【答案】
分析:化簡函數(shù)為同角同名函數(shù),利用2cos
2x-1=cos2x,sin2x+cos2x=)=
sin(2x+
).再利用正弦函數(shù)的性質(zhì),對(duì)稱軸方程x=kπ+
,k∈z;遞減區(qū)間為[2kπ+
,2kπ+
],k∈z,及函數(shù)圖象的變化規(guī)律解決.
解答:解:首先對(duì)函數(shù)進(jìn)行化簡,f(x)=2cos
2x+sin2x-1=sin2x+cos2x=
(sin2xcos
+cos2xsin
)=
sin(2x+
).
對(duì)①,令2x+
=kπ+
,得對(duì)稱軸方程x=
+
,k∈z,∴②正確;
對(duì)①,令2kπ+
<2x+
<2kπ+
,得 kπ+
<x<kπ+
,k∈z.函數(shù)的遞減區(qū)間為[kπ+
,kπ+
],k∈z,∴①√;
對(duì)③,平移的單位應(yīng)是
,∴③×.
對(duì)④,當(dāng)x∈[0,
]時(shí)f(x)單調(diào)遞增,當(dāng)x∈[
,
]時(shí)單調(diào)遞減,f(
)=
,f(
)=-1∴值域是[-1,
],∴④√.
故答案是①②④
點(diǎn)評(píng):牢記三角函數(shù)的性質(zhì)及圖象變化規(guī)律,利用整體代入求解復(fù)合函數(shù)的對(duì)稱軸、單調(diào)區(qū)間、值域是本題的關(guān)鍵.