The area of a hexagram can be calculated using the following formula: if you know the perimeter and the apothem.
If you know the length of one side in a hexagram and the apothem, you can calculate its area using the following formula:
$$"area" = (p * a)/2 $$
$$p = "perimeter value"$$
$$a = "apothem: distance from the center to the closest point in the figure"$$
It is a geometric figure with 12 sides and 6 vertices, all the sides have equal length. Also an hexagram has all the same angles. all regular hexagrams look the same.
An irregular hexagram can have vitually infinite posibles shapes, Despite this all have 12 sides and 6 vertices.
The apothem it´s the distance between the center of the geometric figure and the closest point in the figure to the center.
It is the space of the internal surface in a figure, it is limited for the perimeter. Also, the area can be calculated in a plane of two dimensions.
It is a representation of a rule or a general principle using letters. (Algebra, A. Baldor)
When describing formulas in plural, it is also valid to say "formulae".
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