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当x<=1时,n(x-1)<=0
n->∞时,e^[n(x-1)]->0
f(x)=(x^2*0+ax+b)/(0+1)
=ax+b
当x>1时,n(1-x)<0
n->∞时,e^[n(1-x)]->0
f(x)=lim(n->∞) {x^2+(ax+b)e^[n(1-x)]}/{1+e^[n(1-x)]}
=(x^2+0)/(1+0)
=x^2
因为f(x)在x=1处可导,所以
①f(1)=f(1-)=f(1+)
(ax+b)|(x=1)=(x^2)|(x=1)
a+b=1
②f'(1-)=f'(1+)
(ax+b)'|(x=1)=(x^2)'|(x=1)
a=2
综上所述,a=2,b=-1
n->∞时,e^[n(x-1)]->0
f(x)=(x^2*0+ax+b)/(0+1)
=ax+b
当x>1时,n(1-x)<0
n->∞时,e^[n(1-x)]->0
f(x)=lim(n->∞) {x^2+(ax+b)e^[n(1-x)]}/{1+e^[n(1-x)]}
=(x^2+0)/(1+0)
=x^2
因为f(x)在x=1处可导,所以
①f(1)=f(1-)=f(1+)
(ax+b)|(x=1)=(x^2)|(x=1)
a+b=1
②f'(1-)=f'(1+)
(ax+b)'|(x=1)=(x^2)'|(x=1)
a=2
综上所述,a=2,b=-1
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