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(1)f'(x)=e^x-e,在(-∞,1)内,f'<0,f单调下降;在(1,+∞)内,f'>0,f单调上升;
(2)此问不明确,如取x=1,m=2e,则f(x)<0
(3)F(x)=f(x)+f(-x)=e^x-mx+e^(-x)+mx=e^x+e^(-x)
设g(x)=-lnF(x)
g'(x)=-[e^x-e^(-x)]/[e^x+e^(-x)],g''(x)=-4/[e^x+e^(-x)]^2<0
故g(x)是上凸函数,由Jensen不等式
∑-1/n*lnF(n)<=-lnF(∑1/n*k)=-lnF((n+1)/2)
即1/n∑lnF(n)>=lnF((n+1)/2)=1/2ln{e^[(n+1)/2]+e^[-(n+1)/2]}^2
=1/2ln{e^(n+1)+2+e^[-(n+1)]}>1/2ln[e^(n+1)+2]
ln[F(1)*F(2)*...*F(n)]>ln[e^(n+1)+2]^(n/2)
故F(1)*F(2)*...*F(n)>[e^(n+1)+2]^(n/2)
(2)此问不明确,如取x=1,m=2e,则f(x)<0
(3)F(x)=f(x)+f(-x)=e^x-mx+e^(-x)+mx=e^x+e^(-x)
设g(x)=-lnF(x)
g'(x)=-[e^x-e^(-x)]/[e^x+e^(-x)],g''(x)=-4/[e^x+e^(-x)]^2<0
故g(x)是上凸函数,由Jensen不等式
∑-1/n*lnF(n)<=-lnF(∑1/n*k)=-lnF((n+1)/2)
即1/n∑lnF(n)>=lnF((n+1)/2)=1/2ln{e^[(n+1)/2]+e^[-(n+1)/2]}^2
=1/2ln{e^(n+1)+2+e^[-(n+1)]}>1/2ln[e^(n+1)+2]
ln[F(1)*F(2)*...*F(n)]>ln[e^(n+1)+2]^(n/2)
故F(1)*F(2)*...*F(n)>[e^(n+1)+2]^(n/2)
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