Answer
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s = 17
P = 102
A = 750.84402508111
Interior Angle sum = 720°
Diagonals = 9
1 vertex Diagonals = 3
Triangles = 4
Sides (Edges) = 6
Faces = 1
Vertices = 6
P = 102
A = 750.84402508111
Interior Angle sum = 720°
Diagonals = 9
1 vertex Diagonals = 3
Triangles = 4
Sides (Edges) = 6
Faces = 1
Vertices = 6
↓Steps Explained:↓
Hexagon has side length (s) of 17
calculate the Perimeter (P) and Area (A)
Calculate Perimeter:
P = 6 x s
P = 6 x 17
P = 102
Calculate Area (A):
| A = | 3√3s2 |
| 2 |
| A = | 3√3(172) |
| 2 |
| A = | 3√3(289) |
| 2 |
| A = | 1501.6880501622 |
| 2 |
A = 750.84402508111
Calculate Sum of the Interior Angles:
Interior Angle Sum = (sides - 2) x 180°
Interior Angle Sum = (6 - 2) x 180°
Interior Angle Sum = 4 x 180°
Interior Angle sum = 720°
Calculate polygon diagonals
| Diagonals = | n(n - 3) |
| 2 |
| Diagonals = | 6(6 - 3) |
| 2 |
| Diagonals = | 6(3) |
| 2 |
| Diagonals = | 18 |
| 2 |
Diagonals = 9
Calculate 1 vertex diagonals:
1 vertex Diagonals = n - 3
1 vertex Diagonals = 6 - 3
1 vertex Diagonals = 3
Calculate triangles from one vertex:
Triangles = N - 2
Triangles = 6 - 2
Triangles = 4
Other Properties:
Sides (Edges) = 6
Faces = 1
Vertices = 6
Final Answers
s = 17P = 102
A = 750.84402508111
Interior Angle sum = 720°
Diagonals = 9
1 vertex Diagonals = 3
Triangles = 4
Sides (Edges) = 6
Faces = 1
Vertices = 6
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