Respuesta :
Answer:
[tex]c = 4\sqrt2\\\\S'(4\sqrt2) = 0\\\\S''(4\sqrt2)=\frac{1}{2\sqrt2}[/tex]
Step-by-step explanation:
We are given the following information in the question:
The product of two numbers is 32.
Let the two numbers be x and y, then,
[tex]x\times y = 32\\\\y = \displaystyle\frac{32}{x}[/tex]
The sum of the two numbers = S(x)
[tex]S(x) = x + \displaystyle\frac{32}{x}[/tex]
First, we differentiate S(x) with respect to x, to get,
[tex]\displaystyle\frac{d(S(x))}{dx} = \frac{d( x +\frac{32}{x})}{dx} = 1 - \frac{32}{x^2}[/tex]
Equating the first derivative to zero, we get,
[tex]\frac{d(S(x))}{dx} = 0\\\\1 - \frac{32}{x^2}= 0[/tex]
Solving, we get,
[tex]x =\pm \sqrt{32}[/tex]
Again differentiation S(x), with respect to x, we get,
[tex]\displaystyle\frac{d^2(S(x))}{dx^2} =\frac{64}{x^3}[/tex]
At[tex]x =\sqrt{32}[/tex],
[tex]\frac{d^2(S(x))}{dx^2} > 0[/tex]
Thus, minima occurs at x = [tex]\sqrt{32}[/tex] for S(x).
If c be the smaller of the two numbers that minimize the sum, then,
[tex]c = \sqrt{32} = 4\sqrt2\\\\S'(c) = 1 - \displaystyle\frac{32}{32} = 0\\\\S''(c) = \frac{64}{32\sqrt{32}} = \frac{1}{2\sqrt2}[/tex]
