Illustrative Math-Media4Math Alignment

 

 

Illustrative Math Alignment: Grade 8 Unit 2

Dilations, Similarity, and Introducing Slope

Lesson 9: Side Length Quotients in Similar Triangles

Use the following Media4Math resources with this Illustrative Math lesson.

Thumbnail Image Title Body Curriculum Topic
Math Example--Geometric Transformation--Translating Triangles--Example 16 Math Example--Geometric Transformation--Translating Triangles--Example 16 Math Example--Geometric Transformation--Translating Triangles--Example 16

Topic

Transformations

Description

Triangle ABC is translated diagonally 4 units to the right and 3 units upward to form triangle A'B'C'. Example 16: The translation is described as 4 units to the right and 3 units up.

In this topic, students explore transformations, focusing specifically on translating triangles. These examples visually demonstrate how shapes move within a coordinate plane, reinforcing understanding of shifts along axes. Translation examples assist in grasping the basic concept of shifting figures without altering their orientation or shape.

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 17 Math Example--Geometric Transformation--Translating Triangles--Example 17 Math Example--Geometric Transformation--Translating Triangles--Example 17

Topic

Transformations

Description

Triangle ABC is translated diagonally 4 units downward and 4 units to the right to form triangle A'B'C'. Example 17: The translation is described as 4 units down and 4 units to the right.

In this topic, students explore transformations, focusing specifically on translating triangles. These examples visually demonstrate how shapes move within a coordinate plane, reinforcing understanding of shifts along axes. Translation examples assist in grasping the basic concept of shifting figures without altering their orientation or shape.

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 18 Math Example--Geometric Transformation--Translating Triangles--Example 18 Math Example--Geometric Transformation--Translating Triangles--Example 18

Topic

Transformations

Description

 

Triangle ABC is translated diagonally 3 units upward and 3 units to the right to form triangle A'B'C'. Example 18: The translation is described as 3 units up and 3 units to the right.

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 19 Math Example--Geometric Transformation--Translating Triangles--Example 19 Math Example--Geometric Transformation--Translating Triangles--Example 19

Topic

Transformations

Description

Triangle ABC is translated diagonally 6 units to the left and 4 units downward to form triangle A'B'C'. Example 19: The translation is described as 6 units to the left and 4 units down.

In this topic, students explore transformations, focusing specifically on translating triangles. These examples visually demonstrate how shapes move within a coordinate plane, reinforcing understanding of shifts along axes. Translation examples assist in grasping the basic concept of shifting figures without altering their orientation or shape.

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 2 Math Example--Geometric Transformation--Translating Triangles--Example 2 Math Example--Geometric Transformation--Translating Triangles--Example 2

Topic

Transformations

Description

A triangle on a grid is translated 5 units to the right. The diagram shows the original triangle ABC and the new position, A'B'C'.. Example 2: "Draw the triangle that results from the following translation: 5 units to the right." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 20 Math Example--Geometric Transformation--Translating Triangles--Example 20 Math Example--Geometric Transformation--Translating Triangles--Example 20

Topic

Transformations

Description

Triangle ABC is translated diagonally 2 units to the left and 5 units upward to form triangle A'B'C'. Example 20: The translation is described as 2 units to the left and 5 units up.

In this topic, students explore transformations, focusing specifically on translating triangles. These examples visually demonstrate how shapes move within a coordinate plane, reinforcing understanding of shifts along axes. Translation examples assist in grasping the basic concept of shifting figures without altering their orientation or shape.

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 21 Math Example--Geometric Transformation--Translating Triangles--Example 21 Math Example--Geometric Transformation--Translating Triangles--Example 21

Topic

Transformations

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 22 Math Example--Geometric Transformation--Translating Triangles--Example 22 Math Example--Geometric Transformation--Translating Triangles--Example 22

Topic

Transformations

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 3 Math Example--Geometric Transformation--Translating Triangles--Example 3 Math Example--Geometric Transformation--Translating Triangles--Example 3

