Question 8
A hollow cube of internal edge 22 cm is filled with spherical marbles of diameter 0.5 cm and it is assumed that 18 space of the cube remains unfilled. Then, the number of marbles that the cube can accommodate is
Thinking process- If we divide the total volume filled by marbles in a cube by volume of a marble, then we get the required number of marbles.
(A) 142296
(B) 142396
(C) 142496
(D) 142596
Option (A) is correct.
Given , edge of the cube = 22 cm
∴ Volume of the cube
=223
=10648 cm3
[Volume of cube = side3]
Also, given diameter of marble = 0.5 cm
∴ Radius of a marble,
⇒r=0.52=0.25 cm [Diameter = 2×radius]
Volume of one marble
=43πr3
=43×227×(0.25)3
Volume of sphere
=43×π(radius)3
=1.37521=0.0655 cm3
Filled space of cube = Volume of the cube - [18× Volume of cube ]
=10648−(10648×18)=10648×78=9317 cm3
∴ Required number of marbles
=Total space filled by marbles in a cubeVolume of one marble=93170.0655142244 (approx.)
Hence, the number of marbles that cube can accommodate is 142244.