1 00:00:00,800 --> 00:00:03,017 让我们来做大量的习题,只是想确保我们 2 00:00:03,017 --> 00:00:07,036 把基本三角函数掌握得很好 3 00:00:07,036 --> 00:00:11,447 让我们来构思一些直角三角形 4 00:00:11,447 --> 00:00:13,668 让我们来构思些直角三角形,而且我想把它解释得十分清楚明白 5 00:00:15,186 --> 00:00:18,042 目前为止,它们只适用于直角三角形,所以如果你正在找 6 00:00:18,042 --> 00:00:23,475 一些不是在直角三角形里的角的三角函数 7 00:00:23,475 --> 00:00:25,704 我们看到 必须要构建直角三角形 8 00:00:25,704 --> 00:00:27,867 但现在我们只集中注意力在直角三角形 9 00:00:27,867 --> 00:00:31,344 因此我们说,我有一个三角形,而且假设这里的长度是7 10 00:00:33,897 --> 00:00:37,757 也假设,这条边的长度,是4 11 00:00:39,452 --> 00:00:42,516 让我们找出这里的斜边将会是多少 12 00:00:42,516 --> 00:00:45,720 因此我们知道 让我们把斜边叫做“h” 13 00:00:45,720 --> 00:00:52,200 我们知道h的平方将等于 7的平方+4的平方 14 00:00:52,200 --> 00:00:55,194 这从勾股定理中来 15 00:00:55,194 --> 00:00:57,469 斜边的平方等于 16 00:00:57,469 --> 00:01:01,974 其他两条边的平方的总和 17 00:01:01,974 --> 00:01:04,533 h的平方 = 7的平方 + 4的平方 18 00:01:04,533 --> 00:01:09,776 这就等于49+16 19 00:01:09,776 --> 00:01:11,800 49+16 20 00:01:11,800 --> 00:01:18,553 49+10=59,加上6等于65 21 00:01:18,553 --> 00:01:21,107 所以这是√65 22 00:01:21,107 --> 00:01:25,705 让我写下:√65 这是黄色不同的阴影-- 23 00:01:25,705 --> 00:01:28,818 因此我们有一个数的平方是等于65 24 00:01:28,818 --> 00:01:33,533 我做得对吗?49+10=59,加上另外的6等于65 25 00:01:33,533 --> 00:01:37,600 或者我们能说h等于,如果我们把两边的开方 26 00:01:37,600 --> 00:01:39,200 开方 27 00:01:39,200 --> 00:01:42,933 65的平方根,而且我们真的不能把它化简了 28 00:01:42,933 --> 00:01:44,699 这是13 29 00:01:44,699 --> 00:01:47,463 这跟13乘以5一样,他们都不能完全平方 30 00:01:50,388 --> 00:01:51,804 它们都是素数 所以你不能再化简它们 31 00:01:51,804 --> 00:01:55,467 这就等于65的平方根 32 00:01:55,467 --> 00:02:02,114 现在让我们找,让我们这个角的的三角函数 33 00:02:02,114 --> 00:02:05,457 假设这个角叫做Θ 34 00:02:05,457 --> 00:02:06,533 所以每当你做它 35 00:02:06,533 --> 00:02:09,467 你总是想要把它写下来--至少对我来说,写下来它起作用 36 00:02:09,467 --> 00:02:11,714 soh cah toa 37 00:02:11,714 --> 00:02:13,120 soh 38 00:02:13,120 --> 00:02:16,464 soh cah toa。我有些模糊的记忆 39 00:02:16,464 --> 00:02:18,786 从我的三角学老师 40 00:02:18,786 --> 00:02:21,293 也许我已经在几本书里读过它了,我不知道 — — 你知道,关于 41 00:02:21,293 --> 00:02:23,867 一些类型的印度公主命名为"soh cah toa" 或什么的 42 00:02:23,867 --> 00:02:26,123 但它是一个非常有用的助记符 43 00:02:26,123 --> 00:02:27,564 这样我们可以应用"soh cah toa" 44 00:02:27,564 --> 00:02:31,046 假设我们要找余弦值 45 00:02:31,046 --> 00:02:34,436 我们想要找角的余弦值 46 00:02:34,436 --> 00:02:37,965 我们想找角的余弦值,你说:"soh cah toa !" 