Topic

Transformations

Description

A triangle on a grid is translated 4 units up. The figure displays both the original and translated triangles ABC and A'B'C'.. Example 3: "Draw the triangle that results from the following translation: 4 units up." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 4 Math Example--Geometric Transformation--Translating Triangles--Example 4 Math Example--Geometric Transformation--Translating Triangles--Example 4

Topic

Transformations

Description

A triangle on a grid is translated 5 units down. It shows the original triangle and its new position after translation, labeled A'B'C'. Example 4: "Draw the triangle that results from the following translation: 5 units down." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 5 Math Example--Geometric Transformation--Translating Triangles--Example 5 Math Example--Geometric Transformation--Translating Triangles--Example 5

Topic

Transformations

Description

A triangle is translated 4 units to the left and 2 units down. Both the original and the new triangles, ABC and A'B'C', are illustrated. Example 5: "Draw the triangle that results from the following translation: 4 units to the left, 2 units down." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 6 Math Example--Geometric Transformation--Translating Triangles--Example 6 Math Example--Geometric Transformation--Translating Triangles--Example 6

Topic

Transformations

Description

The triangle is translated 5 units to the right and 3 units up. The image includes both original and translated triangles, labeled ABC and A'B'C'. Example 6: "Draw the triangle that results from the following translation: 5 units to the right, 3 units up." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 7 Math Example--Geometric Transformation--Translating Triangles--Example 7 Math Example--Geometric Transformation--Translating Triangles--Example 7

Topic

Transformations

Description

A triangle is translated 4 units up and 5 units left, showing the original ABC and translated A'B'C' triangles. Example 7: "Draw the triangle that results from the following translation: 4 units up, 5 units left." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 8 Math Example--Geometric Transformation--Translating Triangles--Example 8 Math Example--Geometric Transformation--Translating Triangles--Example 8

Topic

Transformations

Description

 

The triangle is translated 5 units up and 2 units right. The image shows both the original and translated positions of the triangle. Example 8: "Draw the triangle that results from the following translation: 5 units up, 2 units rogjt." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Geometric Transformation--Translating Triangles--Example 9 Math Example--Geometric Transformation--Translating Triangles--Example 9 Math Example--Geometric Transformation--Translating Triangles--Example 9

Topic

Transformations

Description

A triangle is translated 4 units to the right and 3 units down. The image shows both the original and the new triangle positions. Example 9: "Draw the triangle that results from the following translation: 4 units to the right, 3 units down." Solution: "Identify one point to translate. Then complete the triangle."

Applications of Transformations and Applications of Triangles
Math Example--Polygons--Triangle Classification: Example 1 Math Example--Polygons--Triangle Classification: Example 1 Math Example--Polygons--Triangle Classification: Example 1

Topic

Triangles

Description

This image shows a triangle with side lengths labeled as a, b, and c, where all sides are unequal. Based on the length of each side, the triangle is classified as scalene, as no two sides are congruent.

Triangles are categorized based on side length (scalene, isosceles, equilateral) or angle measures (acute, obtuse, right). In this example, the scalene classification is determined by identifying that each side is a different length. The examples in this collection illustrate various classification rules based on both side and angle properties.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 10 Math Example--Polygons--Triangle Classification: Example 10 Math Example--Polygons--Triangle Classification: Example 10

Topic

Triangles

Description

This example presents a triangle with side lengths of 10, 10, and 8. Since two sides are congruent, the triangle is classified as isosceles.

Triangle classification can be determined by side lengths or angle measures. Isosceles triangles have two equal sides or angles. Reviewing different examples assists students in identifying these types based on side or angle properties.

Seeing multiple worked-out examples reinforces students’ ability to classify triangles by consistently applying classification rules.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 11 Math Example--Polygons--Triangle Classification: Example 11 Math Example--Polygons--Triangle Classification: Example 11

Topic

Triangles

Description

This example shows a triangle with two sides labeled as x and a third side labeled y. Because two sides are congruent, the triangle is classified as isosceles.

Triangles can be classified by their side lengths or angle measures. An isosceles triangle has two equal sides or angles, as seen in this example. Reviewing a series of examples helps students understand these classifications and recognize patterns in triangles.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 12 Math Example--Polygons--Triangle Classification: Example 12 Math Example--Polygons--Triangle Classification: Example 12

Topic

Triangles

Description

This example shows a triangle with side lengths all equal to 9. Since all sides are congruent, the triangle is classified as equilateral.

