A box open from top is made from a rectangular sheet of dimension $a \times b$ by cutting squares each of side $x$ from each of the four corners and folding up the flaps. If the volume of the box is maximum, then $x$ is equal to

\frac{a + b - \sqrt{a^{2} + b^{2} - a b}}{12}

No worries! We‘ve got your back. Try BYJU‘S free classes today!

\frac{a + b + \sqrt{a^{2} + b^{2} - a b}}{6}

No worries! We‘ve got your back. Try BYJU‘S free classes today!

\frac{a + b - \sqrt{a^{2} + b^{2} + a b}}{6}

No worries! We‘ve got your back. Try BYJU‘S free classes today!

\frac{a + b - \sqrt{a^{2} + b^{2} - a b}}{6}

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

Open in App

Solution

The correct option is D $\frac{a + b - \sqrt{a^{2} + b^{2} - a b}}{6}$

$V = (a - 2 x) (b - 2 x) x$
For maximum volume
$\frac{d V}{d x} = 0$
$\Rightarrow - 2 (b - 2 x) x + (a - 2 x) (- 2) x + (a - 2 x) (b - 2 x) = 0$
$\Rightarrow 12 x^{2} + x (- 2 a - 2 b - 2 b - 2 a) + a b = 0$
$\Rightarrow 12 x^{2} - 4 (a + b) x + a b = 0$
$\Rightarrow x = \frac{4 (a + b) \pm \sqrt{16 (a + b)^{2} - 48 a b}}{24}$
$\Rightarrow x = \frac{(a + b) \pm \sqrt{a^{2} + b^{2} - a b}}{6}$

$\frac{d^{2} V}{d x^{2}} = 24 x - 4 (a + b)$
$= 4 (6 x - (a + b)) < 0,$ for $x = \frac{a + b - \sqrt{a^{2} + b^{2} - a b}}{6}$

Hence $V_{max} at x = \frac{a + b - \sqrt{a^{2} + b^{2} - a b}}{6}$

Suggest Corrections

Similar questions

Q. A rectangular sheet of tin 45 cm by 24 cm is to be made into a box without top, in cutting off squares from each corners and folding up the flaps. What should be the side of the square to be cut off so that the volume of the box is maximum possible?

Q. A square piece of tin of side

18 c m

is to be made into a box without top by cutting a square from each corner and folding up the flaps to form a box. What should be the side of the square to be cut off so that the volume of then box is maximum? Also find this maximum volume?

A rectangular sheet of tin 45 cm by 24 cm is to be made into a box without top, by cutting-off square from each corner and folding up the flaps. What should be the side of the square to be cut-off so that the volume of the box is maximum?

A rectangular sheet of tin $45 c m$ by $24 c m$ is to be made into a box without top, by cutting off square from each corner and folding up the flaps. What should be the side of the square to be cut off so that the volume of the box is maximum?

Join BYJU'S Learning Program

A box open from top is made from a rectangular sheet of dimension a×b by cutting squares each of side x from each of the four corners and folding up the flaps. If the volume of the box is maximum, then x is equal to

A box open from top is made from a rectangular sheet of dimension $a \times b$ by cutting squares each of side $x$ from each of the four corners and folding up the flaps. If the volume of the box is maximum, then $x$ is equal to