因为f(x)=cos2x-cos(2x+2π/3)-2sin²(x+π/6)+1=cos2x-cos2xcos2π/3+sin2xsin2π/3+cos(2x+π/3)=cos2x+1/2cos2x+根号3/2sin2x+1/2cos2x-根号3/2sin2x=2cos2x所以f(x)的最大值是2,此时cos2x=1.