Trapezoid Practice Problems for 9th Grade - Area & Properties

Master trapezoid properties, area formulas, and angle calculations with step-by-step practice problems designed for ninth grade students learning quadrilaterals.

📚Master Trapezoid Concepts Through Targeted Practice

Calculate trapezoid area using the formula with parallel bases and height
Identify and classify isosceles, right angle, and standard trapezoids
Find missing angles in isosceles trapezoids using angle properties
Solve for unknown variables in trapezoid area problems
Apply midsegment theorem to find missing trapezoid measurements
Determine ratios between trapezoid segments and triangle areas

Understanding Trapezoids

Complete explanation with examples

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.

Characteristics of the Trapezoid

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.

A1 - Characteristics and types of trapezoids

Detailed explanation

Practice Trapezoids

Test your knowledge with 41 quizzes

What is the area of the trapezoid ABCD?

Examples with solutions for Trapezoids

Step-by-step solutions included

Exercise #1

The trapezoid ABCD is shown below.

AB = 2.5 cm

DC = 4 cm

Height (h) = 6 cm

Calculate the area of the trapezoid.

Step-by-Step Solution

First, let's remind ourselves of the formula for the area of a trapezoid:

$A=\frac{\left(Base\text{ }+\text{ Base}\right)\text{ h}}{2}$

We substitute the given values into the formula:

(2.5+4)*6 =
6.5*6=
39/2 =
19.5

Answer:

$19\frac{1}{2}$

Video Solution

Exercise #2

The trapezoid ABCD is shown below.

Base AB = 6 cm

Base DC = 10 cm

Height (h) = 5 cm

Calculate the area of the trapezoid.

Step-by-Step Solution

First, we need to remind ourselves of how to work out the area of a trapezoid:

$\frac{(Base+Base)\cdot h}{2}=Area$

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

Answer:

40 cm²

Video Solution

Exercise #3

Given: $∢C=2x$

$∢A=120°$

isosceles trapezoid.

Find x.

Step-by-Step Solution

Given that the trapezoid is isosceles and the angles on both sides are equal, it can be argued that:

$∢C=∢D$

$∢A=∢B$

We know that the sum of the angles of a quadrilateral is 360 degrees.

Therefore we can create the formula:

$∢A+∢B+∢C+∢D=360$

We replace according to the existing data:

$120+120+2x+2x=360$

$240+4x=360$

$4x=360-240$

$4x=120$

We divide the two sections by 4:

$\frac{4x}{4}=\frac{120}{4}$

$x=30$

Answer:

30°

Video Solution

Exercise #4

Below is an isosceles trapezoid

If $∢D=50°$

Determine the value of $∢B$ ?

Step-by-Step Solution

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:

$A+C=180$

$B+D=180$

Since angle D is known to us, we can calculate:

$180-50=B$

$130=B$

Answer:

130°

Video Solution

Exercise #5

The trapezoid ABCD is shown below.

AB = 5 cm

DC = 9 cm

Height (h) = 7 cm

Calculate the area of the trapezoid.

Step-by-Step Solution

The formula for the area of a trapezoid is:

\text{Area} = \frac{1}{2} \times (\text{Base}_1 + \text{Base}_2) \times \text{Height}

We are given the following dimensions:

Base $AB = 5$ cm
Base $DC = 9$ cm
Height $h = 7$ cm

Substituting these values into the formula, we have:

\text{Area} = \frac{1}{2} \times (5 + 9) \times 7

First, add the lengths of the bases:

5 + 9 = 14

Now substitute back into the formula:

\text{Area} = \frac{1}{2} \times 14 \times 7

Calculate the multiplication:

\frac{1}{2} \times 14 = 7

Then multiply by the height:

7 \times 7 = 49

Thus, the area of the trapezoid is 49 cm $^2$ .

Answer:

49 cm

Video Solution

Frequently Asked Questions

Everything you need to know about Trapezoids

What is the formula for finding the area of a trapezoid?

The area of a trapezoid is calculated using the formula: Area = (b₁ + b₂) × h ÷ 2, where b₁ and b₂ are the lengths of the parallel bases and h is the height. This formula works by finding the average of the two bases and multiplying by the height.

How do you identify different types of trapezoids?

There are three main types: 1) Regular trapezoid - has one pair of parallel sides, 2) Isosceles trapezoid - has equal leg lengths and equal base angles, 3) Right trapezoid - contains two right angles where the height equals one of the legs.

What are the angle properties of an isosceles trapezoid?

In an isosceles trapezoid, base angles are equal (angles on the same base have equal measures), and adjacent angles are supplementary (they add up to 180°). The legs are also equal in length, making it symmetric across its vertical axis.

How do you find missing angles in trapezoids?

Use these rules: adjacent angles on the same side add to 180°, base angles in isosceles trapezoids are equal, and the sum of all angles equals 360°. Start with known angles and apply these properties systematically.

What is a midsegment in a trapezoid and how do you calculate it?

A midsegment connects the midpoints of the two legs (non-parallel sides) of a trapezoid. Its length equals the average of the two parallel bases: midsegment = (base₁ + base₂) ÷ 2, and it runs parallel to both bases.

How do you solve trapezoid problems with variables?

Steps to follow: 1) Identify what the variable represents, 2) Set up the area formula or angle relationship, 3) Substitute known values, 4) Solve the resulting equation algebraically, 5) Check your answer by substituting back into the original problem.

What makes trapezoid problems challenging for 9th graders?

Students often struggle with: distinguishing between different trapezoid types, remembering that only one pair of sides is parallel, applying the correct area formula, and working with variables in geometric contexts. Practice with labeled diagrams helps overcome these challenges.

How are trapezoids different from parallelograms?

Key differences: Trapezoids have exactly one pair of parallel sides (bases), while parallelograms have two pairs of parallel sides. In trapezoids, only base angles may be equal (in isosceles type), whereas parallelograms have opposite angles equal and adjacent angles supplementary.

Practice by Question Type

Choose your preferred learning style and practice format for fraction problems

Applying the formula Calculate The Missing Side based on the formula Calculate The Missing Side based on the formula Finding Area based off Perimeter and Vice Versa How many times does the shape fit inside of another shape? Identifying and defining elements Subtraction or addition to a larger shape Suggesting options for terms when the formula result is known True / false Using additional geometric shapes Using angle properties Using Pythagoras' theorem Using ratios for calculation Using variables

Trapezoid Practice Problems for 9th Grade - Area & Properties

Understanding Trapezoids

Characteristics of the Trapezoid

Practice Trapezoids

Examples with solutions for Trapezoids

Frequently Asked Questions

What is the formula for finding the area of a trapezoid?

How do you identify different types of trapezoids?

What are the angle properties of an isosceles trapezoid?

How do you find missing angles in trapezoids?

What is a midsegment in a trapezoid and how do you calculate it?

How do you solve trapezoid problems with variables?

What makes trapezoid problems challenging for 9th graders?

How are trapezoids different from parallelograms?

More Trapezoids Questions

Area of a Trapezoid

Trapeze

Isosceles Trapezoids

Practice by Question Type

More Resources and Links