已知函数fx=3sin(2x 6) (1)写出fx的最小周期
来源:学生作业帮助网 编辑:作业帮 时间:2024/10/05 02:33:10
(1)∵0≤x≤5,∴π3≤πx6+π3≤7π6,…(1分)∴−12≤sin(πx6+π3)≤1. …(2分)当πx6+π3=π2,即x=1时,sin(πx6+π3)=1,f(x
一个单调增区间的长度加上一个单调减区间的长度是一个周期所以这个函数的周期是T=Pi周期T=2Pi/w=Pi,所以w=2
f(x)=√3sin²x+sinxcosx=√3[(1-cos2x)/2]+1/2sin2x=1/2sin2x-√3/2cos2x+√3/2=sin(2x-π/3)+√3/2∵x∈[π/2,
(1)f(x)=2sin(2x+π/3)+2由2x+π/3=kπ+π/2,k∈Z得2x=kπ+π/6,k∈Z对称轴方程为x=kπ/2+π/12,k∈Z(2)g(x)=f(x)+m=2sin(2x+π/
2sinπ/6x=1-cosπ/3xf(x)=2sinπ/6x+sin(π/3x+π/6)—1=(1-cosπ/3x)+sinπ/3xcosπ/6+cosπ/3xsinπ/6-1=√3/2sinπx/
fx=2sin(2x+pai/6)振幅A=2最小正周期T=2pai/2=paix∈【0,pai/]2xE[0,2pai]2x+pai/6E[pai/6,2pai+pai/6]很明显,设u=2x+pai
周期等于2派.g(x)=2sinx;基函数再问:有过程吗??再答:这可以看出来,还要过程吗,,,,周期等于2派/x前的数1===2派;;g(x)=2sint(x+pi/3+p1/3)=2sinx;si
1)a=π/3,2x+π/6∈[-π/6,5π/6],从而f(x)∈[-1/2,1];再答:2)因为若f(x)的值域是[-1/2,1],所以2x+π/6∈[-π/6,7π/6],从而x∈[-π/6,π
1、最小正周期T=2π/2=π;最大值=2×1+2=4;2、单调递增式时-π/2+2kπ≤2x+π/3≤π/2+2kπ(k∈Z)-5π/6+2kπ≤2x≤π/6+2kπ(k∈Z)-5π/12+kπ≤x
答:f(x)=2sin(x-π/3)cosx+sinxcosx+√3(sinx)^2=sin(x-π/3+x)+sin(x-π/3-x)+sinxcosx+(√3/2)(1-cos2x)=sin(2x
f(x)=cos(2x-π/3)+2sin(x-π/4)sin(x+π/4)=cos(2x-π/3)+2sin(x-π/4)cos[π/2-(x+π/4)]=cos(2x-π/3)+2sin(x-π/
答:y=f(x)=2√3sinxcosx-2sin²x=√3sin2x+cos2x-1=2*[(√3/2)sin2x+(1/2)cos2x]-1=2sin(2x+π/6)-1y=f(x)关于
第一题A.第二题B
(1)化简可得f(x)=(sin(x/2))^2+((√3)/2)sinx-0.5f'(x)=sin(x/2)cos(x/2)+((√3)/2)cosx=sinx+√3cosx=0√3cosx=-si
你的分析前一半是对的,一直到“那么2x的单调增区间是[-4分之π,4分之π]”.2x的单调递增区间是[-π/2,π/2],x的才是[-π/4,π/4].所以函数在x=-π/3处取得最小值为-2分之根号
(1)fx=sin(2x+φ)经过点(π/12,1)sin(π/6+φ)=1∴π/6+φ=π/2+2kπ,k∈Z∴φ=π/3+2kπ,k∈Z∵0
解答;f(x)=sin(2x+3分之π)∴sin(2x+π/3)=-3/5∵x∈(0,π/2)∴2x+π/3∈(π/3,4π/3)∵sin(2x+π/3)
解1当2kπ-π/2≤2x+π/3≤2kπ+π/2,k属于Z时,y是增函数即2kπ-5π/6≤2x≤2kπ+π/6,k属于Z时,y是增函数即kπ-5π/12≤x≤kπ+π/12,k属于Z时,y是增函数
f(x)=√3sin2x-2sin²x=√3sin2x-(1-cos2x)=2sin(2x+π/6)-1∴当sin(2x+π/6)=1时f(x)max=2*1-1=1