设f(x)=2√3sin

f(x)=cos(2x+π/3)+sin²x=cos2xcosπ/3-sin2xsinπ/3+[1-cos(2x)]/2=1/2cos2x-√3/2sin2x+1/2-1/2cos2x=-√

你啊,要好好学习了!还没有悬赏分?把对称轴即x=∏／8代入原式子,即sin(∏／4+φ)=1或者-1,再用(-π

1.(1)f(x)=cos(2x+π/3）+sin(平方）x=1/2cos2x-根号3/2sin2x+sin（平方）x+1/2-1/2=1/2cos2x-根号3/2sin2x-1/2cos2x+1/2

f(x)=cos2x*1/2-√3*sin2x+(1-cos2x)/2=cos2x-√3sin2x+1/2=2cos(2x+π/3)+1/2所以最小正周期T=2π/2=π当cos（2x+π/3）=1取

f(x)=cos(2x+π/3)+sin^2X=1/2cos2x-根号3/2sin2x+(1-cos2x)/2=1/2-根号3/2sin2x因为f(c/2)=-1/4,所以sinC=根号3/2,cos

(1)f(x)=cos(2x+π/3)+sin²x=1/2cos2x*-√3/2sin2x*+(1-cos2x)/2=1/2-√3/2*sin2xT=2pi/2=pi最大值是1/2+√3/2

f(x)=cos(2x+π/3)+sin^2x-1/2=cos(2x+π/3)+(1-cos2x)/2-1/2=cos2xcos(π/3)-sin2xsin(π/3)-cos2x*1/2=-√3/2*

原式=1/2+根3/2sin2X1)求函数f(x)的最大值1/2+根3/2,最小正周期π

f(x)=cos(2x+π/3)+sin²X=1/2*cos2x-√3/2*sin2x+(1/2)(1-cos2x)=1/2-√3/2*sin2x,(1)f(x)的最大值=（1+√3）/2.

1.展开后：f(x)=-(√3/2)sin2x+(1/2)f(x)max=√3/2-1/2T=π2.∵f(C/2)=-1/4∴-(√3/2)sin2(C/2)+(1/2)=-1/4sinC=√3/2∵

1）由三角函数和差化积公式：f(x)=2sin(x+x+π/3)/2cos(x-x-π/3)/2=2sin(x+π/6)cos(π/6)=√3sin(x+π/6)f(x)的最小值为-√3.当x+π/6

找规律啊f(1)=1/2f(2)=(根号3)/2f(3)=1f(4)=(根号3)/2f(5)=1/2f(6)=0f(7)=-1/2f(8)=-(根号3)/2f(9)=-1f(10)=-(根号3)/2f

f(x)=sin2(x+y/2)由于sin2x对称轴为π/4+kπ/2;故x+y/2=π/4+kπ/2x=π/4+kπ/2-y/2;将x=x=π/8代入,得y=π/4+kπ,根据y的范围可知：y=-3

f'（x）=sinθx²+√3cosθxf'（1）=sinθ+√3cosθ=（1/2）×sin（θ+π/6）θ∈[0,5π/12],则θ+π/6∈[π/6,7π/12].∴θ+π/6=π/2

先化简表达式：      ∴函数的最小正周期是        

1）f(x)=sin(2x+φ)一条对称轴是X=π/8则kπ+π/2=2*π/8+φ===>φ=kπ+π/4因为-π

2x+φ＝kπ＋π/2,x＝(kπ＋π/2－φ)/2(kπ＋π/2－φ)/2＝π/8当k＝0时,φ＝π/4

1.由f(x)=sin(2x+φ)一条对称轴是直线x=π/2可得：在x=π/2时,函数取极值.则2*π/2+φ=kπ+π/2(k∈Z)φ=kπ-π/2又-π

先化简原式,得到f(x)=2sin(2x+π/6)你的那个式子应该错了,应该是f(A)=2吧这样得到角A=π/6向量AB*向量AC=边AB*边AC*cosA这样得到AB*AC=2再利用不等式[(AB)

f(x)=sin(2x+a)是R上的偶函数有f(x)=f(-x);sin(2x+a)=sin(-2x+a)=cos(π/2-(-2x+a))=cos(π/2+2x-a)余弦函数为R上的偶函数,a=π/