题目内容
(1)求值sin2120°+cos180°+tan45°-cos2(-330°)+sin(-210°)(2)化简:
sin(α-2π)cos(α-
| ||
| sin(3π-α)sin(-π-α) |
分析:(1)利用诱导公式得sin120°=sin60°,cos2(-330°)=cos230°,sin(-210°)=sin30°,化简即可
(2)sin(a-2π)=-sin(2π-α)=sinα,cos(α-
)=sinα,cos(π+α)=-cosα,sin(3π-α)=sinα,sin(-π-α)=sinα进行化简即可.
(2)sin(a-2π)=-sin(2π-α)=sinα,cos(α-
| π |
| 2 |
解答:解:(1)sin2120°+cos180°+tan45°-cos2(-330°)+sin(-210°)
=(sin60°)2-cos(0°)+tan45°-(cos30°)2+sin(30°)
=
+(-1)+1-
+
=
(2)
=
=-cosα
=(sin60°)2-cos(0°)+tan45°-(cos30°)2+sin(30°)
=
| 3 |
| 4 |
| 3 |
| 4 |
| 1 |
| 2 |
=
| 1 |
| 2 |
(2)
sin(α-2π)cos(α-
| ||
| sin(3π-α)sin(-π-α) |
=
| -sin2αcosα |
| sin2α |
=-cosα
点评:本题考查了三角函数的诱导公式,要熟悉掌握公式和特殊角的函数值,属于基础题.
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