设函数fx=2cos²x 2√3sinxcosx-1
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fx=-√3cos2x-sin2x=-2sin(2x+π/3)所以最小正周期为πf'x=-4cos(2x+π/3),f'x>0时递增x在(π/12,π/3)上递增f'x=0,x=π/12.极小值f(π
f(x)=sin2x+2√3cosxcosx=sin2x+√3(1+cos2x)=sin2x+√3cos2x+√3=2sin(2x+π/3)+√3T=2π/2=π
你好,这题应该这样1.f(x)=cos(2x+π/3)+sin²X=负二分之根号三sin2x+二分之一所以最大值为﹙√3+1﹚/2最小正周期为π2.可知COSB=1/3sinC=√3/2∵C
f(x)=sin²x+√3sinxcosx+2cos²x,=√3sinxcosx+cos²x+1=√3/2sin2x+1/2(1+cos2x)+1=√3/2sin2x+1
fx=2cos^2x+2根号3sinxcosx-1=2cos^2x-1+2根号3sinxcosx根据倍角公式,sin2α=2sinαcosαcos2α=2cos^2(α)-1fx=cos2x+根号3s
(1)f(x)=√3sinx·cosx+cos²x+2m-1=1/2*(√3*2*sinx·cosx+2cos²x)+2m-1=1/2*(√3*sin2x+cos2x+1)+2m-
f(x)=cos(2x-4π/3)+2cos^2x=cos(2x-4π/3)+cos2x+1=2cos(2x-2π/3)cos2π/3+1=1-√3cos(2x-2π/3)1.当cos(2x-2π/3
再问:第5步为什么要提出一个√3/3,sin前面的1/2去哪了?再答:1/2哪去了?哪也没去啊?只是换了一种存在的方式而已:[(√3)/3]×[(√3)/2]=1/2
再答:这是高一的题目吧再答:不谢,复习加油
F(X)=cos(√3x+t)F'(X)=-√3sin(√3x+t)F(X)+F'(X)=cos(√3x+t)-√3sin(√3x+t)是奇函数所以F(0)+F'(0)=0即cost-√3sint=0
解析:∵F(X)=X^3-2eX^2+mX-lnX ,记G(X)=F(X)/X则g(X)=X^2-2eX+m-lnX/x令G ‘(X)=2X-2e+(lnX-1)/x^2=0==&
f(x)=cos(2x-π/3)-cos2x=1/2cos2x+√3/2sin2x-cos2x=√3/2sin2x-1/2cos2x=sin(2x-π/6)最小正周期T=2π/2=π(2)0
f(x)=[1-cos(2x)]/2+sin(2x)+3[1+cos(2x)]/2=sin(2x)+cos(2x)+2=√2sin(2x+π/4)+2.周期T=kπ,k∈Z且k≠0.最小正周期为π.
设函数fx=2cos^2(π/4-x)+sin(2x+π/3)-1=cos(PI/2-2x)+sin(2x+PI/3)=sin(2x)+sin(2x)/2+cos(2x)*sqrt(3)/2=sqrt
(1)∵cos2x=2cos^2x-1∴f(x)=1/2+cos(2x+π/6)/2对称轴2x0+π/6=π+2kπx0=5π/12+kπg(x0)=1+1/2sin(5π/6+2kπ)=5/4(2)
①f(x)=cos﹙2x-4π/3﹚+2cos²x=cos2xcos4π/3+sin2xsin4π/3+1+cos2x=1/2cos2x-√3/2sin2x+1=cos(2x+π/3)+1当
f(x)=√3sin2x+cos2x=2sin(2x+π/6)∴f(x0)=2sin(2x0+π/6)=6/5∴sin(2x0+π/6)=3/5∵x0∈[π/4,π/2]∴2x0+π/6∈[2π/3,
解f(x)=2cos^2x+2√3sinxcosx-1=√3sin2x+cos2x=2sin(2x+π/6)∴最小正周期为:2π/2=π再答:不懂追问再问:在三角形ABC中,角ABC所对的边分别是ab
解由fx=x2-2lnx知x>0求导得f'(x)=2x-2/x=(2x^2-2)/x令f'(x)=0解得x=1或x=-1当x属于(0,1)时,f'(x)<0当x属于(1,正无穷大)时,f'(x)>0故