作业帮fx=sin(2x+π/6)+sin(2x-π/6)+2(cosx)^2 (x∈R)1.求fx的最大值及此时x的取值集合2.求fx的单调增区间3.求y=sinx的图象经过怎样的变化得到fx
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fx=sin(2x+π/6)+sin(2x-π/6)+2(cosx)^2 (x∈R)1.求fx的最大值及此时x的取值集合2.求fx的单调增区间3.求y=sinx的图象经过怎样的变化得到fx
fx=sin(2x+π/6)+sin(2x-π/6)+2(cosx)^2 (x∈R)
1.求fx的最大值及此时x的取值集合
2.求fx的单调增区间
3.求y=sinx的图象经过怎样的变化得到fx
fx=sin(2x+π/6)+sin(2x-π/6)+2(cosx)^2 (x∈R)1.求fx的最大值及此时x的取值集合2.求fx的单调增区间3.求y=sinx的图象经过怎样的变化得到fx
1.用两角和与差的正弦公式展开化简得
f(x)=√3sin2x+1+cos2x=2sin(2x+π/6)+1,由此得2x+π/6=2kπ+π/2时,f(x)最大值为3,此时x的取值范围是{x∈R|x=kπ+π/6,k∈Z}.
以下两问只说结论了,符号太难打了
2.f(x)的单调增区间是[kπ-π/3,kπ+π/6],k∈Z.
3.可将y=sinx的图像向左平移π/6单位,再将所得图像各点纵坐标不变,横坐标变为原来的一半,然后将所得图像各点横坐标不变,纵坐标变为原来的2倍,最后再将所得图像各点向上平移11个单位得函数f(x)的图像.
f(x)=sin2x·cos(π/6)+cos2x·sin(π/6)+sin2x·cos(π/6)-cos2x·sin(π/6)+cos2x +1
=√3·sin2x+cos2x +1
=2[(√3/2)·sin2x+(1/2)·cos2x] +1
=2sin(2x+π/6) +1
1.令2x+π/6=2kπ+π/2,则sin(2x+π/6)=1,f(x)有最大值为...
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f(x)=sin2x·cos(π/6)+cos2x·sin(π/6)+sin2x·cos(π/6)-cos2x·sin(π/6)+cos2x +1
=√3·sin2x+cos2x +1
=2[(√3/2)·sin2x+(1/2)·cos2x] +1
=2sin(2x+π/6) +1
1.令2x+π/6=2kπ+π/2,则sin(2x+π/6)=1,f(x)有最大值为3,
此时,x的集合为 {x|x=kπ+π/6,k∈Z}
2.令 2kπ-π/2≤2x+π/6≤2kπ+π/2
解得 kπ-π/3≤x≤kπ+π/6,
即f(x)的增区间为[kπ-π/3,kπ+π/6],k∈Z
3.将y=sinx的图像纵坐标不变,横坐标缩小为原来的1/2,得y=sin2x的图像;
再将图像横坐标不变,纵坐标扩大为原来的2倍,得y=2sin2x的图像;
再向左平移π/12个单位,得y=2sin(2x+π/6)的图像;
最后,将图像向上平移1个单位,就得到y=2sin(2x+π/6) +1的图像.
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f(x)=sin2xcosπ/6+cos2xsinπ/6+sin2xcosπ/6-cos2xsinπ/6+cos2x+1
=根号3*sin2x+cos2x+1
=2sin(2x+π/6)+1
1、当2x+π/6=2kπ+π/2,即x=kπ+π/6,(k∈Z)时,f(x)的最大值为2*1+1=3
2、由2kπ-π/2<=2x+π/6<=2kπ+π/2,即kπ-π/3<...
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f(x)=sin2xcosπ/6+cos2xsinπ/6+sin2xcosπ/6-cos2xsinπ/6+cos2x+1
=根号3*sin2x+cos2x+1
=2sin(2x+π/6)+1
1、当2x+π/6=2kπ+π/2,即x=kπ+π/6,(k∈Z)时,f(x)的最大值为2*1+1=3
2、由2kπ-π/2<=2x+π/6<=2kπ+π/2,即kπ-π/3<=x<=kπ+π/6,(k∈Z)得增区间为[kπ-π/3,kπ+π/6]
3、将y=sinx 向左平移π/6个单位得到 y=sin(x+π/6),然后将其横坐标缩短为原来的1/2(纵坐标不变)得到 y=sin(2x+π/6),再将其坐标伸长为原来2倍(横坐标不变)得到y=2sin(2x+π/6),最后将得到图象向上移一个单位就得到了y=2sin(2x+π/6)+1和图象
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