一、选择题1.cos(-)+sin(-)的值为()xKb1.ComA.-B.C.D.【解析】原式=cos-sin=cos-sin=-cos+sin=.【答案】C2.(2013·石家庄高一检测)若cos(2π-α)=,则sin(-α)等于()A.-B.-C.D.±【解析】∵cos(2π-α)=cos(-α)=cosα=,∴sin(-α)=-cosα=-,故选A.【答案】A3.已知f(x)=sinx,下列式子成立的是()A.f(x+π)=sinxB.f(2π-x)=sinxC.f(x-)=-cosxD.f(π-x)=-f(x)【解析】由于sin(x-)=-sin(-x)=-cosx,故C成立,选C.【答案】C4.已知cos(π+α)=-,则sin(π+α)等于()A.B.-C.±D.-【解析】由于cos(π+α)=-cosα=-,∴cosα=,∴sin(π+α)=sin(2π-+α)=sin(α-)=-sin(-α)=-cosα=-,故选D.【答案】D5.下列三角函数中,与sin数值相同的是()①sin(nπ+);②cos(2nπ+);③sin(2nπ+);④cos[(2n+1)π-];⑤sin[(2n+1)π-](n∈Z).A.①②B.①③④C.②③⑤D.①③⑤【解析】①中,sin(nπ+)==②中,cos(2nπ+)=cos=sin(-)=sin;③中,sin(2nπ+)=sin;④中,cos(2nπ+π-)=cos(π-)=-cos≠sin;⑤中,sin(2nπ+π-)=sin(π-)=sin.故②③⑤中的三角函数与sin的数值相同.【答案】C二、填空题6.sin315°-cos135°+2sin570°的值是________.【解析】原式=sin(360°-45°)-cos(180°-45°)+2sin(360°+210°)=-sin45°+cos45°+2sin(180°+30°)=-2sin30°=-2×=-1.【答案】-17.的值是________.【解析】原式==XkB1.com===.【答案】8.若sin(π+α)+cos(+α)=-m,则cos(-α)+2sin(2π-α)的值为________.【解析】∵sin(π+α)+cos(+α)=-sinα-sinα=-m,∴sinα=.∴cos(-α)+2sin(2π-α)=-sinα-2sinα=-3sinα=-.【答案】-三、解答题9.已知角α终边上一点P(-4,3),求的值.【解】点P到原点O的距离|OP|==5,根据三角函数的定义得:sinα=,cosα=-.=====×(-)=-.10.化简:··.http://www.xkb1.com【解】··=··=··=··=··=1.11.若f(sinx)=cos17x,求f()的值.【解】由sinx=,得x=2kπ+或x=2kπ+(k∈Z).∵sin(2kπ+)=sin,sin(2kπ+)=sin,∴f()=f(sin)=cos=cos(2π+)=cos=cos(π-)=-cos=-,或f()=f(sin)=cosxKb1.Com=cos(14π+)=cos=.即f()=±.系列资料www.xkb1.com
