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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 horizontal measurement of the hexagon shape.
The calculator uses the formula:
Where:
Explanation: This formula calculates the breadth of a concave regular hexagon based on its total area, using the mathematical relationship between area and breadth in this specific geometric shape.
Details: Calculating the breadth of a concave regular hexagon is important in various geometric applications, architectural designs, and engineering projects where precise measurements of irregular hexagonal shapes are required.
Tips: Enter the area of the concave regular hexagon in square meters. The value must be positive and greater than zero for accurate calculation.
Q1: What is a concave regular hexagon?
A: A concave regular hexagon is a six-sided polygon where all sides are equal in length, but at least one interior angle is greater than 180 degrees, creating an indented shape.
Q2: How is this different from a convex hexagon?
A: In a convex hexagon, all interior angles are less than 180 degrees, while a concave hexagon has at least one interior angle greater than 180 degrees, creating a "caved-in" appearance.
Q3: What are typical applications of this calculation?
A: This calculation is used in geometric design, architectural planning, material estimation, and various engineering applications involving hexagonal structures.
Q4: Are there limitations to this formula?
A: This formula specifically applies to regular concave hexagons where all sides are equal. It may not be accurate for irregular hexagons or other polygonal shapes.
Q5: Can this calculator handle different units?
A: The calculator uses square meters for area and meters for breadth. For other units, convert your measurements to these units before calculation.