Math, asked by daskunjakishori, 6 hours ago

Find no. Of faces of a polyhedron. If no. Of vertices is 7 and no. Of Edges is 11. ​

Answers

Answered by seemarao781
1

Step-by-step explanation:

.Here,

No. of Faces (F):5

No. of Vertices (V):6

No. of Edges (E):9

Euler’s formula: F + V = E + 2

⇒ 5 + 6 = 9 + 2

⇒ 11 = 11

∴ Euler’s formula satisfies for the shape.

2.Here,

No. of Faces (F):7

No. of Vertices (V):10

No. of Edges (E):15

Euler’s formula: F + V = E + 2

⇒ 7 + 10 = 15 + 2

⇒ 17 = 17

∴ Euler’s formula satisfies for the shape.

3.Here,

No. of Faces (F):8

No. of Vertices (V):12

No. of Edges (E):18

Euler’s formula: F + V = E + 2

⇒ 8 + 12 = 18 + 2

⇒ 20 = 20

∴ Euler’s formula satisfies for the shape.

4.Here,

No. of Faces (F):6

No. of Vertices (V):6

No. of Edges (E):10

Euler’s formula: F + V = E + 2

⇒ 6 + 6 = 10 + 2

⇒ 12 = 12

∴ Euler’s formula satisfies for the shape.

5.Here,

No. of Faces (F):5

No. of Vertices (V):5

No. of Edges (E):8

Euler’s formula: F + V = E + 2

⇒ 5 + 5 = 8 + 2

⇒ 10 = 10

∴ Euler’s formula satisfies for the shape.

6.Here,

No. of Faces (F):8

No. of Vertices (V):12

No. of Edges (E):18

Euler’s formula: F + V = E + 2

⇒ 8 + 12 = 18 + 2

⇒ 20 = 20

∴ Euler’s formula satisfies for the shape.

7.Here,

No. of Faces (F):8

No. of Vertices (V):6

No. of Edges (E):12

Euler’s formula: F + V = E + 2

⇒ 8 + 6 = 12 + 2

⇒ 14 = 14

∴ Euler’s formula satisfies for the shape.

8.Here,

No. of Faces (F):7

No. of Vertices (V):10

No. of Edges (E):15

Euler’s formula: F + V = E + 2

⇒ 7 + 10 = 15 + 2

⇒ 17 = 17

∴ Euler’s formula satisfies for the shape.

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