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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 mathematical formula:
Where:
Explanation: This formula calculates the height based on the given area of a concave regular hexagon, using the mathematical relationship between area and height in this specific geometric shape.
Details: Calculating the height of a concave regular hexagon is essential for geometric analysis, architectural design, and various engineering applications where precise dimensional measurements are required.
Tips: Enter the area of the concave regular hexagon in square meters. The value must be positive and valid (area > 0).
Q1: What is a concave regular hexagon?
A: A concave regular hexagon is a six-sided polygon with equal sides and angles, but with at least one interior angle greater than 180 degrees, causing it to cave inward.
Q2: How is this different from a convex hexagon?
A: In a convex hexagon, all interior angles are less than 180 degrees and all vertices point outward, while a concave hexagon has at least one interior angle greater than 180 degrees.
Q3: What are the units for the result?
A: The height is returned in meters, matching the input area units (square meters).
Q4: Can this calculator handle very large areas?
A: Yes, the calculator can handle any positive area value, though extremely large values may be limited by computational precision.
Q5: Is this formula specific to regular concave hexagons?
A: Yes, this formula applies specifically to regular concave hexagons where all sides are equal and the shape maintains its regular concave properties.