(1)當(dāng)θ=0時(shí),求f(x)的單調(diào)增區(qū)間;
(2)θ∈(0,π),且sinx不恒為0,則θ為何值時(shí),f(x)為偶函數(shù)?
解:(1)當(dāng)θ=0時(shí),f(x)=sinx+cosx=
sin(x+
).
由2kπ-
≤x+
≤2kπ+
(k∈Z),得
2kπ-
≤x≤2kπ+
(k∈Z).
∴f(x)的單調(diào)增區(qū)間是[2kπ-
,2kπ+
](k∈Z).
(2)∵f(x)為偶函數(shù),∴f(x)=f(-x).
∴sin(-x+θ)+cos(-x-θ)=sin(x+θ)+cos(x-θ).
∴sin(x+θ)+sin(x-θ)=cos(x+θ)-cos(x-θ).
展開(kāi)整理得2sinxcosθ=-2sinxsinθ.
∵sinx不恒為零,∴cosθ=-sinθ.
∴tanθ=-1,θ=kπ-
(k∈Z).
又∵θ∈(0,π),∴θ=
.
故θ=
時(shí),f(x)為偶函數(shù).
將正奇數(shù)列{2n-1}中的所有項(xiàng)按每一行比上一行多一項(xiàng)的規(guī)則排成如下數(shù)表: