Home
Class 14
MATHS
From the solid gold in the form of a cub...

From the solid gold in the form of a cube of side length 1 cm, spherical solid balls each having the surface area `pi^(1//3) cm^(2)` are to be made. Assuming that there is no loss of the material in the process of making the balls, the maximum number of balls made will be

A

3

B

4

C

6

D

9

Text Solution

AI Generated Solution

Promotional Banner

Similar Questions

Explore conceptually related problems

Three spherical balls of radius 3 cm, 2 cm and 1 cm are melted to form a new spherical ball. In this prcoess there is a loss of 25% of the material. What is the radius (in cm) of the new ball ?

Three spherical balls of radius 2 cm, 4 cm and 6 cm are melted to form a new spherical ball. In this process there is a loss of 25% of the material. What is the radius (in cm) of the new ball?

By melting three spherical solid balls of radius 1 cm, 2 cm and 3 cm, respectively, a large spherical ball is formed. If 25% material is lost in this process, what will be the radius of the new ball?

How many cubes of side 2 cm can be made from a solid cube of side 10 cm ?

How many cubes of side 5 cm can be made from a solid cube of side 10 cm ?

The solid as shown in the figure, is made up of cubical blocks each of side 1 cm. The number of blocks is

A solid metal ball of radius 8 cm is melted and cast into smaller balls, each of radius 2 cm. The number of balls made are ……….. .

An iron solid sphere of radius 3cm is melted and recast into small sperical balls ofradius 1cm each.Assuming that there is no wastage in the process,find the number ofsmall spherical balls made from the given sphere.in order to reach the destination

Three cubes each of sides 7 cm are joined end to end. Find the surface area of the resulting solid.

A solid metal ball of diameter 16 cm is melted and cast into smaller balls, each of radius 1 cm. The number of such balls is :