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The Height of Concave Regular Hexagon is the perpendicular distance from the bottom most point to the top most point of the Concave Regular Hexagon. It is an important geometric measurement used in various mathematical and engineering applications.
The calculator uses the formula:
Where:
Explanation: The height of a concave regular hexagon is calculated as three halves times the side length, based on the geometric properties of regular hexagons.
Details: Calculating the height of a concave regular hexagon is essential in geometry, architectural design, engineering applications, and various mathematical computations involving hexagonal shapes.
Tips: Enter the side length of the concave regular hexagon in meters. The value must be positive and valid for accurate calculation.
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, causing the shape to be indented.
Q2: How is this different from a convex regular hexagon?
A: In a convex regular hexagon, all interior angles are less than 180 degrees and the shape bulges outward, while a concave hexagon has at least one indentation.
Q3: Does this formula work for all types of hexagons?
A: No, this specific formula applies only to concave regular hexagons where all sides are equal and the shape follows specific geometric properties.
Q4: What are practical applications of this calculation?
A: This calculation is used in architectural design, mechanical engineering, geometric modeling, and various mathematical applications involving hexagonal structures.
Q5: How accurate is this formula?
A: The formula is mathematically precise for ideal concave regular hexagons, providing exact results based on the geometric properties of these shapes.