名校
解题方法
1 . 在锐角三角形
中,其内角
所对的边分别为
,且满足
.
(1)求证:
;
(2)求
的取值范围.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/7bef5239ddbb0972700ce01daf9ee7cf.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/24e0c10fb103930eabd5fa18e8f9bb06.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/76f0649064a085fb74c997fb507a9b6d.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/5a2264c134952d41fb9bcb90e6c72c83.png)
(1)求证:
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/6b27a9205353ce97a85d161a993a060a.png)
(2)求
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/8c2d595eac6c838f3ab8ce12c22111d0.png)
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2023-07-18更新
|
870次组卷
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4卷引用:广东省广州外国语学校等三校2022-2023学年高一下学期期末联考数学试题
广东省广州外国语学校等三校2022-2023学年高一下学期期末联考数学试题(已下线)专题突破卷12 解三角形中的最值范围问题-1广东省茂名市高州中学2023-2024学年高一下学期期中考试数学试题(创新班1-3班)(已下线)高一下学期期末复习解答题压轴题二十四大题型专练(1)-举一反三系列(人教A版2019必修第二册)
2 . 求证:
(1)
;
(2)
;
(3)
;
(4)
.
(1)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3fa937ccb146dae977cb55510f4d5042.png)
(2)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/fab8647d21551f167d68b305179c37ed.png)
(3)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/11c58a6ee2ea78be2d62f5c182c04326.png)
(4)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/f15c3e2158bdc118bb5ef2c9c16b5eb5.png)
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名校
3 . (1)化简:
;
(2)求证:
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3debd971cb6f79f97f6123198ccb1656.png)
(2)求证:
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/49a1f4d4bb77912ab865610e12a00871.png)
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2023-02-26更新
|
358次组卷
|
4卷引用:湖北省黄冈市黄梅国际育才高级中学2022-2023学年高一下学期2月月考数学试题
湖北省黄冈市黄梅国际育才高级中学2022-2023学年高一下学期2月月考数学试题(已下线)专题04 二倍角的三角函数-期中期末考点大串讲(苏教版2019必修第二册)湖北省黄冈市黄梅县育才高级中学2023-2024学年高一下学期2月月考数学试卷内蒙古兴安盟乌兰浩特第一中学2023-2024学年高一下学期期中考试数学试题
解题方法
4 . 在
中,内角A,B,C所对的边分别为a,b,c,且满足
.
(1)证明:
.
(2)求
的取值范围.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/15c0dbe3c080c4c4636c64803e5c1f76.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e56735696c9d7c8052c0b6a2922ae8ed.png)
(1)证明:
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/5a2264c134952d41fb9bcb90e6c72c83.png)
(2)求
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/f5ec4e7815c0e96282e553a00d038b99.png)
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名校
解题方法
5 . 设
次多项式
,若其满足
,则称这些多项式
为切比雪夫多项式.例如:由
可得切比雪夫多项式
.
(1)求切比雪夫多项式
;
(2)求
的值;
(3)已知方程
在
上有三个不同的根,记为
,求证:
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/b6a24198bd04c29321ae5dc5a28fe421.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/f6bcabb8534436af78551405453864df.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/076517385a1ca0aa2d8f7035158f353a.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/17bd2bc42d15891e0739e1ff3c0993d2.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/b327b904e4d65a88b5adaf4de91694fd.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/703a4194b9d5650df287fa822cf039cf.png)
(1)求切比雪夫多项式
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/10608b54173b1b7b559c579f4dc69ae2.png)
(2)求
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/ff1e86c5abdaa1ca8599ffa5e933e046.png)
(3)已知方程
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/fcf211eb82ea0c803eeff551d5819643.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/455ba3d3e46977fcbe5b71f8bb9df4be.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/05b8ec9d4206ea66a02de5c4a1e1e911.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/6f2c5f7b63a7dd6d0155f9d38158fcf1.png)
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6 . 在
中,角
的对边分别为
.
