NCERT Solutions for Class 8th: Ch 10 Visualising Solid Shapes Geometry

(a) → (iii) → (iv)

(b) → (i) → (v)

(c) → (iv) → (ii)
(d) → (v) → (iii)
(e) → (ii) → (i)

2. For each of the given solid, the three views are given. Identify for each solid the corresponding top, front and side views.

(a) (i) → Front
(ii) → Side
(iii) → Top view

(b) (i) → Side
(ii) → Front

(iii) → Top view

(c) (i) → Front

(ii) → Side
(iii) → Top view

(d) (i) → Front

(ii) → Side
(iii) → Top view

(a) (i) → Top view 

(ii) → Front view

(iii) → Side view

(b) (i) → Side view

(ii) → Front view

(iii) → Top view

(c) (i) → Top view

(ii) → Side view

(iii) → Front view

(d) (i) → Side view

(ii) → Front view

(iii) → Top view

(e) (i) → Front view

(ii) → Top view

(iii) → Side view

1. Can a polygon have for its faces:
(i) 3 triangles
(ii) 4 triangles
(iii) a square and four triangles

Answer

(i) No, a polyhedron cannot have 3 triangles for its faces.
(ii) Yes, a polyhedron can have four triangles which is known as pyramid on triangular base.
(iii) Yes, a polyhedron has its faces a square and four triangles which makes a pyramid on square base.
2. Is it possible to have a polyhedron with any given number of faces? (Hint: Think of a pyramid)

Answer

It is possible, only if the number of faces are greater than or equal to 4.

3. Which are prisms among the following:


Answer

Figure (ii) unsharpened pencil and figure (iv) a box are prisms.

4. (i) How are prisms and cylinders alike?
(ii) How are pyramids and cones alike?

Answer

(i) A prism becomes a cylinder as the number of sides of its base becomes larger and larger.
(ii) A pyramid becomes a cone as the number of sides of its base becomes larger and larger.

5. Is a square prism same as a cube? Explain.

Answer

Yes, a square prism is same as a cube, it can also be called a cuboid. A cube and a square prism are both special types of a rectangular prism. A square is just a special type of rectangle! Cubes are rectangular prisms where all three dimensions (length, width and height) have the same measurement.

6. Verify Euler’s formula for these solids.


Answer

(i) Here, figure (i) contains 7 faces, 10 vertices and 15 edges.
Using Eucler’s formula, we see
 F + V – E = 2
Putting F = 7, V = 10 and E = 15,
 F + V – E = 2
⇒ 7 + 10 – 15 = 2
⇒ 17 – 15 = 2
⇒ 2 = 2
⇒ L.H.S. = R.H.S. Hence Eucler’s formula verified.

(ii) Here, figure (ii) contains 9 faces, 9 vertices and 16 edges.
Using Eucler’s formula, we see
F + V – E = 2
 F + V – E = 2
 9 + 9 – 16 = 2
⇒ 18 – 16 = 2
⇒ 2 = 2
⇒ L.H.S. = R.H.S.
Hence Eucler’s formula verified.

7. Using Euler’s formula, find the unknown:

Faces	?	5	20
Vertices	6	?	12
Edges	12	9	?

Answer

In first column, F = ?, V = 6 and E = 12
Using Eucler’s formula, we see
F + V – E = 2
 F + V – E = 2
⇒ F + 6 – 12 = 2
⇒ F – 6 = 2
⇒ F = 2 + 6 = 8
Hence there are 8 faces.
In second column, F = 5, V = ? and E = 9
Using Eucler’s formula, we see
F + V – E = 2
F + V – E = 2
⇒ 5 + V – 9 = 2
⇒ V – 4 = 2
⇒ V = 2 + 4 = 6
Hence there are 6 vertices.
In third column, F = 20, V = 12 and E = ?
Using Eucler’s formula, we see
F + V – E = 2
F + V – E = 2
⇒ 20 + 12 – E = 2
⇒ 32 – E = 2
⇒ E = 32 – 2 = 30
Hence there are 30 edges.

8. Can a polyhedron have 10 faces, 20 edges and 15 vertices?

Answer

If F = 10, V = 15 and E = 20.
Then, we know Using Eucler’s formula,
F + V – E = 2
L.H.S. = F + V – E
= 10 + 15 – 20
= 25 – 20
= 5
R.H.S. = 2
∵ L.H.S. ≠ R.H.S.
Therefore, it does not follow Eucler’s formula.
So polyhedron cannot have 10 faces, 20 edges and 15 vertices.