9762
Perimeter = 2*Area/Apothem.
Assuming that you are talking about a regular hexagon, the equation is (1/2)ap, a being the apothem and pbeing the perimeter. You can also use that equation for any other regular polygon.
A pair of regular hexagons.
Given the perimeter of a regular hexagon, it is better to use the side length: 6 inches, rather than the apothem of 5.2 inches because the latter is he rounded value of 3*sqrt(3) which is 5.196152... rather than 5.2. Based on the length of the sides, the area is approx 93.53 sq inches. [The apothem would have given 93.67 sq inches.]
There are no right angles in a regular hexagon nor any regular hexagons in a right angle.
If the hexagon has side length s, then the apothem is sqrt(3) * s / 2.
Perimeter = 2*Area/Apothem.
Assuming that you are talking about a regular hexagon, the equation is (1/2)ap, a being the apothem and pbeing the perimeter. You can also use that equation for any other regular polygon.
A pair of regular hexagons.
For a regular hexagon, half the side length can be calculated from the apothem via trigonometry: half_side_length = apothem x tan 30° Then: area = apothem x 1/2 x perimeter = apothem x 1/2 x side_length x 6 = apothem x half_side_length x 6 = 24 in x (24 in x tan 30°) x 6 ≈ 1995 sq in
A regular hexagon and 3 classes of convex hexagons, plus concave hexagons will tessellate.
The perimeter of a regular hexagon is: length times the # of sides, which in this case happens to be six. The perimeter of a regular hexagon= l(6)
Given the perimeter of a regular hexagon, it is better to use the side length: 6 inches, rather than the apothem of 5.2 inches because the latter is he rounded value of 3*sqrt(3) which is 5.196152... rather than 5.2. Based on the length of the sides, the area is approx 93.53 sq inches. [The apothem would have given 93.67 sq inches.]
The area of a regular hexagon with a perimeter 120m is about 1039.2m2
No, one regular hexagon could be larger than another regular hexagon.
There are no right angles in a regular hexagon nor any regular hexagons in a right angle.
A regular hexagon will tessellate. Other hexagons may or may not tessellate.