Triangles can be classified based on side or angle properties. An equilateral triangle has all sides and angles congruent. Viewing multiple examples reinforces students’ understanding of these classifications and enhances their ability to recognize triangle properties.

Seeing several worked-out examples helps students understand and apply the rules consistently for classifying triangles.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 13 Math Example--Polygons--Triangle Classification: Example 13 Math Example--Polygons--Triangle Classification: Example 13

Topic

Triangles

Description

This example shows a triangle with three sides labeled as x, all equal in length. Since all sides are congruent, the triangle is classified as equilateral.

Triangles can be categorized by side length or angle measures. An equilateral triangle has all congruent sides and angles. Reviewing multiple examples helps students recognize triangle classifications by observing side and angle patterns.

Providing several examples reinforces students’ ability to consistently classify triangles based on the observed properties.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 14 Math Example--Polygons--Triangle Classification: Example 14 Math Example--Polygons--Triangle Classification: Example 14

Topic

Triangles

Description

This example shows a triangle with three angles, each measuring 60°. Since all angles are equal, the triangle is classified as equilateral.

Triangle classification can be based on side lengths or angle measures. An equilateral triangle has all angles congruent. Reviewing examples like these helps students understand classification rules based on triangle properties.

Multiple examples reinforce students' ability to identify triangle types consistently by observing angle or side characteristics.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 15 Math Example--Polygons--Triangle Classification: Example 15 Math Example--Polygons--Triangle Classification: Example 15

Topic

Triangles

Description

This example presents a triangle with two angles labeled 60° and an unknown angle labeled x. Solving for x, we find it to be 60°, making all angles congruent and classifying the triangle as equilateral.

Triangle classification can be determined by side length or angle measures. An equilateral triangle has all equal sides and angles. Observing multiple examples helps students apply these criteria consistently when classifying triangles.

Seeing several worked examples helps students gain confidence in identifying triangles by recognizing congruent angles or sides.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 16 Math Example--Polygons--Triangle Classification: Example 16 Math Example--Polygons--Triangle Classification: Example 16

Topic

Triangles

Description

This example presents a triangle with three sides labeled as x, each equal in length. Since all three sides are congruent, the triangle is classified as equilateral.

Triangles are categorized by their side lengths or angle measures. An equilateral triangle has all equal sides and angles, as seen in this example. Reviewing multiple examples reinforces students' understanding of the consistent characteristics that define each triangle type.

Providing multiple worked-out examples helps students confidently apply classification rules to identify triangles by their properties.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 17 Math Example--Polygons--Triangle Classification: Example 17 Math Example--Polygons--Triangle Classification: Example 17

Topic

Triangles

Description

This example shows a triangle with angles measuring 90°, 60°, and 30°. Since one angle is exactly 90°, the triangle is classified as a right triangle.

Triangle classification often considers angle measures, with right triangles defined by having one 90° angle. Observing multiple examples allows students to consistently apply this classification rule.

Reviewing various worked-out examples helps students solidify their understanding of identifying triangle types based on angle measurements.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 18 Math Example--Polygons--Triangle Classification: Example 18 Math Example--Polygons--Triangle Classification: Example 18

Topic

Triangles

Description

This example shows a triangle with two angles labeled 50° and 40° and an unknown angle x. Solving for x, we find it to be 90°, which classifies this as a right triangle.

Triangles are classified by side lengths or angles, and a right triangle has a 90° angle. Examining examples like this helps students reinforce the criteria for identifying right triangles based on their angle properties.

Seeing multiple worked-out examples enables students to apply classification rules more effectively and confidently.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 19 Math Example--Polygons--Triangle Classification: Example 19 Math Example--Polygons--Triangle Classification: Example 19

Topic

Triangles

Description

This example presents a triangle with two congruent angles of 45° and one right angle of 90°. Because it has a 90° angle, the triangle is classified as a right triangle, and the two equal angles make it an isosceles right triangle.

