设f(x)=x/(1-x),求f(f(x))与f(f(f(x)))的表达式.
f(f(x))=f[x/(1-x)] =[x/(1-x)]/{1-[x/(1-x)]} =x/(1-2x) 其定义域为(-∞,1/2)∪(1/2,1)∪(1,+∞) f(f(f(x)))=f[x/(1-2x)] =[x/(1-2x)]/{1-[x/(1-2x)]} =x/(1-3x) 其定义域为(-∞,1/3)∪(1/3,1/2)∪(1/2,1)∪(1,+∞)
设f(x)=x/(1-x),求f(f(x))与f(f(f(x)))的表达式.
f(f(x))=f[x/(1-x)] =[x/(1-x)]/{1-[x/(1-x)]} =x/(1-2x) 其定义域为(-∞,1/2)∪(1/2,1)∪(1,+∞) f(f(f(x)))=f[x/(1-2x)] =[x/(1-2x)]/{1-[x/(1-2x)]} =x/(1-3x) 其定义域为(-∞,1/3)∪(1/3,1/2)∪(1/2,1)∪(1,+∞)
