摘要:(1)由8x f(x)4(x2+1).∴f(1)=8.f(-1)=0.∴b=4 又8x f(x)4(x2+1) 对恒成立.∴a=c=2 f2 k+s-5#u ==.D={x︱x-1 } X1=.x2=.x3=-.x4=-1.∴M={..-.-1}
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设函数f(x)=
(x>0),观察:f1(x)=f(x)=
,f2(x)=f(f1(x))=
,f3(x)=f(f2(x))=
,f4(x)=f(f3(x))=
…根据以上事实,由归纳推理可得当n∈N*且n≥2时,fn(x)=f(fn-1(x))=( )
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| 3x+4 |
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| 7x+8 |
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| 15x+16 |
设函数f(x)=
(x>0),观察:f1(x)=f(x)=
,f2(x)=f(f1(x))=
,f3(x)=f(f2(x))=
,f4(x)=f(f3(x))=
,根据以上事实,由归纳推理可得:当n∈N+且n≥2时,fn(x)=f(fn-1(x))=
.
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