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Breadth Of Concave Regular Hexagon Calculator

Formula Used:

\[ b = \sqrt{3} \times S \]

m

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1. What is the Breadth of Concave Regular Hexagon?

The Breadth of Concave Regular Hexagon is the perpendicular distance from the left most point to the right most point of the Concave Regular Hexagon. It represents the maximum width measurement across the hexagon shape.

2. How Does the Calculator Work?

The calculator uses the formula:

\[ b = \sqrt{3} \times S \]

Where:

Explanation: The formula calculates the breadth by multiplying the side length by the square root of 3, which is derived from the geometric properties of regular hexagons.

3. Importance of Breadth Calculation

Details: Calculating the breadth is essential for determining the overall dimensions of concave regular hexagons, which is crucial in various applications including architectural design, engineering layouts, and geometric pattern creation.

4. Using the Calculator

Tips: Enter the side length of the concave regular hexagon in meters. The value must be positive and greater than zero. The calculator will automatically compute the breadth using the mathematical formula.

5. Frequently Asked Questions (FAQ)

Q1: What is a concave regular hexagon?
A: A concave regular hexagon is a six-sided polygon with equal side lengths but with at least one interior angle greater than 180 degrees, creating an inward indentation.

Q2: How does this differ from a convex regular hexagon?
A: In a convex regular hexagon, all interior angles are less than 180 degrees and all vertices point outward, while a concave regular hexagon has at least one vertex pointing inward.

Q3: Can this formula be used for irregular hexagons?
A: No, this specific formula only applies to regular hexagons where all sides are equal length. Irregular hexagons require different calculation methods.

Q4: What are practical applications of this calculation?
A: This calculation is used in various fields including mechanical engineering for bolt patterns, architectural design for tiling patterns, and manufacturing for component design.

Q5: How accurate is this calculation?
A: The calculation is mathematically precise for perfect regular hexagons. The accuracy in practical applications depends on the precision of the side length measurement.

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