(1)若x+y=5,求3^x+3^y的最小值?(2)若x、y、z为正实数,满足x+2y+3z=0,则y^2/xz最小值为?
网友回答
(1)因x+y=5,
3^x+3^y≥2√(3^x*3^y)=2*√3^(x+y)=2*√3^5=18√2
(2)据x+2y+3z=0,
y^2=(x+3z)^2/4
y^2/xz=(x^2+6xz+9z^2)/4xz=x/4z+3/2+(9z)/(4x)≥3/2+2√(9/4)=9/2
(x、y、z为正,不可能小于等于0)
======以下答案可供参考======
供参考答案1:
1、3^x+3^y=3^x+3^(5-x)≥2√3^x*3^(5-x)=2√3^5=18√3;
2、x=-2y-3z代入y^2/xz=-y²/(3z²+2yz)=1/(1/3-3(z/y+1/3)²);
∵1/(1/3-3(z/y+1/3)²)≥3,最小值为3;若y=0,则为0,若xz