题目内容

f(α)=
2sinαcosα+cosα
1+sin2α+cos(
2
+α)-sin2(
π
2
+α)
(1+2sinα≠0)
(1)化简f(α).
(2)求f(1°)•f(2°)•f(3°)•…•f(89°)的值.
(1)∵cos(
2
+α)=sinαsin2(
π
2
+α)=cos2α
f(α)=
cosα(2sinα+1)
1+sin2α+sinα-cos2α
=
cosα(2sinα+1)
2sin2α+sinα
=
cosα(2sinα+1)
sinα(2sinα+1)
=
cosα
sinα

(2)f(1°)•f(2°)•f(3°)••f(89°)
=
cos1°
sin1°
cos2°
sin2°
••
cos45°
sin45°
••
cos88°
sin88°
cos89°
sin89°

=(
cos1°
sin1°
cos89°
sin89°
)•(
cos2°
sin2°
cos88°
sin88°
)••
cos45°
sin45°

=(
cos1°
sin1°
sin1°
cos1°
)•(
cos2°
sin2°
sin2°
cos2°
)••
cos45°
sin45°
=1
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相关题目
f(α)=
2sinαcosα+cosα
1+sin2α+cos(
2
+α)-sin2(
π
2
+α)
(1+2sinα≠0)
(1)化简f(α).
(2)求f(1°)•f(2°)•f(3°)•…•f(89°)的值.
f(α)=
2sin(π+α)cos(π-α)-cos(π+α)
1+sin2α+sin(π-α)-cos2(π-α)

(1)若α=-
17
6
π,求f(α)的值;
(2)若α是锐角,且sin(α-
3
2
π)=
3
5
,求f(α)的值.
(2013•东莞二模)已知函数f(x)=tan(
1
3
x-
π
6
)
(1)求f(x)的最小正周期;
(2)求f(
2
)的值;
(3)设f(3α+
2
)=-
1
2
,求
sin(π-α)+cos(α-π)
2
sin(α+
π
4
)
的值.
f(α)=
2sin(π+α)cos(π-α)-cos(π+α)
1+sin2α+sin(π-α)-cos2(π-α)

(1)若α=-
17
6
π,求f(α)的值;
(2)若α是锐角,且sin(α-
3
2
π)=
3
5
,求f(α)的值.

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