The trapezoid is considered one of the most intimidating shapes for students, therefore we have decided to provide a summary of the general idea behind the trapezoid and explain its properties to them and introduce some types of trapezoids.
The trapezoid is considered one of the most intimidating shapes for students, therefore we have decided to provide a summary of the general idea behind the trapezoid and explain its properties to them and introduce some types of trapezoids.
A trapezoid is a quadrilateral based on 4 sides like any other,
but special in that it will always have two parallel sides also called bases, which we can call the larger base and the smaller base
and it will also have two opposite sides also called legs.
Calculate the area of the trapezoid.
Given: \( ∢C=2x \)
\( ∢A=120° \)
isosceles trapezoid.
Find x.
Given the trapezoid:
What is the area?
Look at the trapezoid in the diagram.
What is its perimeter?
\( ∢D=50° \)
The isosceles trapezoid
What is \( ∢B \)?
Calculate the area of the trapezoid.
We use the formula (base+base) multiplied by the height and divided by 2.
Note that we are only provided with one base and it is not possible to determine the size of the other base.
Therefore, the area cannot be calculated.
Cannot be calculated.
Given:
isosceles trapezoid.
Find x.
Given that the trapezoid is isosceles and the angles on both sides are equal, it can be argued that:
We know that the sum of the angles of a quadrilateral is 360 degrees.
Therefore we can create the formula:
We replace according to the existing data:
We divide the two sections by 4:
30°
Given the trapezoid:
What is the area?
Formula for the area of a trapezoid:
We substitute the data into the formula and solve:
52.5
Look at the trapezoid in the diagram.
What is its perimeter?
In order to calculate the perimeter of the trapezoid we must add together the measurements of all of its sides:
7+10+7+12 =
36
And that's the solution!
36
The isosceles trapezoid
What is ?
Let's recall that in an isosceles trapezoid, the sum of the two angles on each of the trapezoid's legs equals 180 degrees.
In other words:
Since angle D is known to us, we can calculate:
130°
The trapezoid ABCD is shown below.
AB = 2.5 cm
DC = 4 cm
Height (h) = 6 cm
Calculate the area of the trapezoid.
The trapezoid ABCD is shown below.
Base AB = 6 cm
Base DC = 10 cm
Height (h) = 5 cm
Calculate the area of the trapezoid.
True OR False:
In all isosceles trapezoids the base Angles are equal.
What is the area of the trapezoid in the figure?
What is the perimeter of the trapezoid in the figure?
The trapezoid ABCD is shown below.
AB = 2.5 cm
DC = 4 cm
Height (h) = 6 cm
Calculate the area of the trapezoid.
First, let's remind ourselves of the formula for the area of a trapezoid:
We substitute the given values into the formula:
(2.5+4)*6 =
6.5*6=
39/2 =
19.5
The trapezoid ABCD is shown below.
Base AB = 6 cm
Base DC = 10 cm
Height (h) = 5 cm
Calculate the area of the trapezoid.
First, we need to remind ourselves of how to work out the area of a trapezoid:
Now let's substitute the given data into the formula:
(10+6)*5 =
2
Let's start with the upper part of the equation:
16*5 = 80
80/2 = 40
40 cm²
True OR False:
In all isosceles trapezoids the base Angles are equal.
True: in every isosceles trapezoid the base angles are equal to each other.
True
What is the area of the trapezoid in the figure?
We use the following formula to calculate the area of a trapezoid: (base+base) multiplied by the height divided by 2:
cm².
What is the perimeter of the trapezoid in the figure?
To find the perimeter we will add all the sides:
24
Do the diagonals of the trapezoid necessarily bisect each other?
Given the trapezoid in front of you:
Given h=9, DC=15.
Since the area of the trapezoid ABCD is equal to 126.
Find the length of the side AB.
In an isosceles trapezoid ABCD
\( ∢B=3x \)
\( ∢D=x \)
Calculate the size of angle \( ∢B \).
Look at the trapezoid in the figure.
The long base is 1.5 times longer than the short base.
Find the perimeter of the trapezoid.
The perimeter of the trapezoid equals 22 cm.
AB = 7 cm
AC = 3 cm
BD = 3 cm
What is the length of side CD?
Do the diagonals of the trapezoid necessarily bisect each other?
The diagonals of an isosceles trapezoid are always equal to each other,
but they do not necessarily bisect each other.
(Reminder, "bisect" means that they meet exactly in the middle, meaning they are cut into two equal parts, two halves)
For example, the following trapezoid ABCD, which is isosceles, is drawn.
Using a computer program we calculate the center of the two diagonals,
And we see that the center points are not G, but the points E and F.
This means that the diagonals do not bisect.
No
Given the trapezoid in front of you:
Given h=9, DC=15.
Since the area of the trapezoid ABCD is equal to 126.
Find the length of the side AB.
We use the formula to calculate the area: (base+base) times the height divided by 2
We input the data we are given:
We multiply the equation by 2:
We divide the two sections by 9
13
In an isosceles trapezoid ABCD
Calculate the size of angle .
To answer the question, we must know an important rule about isosceles trapezoids:
The sum of the angles that define each of the trapezoidal sides (not the bases) is equal to 180
Therefore:
∢B+∢D=180
3X+X=180
4X=180
X=45
It's important to remember that this is still not the solution, because we were asked for angle B,
Therefore:
3*45 = 135
And this is the solution!
135°
Look at the trapezoid in the figure.
The long base is 1.5 times longer than the short base.
Find the perimeter of the trapezoid.
First, we calculate the long base from the existing data:
Multiply the short base by 1.5:
Now we will add up all the sides to find the perimeter:
17.5
The perimeter of the trapezoid equals 22 cm.
AB = 7 cm
AC = 3 cm
BD = 3 cm
What is the length of side CD?
Since we are given the perimeter of the trapezoid and not the length of CD, we can calculate:
9