Table of Contents
Exercise 19.1
Question 1.
What is the least number of planes that can enclose a solid ? What is the name of the solid ?
Solution:
The least number of planes that can enclose a solid is called a Tetrahedron.
Question 2.
Can a polyhedron have for its faces :
(i) three triangles ?
(ii) four triangles ?
(iii) a square and four triangles ?
Solution:
(i) No, polyhedron has three faces.
(ii) Yes, tetrahedron has four triangles as its faces.
(iii) Yes, a square pyramid has a square as its base and four triangles as its faces.
Question 3.
Is it possible to have a polyhedron with any given number of faces ?
Solution:
Yes, it is possible if the number of faces is 4 or more.
Question 4.
Is a square prism same as a cube ?
Solution:
Yes, a square prism is a cube.
Question 5.
Can a polyhedron have 10 faces, 20 edges and 15 vertices ?
Solution:
No, it is not possible as By Euler’s formula
F + V = E + 2
⇒ 10 + 15 = 20 + 2
⇒ 25 = 22
Which is not possible
Question 6.
Verify Euler’s formula for each of the following polyhedrons :
Solution:
(i) In this polyhedron,
Number of faces (F) = 7
Number of edges (E) = 15
Number of vertices (V) = 10
According to Euler’s formula,
F + V = E + 2
⇒ 7 + 10 = 15 + 2
⇒ 17 = 17
Which is true.
(ii) In this polyhedron,
Number of faces (F) = 9
Number of edges (E) = 16
Number of vertices (V) = 9
According to Euler’s formula,
F + V = E + 2
⇒ 9 + 9 = 16 + 2
⇒ 18 = 18
Which is true.
(iii) In this polyhedron,
Number of faces (F) = 9
Number of edges (E) =18
Number of vertices (V) = 11
According to Euler’s formula,
F + V = E + 2
⇒ 9 + 11 = 18 + 2
⇒ 20 = 20
Which is true.
(iv) In this polyhedron,
Number of faces (F) = 5
Number of edges (E) = 8
Number of vertices (V) = 5
According to Euler’s formula,
F + V = E + 2
⇒ 5 + 5 = 8 + 2
⇒ 10 = 10
Which is true.
(v) In the given polyhedron,
Number of faces (F) = 9
Number of edges (E) = 16
Number of vertices (V) = 9
According to Euler’s formula,
F + V = E + 2
⇒ 9 + 9 = 16 + 2
⇒ 18 = 18
Which is true.
Question 7.
Using Euler’s formula, find the unknown:
Solution:
We know that Euler’s formula is
F + V = E + 2
(i) F + 6 = 12 + 2
⇒ F + 6 = 14
⇒ F = 14 – 6 = 8
Faces = 8
(ii) F + V = E + 2
⇒ 5 + V = 9 + 2
⇒ 5 + V = 11
⇒ V = 11 – 5 = 6
Vertices = 6
(iii) F + V = E + 2
⇒ 20 + 12 = E + 2
⇒ 32 = E + 2
⇒ E = 32 – 2 = 30
Edges = 30
Exercise 19.2
Question 1.
Which among the following are nets for a cube ?
Solution:
Nets for a cube are (ii), (iv) and (vi)
Question 2.
Name the polyhedron that can be made by folding each net:
Solution:
(i) This net is for a square
(ii) This net is for triangular prism.
(iii) This net is for triangular prism.
(iv) This net is for hexagonal prism.
(v) This net is for hexagon pyramid.
(vi) This net is for cuboid.
Question 3.
Dice are cubes where the numbers on the opposite faces must total 7. Which of the following are dice ?
Solution:
Figure (i) shows the net of cube or dice.
Question 4.
Draw nets for each of the following polyhedrons:
Solution:
(i) Net for cube is given below :
(ii) Net of a triangular prism is as under :
(iii) Net of hexagonal prism is as under :
(iv) The net for pentagonal pyramid is as under:
Question 5.
Match the following figures:
Solution:
(a) (iv)
(b) (i)
(c) (ii)
(d) (iii)
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