Question 9
A metallic spherical shell of internal and external diameters 4 cm and 8 cm, respectively is melted and recast into the form of a cone of base diameter 8cm. Find the height of the cone.
(A) 12 cm
(B) 14 cm
(C) 15 cm
(D) 18 cm
Option (B) is correct.
Given, internal diameter of spherical shell = 4 cm
External diameter of spherical = 8 cm
∴ internal radius of spherical shell, r1=42cm=2 cm [Diameter=2×radius]
External radius of shell, r2=82=4 cm [Diameter=2×radius]
Given is the spherical shell
Now , volume of the spherical shell = 43π[r32−r31]
[∵ Volume of the spherical shell =43π(external radius3)−(internal radius)3]=43π(43−23)=43π(64 − 8)=2243π cm3
Let height of the cone = h cm
Diameter of the base of cone = 8 cm [diameter=2×radius]
According to the question,
Volume of cone = Volume of spherical shell [Volume of cone=13×π×(radius)2×(height)]
⇒13π(4)2h=2243π⇒h=22416=14 cm
Hence, the height of the cone is 14 cm.