0)的周期为π,f(x)≤2,f(π/4)=√3(1)求f(x)表达式(2)求递增空间
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(1),f(x)=asinωx+bcosωx=
√a^2+b^2 sin(ωx+t),其中t为辅助角,且tant=b/a ,
∴T=2π/w =π,∴ω=2
∵ f(π/4 )=√3 ,∴asinπ/2+bcosπ/2 =√3 ,即a=√3
∵f(x)的最大值为2,∴
√(a^2+b^2) =2,解得,b=1
∴ f(x)=√3sin2x+cos2x
(2)由(1)得,f(x)=√3sin2x+cos2x =2sin(2x+π/6 )
令 -π/2 +2kπ ≤2x+π/6 ≤π/2 +2kπ ,k∈Z,解得,kπ-π/3 ≤x≤kπ+π/6 ,k∈Z
∴函数的单调递增区间 [kπ-π/3 ,kπ+π/6 ],k∈Z ;