已知向量a=sinx,cosx向量b=sinx
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a.b=(sinx-cosx)(sinx+cosx)+2cosxsinx=sin2x-cos2x=3/5=>(sin2x-cos2x)^2=9/251-2sin2xcos2x=9/25sin4x=16
f(x)=a*b=2sinxcosx+(sinx+cosx)(cosx-sinx)=sin2x+cos2x=√2sin(2x+π/4)1)当x∈[0,π/2]时2x+π/4∈[π/4,π/4+π]当2
解f(x)=a*b=2sinxcosx+2cos²x=sin2x+2cos²x-1+1=sin2x+cos2x+1=√2sin(2x+π/4)+1∴最小正周期为:T=2π/2=π∵
f(x)=(2sinx)×(√3cosx)+(cosx+sinx)×(sinx-cosx)f(x)=2√3sinxcosx-(cos²x-sin²x)f(x)=√3sin2x-co
这个.我还以为什么压轴难题呢.完全口算就可以了嘛(玩笑..)应该是f(x)=sin2x+cos2x然后f(x)=√2sin(2x+π/4)(如果我没记错的话)当2x+π/4=π/2时,f(x)取到最大
f(x)=2(cosx)^2+2根号3sinxcosx=cos2x+1+根号3sin2x=2sin(2x+Pai/6)+1单调增区间是:-Pai/2+2kPai
f(x)=mn=2cos^2x+2√3sinxcosx+a-1+1=cos2x+√3sin2x+a+1=2sin(2x+π/6)+a+1f(x)=0sin(2x+π/6)=(-a-1)/2f(x)在【
1)a-b=(-2cosx,2sinx/2-2cosx/2)f(x)=2+sinx-(1/4)[4cos²x+4(sin²x/2+cos²x/2-2sinx/2cosx/
(1)、|a|=√[(sinx)^2+(cosx)^2]=1,|c|=1,a•c=-cosx,设向量a、c的夹角为α,cosα=a•c/(|a|*|c|)=-cosx/1,x=
f(x)=向量a×向量b=(sinx,√3cosx)*(cosx,cosx)=sinxcosx+√3cosxcosx=1/2(2sinxcosx+2√3cosxcosx)=1/2(sin2x+√3co
1.f(x)=2(√3sinxcosx+(cosx)^2)+2m-1=√3sin2x+cos2x+2m=2sin(2x+pi/6)+2m最小正周期=pi2.x属于[0,pi/2]f(x)最小值=2si
f(x)=向量a.向量b.=(1+sin2x)*1+(sinx-cosx)*(sinx+cosx).=1+sin2x-(cos^2x-sin^2x).=1+sin2x-cos2x.=1+√2sin(2
(1)a*b=0sin2x-cos2x=0sqr(2)sin(2x-π/4)=0x=π/8+kπ/2,k∈Z(2)f(x)=sqr(2)sin(2x-π/4)x∈(3π/8+kπ,7π/8+kπ),k
f(x)=cos^2x+sinxcosx=1/2(sin2x+cos2x)+1/2=√2/2sin(2x+π/4)+1/21.增[kπ-π/8,kπ+3π/8]2.f(B)=√2/2sin(2B+π/
⑴a=(√3/2,1/2).c=(-1,0).cos<a,c>=a·c/(|a||c|)=-√3/2向量a,c的夹角=5π/6.⑵f(x)=sin2x-cos2x=√2sin(2x-π/4).注意3π
f(x)=2√3cosx^2+2sinxcosx=sin2x+√3(cos2x+1)=sin2x+√3cos2x+√3=2sin(2x+π/3)+√3后面应该会解吧?
没错,f(x)=2sin(2x+π/6)周期T=2π/2=π因为-1≤sin(2x+π/6)≤1f(x)max=2f(x)min=-2
f(x)=a·b=sin²x-√3sinxcosx²=1/2-(cos2x+√3sin2x)/2=1/2-sin(2x+π/6)单调递增区间2x+π/6∈[(2n+1/2)π,(2
(1)a⊥b则:f(x)=sinxcosx+√3cosxcosx=sin2x/2+√3(1+cos2x)/2=sin(2x+π/3)+√3/2=0∴2x+π/3=2kπ+3π/2±π/6∴x=kπ+7
1)因为X=π/6,所以向量a=(根号3/2,1/2),根据公式a•c=|a|*|c|*cos<a,c>所以向量a与向量c的乘积为cosπ/6*(-1)+sinx*0=负根号3/2,向量a