A hexagon has six sides while a rectangle only has four.
There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.
A RECTANGLE HAS 4 SIDES; A HEXAGON 6; A PENTAGON has 5 sides
A regular hexagon.
a rectangle a hexagon
To find the area of the shaded region (the rectangle inside the hexagon), we first calculate the area of the hexagon using the formula ( \text{Area} = \frac{3\sqrt{3}}{2} \times a^2 ), where ( a ) is the apothem. Given that the apothem is 15.59 units, the area of the hexagon is approximately ( \frac{3\sqrt{3}}{2} \times (15.59^2) \approx 609.67 ) square units. Assuming the rectangle’s area is not specified, the shaded area would be the hexagon's area minus the rectangle's area. If the rectangle's area is provided, subtract it from the hexagon's area to find the shaded region's area.
There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.There can be no such thing as a rectangle hexagon. A rectangle is a polygon that is distinct from a hexagon.
Nope, a hexagon has six sides and a rectangle only has four sides.
No because a rectangle has 4 sides whereas a hexagon has 6 sides
as rectangle is to square I would say Rectangle is to Triangle. Because Hexagon-6sides, pentagon-5 sides, Rectangle-4 sides, triangle 3 sides. But that is just me :)
Hexagon
A RECTANGLE HAS 4 SIDES; A HEXAGON 6; A PENTAGON has 5 sides
A regular hexagon.
yes
they have at least 4 sides
a rectangle a hexagon
To find the area of the shaded region (the rectangle inside the hexagon), we first calculate the area of the hexagon using the formula ( \text{Area} = \frac{3\sqrt{3}}{2} \times a^2 ), where ( a ) is the apothem. Given that the apothem is 15.59 units, the area of the hexagon is approximately ( \frac{3\sqrt{3}}{2} \times (15.59^2) \approx 609.67 ) square units. Assuming the rectangle’s area is not specified, the shaded area would be the hexagon's area minus the rectangle's area. If the rectangle's area is provided, subtract it from the hexagon's area to find the shaded region's area.
triangle,hexagon,rectangle