(1)求证:
;
(2)若
是
上一点,
平分
,求
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/15c0dbe3c080c4c4636c64803e5c1f76.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/24e0c10fb103930eabd5fa18e8f9bb06.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/b0faf9f046fcde132e55d5c4929aa749.png)
(1)求证:
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e4313d6184e087fa6753a02379a8f8a3.png)
(2)若
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/8455657dde27aabe6adb7b188e031c11.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/0dc5c9827dfd0be5a9c85962d6ccbfb1.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/6eb8f06f42483209bdd51fb70b56a940.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/7cbce11aa19b8bd2bf6ee5a834e005de.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/c4e563e032dfdef69b0f357060c27bd4.png)
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名校
解题方法
7 . (1)证明:
;
(2)若
,
,其中实数
,
不全为零.
①求
;
②求
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/fede4c333b02961cce4709facfa6893f.png)
(2)若
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/756e54aea128da691443988955aa41b4.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/43e68ff9b088253c2a462a7ac7f9d8cf.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/0a6936d370d6a238a608ca56f87198de.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/2c94bb12cee76221e13f9ef955b0aab1.png)
①求
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/bbb006ea697b63a914eb487073f0abe1.png)
②求
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/cc3884b343d76a26b4b85b48987d7064.png)
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8 . 为了推导两角和与差的三角函数公式,某同学设计了一种证明方法:在直角梯形ABCD中,
,
,点E为BC上一点,且
,过点D作
于点F,设
,
.
(1)利用图中边长关系
,证明:
;
![](https://img.xkw.com/dksih/QBM/2023/6/20/3263775491006464/3265425842176000/STEM/d80ec35b6b4c44ad9d54317146a5675c.png?resizew=47)
(2)若
,求
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/f7d8397018b0a01a1b4e9574604f9e76.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3f4aca5534bce25acaeb7379deed8f8f.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3d5427b7b994b860628df3d6b7a07de8.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/7aa30a9ee227af2b387cf6e028c20d7d.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/2a447d8fc6919edd758ccec4277435aa.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/21461e9cb1265843a16d379788f3fcb8.png)
![](https://img.xkw.com/dksih/QBM/editorImg/2023/6/24/b7c91a13-25b3-41d4-9180-c25f2539ec0f.png?resizew=133)
(1)利用图中边长关系
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/b8904ac51eff2df308ed7b6a07aa2477.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/1c8b8ee28cf91c5976d074d233c941f3.png)
![](https://img.xkw.com/dksih/QBM/2023/6/20/3263775491006464/3265425842176000/STEM/d80ec35b6b4c44ad9d54317146a5675c.png?resizew=47)
(2)若
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/952ab659a747b410974aa88748f18d0c.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/fff423fa9846e49124710a2add054a8f.png)
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解题方法
9 . (1)已知
,求
的值;
(2)证明恒等式:
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/69b4cab645c97f6d1710f803ef6a8436.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/9146fc0a63e5c14a8fa46573e60c07ba.png)
(2)证明恒等式:
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/aa4c283c3eafb7f68571a73e2f78179b.png)
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名校
解题方法
10 . “勾股定理”在西方被称为“毕达哥拉斯定理”,三国时期吴国的数学家赵爽创制了一幅“勾股圆方图”,用数形结合的方法给出了勾股定理的详细证明.如图所示的“勾股圆方图”中,四个相同的直角三角形与中间的小正方形拼成一个大正方形.若直角三角形中较小的锐角为
,现已知阴影部分与大正方形的面积之比为
,则锐角![](https://staticzujuan.xkw.com/quesimg/Upload/formula/9251dff989f7d60db751b73033dee269.png)
________ .
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e170f206fdbbd834aad7580c727e2cc6.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/6503ca085e3ca5f2ba723b0dd66e210b.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/9251dff989f7d60db751b73033dee269.png)
![](https://img.xkw.com/dksih/QBM/editorImg/2023/6/14/73154291-7b68-4d6e-81d4-fdcd53b3b5e9.png?resizew=108)
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