47 00:02:37,965 --> 00:02:40,800 所以"cah". "Cah"告诉我们如何处理余弦值 48 00:02:40,800 --> 00:02:43,027 "cah"这部分告诉我们 49 00:02:43,027 --> 00:02:46,371 余弦值是 邻边比斜边 50 00:02:46,371 --> 00:02:51,433 余弦值等于邻边 51 00:02:51,433 --> 00:02:55,798 现在,让我们看一遍 Θ ; 哪条是邻边? 52 00:02:55,798 --> 00:02:57,702 我们都知道,斜边 53 00:02:57,702 --> 00:03:00,767 我们知道,斜边是这条 54 00:03:00,767 --> 00:03:04,761 所以它不能是那条。其他仅有的一条相邻的边 55 00:03:04,761 --> 00:03:07,133 不是斜边,是4 56 00:03:07,133 --> 00:03:10,473 所以邻边在这里,这条是 57 00:03:10,473 --> 00:03:14,374 这恰好是靠近角的旁边,这是构成这个三角形的一条边之一 58 00:03:15,754 --> 00:03:17,133 这是4 59 00:03:17,133 --> 00:03:21,108 斜边我们已经知道了是 √65 60 00:03:21,108 --> 00:03:25,380 因此是4除以√65 61 00:03:25,380 --> 00:03:29,142 有时候人们会希望你把分母有理化,意思是 62 00:03:29,142 --> 00:03:32,625 他们不喜欢分母是一个无理数,就象√65一样 63 00:03:35,227 --> 00:03:39,359 如果他们-如果你想重写使它分母里没有无理数 64 00:03:39,359 --> 00:03:41,634 你可以乘以分子和分母 65 00:03:41,634 --> 00:03:43,306 用√65 66 00:03:43,306 --> 00:03:45,094 这显然不会更改数字,因为我们乘以它东西到其本身 67 00:03:48,122 --> 00:03:49,111 所以我们把用1乘以这个数字 68 00:03:49,111 --> 00:03:52,780 这不会改变数,而且至少它可以去除分母中的无理数 69 00:03:52,780 --> 00:03:54,127 所以分子变成 70 00:03:54,127 --> 00:03:57,800 4x √65 71 00:03:57,800 --> 00:04:03,461 而且分母,√65 乘以 √65,等于65 72 00:04:03,461 --> 00:04:07,130 我们没有去掉无理数,它依然在那里,只是在分子那里 73 00:04:07,130 --> 00:04:09,777 现在让我们来做其他三角函数 74 00:04:09,777 --> 00:04:12,401 或者其他重要的三角函数。将来我们将要学很多这些 75 00:04:14,399 --> 00:04:15,443 但它们都是从这些中延伸出来的 76 00:04:15,443 --> 00:04:19,733 因此让我们想Θ的符号是什么。再一次,用到 soh cah toa 77 00:04:19,733 --> 00:04:25,474 soh 告诉怎么做正弦值。正弦值是对边比斜边 78 00:04:25,474 --> 00:04:29,200 正弦值等于对边比斜边 79 00:04:29,200 --> 00:04:31,372 正弦值是对边比斜边 80 00:04:31,372 --> 00:04:34,390 因此,哪条是这个角的对边呢? 81 00:04:34,390 --> 00:04:38,430 我们从它走向对面,它面对什么,它面对着7 82 00:04:38,430 --> 00:04:41,200 所以,对边是7 83 00:04:41,200 --> 00:04:44,468 正好在这,这是对边 84 00:04:44,468 --> 00:04:47,800 然后在斜边,它是对边比斜边 85 00:04:47,800 --> 00:04:51,109 斜边是√65 86 00:04:51,109 --> 00:04:52,966 65的平方根 87 00:04:52,966 --> 00:04:55,133 再一次如果我们想使它有理化 88 