Volume of Hemisphere


 
 
Concept Explanation
 

Volume of Hemisphere

Volume of Hemisphere: The volume V of a hemisphere of radius r is given by  V=frac{2}{3}{pi}r^{3};cubic ;units

Illustration: Find the volume of a hemisphere of radius 3.5cm.

Solution: We know that the volume V of hemisphere of radius r is given by

large V=frac{2}{3}times{frac{22}{7}}times{3.5}times{3.5}times{3.5} = frac{11times{49}}{3times{2}}=89.83;cm^{3}

Illustration: A hemispherical bowl of internal diameter 36 cm contains a liquid. This liquid is to be filled in cylindrical bottles of radius 3 cm and height 6 cm. How many bottles are required to empty the bowl?

Solution:  We have, Radius of the hemispherical bowl = 18cm

Volume of the hemispherical bowl =frac{2}{3}{pi}(18)^{3};cm^{3}

Radius of a cylindrical bottle = 3 cm

Height of a cylindrical bottle = 6 cm

Volume of a cylindrical bottle =(pi times 3^{2}times 6);cm^{3} =(pi times 9times 6);cm^{3}

Suppose x bottles are required to empty the bowl.

Volume of x cylindrical bottles =(xtimes pi times 9times 6);cm^{3}

Clearly, Volume of liquid in x bottles = Volume of bowl

xtimes pi times 9times 6=frac{2pi }{3}times (18)^{3}

x=frac{2pi times (18)^{3} }{3times pi times 9times 6}

x=72

Hence, 72 bottles are required to empty the bowl.

Sample Questions
(More Questions for each concept available in Login)
Question : 1

A sphere has radius 2 cm and hemisphere has radius 4 cm. The ratio of their volume is _________________

Right Option : B
View Explanation
Explanation
Question : 2

Find the volume of the hemisphere of radius 3.5 cm.

Right Option : B
View Explanation
Explanation
Question : 3

Find the volume of a hemisphere having radius 3 cm.

Right Option : B
View Explanation
Explanation
 
Video Link - Have a look !!!
 
Language - English
 
Chapters
Content / Category
Class / Course
 
 
Related Videos
Language - English

Language - English

Language - English

Language - English

Language - English
Language - English
Language - English

Language - English


Students / Parents Reviews [20]