1)
f(x)=-x^4+2x^2+3
x∈[-3,2]
2)f(x)=(x+1)/(x^2+1)
x∈[0,4]
解:1)f(x)=-x^4+2x^2+3
=-x^4-x^2+3x^2+3
=-(x^2+1)x^2+3(x^2+1)
=(x^2+1)(3-x^2)
观察易知最小值是当x=-3时取到,此时f(x)的最小值=10*(-6)=-60
最大值易知时正的,那么此时3-x^2>0,而x^2+1>0
又∵x^2+1+3-x^2=4,即和为定值,积有最大值
(用ab<=[(a+b)/2]²,a>0,b>0)
(把a=x^2+1,b=3-x^2)
所以(x^2+1)(3-x^2)<=[(x^2+1+3-x^2)/2]²=4,此时x²=1,x=±1显然x能取到
所以最大值是4
2)令y=f(x)=(x+1)/(x^2+1)
x∈[0,4]
=(x^2-x^2+x+1)/(x^2+1)
=1-(x^2-x)/(x^2+1)
yx^2+y=x+1,整理得yx^2-x+y-1=0,看做是x得二次方程,它有解则判别式>=0
b^2-4ac=1-4y(y-1)>=0
-4y^2+4y+1>=0
4y^2-4y-1<=0
4y^2-4y+1-2<=0
(2y-1)²<=2
-√2<=2y-1<=√2
-√2+1<=2y<=√2+1
(-√2+1)/2<=y<=(√2+1)/2
所以y的最大值为(√2+1)/2,因为这里的y的最小值取不到,所以y得最小值为x=4时取到,所以为4+1/16+1=1/17
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