00:04:55,133 --> 00:04:59,933 我们可以乘以√65分之√65 89 00:04:59,933 --> 00:05:04,298 然后分子,我们会得到7√65 90 00:05:04,298 --> 00:05:07,966 在分母我们得到65 91 00:05:07,966 --> 00:05:10,474 现在让我们来做正切值 92 00:05:10,474 --> 00:05:12,796 让我们来做正切值 93 00:05:12,796 --> 00:05:14,793 因此,如果我问你正切值 94 00:05:14,793 --> 00:05:17,394 θ的正切值 95 00:05:17,394 --> 00:05:20,784 再一次回到soh cah 96 00:05:20,784 --> 00:05:23,106 toa, toa这一部分告诉我们怎样做正切值 97 00:05:23,106 --> 00:05:24,800 它告诉我们 98 00:05:24,800 --> 00:05:27,053 它告诉我们 99 00:05:27,053 --> 00:05:29,867 正切值等于对边 100 00:05:29,867 --> 00:05:33,137 比 101 00:05:33,137 --> 00:05:35,867 对边比邻边 102 00:05:35,867 --> 00:05:38,709 所以对这个角来说 我们已经找出了对边 103 00:05:38,709 --> 00:05:41,124 是7,它对着7 104 00:05:41,124 --> 00:05:42,533 这条对边是7 105 00:05:42,533 --> 00:05:46,372 所以,是7 106 00:05:46,372 --> 00:05:48,200 嗯,4是邻边 107 00:05:48,200 --> 00:05:51,295 这个4是邻边,所以邻边是4 108 00:05:51,295 --> 00:05:54,330 因此是7比4 109 00:05:54,330 --> 00:05:56,133 我们完成了 110 00:05:56,133 --> 00:05:59,375 我们找出了所有三角形内θ的所有比率。让我们做另一题 111 00:06:00,416 --> 00:06:02,719 让我们做另一题。我将把它具体化,因为现在我们已经说过 112 00:06:02,719 --> 00:06:06,434 x的正切值,θ的正切值。让我把题目弄得复杂点 113 00:06:06,434 --> 00:06:08,431 假设 114 00:06:08,431 --> 00:06:10,799 假设,让我画另一个直角三角形 115 00:06:10,799 --> 00:06:13,772 这是另一个直角三角形 116 00:06:13,772 --> 00:06:17,533 我们正解决的一切题目 117 00:06:17,533 --> 00:06:21,109 假设,斜边的长度是4 118 00:06:21,109 --> 00:06:26,357 假设这条边的长度将会是2 119 00:06:26,357 --> 00:06:31,790 假设这条边的长度将会是2√3 120 00:06:31,790 --> 00:06:33,462 我们能证明这个结果 121 00:06:33,462 --> 00:06:36,467 如果你把这条边平方 所以你会有,让我把它写下来 122 00:06:36,467 --> 00:06:38,803 2乘以3的平方根之积的平方 123 00:06:38,803 --> 00:06:42,471 加上2的平方等于 124 00:06:42,471 --> 00:06:46,467 这是2 这将是4x3 125 00:06:46,467 --> 00:06:49,763 4x3+4 126 00:06:49,763 --> 00:06:53,478 这将会=12+4 = 16 127 00:06:53,478 --> 00:06:57,800 16确实是4的平方,因此这真的等于4的平方 128 00:06:57,800 --> 00:07:01,790 它等于4的平方,它满足勾股定理 129 00:07:01,790 --> 00:07:06,133 如果你记得你在30,60,90三角形中, 130 00:07:06,133 --> 00:07:07,781 你可能会学习到几何 131 00:07:07,781 --> 00:07:11,450 你可能会认出这个是一个30,60,90度三角形 132 00:07:11,450 --> 00:07:13,133 这个是直角 133 00:07:13,133 --> 00:07:15,867 我应该把它画出来,表示出这是一个直角三角形 134 