题目内容
化简
(1)cos315°+sin(-30)°+sin225°+cos480°
(2)
.
(1)cos315°+sin(-30)°+sin225°+cos480°
(2)
| ||
| sin250°+cos790° |
分析:(1)利用三角函数的诱导公式加以计算,可得原式=cos45°-sin30°-sin45°-cos60°=-1;
(2)根据同角三角函数的基本关系与诱导公式,将分子化简为
=sin70°-cos70°,分母化简为cos70°-sin70°,进而可得原式的值为-1.
(2)根据同角三角函数的基本关系与诱导公式,将分子化简为
| (sin70°-cos70°)2 |
解答:解:(1)cos315°+sin(-30)°+sin225°+cos480°
=cos(360°-45°)-sin30°+sin(180°+45°)+cos(360°+120°)
=cos(-45°)-sin30°-sin45°+cos120°
=cos45°-sin30°-sin45°-cos60°
=
-
-
-
=-1.
(2)原式=
=
=
=
=
=-1.
=cos(360°-45°)-sin30°+sin(180°+45°)+cos(360°+120°)
=cos(-45°)-sin30°-sin45°+cos120°
=cos45°-sin30°-sin45°-cos60°
=
| ||
| 2 |
| 1 |
| 2 |
| ||
| 2 |
| 1 |
| 2 |
(2)原式=
| ||
| sin(180°+70°)+cos(720°+70°) |
=
| ||
| -sin70°+cos70° |
| ||
| cos70°-sin70° |
| |sin70°-cos70°| |
| cos70°-sin70° |
=
| sin70°-cos70° |
| cos70°-sin70° |
点评:本题求两个三角函数式子的值,考查了三角函数的诱导公式、同角三角函数的基本关系等知识,属于中档题.
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