Triangle classification can involve side lengths or angles. A right triangle has a 90° angle, while isosceles triangles have two equal angles or sides. This example combines both classifications. Reviewing multiple examples helps students confidently apply the criteria to identify triangle types.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 2 Math Example--Polygons--Triangle Classification: Example 2 Math Example--Polygons--Triangle Classification: Example 2

Topic

Triangles

Description

This image shows a triangle with sides measuring 7, 8, and 9. The triangle is classified as scalene because each side has a different length, meaning no two sides are congruent.

Triangles can be classified by examining their side lengths or angle measures. Scalene triangles, like the one shown, have no congruent sides, making them unique. This collection of examples helps students understand classification rules and visually identify different triangle types.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 20 Math Example--Polygons--Triangle Classification: Example 20 Math Example--Polygons--Triangle Classification: Example 20

Topic

Triangles

Description

This example shows a triangle with two known angles of 45° and an unknown angle x. Solving for x, we find it to be 90°, classifying this as a right triangle with two congruent angles, making it an isosceles right triangle.

Triangle classification may be based on side lengths or angles. Right triangles have a 90° angle, while isosceles triangles have two equal sides or angles. Examples like this help students understand combined classifications.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 21 Math Example--Polygons--Triangle Classification: Example 21 Math Example--Polygons--Triangle Classification: Example 21

Topic

Triangles

Description

This example shows a triangle with angles labeled as x, 2x, and 3x. Solving for x, we find that the angles are 30°, 60°, and 90°, classifying it as a right triangle.

Triangle classification can involve angle measures or side lengths. Right triangles have one 90° angle, as seen here. Reviewing various examples supports students in consistently applying these classification rules.

Observing multiple worked-out examples helps students gain confidence in identifying triangles based on the presence of specific angle measures.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 22 Math Example--Polygons--Triangle Classification: Example 22 Math Example--Polygons--Triangle Classification: Example 22

Topic

Triangles

Description

This example shows a triangle with two equal angles labeled x and a third angle labeled 2x. Solving for x, we find the angles to be 45°, 45°, and 90°, classifying it as an isosceles right triangle.

Triangles are classified by their angle measures or side lengths. Right triangles have a 90° angle, and isosceles triangles have two congruent angles. Reviewing examples like this one helps students understand combined classifications.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 23 Math Example--Polygons--Triangle Classification: Example 23 Math Example--Polygons--Triangle Classification: Example 23

Topic

Triangles

Description

This example shows a triangle with angles labeled x, 3x, and 5x. Solving for x, we find the angles to be 20°, 60°, and 100°, which classifies this triangle as obtuse because one of the angles is greater than 90°.

Triangles can be classified by angle measures, with obtuse triangles defined as having one angle greater than 90°. Observing examples like this aids students in understanding how angle measures determine classifications.

Providing multiple worked-out examples reinforces students' ability to consistently classify triangles based on angle properties.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 24 Math Example--Polygons--Triangle Classification: Example 24 Math Example--Polygons--Triangle Classification: Example 24

Topic

Triangles

Description

This example shows a triangle with angles labeled as x, 0.25x, and 1.1x. Solving for x, we find that all angles are less than 90°, classifying the triangle as acute.

Triangles are classified by their angle measures or side lengths, with acute triangles having all angles less than 90°. Reviewing examples like this helps students reinforce the criteria for classifying triangles based on angle sizes.

Seeing multiple worked-out examples builds students' confidence in applying classification rules and identifying triangle types based on consistent properties.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 3 Math Example--Polygons--Triangle Classification: Example 3 Math Example--Polygons--Triangle Classification: Example 3

Topic

Triangles

Description

This example shows a triangle with side lengths of 12, 18, and x, where x is not equal to 12 or 18. The triangle is classified as scalene because all three side lengths are different.

Triangles are categorized by side length or angle. Scalene triangles, with all sides unequal, demonstrate a key classification type. Multiple examples help students recognize classification patterns for triangles based on side length or angle measure.

