Finding the Area of a Basic Figure

Developing the Area formulae for Squares, Rectangles, Parallelograms, Triangles, and

Trapezoids.

Square Parallelogram Triangle

Rectangle Trapezoid

What is Area?

Area is a quantity that describes the amount a two-dimensional shape can cover a plane.

Area is defined as the number of squares of a fixed size that cover the same space.

Area can be thought of as the amount of material it can take to cover an object OR the amount of paint required to paint an object with a single coat

What is Area?Since Area is measured in Square units we will start by defining the area of a unit square.

1 unit

1 unit

The Area of this object is Defined as 1 unit2.

The Area of a Square

To find the area of a square we find how many unit squares fit into the actual square

4 units

4 units

The Area of this object is 16 units2.

The Area of a Square

Following the pattern for any Square we can develop a formula

S units

S units

The Area of this object is S*S units2

or S2 units2

The Area of a Square

SO….The Area of any square is:

Area = S2

(Where S is the length of the sides of the Square)

S units

S units

The Area of a Rectangle

We find the area of a rectangle similarly to how we found the area of a rectangle.

3 units

6 units

The Area of this object is 6*3 = 18 units2.

The Area of a Rectangle

Now we develop the formula by multiplying the number of columns (Base) with the number of rows (Height).

Height

Base

The Area of this object is Base*Height = bh units2.

The Area of a Rectangle

SO….The Area of any rectangle is:

Area = b*h(Where b is the base and h is the height)

Height

Base

The Area of a Parallelogram

To Find the Area Formula for Parallelograms we must slice it and turn it into a Rectangle

Height

Base

The Area of a Parallelogram

Start by identifying a line of height perpendicular to the base.

Height

Base

The Area of a Parallelogram

Cut the Parallelogram along the height and move half the shape to the other side.

Height

Base

Base

Height

The Area of a Parallelogram

Notice that the shape turned into a Parallelogram with the same Height and Base

Height

Base

Base

Height

The Area of a Parallelogram

SO…the are formula for a Parallelogram IS identical to the Area formula for a Rectangle.

Height

Base

Base

HeightArea = b*h

Where b is the base

and h is the height

Parallelogram Example

8

10

Area = b*h = 10*8 = 80 units2

The Area of a Triangle

Again the goal is to turn the triangle into a shape we already know

Height

Base

The Area of a Triangle

Start by Copying the Triangle

Height

Base

The Area of a Triangle

Rotate the copy and place it next to the original so that one pair of common sides overlap

Height

Base

Notice: The new shape is a Parallelogram & the triangle was half of the new shape.

The Area of a Triangle

Since the original triangle is half of the Parallelogram, then the area is also half.

Height

Base

Area = (Area of Parallelogram) = b*h

Triangle Example

4

6

Area = = *4 = 12 units2

The Area of a Trapezoid

Again the goal is to turn the trapezoid into a shape we already know

Height

Base 2

Base 1

The Area of a Trapezoid

Like the triangle, copy the original trapezoid

Height

Base

The Area of a Trapezoid

Rotate the trapezoid and place it so one pair of legs overlap

Height

Base 2Notice: The new shape is a Parallelogram & the trapezoid was half of the new shape.

Base 1

Base 1Base 2

The Area of a Trapezoid

Since the Trapezoid is half the parallelogram:

Height

Base 2

Area = b*h =

*h

Base 1

Base 1Base 2

Trapezoid Example

4

8Area = *h

= *4=(13)*4

= 6.5*4

= 26

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