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How can we find the area of a regular hexagon?
Area of a Hexagon Formula The formula for the area of a regular hexagon is (3√3 s2)/2, where ‘s’ is the length of the side of the hexagon.
How do you find the length of the sides of a hexagon?
The length of the side of the hexagon is twice the length of the base. Substitute in the value of the length of the base to find the side length of the hexagon.
What is one side of a regular hexagon?
equilateral
From this it can be seen that a triangle with a vertex at the center of the regular hexagon and sharing one side with the hexagon is equilateral, and that the regular hexagon can be partitioned into six equilateral triangles.
What is the formula for finding the area of a regular hexagon?
Since a regular hexagon is comprised of six equilateral triangles, the formula for finding the area of a hexagon is derived from the formula of finding the area of an equilateral triangle. The formula for finding the area of a hexagon is Area = (3√3 s2)/ 2 where s is the length of a side of the regular hexagon.
How do you calculate the area of a regular hexagon?
To calculate the area of a hexagon, use the formula a = 3 × square root of 3 × s^2 divided by 2, where a is the area and s is the length of a side of the hexagon. Just plug in the length of one of the sides and then solve the formula to find the area.
What are the dimensions of a regular hexagon?
A hexagon has exactly six vertices. A hexagon is a six-sided, two-dimensional shape. A regular hexagon consists of six equal sides with internal angles of 120 degrees, while an irregular hexagon can have sides and angles of any size.
What is a hexagon in real life?
One example of real-life hexagons are the cells found in a honeycomb. Another example is most of the basalt rocks in the Giant’s Causeway on the coast of Northern Ireland .