已知向量a=(2根号3sinx,cosx sinx)

(1)F(x)=2(cosx)^2-2√3cosxsinx=cos2x-√3sin2x+1=2sin(2x-π/6)+1最小正周期T=π函数f（x）在【0,π】上的单调递增区间为[0,π/3]∪[5π

f(x)=向量a乘向量b=2sinx*√3cosx+(√2cosx+1)(√2cosx-1)=√3sin2x+2(cosx)²-1=√3sin2x+cos2x=2sin(2x+π/6)∴T=

f(x)=2[√3cosxsinx+2(cosx)^2]-2[(sinx)^2+(2cosx)^2]-1=√3sin2x-2(cosx)^2-3=√3sin2x-cos2x-4=2sin(2x-π/6

f(x)=(2sinx)×(√3cosx)＋(cosx＋sinx)×(sinx－cosx)f(x)=2√3sinxcosx－(cos²x－sin²x)f(x)=√3sin2x－co

第一题：（1）：f(x)=2倍sinx的平方+2倍根号3cosxsinx-1化简为：f(x)=-2cos（2x+π／3）显然f(x)在x=0处去最小为-1；在x=π／3处取最大为2（2）：f（x）=-

f(x)=2sinxcosx+2√3sinx^2-√3=sin2x+√3(1-cos2x)-√3=sin2x-√3cos2x+√3-√3f(x)=2sin(2x-∏/3)T=∏2x-∏/3=∏/2+k

(1)f(x)=msinxcosx-2√3（sinx)^2+√3=（m/2)sin2x+√3cos2x,x=π/6是函数y=f(x)的零点,∴（m/2+1)√3/2=0,m=-2.∴f(x）=-sin

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、f(x)=2sin²x＋2√3sinxcosx=1－cos2x＋√3sin2x=2sin(2x－π/6)＋1.当x∈[0,π/2]时,f(x)∈[2,3]；若f(x)关于直线x=a对称,

分析,f(x)=a*b-√3=2sinx*cosx+2√3sin²x-√3=sin(2x)-√3cos(2x)=2sin(2x-π/3)当,2kπ+π/2≦2x-π/3≦2kπ+3π/2∴k

f(x)=a*b=2sinxcosx+2√3(sinx)^2=sin(2x)+√3[1-cos(2x)]=2sin(2x-π/3)+√3,因为y=f(x+φ)=2sin(2x+2φ-π/3)+√3为偶

f(x)=2sinxcosx+2√3(cosx)^2-1-√3=sin2x+√3cos2x-1=2sin(2x+π/3)-1(1)当2x+π/3=π/2,即x=π/12时,f(x)取得最大值f(π/1

向量a=(sinx,-1),向量b=((√3)cosx,-1/2),函数f(x)=（a+b)•a-2；已知a,b,c分别为三角形ABC内角A,B,C的对边,其中A为锐角,a=2√3,c=4

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

请看图.

(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

（1）f(x)的最小正周期为π（2）f(x)的值域为[-2,2] 过程如下图： 

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)向量a=（2cosx,根号3）,b=（cosx,-sinx）a∥b,所以2cosx/cosx=√3/(-sinx)即sinx=-√3/2所以2cos²x-sinx=2(1-sin