Observing various worked-out examples reinforces consistent application of classification criteria, building student confidence in identifying triangle types.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 4 Math Example--Polygons--Triangle Classification: Example 4 Math Example--Polygons--Triangle Classification: Example 4

Topic

Triangles

Description

This example displays a triangle with angles measuring 89°, 44°, and 47°. Since all angles are less than 90°, the triangle is classified as acute.

Triangle classification can be based on side length or angle measures. Acute triangles have all angles less than 90°, as shown in this example. Reviewing multiple examples in this way helps students visually distinguish triangle types by angle.

Providing varied worked-out examples solidifies students’ understanding of the criteria for each triangle type, enabling them to accurately identify triangles by their angle measures.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 5 Math Example--Polygons--Triangle Classification: Example 5 Math Example--Polygons--Triangle Classification: Example 5

Topic

Triangles

Description

This example presents a triangle with angles of 48°, 50°, and an unknown angle x. Solving for x, we find that x = 82°, meaning all angles are less than 90°, classifying it as acute.

Triangles can be identified by their angles or side lengths. Acute triangles have all angles less than 90°, as seen here. Reviewing examples like this supports student understanding of angle-based classification.

Seeing multiple worked examples helps students recognize patterns and confidently classify triangles based on established criteria.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 6 Math Example--Polygons--Triangle Classification: Example 6 Math Example--Polygons--Triangle Classification: Example 6

Topic

Triangles

Description

This example shows a triangle with angles of 36°, 100°, and 44°. Because one of the angles is greater than 90°, this triangle is classified as obtuse.

Triangles are classified by side lengths or angles. An obtuse triangle has one angle greater than 90°, as seen here. This collection of examples supports students in identifying and classifying triangles based on distinct angle measures.

Seeing multiple worked-out examples reinforces students' understanding of classification rules, making it easier to recognize triangle types based on angle or side length.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 7 Math Example--Polygons--Triangle Classification: Example 7 Math Example--Polygons--Triangle Classification: Example 7

Topic

Triangles

Description

This example presents a triangle with two known angles, 20° and 50°, and an unknown angle x. Solving for x, we find it to be 110°. Since one angle is greater than 90°, the triangle is classified as obtuse.

Triangles can be classified by their angles, where obtuse triangles have one angle over 90°. Reviewing examples like this aids students in understanding classification based on angle measures.

Seeing multiple examples reinforces the rules and helps students apply classification consistently and accurately.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 8 Math Example--Polygons--Triangle Classification: Example 8 Math Example--Polygons--Triangle Classification: Example 8

Topic

Triangles

Description

This example shows a triangle with two angles, each measuring 60°. Since two angles are congruent, this triangle is classified as isosceles.

Triangles can be categorized by side or angle properties. Isosceles triangles have two equal sides or two equal angles, as illustrated here. This collection of examples allows students to observe classifications and understand patterns in triangle properties.

Examining multiple examples helps students confidently identify triangle types based on consistent characteristics.

Definition of a Triangle
Math Example--Polygons--Triangle Classification: Example 9 Math Example--Polygons--Triangle Classification: Example 9 Math Example--Polygons--Triangle Classification: Example 9

Topic

Triangles

Description

This example shows a triangle with two angles labeled x and one angle labeled y. Since two angles are congruent, the triangle is classified as isosceles.

Triangles can be classified by side lengths or angle measures. Isosceles triangles, with two equal sides or angles, are common. Observing various examples helps students understand these classification criteria.

Providing multiple examples allows students to identify patterns in side and angle relationships, reinforcing accurate triangle classification.

Definition of a Triangle
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 1 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 1 Solving Equations Using Triangle Properties: Example 1

Topic

Equations

Description

This example focuses on solving equations using the properties of similar isosceles triangles. Isosceles triangles are characterized by having two equal sides and two equal base angles. In this case, we have two similar isosceles triangles, which means they share the same shape but may differ in size. The equation to be solved involves finding the unknown angle x, given that one of the angles is 20°. The property of vertical angles tells us that the angle vertical to the 20° angle is also 20°

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 10 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 10 Solving Equations Using Triangle Properties: Example 10

Topic

Equations

Description

This example, similar to Example 9, involves solving equations using the properties of a kite and applying the exterior angle theorem. We are again given one angle of 40° and two unknown angles, y and x. The goal is to set up and solve equations to find the values of y and x using the properties of kites and the exterior angle theorem. 