00:07:15,867 --> 00:07:20,366 这里的这个是30度的角 135 00:07:20,366 --> 00:07:23,385 然后这个角 136 00:07:23,385 --> 00:07:26,125 是60度角 137 00:07:26,125 --> 00:07:27,797 它们是30 60 90 因为 138 00:07:27,797 --> 00:07:31,791 30度角所对的边=斜边的一半 139 00:07:31,791 --> 00:07:36,800 60度角的对边比另一条边的值是√3 140 00:07:36,800 --> 00:07:38,432 不是比斜边 141 00:07:38,432 --> 00:07:40,159 因此我们不准备,这个的目的不是复习30 60 90三角形 142 00:07:43,415 --> 00:07:46,933 让我们真正地找三角形不同角的比值 143 00:07:46,933 --> 00:07:51,295 因此如果我问你 144 00:07:51,295 --> 00:07:54,639 什么是30度角的正弦值 145 00:07:54,639 --> 00:07:58,447 记得30度是三角形的其中一个角,但它可以满足 146 00:07:58,447 --> 00:08:01,698 当你有一个30度角而且你正在解决直角三角形的问题 147 00:08:01,698 --> 00:08:05,135 我们将来会有广泛的定义,但如果你说30度的正弦值 148 00:08:05,135 --> 00:08:09,035 这里的这个角是30度,因此我能用这个直角 149 00:08:09,035 --> 00:08:12,133 因此我们只需要记得 soh cah toa 150 00:08:12,133 --> 00:08:17,116 重写它 soh cah toa 151 00:08:17,116 --> 00:08:22,782 正弦值soh告诉我们怎样做正弦值。正弦值是对边比斜边 152 00:08:22,782 --> 00:08:26,358 30度的正弦值是对边 153 00:08:26,358 --> 00:08:30,723 对边是2比斜边 154 00:08:30,723 --> 00:08:32,395 斜边是4 155 00:08:32,395 --> 00:08:35,646 这是4分之二,也就等于二分之一 156 00:08:35,646 --> 00:08:40,800 30度的正弦值,你会看见这总是等于 157 00:08:40,800 --> 00:08:44,144 现在,什么是 158 00:08:44,144 --> 00:08:46,867 什么是余弦值 159 00:08:46,867 --> 00:08:50,135 再一次回到 soh cah toa 160 00:08:50,135 --> 00:08:52,643 cah告诉我们怎样做余弦值 161 00:08:52,643 --> 00:08:56,033 余弦值是邻边比斜边 162 00:08:56,033 --> 00:08:59,051 因此,对于30度角来说,它的邻边是这条 163 00:08:59,051 --> 00:09:01,791 邻边是正好与它相邻 164 00:09:01,791 --> 00:09:05,467 不是斜边 是邻边比斜边 165 00:09:05,467 --> 00:09:09,129 因此是2x√3 166 00:09:09,129 --> 00:09:13,633 邻边除以斜边 除以4 167 00:09:13,633 --> 00:09:16,977 或者如果我们简化它,我们用分子和分母同时除以2 168 00:09:16,977 --> 00:09:20,646 是√3/2 169 00:09:20,646 --> 00:09:22,782 最后我们做正切值 170 00:09:22,782 --> 00:09:27,800 30度角的 171 00:09:27,800 --> 00:09:30,305 我们回到soh cah toa 172 00:09:30,305 --> 00:09:31,699 soh cah toa 173 00:09:31,699 --> 00:09:34,800 toa 告诉我们怎样做正切值,是对边比邻边 174 00:09:34,800 --> 00:09:38,804 你找到30度角,因为我们关注30度角的正切值 175 00:09:38,804 --> 00:09:42,101 30度角的正切值,对边是2 176 00:09:42,101 --> 00:09:46,200 对边是2,邻边是2√3, 177 00:09:46,200 --> 00:09:48,045 它正好与它的邻边相邻 178 