已知函数f(x)=sinωx的平方 根号3sinωxsin(ωx 二分之π)
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①原式=f(x)=2cos2x+sinx^2=2cos2x+1-cos2x/2=3/2cos2x+1/2故f(π/3)=3/2*cos2π/3+1/2=-3/4+1/2=-1/4②依f(x)=3/2c
f(x)=sin²x+sinxcosx=[1-cos(2x)]/2+sin(2x)/2=sin(2x)/2-cos(2x)/2+1/2=(√2/2)sin(2x-π/4)+1/2最小正周期T
其图像经过点M(π/3,1/2)代入f(x)=sin(x+φ)1/2=sin(π/3+φ)∵0<φ<π∴π/3<π/3+φ<4π/3∵1/2=sin(π/3+φ)∴π/3+φ=
1.sin(x-π/6)2.可知半周期为2π/3,又在区间(0,π/3)上是增函数,故ω>0,2π/ω=4π/3从而ω=1.5
1、由于函数g(x)=sin(2(x-a)+π/3)为偶函数,所以g(x)的图像关于y轴对称,即函数g(x)当x=0时取得最值,所以g(0)=±1,解得sin(π/3-2a)=±1,sin(2a-π/
∵f(x)=2sin(π-x)cosx=2sinxcosx=sin2x1、最小正周期T=2π/2=π.2、∵-π/6≤x≤π/2∴-π/3≤2x≤π,∴-√3/2≤f(x)≤1,∴最大值1,最小值-√
f(x)=sin2x-2sin^2x=sin2x+cos2x-1=√2sin(2x+π/4)-1.(1)T=2π/2=π.(2).当2x+π/4=2kπ+π/2,k∈Z,即x=kπ+π/8,k∈Z时,
f(x)=cosx+sinxf(x)=√2sin(x+π/4)(1)递增区间:2kπ-π/2≤x+π/4≤2kπ+π/2得:2kπ-3/4π≤x≤2kπ+π/4递增区间是:[2kπ-3π/4,2kπ+
f(x)=sin²(x)+(√3)sin(x)cos(x)+2cos²(x)=3/2+√3/2sin2x+1/2cos2x=3/2+sin(2x+π/6)函数f(x)的最小正周期T
函数f(x)=sin(ωx+π4)的图象向左平移π6个单位后得到函数f(x)=sin(ωx+π4+ωπ6)的图象,由已知可知,它的与函数g(x)=sin(ωx+π6)的图象重合,所以π4+ωπ6=2k
f(x)=sin2x+cos2x-1=√2sin(2x+π/4)-1.1、最小正周期是π,最大值时2x+π/4=2kπ+π/2,即x=kπ+π/4,k是整数.再问:已知函数f(x)=2sin(∏-X)
首先:定义域只有这一个,X+π/4≠2Kπ,所以X≠-π/4+2kπ..附上值域,化简原函数:f(X)=cos2X/[√2/2(sinX+cosX)]f(x)=(cos²X-sin²
因为f(x)=sinx+cosx=√2sin(x+π/4)第一题T=2π/1=2π第二题当sin(x+π/4)=1时,为最大值,即f(x)=√2sin(x+π/4)=-1时,为最小值,即f(x)=-√
∵函数f(x)=sin(ωx+φ)(w>0,0≤φ≤π)是R上的偶函数∴f(-x)=f(x)→sin(-wx+φ)=sin(wx+φ)→-sinωxcosφ=sinωxcosφ∵sinωx不恒等于0,
f(x)=cos(x-π/3)-sin(π/2-x)=(1/2)cosx+(√3/2)sinx-cosx=(√3/2)sinx-(1/2)cosx=sin(x-π/6),它的最小值=-1.
cos2x=1-2sin平方xsin2x=2sinxcosxf(x)=(1-cos2x)/2+(sin2x)/2=1/2+(sin2x-cos2x)/2=1/2+根号2/2*sin(2x-∏/4)T=
f(x)=-√3sinωxcosωx+cos²ωx=-(√3/2)sin(2ωx)+[1+cos(2ωx)]/2=cos(2ωx)*cos(π/3)-sin(2ωx)*sin(π/3)+1/
答:1)f(x)=√3cos²x+sinxcosx-√3/2=(√3/2)(2cos²x-1)+(1/2)*2sinxcosx=(√3/2)cos2x+(1/2)sin2x=sin
f(x)=sin^2x+2√3sinxcosx+3cos^2x=1+√3sin2x+2cos^2x-1+1=√3sin2x+cos2x+2=2(sin2x*√3/2+cos2x*1/2)+2=2sin
f(x)=2cosx+sin^2x=-cos^2x+2cosx+1令t=cosx则f(x)=-t^2+2t+1=-(t-1)^2+2因为t∈[-1,1]所以当t=1时,f(x)有最大值2