Key properties to consider: 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 2 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 2 Solving Equations Using Triangle Properties: Example 2

Topic

Equations

Description

This example explores solving equations using the properties of similar isosceles triangles, building upon the concepts introduced in Example 1. In this case, we have two similar isosceles triangles with one known angle of 70° and an unknown angle x. The goal is to determine the value of x using triangle properties and algebraic techniques. 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 3 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 3 Solving Equations Using Triangle Properties: Example 3

Topic

Equations

Description

This example focuses on solving equations involving parallel lines cut by a transversal, a fundamental concept in geometry. The problem presents two parallel lines intersected by two transversals that also form a triangle. We are given that one angle measures 120° and the corresponding angle can be expressed as (y + 40)°. The goal is to determine the value of y using the properties of angles formed by parallel lines and a transversal. 

When parallel lines are cut by a transversal, several important angle relationships are formed: 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 4 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 4 Solving Equations Using Triangle Properties: Example 4

Topic

Equations

Description

This example demonstrates solving equations using the Exterior Angle Theorem in the context of parallel lines cut by a transversal, two crucial concepts in geometry. The problem presents a triangle with two known interior angles of 80° and y, and an unknown exterior angle x°. 

We are also given that 80 - y = 50, which simplifies to y = 30. The goal is to determine the value of x using the properties of triangles and the Exterior Angle Theorem. The Exterior Angle Theorem states that an exterior angle of a triangle is equal to the sum of the two non-adjacent interior angles. Wo we get x = 80 + 30, or x = 110.

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 5 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 5 Solving Equations Using Triangle Properties: Example 5

Topic

Equations

Description

This example focuses on solving equations involving isosceles triangles centered in a circle. The problem presents two equations: z - y = 20 and z + y = 120, where z and y represent angles in the isosceles triangles. The goal is to solve this system of equations to find the values of z and y, utilizing properties of isosceles triangles and circles. 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 6 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 6 Solving Equations Using Triangle Properties: Example 6

Topic

Equations

Description

This example explores solving equations involving triangles that share a vertex at the center of a circle. We are presented with two equations: 

x + y = 75 and z + y = 110, where x, y, and z represent angles in the triangle

The goal is to solve this system of equations to find the values of x, y, and z, utilizing properties of isosceles triangles. Since each of the triangles is isosceles, we know that z + 55 + 55 = 180 and therefore, z = 70°. We substitute this into one of the equations:

70 + y = 110

7 = 40°

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 7 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 7 Solving Equations Using Triangle Properties: Example 7

Topic

Equations

Description

This example focuses on solving equations involving isosceles triangles with a common vertex and base. We are given two angles, 62° and 99°, and need to find the unknown angle x. This problem demonstrates how to use the properties of isosceles triangles and the sum of angles in a triangle to solve for an unknown angle. 

Key properties to consider: 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 8 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 8 Solving Equations Using Triangle Properties: Example 8

Topic

Equations

Description

This example involves solving an equation using the properties of a trapezoid with an embedded parallelogram and applying the exterior angle theorem. We are given two angles, 30° and 110°, and need to find the unknown angle x. This problem demonstrates the application of multiple geometric concepts to solve a complex equation. 

Key properties to consider: 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 9 Math Example--Solving Equations--Solving Equations Using Triangle Properties: Example 9 Solving Equations Using Triangle Properties: Example 9

Topic

Equations

Description

This example focuses on solving equations using the properties of a kite and applying the exterior angle theorem. We are given one angle of 30° and two unknown angles, y and x. The goal is to set up and solve equations to find the values of y and x using the properties of kites and the exterior angle theorem. 

Key properties to consider: 

Applications of Equations and Inequalities and Applications of Triangles
Math Example--Solving Equations--Solving Equations with Angle Measures--Example 1 Math Example--Solving Equations--Solving Equations with Angle Measures--Example 1 Solving Equations with Angle Measures--Example 1

Topic

Equations

Solving Multistep Equations and Applications of Angles and Planes