f(x)=2[sin(x+Ï/4)]^2-â3cos(2x)=1-cos[2(x+Ï/4)]-â3cos(2x)
=1-cos(2x+Ï/2)-â3cos(2x)
=1+sin(2x)-â3cos(2x)
=1+2[sin(2x)*1/2-cos(2x)*â3/2]
=1+2*[sin(2x)cos(Ï/3)-cos(2x)sin(Ï/3)]
=1+2sin(2x-Ï/3)
å 为 xâï¼Ï/4ï¼Ï/2ï¼ï¼æ以å½æ°ä¸æ¯å¨æå½æ°ï¼æ æå°æ£å¨æ ã
ç± Ï/6<2x-Ï/3<=Ï/2 å¾ Ï/4<x<=5Ï/12 ï¼æ以å¢åºé´æ¯ ï¼Ï/4ï¼5Ï/12ãã
ç± Ï/4<x<Ï/2 å¾ Ï/6<2x-Ï/3<2Ï/3 ï¼æ以 å½æ°å¼å为 ï¼2 ï¼3ãã
=1-cos(2x+Ï/2)-â3cos(2x)
=1+sin(2x)-â3cos(2x)
=1+2[sin(2x)*1/2-cos(2x)*â3/2]
=1+2*[sin(2x)cos(Ï/3)-cos(2x)sin(Ï/3)]
=1+2sin(2x-Ï/3)
å 为 xâï¼Ï/4ï¼Ï/2ï¼ï¼æ以å½æ°ä¸æ¯å¨æå½æ°ï¼æ æå°æ£å¨æ ã
ç± Ï/6<2x-Ï/3<=Ï/2 å¾ Ï/4<x<=5Ï/12 ï¼æ以å¢åºé´æ¯ ï¼Ï/4ï¼5Ï/12ãã
ç± Ï/4<x<Ï/2 å¾ Ï/6<2x-Ï/3<2Ï/3 ï¼æ以 å½æ°å¼å为 ï¼2 ï¼3ãã
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第1个回答 2012-04-12
解:
f(x)=[1-cos(π/2+2x)]-√3cos2x
=1+sin2x-√3cos2x
=2*[sin2x*cos(π/3)-cos2x*sin(π/3)]+1
=2sin(2x-π/3)+1
(1)T=2π/2=π
(2) 2kπ-π/2≤2x-π/3≤2kπ+π/2
2kπ-π/6≤2x≤2kπ+5π/6
kπ-π/12≤x≤kπ+5π/12
增区间是【kπ-π/12,kπ+5π/12】,k∈ Z本回答被提问者采纳
f(x)=[1-cos(π/2+2x)]-√3cos2x
=1+sin2x-√3cos2x
=2*[sin2x*cos(π/3)-cos2x*sin(π/3)]+1
=2sin(2x-π/3)+1
(1)T=2π/2=π
(2) 2kπ-π/2≤2x-π/3≤2kπ+π/2
2kπ-π/6≤2x≤2kπ+5π/6
kπ-π/12≤x≤kπ+5π/12
增区间是【kπ-π/12,kπ+5π/12】,k∈ Z本回答被提问者采纳
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