A metal box with a square base and vertical sides is to contain $1024 c m^{3}$ . The material for the top and bottom costs $₹ 5 / c m^{2}$ and the material for the sides costs $₹ 2.50 / c m^{2}$ . Find the least cost of the box.

Open in App

Solution

Apply the concept of Maxima and Minima.
Given the volume of the box $= 1024 c m^{3}$
Let length of the side of square base be $x c m$ and height of the box be $y c m$ .
Volume of box $= x^{2} y$
$\Rightarrow x^{2} y = 1024 \Rightarrow y = \frac{1024}{x^{2}}$
Let $' C'$ be the cost of the material of the box.
So,
$C = 2 x^{2} \times (5) + 4 x y \times 2.5 = 10 x^{2} + 10 x y = 10 x (x + y) = 10 x (x + \frac{1024}{x^{2}}) = 10 x^{2} + \frac{10240}{x}$
Differentiate both sides w.r.t. $x$
$\frac{d C}{d x} = 20 x - \frac{10240}{x^{2}}$
For maxima or minima, equating derivative to zero, we get
$\frac{d C}{d x} = 0 \Rightarrow 20 x - \frac{10240}{x^{2}} = 0 \Rightarrow 20 x = \frac{10240}{x^{2}} \Rightarrow x^{3} = \frac{1024}{2} \Rightarrow x^{3} = 512 \Rightarrow x = 8$
Differentiating again for $x = 8$ , we get
$\frac{d^{2} C}{d x^{2}} = 20 + \frac{2 \times 10240}{x^{3}} > 0$
So, $x = 8$ is a point of minima.
We have:
$C = 10 x^{2} + \frac{10240}{x}$
Substituting $x$ in the above equation, we get:
$C = 10 \times 8^{2} + \frac{10240}{8} C = 640 + 1280 C = 1920$
Hence, the least cost of the box is $₹ 1920$ .

Suggest Corrections

Similar questions

Q. A metal box with a square base and vertical height is to contain 1024

c m^{2}

. The material for the top and the bottom costs Rs.5/

c m^{2}

and the material for the sides costs Rs. 2.50/

c m^{2}

. Find the least cost of the box.

A close rectagular box with square base is to be made to contain thousand cubic feet the cost of the material per square foot for the bottom is 15 paise, for the top 25 paise and for the side 20 paise. The labour charges for making box are Rs. 3 find the dimention of the box, when the cost is minimum?

Q. A closed metallic cylindrical box is