f(x)=sin(2x+φ) φ是 实数f(x)≤f(π/6)的绝对值x属于R恒成立且f(π/2)>f(π)则f(x)单调递增区间
3个回答
展开全部
f(x)≤|f(π/6)|,
∴sin(π/3+φ)=土1,
π/3+φ=(k+1/2)π,k∈Z.
φ=(k+1/6)π,
由f(π/2)>f(π)得
sin[(k+7/6)π]-sin[(k+13/6)π]>0,
-2sin(π/2)cos[(k+5/3)π>0,取k=-1,
f(x)=sin(2x-5π/6),单调递增区间由
(2k-1/2)π<2x-5π/6<(2k+1/2)π确定,
(2k+1/3)π<2x<(2k+4/3)π,
∴(k+1/6)π<x<(k+2/3)π,为所求。
∴sin(π/3+φ)=土1,
π/3+φ=(k+1/2)π,k∈Z.
φ=(k+1/6)π,
由f(π/2)>f(π)得
sin[(k+7/6)π]-sin[(k+13/6)π]>0,
-2sin(π/2)cos[(k+5/3)π>0,取k=-1,
f(x)=sin(2x-5π/6),单调递增区间由
(2k-1/2)π<2x-5π/6<(2k+1/2)π确定,
(2k+1/3)π<2x<(2k+4/3)π,
∴(k+1/6)π<x<(k+2/3)π,为所求。
本回答由提问者推荐
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
展开全部
f(x)=sin(2x+φ), φ是 实数,f(x)≤︱f(π/6)︱,当x∈R恒成立,且f(π/2)>f(π)则f(x)单调递增区间是
解:∵对任何x,不等式f(x)≤︱f(π/6)︱恒成立,∴必有︱f(π/6)︱=︱sin(π/3+φ)︱=1,于是有
π/3+φ=±π/2 +2kπ,即φ=±π/2-π/3+2kπ=π/6+2kπ或-5π/6+2kπ,k∈Z;
又f(π/2)=sin(π+φ)=-sinφ>f(π)=sin(2π+φ)=sinφ,即有2sinφ<0,也就是有sinφ<0,故φ=-5π/6;
∴f(x)=sin(2x-5π/6).
由-π/2+2kπ≦2x-5π/6≦π/2+2kπ,得π/3+2kπ≦2x≦5π/6+2kπ,故单增区间为:
π/6+kπ≦x≦5π/12+kπ,k∈Z;
解:∵对任何x,不等式f(x)≤︱f(π/6)︱恒成立,∴必有︱f(π/6)︱=︱sin(π/3+φ)︱=1,于是有
π/3+φ=±π/2 +2kπ,即φ=±π/2-π/3+2kπ=π/6+2kπ或-5π/6+2kπ,k∈Z;
又f(π/2)=sin(π+φ)=-sinφ>f(π)=sin(2π+φ)=sinφ,即有2sinφ<0,也就是有sinφ<0,故φ=-5π/6;
∴f(x)=sin(2x-5π/6).
由-π/2+2kπ≦2x-5π/6≦π/2+2kπ,得π/3+2kπ≦2x≦5π/6+2kπ,故单增区间为:
π/6+kπ≦x≦5π/12+kπ,k∈Z;
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
展开全部
f(x)≤|f(π/6)|,
∴sin(π/3+φ)=土1,
π/3+φ=(k+1/2)π,k∈Z.
φ=(k+1/6)π,
由f(π/2)>f(π)得
-2sin(π/2)cos[(k+5/3)π>0,取k=-1,
f(x)=sin(2x-5π/6),单调递增区间由
(2k-1/2)π<2x-5π/6<(2k+1/2)π确定,
(2k+1/3)π<2x<(2k+4/3)π,
∴(k+1/6)π<x<(k+2/3)π,为所求
∴sin(π/3+φ)=土1,
π/3+φ=(k+1/2)π,k∈Z.
φ=(k+1/6)π,
由f(π/2)>f(π)得
-2sin(π/2)cos[(k+5/3)π>0,取k=-1,
f(x)=sin(2x-5π/6),单调递增区间由
(2k-1/2)π<2x-5π/6<(2k+1/2)π确定,
(2k+1/3)π<2x<(2k+4/3)π,
∴(k+1/6)π<x<(k+2/3)π,为所求
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
更多回答(1)
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
