You would have to use a couple of formulas to do this. It would basically be 374.4 cm in area but first you would have to find the base and the height.
It is 374.12 sq inches.
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming
If yo have the area of the circle, the square is irrelevant. Radius = sqrt(Area/pi)
the Regular hexagon : Area=(1/2)*(radius of the inscribed circle)*perimeter units2 The irregular hexagon : Area can be computed by the scalene triangle method. from one of the points to the other vertexes,you get 3 diagonals and hence three scalene triangle. hence use the area of a scalene triangle=sqrt(s (s - s1) (s - s2) (s - s3)) units2 where s=(s1+s2+s3)/2
The area of square is : 100.0
The radius of a circle inscribed in a regular hexagon equals the length of one side of the hexagon.
If you know the length of the side of the (regular) hexagon to be = a the radius r of the inscribed circle is: r = a sqrt(3)/2
It is 374.12 sq inches.
Yes.
1
The area of any hexagon is 6(0.5)(L)(L sin 60o) = 3L2 sin 60o, where L is the length of one side and is also the radius of the circumscribed circle.
radius
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming
There are different formula for: Height, Area, Perimeter, Angle, Length of Median Radius of inscribed circle Perimeter of inscribed circle Area of inscribed circle etc.
It has at least two radii, the radius of the circle going through the vertices and the radius of the inscribed circle touching all the sides.
Half the square root of the square radius equals the circle radius.
Area of circle = 225 cm2 implies radius = 8.46 cm (approx) Therefore, apothem of hexagon = 8.46 cm then side of hexagon = apothem*2/sqrt(3) = 9.77 cm (approx) and so perimeter = 6*side = 58.63 cm