Volume of Cone

Concept Explanation

Volume of Cone

Cone: A cone is a three-dimensional figure with one circular base. A curved surface connects the base and the vertex.

Volume of Cone: .The volume V of a cone with radius r is one-third the area of the base B times the height h.

Volume of the cone of radius r and height h = $frac{1}{3}{pi}r^{2}h$

Illustration: Find the volume of a right circular cone 1.02m high , if the radius of its base is 28 cm.

Solution: We know that the volume V of a right circular cone of radius r and height h is given $V=frac{1}{3}{pi}r^{2}h$ . Here, r = 28cm and h = 1.02 m = 1.02 X 100 cm = 102 cm

$therefore V=frac{1}{3}times {frac{22}{7}}times 28times 28times 102=83776;cm^3$

Illustration: A conical tent is 9 m high and the radius of its base is 12 m.

(i) What is the cost of the canvas required to make it, if a square metre canvas costs Rs 10?

(ii) How many persons can be accommodated in the tent, if each person requires 2 square metre on the ground and $15;m^{3}$ of space to breath in?

Solution: We have,

r = Radius of the base of the conical tent = 12 m

h = Height of the conical tent = 9 m

l = Slant height of the conical tent = $sqrt{r^{2}+h^{2}}$

$=sqrt{(12)^{2}+9^{2}}$

$=sqrt{144+81}$ $=sqrt{225};m$

$=15;m$

(i) Area of the lateral surface = $pi rl=frac{22}{7}times 12times 15;m^{2}$

$=565.7;m^{2}$

So, total cost of the canvas = Rs(565.2 X 10) = Rs 5652

(ii) Area of the base of the conical tent = $pi r^{2}=frac{22}{7}times 12times 12;m^{2}$

$=452.16;m^{2}$

As each person requires 2 sq. metres of floor area.

So, max number of persons who will have enough space on the ground $=frac{452.16}{2}=226$

Also, Volume of the conical tent $=frac{1}{3}times Area;of;the;basetimes Height$

Volume of the conical tent $=frac{1}{3}times 452.16times 9;m^{3}$

Volume of the conical tent = 1356.48 $;m^{3}$

We have, air space required person $=15;m^{3}$

So, number of persons who will have enough air space to breath in $=frac{1356.48}{15}=90$

Between 226 and 90, the smaller number is 90.

Hence 90 persons can be accomodated.

Sample Questions

(More Questions for each concept available in Login)

Question : 1

The area of the base of a right circular cone is $314;cm^{2}$ and its height is 15 cm. Find the volume of the cone.
A. $1507;cm^{3}$	B. $5570;cm^{3}$	C. $1570;cm^{3}$	D. $1577;cm^{3}$
Right Option : C
View Explanation

Question : 2

A right circular cone is 3.6 m high and radius of its base is 1.6 cm. It is melted and recast into a right circular cone with radius of its base as 1.2 cm. Find its height.
A. 6.4 cm	B. 5.3 cm	C. 7.3 cm	D. 5.6 cm
Right Option : A
View Explanation

Question : 3

The diameter of a right circular cone is 8 cm and its volume is $48pi ;cm^{3}$ . What is its height?
A. 7 cm	B. 5 cm	C. 12 cm	D. 9 cm
Right Option : D
View Explanation

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Volume of Cone

Volume of Cone

Students / Parents Reviews [20]

Anika Saxena

Yogansh Nyasi

Yatharthi Sharma

Eshan Arora

Barkha Arora

Shreya Shrivastava

Aman Kumar Shrivastava

Hridey Preet

Manya

Manish Kumar

Aman Kumar Shrivastava

Shivam Rana

Manish Kumar

Cheshta

Prisha Gupta

Aman Kumar Shrivastava

Upmanyu Sharma

Sharandeep Singh

Hiya Gupta

Om Umang