设函数f(x)=根号3 cos^2x+sinxcosx - 根号3/2 (1)求函数的最小正周期T,并求出函数的单调递增区间(2)求在【0,3派)内使函数取得最大值的所有X的和

问题描述:

设函数f(x)=根号3 cos^2x+sinxcosx - 根号3/2 (1)求函数的最小正周期T,并求出函数的单调递增区间
(2)求在【0,3派)内使函数取得最大值的所有X的和

f(x)=√3/2*[2(cosx)^2-1+1/2(2sinxcosx)
=1/2*sin2x+√3/2*cos2x
=sin2x*cosπ/3+cos2x*sinπ/3
=sin(2x+π/3)
所以最小正周期为
2π/2=π
单调增区间为-π/2+2kπ得到-5/12π+kπ【0,3派)内x值有
π/12,13/12π,25/12π
和为39/12π

f(x)=根号3 cos^2x+sinxcosx - 根号3/2
=根号3cos2x/2+sin2x/2
=sin(2x+π/3)
所以最小正周期为T=2π/2=π
单调递增区间为[nπ-5π/12,nπ+π/12]
单调递减区间为[nπ+π/12,nπ+7π/12]
在[0,3π)之间,取最大值的时候,x的解为x=π/12,x=13π/12,x=25π/12
求和得:13π/4

f(x)=根号3 cos^2x+sinxcosx - 根号3/2
=(√3/2)(1+cos2x)+(1/2)sin2x-√3/2
=(√3/2)cos2x+(1/2)sin2x
=sin(2x+π/3)
(1) 最小正周期T=2π/2=π
单增区间2x+π/3∈[2kπ-π/2,2kπ+π/2]
即x∈[kπ-5π/12,kπ+π/12]
(2) x∈[0,3π] 2x+π/3∈[π/3,6π+π/3]
满足最大值条件的有2x+π/3=π/2,2π+π/2,4π+π/2,
所以x=π/12,π+π/12,2π+π/12,
所有x的和=π/12+π+π/12+2π+π/12=3π+π/4=13π/4