00:09:48,045 --> 00:09:49,439 邻边的意思是旁边 179 00:09:49,439 --> 00:09:52,039 因此2√3 180 00:09:52,039 --> 00:09:54,454 这就等于抵消两个2 181 00:09:54,454 --> 00:09:56,776 得出1/√3 182 00:09:56,776 --> 00:10:00,723 或者我们可以同时用√3乘以分子和分母 183 00:10:00,723 --> 00:10:05,367 因此,我们有√3/√3 184 00:10:05,367 --> 00:10:08,804 因此这分子将会等于√3 185 00:10:08,804 --> 00:10:12,473 然后分母等于3 186 00:10:12,473 --> 00:10:15,800 因此我们已经使 √3/3 187 00:10:15,800 --> 00:10:17,442 十分公平 188 00:10:17,442 --> 00:10:20,693 现在让我们用相同的三角形 算出60度的三角形比率 189 00:10:20,693 --> 00:10:22,457 因为我们已经画好了 190 00:10:22,457 --> 00:10:28,328 因此什么是什么是60度角的正弦值? 191 00:10:28,328 --> 00:10:30,166 我想你现在已经掌握诀窍了 192 00:10:30,166 --> 00:10:34,253 正弦值是 对边比邻边,soh从soh cah toa中来 193 00:10:34,253 --> 00:10:36,668 从60度角看那哪条是对边 194 00:10:36,668 --> 00:10:39,315 就是对着2√3 195 00:10:39,315 --> 00:10:42,566 因此对边是 2√3 196 00:10:42,566 --> 00:10:45,306 而且从60度角,邻边是 对不起 197 00:10:45,306 --> 00:10:47,999 应该是对边比斜边,不想把你弄糊涂 198 00:10:47,999 --> 00:10:50,507 因此它是对边比斜边 199 00:10:50,507 --> 00:10:54,315 是2√3 / 4,4是斜边 200 00:10:54,315 --> 00:10:59,981 因此它等于,简化就是√3/2 201 00:10:59,981 --> 00:11:05,507 60度的余弦值是多少 202 00:11:05,507 --> 00:11:10,244 因此记住soh cah toa. 余弦值是邻边比斜边 203 00:11:10,244 --> 00:11:13,667 邻边是与60度角相邻的两条边 204 00:11:13,667 --> 00:11:17,907 因此它是2比斜边4 205 00:11:17,907 --> 00:11:20,972 因此这等于1/2 206 00:11:20,972 --> 00:11:24,176 最后 什么是正切值? 207 00:11:24,176 --> 00:11:27,984 什么是60度的正切值? 208 00:11:27,984 --> 00:11:32,349 好的,正切值,soh cah toa 正切值是对边比邻边 209 00:11:32,349 --> 00:11:34,671 60度的对边是 210 00:11:34,671 --> 00:11:36,400 2√3 211 00:11:36,400 --> 00:11:38,000 2√3 212 00:11:38,000 --> 00:11:39,919 然后邻边是 213 00:11:39,919 --> 00:11:42,733 邻边是2 214 00:11:42,733 --> 00:11:44,800 60度的邻边是2 215 00:11:44,800 --> 00:11:48,650 因此它的对边比邻边 2√3/2 216 00:11:48,650 --> 00:11:52,644 等于√3 217 00:11:52,644 --> 00:11:54,641 然后我只是想--看看它们之间的关系 218 00:11:54,641 --> 00:11:57,984 30度的正弦值等于60度的余弦值 219 00:11:57,984 --> 00:12:01,333 30度的余弦值等于60度的正弦值。 220 00:12:01,333 --> 00:12:03,966 然后这些东西都和对方相反,我想如果你想想这个三角形 221 00:12:05,635 --> 00:12:07,105 它将会言之有理地解释原因 222 00:12:07,105 --> 00:12:08,461 我们将会继续延伸这个,和给你更多的练习在接下来的一些视频中