Hexagon Across Flats Calculator
Hexagon Across Flats Table
| Side Length (mm) | Hexagon Across Flats (mm) |
|---|---|
| 10 | 20 |
| 20 | 40 |
| 30 | 60 |
| 40 | 80 |
| 50 | 100 |
| 60 | 120 |
| 70 | 140 |
| 80 | 160 |
| 90 | 180 |
| 100 | 200 |
| 150 | 300 |
| 200 | 400 |
| 250 | 500 |
| 300 | 600 |
π How to Use This Table
- Find the side length β Choose the length of one side of the hexagon.
- Look up the corresponding across flats β This is the width from one flat side to the opposite flat side.
- Use these values in construction, design, material estimation, and layout planning.
π How is Across Flats Calculated?
The formula used: Across Flats=2ΓSide Length\text{Across Flats} = 2 \times \text{Side Length}Across Flats=2ΓSide Length
Where:
- Side Length = The length of one side of the hexagon.
- Across Flats = The distance from one flat side to the opposite flat side.
β Key Takeaways
- Larger side lengths result in larger across flats.
- Hexagonal shapes are used in engineering, fabrication, and design.
- Important for determining the fitment of bolts, nuts, and industrial components.
- Helps in material planning for manufacturing.