【答案】D
【解析】解:由題意知����,f(x+1)=﹣f(x),
∴f(x+2)=﹣f(x+1)=f(x)�����,
即函數(shù)f(x)是周期為2的周期函數(shù).
若x∈[0��,1]時(shí)�,﹣x∈[﹣1�����,0]�����,
∵當(dāng)x∈[﹣1�,0]時(shí)�����, 
��,
∴當(dāng)x∈[0����,1]時(shí), 
����,
∵f(x)是偶函數(shù)����,∴f(x)= �����,
即f(x)= 
.
∵函數(shù) 
��,
∴g(x)= 
�����,
作出函數(shù)f(x)和g(x)的圖象如圖:
當(dāng)﹣1<x<0時(shí)��,由 
= 
��,
則 
�,由選項(xiàng)驗(yàn)證解得x= 
��,
即此時(shí)不等式式f(x)<g(|x+1|)的解為﹣1<x< ���,
∵函數(shù)g(x)關(guān)于x=﹣1對(duì)稱����,
∴不等式式f(x)<g(x)的解為﹣1<x< 或 
<x<﹣1�����,
即不等式的解集為( ,﹣1)∪(﹣1���, )���,
故選:D.
【考點(diǎn)精析】本題主要考查了奇偶性與單調(diào)性的綜合的相關(guān)知識(shí)點(diǎn),需要掌握奇函數(shù)在關(guān)于原點(diǎn)對(duì)稱的區(qū)間上有相同的單調(diào)性���;偶函數(shù)在關(guān)于原點(diǎn)對(duì)稱的區(qū)間上有相反的單調(diào)性才能正確解答此題.
