A composite 2D figure is a two dimensional figure made up of basic two dimensional shapes such as triangles, rectangles, circles, semi-circles, etc.
To find the perimeter of a composite 2D figure, add the lengths of the sides.
To find the area of a composite 2D figure, draw any necessary segments to view the figure as basic shapes, then:
PROBLEM
Find the perimeter and area of the composite 2D figure below.
View the composite 2D figure as a right triangle together with a rectangle less a semicircle, then find any missing lengths in order to calculate the perimeter and area.
PERIMETER SOLUTION
Since the radius of the semicircle is 20 cm, the distance between the 50 cm and 80 cm side is 40 cm. The hypotenuse of the right triangle can be found by substituting the known lengths of 30 cm and 40 cm into the formula for the Pythagorean theorem. The length of the semicircle (x) can be calculated by multiplying the circumference formula for a circle by one-half.
P: Perimeter of the composite 2D figure.
P = 50 cm + 50 cm + 80 cm + 20π cm;
P = (180 + 20π) cm
Using a calculator, we can estimate this result to two decimal places as 242.83 cm
The perimeter of the given composite 2D figure is (180 + 20π) cm [approximately 242.83 cm].
AREA SOLUTION ONE
A: Area.
Acomposite 2D figure = Aright triangle + Arectangle - Asemicircle
Acomposite 2D figure = 600 cm2 + 2000 cm2 - 200π cm2
Acomposite 2D figure = 2600 cm2 - 200π cm2
Acomposite 2D figure = (2600 - 200π) cm2
Using a calculator, we can estimate this result to two decimal places as 1971.68 cm2
The area of the given composite 2D figure is (2600 - 200π) cm2 [approximately 1971.68 cm2].
AREA SOLUTION TWO
Note that there are other similar ways to calculate the area of the given composite 2D figure. For example rather than viewing the composite 2D figure as a right triangle together with a rectangle less a semicircle, view it as a rectangle less both a right triangle and a semicircle.
A: Area.
Acomposite 2D figure = Arectangle - Aright triangle - Asemicircle
Acomposite 2D figure = 3200 cm2 - 600 cm2 - 200π cm2
Acomposite 2D figure = 2600 cm2 - 200π cm2
Acomposite 2D figure = (2600 - 200π) cm2
Using a calculator, we can estimate this result to two decimal places as 1971.68 cm2
The area of the given composite 2D figure is (2600 - 200π) cm2 [approximately 1971.68 cm2].