题目内容

(1)化简
sin(2π-α)•sin(π+α)•cos(-π+α)
sin(3π-α)•cos(π+α)

(2)求函数y=2-sin2x+cosx的最大值及相应的x的值.
(1)原式
sin(2π-α)•sin(π+α)•cos(-π+α)
sin(3π-α)•cos(π+α)
=
(-sinα)•(-sinα)•(-cosα)
sinα•(-cosα)
=sinα
(2)y=2-sin2x+cosx=cos2x+cosx+1=(cosx+
1
2
2+
3
4

当cosx=1时,函数取得最大值为3,此时x=2kπ,k∈z
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相关题目
(1)化简
sin(2π-α)•sin(π+α)•cos(-π+α)sin(3π-α)•cos(π+α)

(2)求函数y=2-sin2x+cosx的最大值及相应的x的值.
(1)化简
sin(2π-α)cos(π+α)
cos(α-π)cos(
π
2
-α)

(2)tanx=2,求2sin2x-sinxcosx+cos2x的值.
(1)化简
sin(2π-α)cos(π+α)
cos(π-α)sin(3π-α)sin(-α-π)

(2)求值:
3
tan12°-3
sin12°(4cos212°-2)
(1)化简
sin(2π-α)cos(π+α)
cos(π-α)sin(3π-α)sin(-α-π)

(2)求值:
3
tan12°-3
sin12°(4cos212°-2)
(1)化简
sin(2π-α)cos(π+α)
cos(α-π)cos(
π
2
-α)

(2)tanx=2,求2sin2x-sinxcosx+cos2x的值.

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