Direction: A cube is painted and then divided cut into 336 smaller but identical pieces by making the minimum number of cuts possible. All cuts are parallel to some face.

How many smaller pieces have at most one face painted?

248

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

264

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

268

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

None of these

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

Open in App

Solution

The correct option is C 268
Number of identical pieces $336 = 8 \times 7 \times 6.$ Hence we need 7 cut's in Z-direction, 6 cuts in Y- direction, 5-cuts in X-direction.

Means our cube cut into 8 parts along Z-directions say
$n_{Z} = 8,$ Similarly $n_{Y} = 7, n_{X} = 6.$

For total number of identical pieces we can say

$n_{X} \times n_{Y} \times n_{Z} = 336$

${(n_{X} - 2) + 2} \times {(n_{Y} - 2) + 2} \times {(n_{Z} - 2) + 2}$

Now look at table below:

No. of pieces Formula Answrs for
$6 \times 7 \times 8$ cube

3-face painted
(Corner pieces) $2^{3}$ 8

2-face painted
piece $4 [(n_{x} - 2) + (n_{y} - 2) + (n_{z} - 2)]$ $4 [(8 - 2) + (7 - 2) + (6 - 2)] = 60$

Only one face
painted pieces $2 [(n_{x} - 2) (n_{y} - 2) + (n_{y} - 2) (n_{z} - 2) + (n_{z} - 2) (n_{x} - 2)]$ $2 [(8 - 2) (7 - 2) + (7 - 2) (6 - 2) + (8 - 2) \times (6 - 2)]$

Pieces no face
Painted $(n_{x} - 2) (n_{y} - 2) (n_{z} - 2)$ $(8 - 2) (7 - 2) (6 - 2) = 120$

No faces painted + One face painted

= 120 + 148 = 268

Suggest Corrections

Similar questions

Q. Direction: A cube is painted and then divided cut into 336 smaller but identical pieces by making the minimum number of cuts possible. All cuts are parallel to some face.

How many smaller pieces have exactly 3 painted faces?

Q. Direction: A cube is painted and then divided cut into 336 smaller but identical pieces by making the minimum number of cuts possible. All cuts are parallel to some face.

What is the minimum no. of cuts required?

Q. A large cube is painted on all six faces and then divided into maximum number of smaller cubes, by making 9 cuts. How many smaller cubes will have no painted faces?

A cube is painted red along all its faces and then divided into 27 smaller identical pieces. How many of the resultant pieces will have no face painted?

Q. A large cube is painted on all six faces and then cut into a certain number of smaller but identical cubes. It was found that among the smaller cubes, there were eight cubes which had no face painted at all. How many smaller cubes was the original large cube cut into?

Join BYJU'S Learning Program

No. of pieces	Formula	Answrs for $6 \times 7 \times 8$ cube
3-face painted (Corner pieces)	$2^{3}$	8
2-face painted piece	$4 [(n_{x} - 2) + (n_{y} - 2) + (n_{z} - 2)]$	$4 [(8 - 2) + (7 - 2) + (6 - 2)] = 60$
Only one face painted pieces	$2 [(n_{x} - 2) (n_{y} - 2) + (n_{y} - 2) (n_{z} - 2) + (n_{z} - 2) (n_{x} - 2)]$	$2 [(8 - 2) (7 - 2) + (7 - 2) (6 - 2) + (8 - 2) \times (6 - 2)]$
Pieces no face Painted	$(n_{x} - 2) (n_{y} - 2) (n_{z} - 2)$	$(8 - 2) (7 - 2) (6 - 2) = 120$

Direction: A cube is painted and then divided cut into 336 smaller but identical pieces by making the minimum number of cuts possible. All cuts are parallel to some face. How many smaller pieces have at most one face painted?

Direction: A cube is painted and then divided cut into 336 smaller but identical pieces by making the minimum number of cuts possible. All cuts are parallel to some face.

How many smaller pieces have at most one face painted?