同角三角函数的基本关系式与诱导公式
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同角三角函数的基本关系式与诱导公式]
[时间:45分钟 分值:100分]
基础热身
1.化简:cos αtan α=________.
2.cos ⎝⎛⎭
⎫-353π的值是________. 3.若tan α=2,则sin α-3cos αsin α+cos α
的值是________. 4.计算:sin315°sin(-1260°)+cos570°sin(-840°)=________.
能力提升
5.计算:cos(-2040°)=________.
6.已知cos(α-π)=-513
,且α是第四象限角,则sin(-2π+α)=________. 7.已知sin θ-cos θ=13
,则sin2θ的值为________. 8.若tan α=3,则4sin α-2cos α5cos α+3sin α
的值等于________. 9.[2011·全国卷] 已知α∈⎝
⎛⎭⎫π,3π2,tan α=2,则cos α=________. 10.已知f (cos x )=cos3x ,则f (sin30°)的值为________.
11.已知1+sin x cos x =-12,那么cos x sin x -1
的值是________. 12.当k ∈Z 时,sin (k π-α)cos (k π+α)sin[(k +1)π+α]cos[(k +1)π-α]
=________. 13.(8分)(1)已知sin α=45
,且α是第二象限的角,求cos α,tan α的值; (2)已知tan α=512
,求sin α,cos α的值.
14.(8分)化简:
(1)-sin (180°+α)+sin (-α)-tan (360°+α)tan (α+180°)+cos (-α)+cos (180°-α)
;
(2)sin120°·cos330°+sin(-690°)·cos(-660°)+tan675°+1tan765°
.
15.(12分)已知sin(θ+k π)=-2cos(θ+k π)(k ∈Z ).
求:(1)4sin θ-2cos θ5cos θ+3sin θ
;
(2)14sin 2θ+25
cos 2θ.
16.(12分)已知sin(π-α)-cos(π+α)=23⎝⎛⎭⎫π2
<α<π.求下列各式的值: (1)sin α-cos α;
(2)sin 3⎝⎛⎭⎫π2-α+cos 3⎝⎛⎭⎫π2+α.
课时作业(十八)
【基础热身】
1.sin α [解析] 由商数关系tan α=sin αcos α
易得. 2.12 [解析] cos ⎝⎛⎭⎫-353π=cos 35π3=cos ⎝⎛⎭⎫-π3=cos π3=12
. 3.-13 [解析] 原式分子与分母同除以cos α得:tan α-3tan α+1=2-32+1
=-13. 4.34
[解析] sin315°sin(-1260°)+cos570°sin(-840°)=(-sin45°)(-sin180°)+(-cos30°)(-sin60°)=34
. 【能力提升】
5.-12
[解析] cos(-2040°)=cos2040°=cos(6×360°-120°)=cos120°=cos(180°-60°)=-cos60°=-12
. 6.-1213 [解析] 由cos(α-π)=-513得,cos α=513
,而α为第四象限角, ∴sin(-2π+α)=sin α=-1-cos 2α=-1213
. 7.89 [解析] 将sin θ-cos θ两边平方得:1-2sin θcos θ=19,sin2θ=2sin θcos θ=89
. 8.57 [解析] 4sin α-2cos α5cos α+3sin α=4tan α-23tan α+5=57
. 9.-55 [解析] ∵tan α=2,∴sin α=2cos α,代入sin 2α+cos 2α=1得cos 2α=15
,又α∈⎝⎛⎭⎫π,3π2,∴cos α=-55
. 10.-1 [解析] f (sin30°)=f (cos60°)=cos180°=-1. 11.12 [解析] 1+sin x cos x ·sin x -1cos x =sin 2x -1cos 2x
=-1. ∴cos x sin x -1=12
. 12.-1 [解析] 若k 为偶数,则
原式=sin (-α)cos αsin (π+α)cos (π-α)=-sin αcos α(-sin α)(-cos α)
=-1; 若k 为奇数,则
原式=sin (π-α)cos (π+α)sin αcos (-α)
=sin α(-cos α)sin αcos α=-1. 13.[解答] (1)因为sin 2α+cos 2α=1,
所以cos 2α=1-sin 2α=1-⎝⎛⎭⎫452=925.
又α是二象限角,因此cos α<0,
故cos α=-35,tan α=sin αcos α=45×⎝⎛⎭⎫-53=-43
. (2)由sin αcos α=tan α=512,可得sin α=512
cos α. 又sin 2α+cos 2α=1,所以⎝⎛⎭⎫5122cos 2α+cos 2α=1.
解得cos 2α=144169
. 又tan α>0,所以α是第一或第三象限角.
若α是第一象限角,
则cos α=1213,sin α=513
; 若α是第三象限角,
则cos α=-1213,sin α=-513
. 14.[解答] (1)原式=sin α-sin α-tan αtan α+cos α-cos α
=-tan αtan α=-1. (2)原式=sin(180°-60°)·cos(360°-30°)+sin(720°-690°)·cos(720°-660°)+tan(720°-
45°)+1tan (720°+45°)
=sin60°cos30°+sin30°cos60°+tan(-45°)+1=1.
15.[解答] 由已知得cos(θ+k π)≠0(k ∈Z ),
∴tan(θ+k π)=-2(k ∈Z ),即tan θ=-2.
(1)4sin θ-2cos θ5cos θ+3sin θ=4tan θ-25+3tan θ
=10. (2)14sin 2θ+25cos 2θ=14sin 2θ+25cos 2θsin 2θ+cos 2θ
= 14tan 2θ+25tan 2θ+1=725
. 16.[解答] 由sin(π-α)-cos(π+α)=23
, 得sin α+cos α=23
.① 将①式两边平方,得1+2sin α·cos α=29
, 故2sin α·cos α=-79
, 又π2
<α<π,∴sin α>0,cos α<0. ∴sin α-cos α>0.
(1)(sin α-cos α)2=1-2sin α·cos α=1-⎝⎛⎭⎫-79=169
, ∴sin α-cos α=43
. (2)sin 3⎝⎛⎭⎫π2-α+cos 3⎝⎛⎭⎫π2+α=cos 3α-sin 3α =(cos α-sin α)(cos 2α+cos α·sin α+sin 2α)
=⎝⎛⎭⎫-43×⎝⎛⎭⎫1-718=-2227
.。