，了解空间直角坐标系，感受建立空间直角坐标系的必要性，会用空间直角坐标系刻画点的位置。https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-xuan-ze-xing-bi-xiu-yi-%EF%BC%89-zhi-shi-kuang-jia.htmlSat, 24 Jan 2026 19:28:56 +0000https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-san-%EF%BC%89-zhi-shi-kuang-jia.html> 第八章 立体几何初步 **课标要求** - 基本立体图形： ①利用实物、计算机软件等观察空间图形，认识柱、锥、台、球及简单组合体的结构特征，能运用这些特征描述现实生活中简单物体的结构。https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-san-%EF%BC%89-zhi-shi-kuang-jia.htmlSat, 24 Jan 2026 18:27:06 +0000https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-er-%EF%BC%89-zhi-shi-kuang-jia.html> 第五章 三角函数 **课标要求** - 角与弧度制，了解任意角的概念和弧度制，能进行弧度与角度的互换，体会引入弧度制的必要性 - 三角函数概念和性质： ①借助单位圆理解三角函数（正弦、余弦、正切）的定义，能画出这些三角函数的图象，了解三角函数的相关性质； ②借助图象理解正弦函数、余弦函数在[0, 2π]上，正切函数在(-π/2, π/2)上的性质。https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-er-%EF%BC%89-zhi-shi-kuang-jia.htmlSat, 24 Jan 2026 17:07:07 +0000https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-yi-%EF%BC%89-zhi-shi-kuang-jia.html> 第一章 集合与常用逻辑用语 **课标要求** 集合的概念与表示： 1. 通过实例，了解集合的含义，理解元素与集合的属于关系。https://antiwhole.github.io/CIDAxu.github.io/post/gao-zhong-shu-xue-%EF%BC%88-bi-xiu-yi-%EF%BC%89-zhi-shi-kuang-jia.htmlSat, 24 Jan 2026 16:00:43 +0000