Upload
others
View
6
Download
0
Embed Size (px)
Citation preview
Page 1 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
DATE: β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦.
TOPIC: GEOMETRY OF STRAIGHT LINES
CONCEPTS & SKILLS TO BE ACHIEVED:
By the end of the lesson learners should know and be able to write clear descriptions of the
relationship between angles formed:
Parallel lines cut by transversal
RESOURCES: DBE Workbook 1, Sasol-Inzalo book, Textbooks,
ONLINE RESOURCES
https://drive.google.com/open?id=1Qw6gZzmSxQ-ypsHmqx1LHnVbA2HsKX79
https://www.thelearningtrust.org/asp-treasure-box
MATHEMATICS
GRADE 9
Page 2 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
DAY 1: ACTIVITY 1
Teacher instructs learner: Warm Up (10 mins)
Why Warm Up before the start of a lesson?
(Additional information
for student and teacher)
a) Give an example of a pair of vertically opposite angles (draw) and describe how to find
the value of one angle when the other is given.
Example
Description
b) Give an example of adjacent supplementary angle pair and describe how to
find the value of one angle when the other is given.
Example
Description
Use prior-knowledge activities to help
connect to the why of the lesson, paint
a picture of where students are headed
in the lesson, and develop student
perseverance during the lesson (by
reminding them throughout the lesson
how chosen activities connect to the
learning outcomes).
Page 3 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
DAY 1 ACTIVITY 1 & 2 LESSON PRESENTATION/DEVELOPMENT (Suggested time: 20 minutes)
INTRODUCTION: GRADE 8 REVISION
STUDY THE FOLLOWING CONCEPTS TO FAMILIARISE YOURSELF WITH SOME
FUNDAMENTALS:
What are Parallel Lines?
Two lines are parallel to each other if they are the same distance apart on each
point and never intersect each other.
Symbol (β)
Parallel lines are indicated by using arrows on the lines.
Example:
β΄ ππππ 1 ππ ππππππππ π‘π ππππ 2 β΄ ππ β ππ
Parallel lines in our daily life
Transversal: How do we define a transversal?
A transversal is a line that cuts or intersects 2 or more lines. The lines can be parallel or non β
parallel.
Example:
Transversal lines in our daily life:
Page 4 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
CONSOLIDATION/CONCLUSION
Activity 2: Copy and complete in your workbook.
Definition
Characteristics
Example (draw)
Definition
Characteristics
Example(draw)
Memorandum:
Day 1: Activity 1 & 2
Activity 1
a)
Example
Description
AB and CD intersect at O,
then O1 = οΏ½οΏ½2 and O3 = οΏ½οΏ½4
Parallel lines
Transversal line
Page 5 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
b)
Example
Description
1 2Λ ΛIf ABC is a straight line, then B B 180
Activity 2
Definition
Two lines are parallel to each
other if they are the same distant
apart on each point and never
intersect each other.
Characteristics
Same distance apart
Never intersects
Moves in same direction
Indicates with arrows
Symbol (β)
Example
Definition
A transversal is a line that cuts
or intersects 2 or more lines.
The lines can be parallel or non
β parallel.
Characteristics
Straight line
Creates 8 angles when it cut/
intersects pair of lines
Example
Parallel lines
Transversal line
Page 6 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
DAY 2 & 3: ACTIVITIES 3 - 6: LESSON PRESENTATION/DEVELOPMENT
Warm Up: Work through the exercise and complete the answers in your exercise book
Fill in the missing words
1.Parallel lines are two lines that are always the same __________ apart and never
________________.
2. A ____________________ is a line that intersects two lines at two different points.
3. When a transversal cut a set of parallel lines, ____________ angles are formed.
NOTE THE FACTS FOR TODAYβS LESSON:
a. What are exterior angles? (angles that lie on the outside of the parallel
lines cut by the transversal.) - β 1 , β 2 , β 7 and β 8
b. What are interior angles? (angles that lie between the
parallel lines cut by the transversal.) - β 3 , β 4 , β 5 and β 6
Activity 3:
Use tissue paper and color pencils in this activity to discover
alternate interior angles when a transversal cuts two parallel lines.
PART 1: INSTRUCTIONS:
On the picture below, using any colour pencil or highlighter, highlight parallel lines m
and n.
To answer the questions below rotate the tissue paper and place the angle you trace
on top of other angles to find matching angles.
Page 7 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
Focusing on the angles located between(interior area) parallel lines m and n. Place the tissue
paper on top of the picture
3.1 Trace angle 3
3.1.1 Find the angle equal to angle 3.
Colour both angles with the same colour
3.2 Trace angle 4
3.2.1 Find the angle equal to angle 4
Use a different colour pencil than you did for question 3.1 and colour both angles with the
same colour.
Part 2
3.3 The pairs of equal angles found in questions 3.1 and 3.2 have a special
name.
We call them alternate __3.3.1______ angles.
DAY 3: Activity 4:
Use tissue paper and colour pencils to discover corresponding angles when a transversal cuts
two parallel lines.
Instructions:
On the picture below, using any colour pencil or highlighter, highlight π‘ππππ π£πππ ππ π.
To answer the questions below slide the tissue paper along π‘ππππ π£πππ ππ π to find
matching angles.
Focusing on the angles located at the left side of π‘ππππ π£πππ ππ π.
Place the tissue paper on top of the picture
4.1 Trace angle 1
4.1.1 Find the angle equal to angle 1.
Colour both angles with the same colour.
Page 8 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
4.2 Trace angle 3
4.2.1 Find the angle equal to angle 3
Use a different colour pencil and colour both angles with the
same colour.
Focusing only on angles located at the right side of π‘ππππ π£πππ ππ π,
Place the tissue paper on top of the picture above.
4.3 Trace angle 2
4.3.1 Find the angle equal to angle 2
Use a different colour pencil and colour both angles with the
same colour.
4.4 Trace angle 4
4.4.1 Find the angle equal to angle 4
Use a different colour pencil and colour both angles with the
same.
The pairs of equal angles found in questions 4.1, 4.2, 4.3 and 4.4 have
a special name. We call them corresponding angles.
HOMEWORK/CONSOLIDATION
Do the following exercises. The solutions can be found at the end of the lesson.
FIRST ATTEMPT TO DO THE EXERCISE BEFORE YOU WORK THROUGH THE
SOLUTIONS Activity 5
Fill in the missing words and correctly place an angle number / angle pair(s) in the correct box.
Angle numbers may repeat.
Name Angles Transversal EF intersects parallel lines
AB and CD
Interior Angles
Alternate Interior
Angles are ______
Corresponding
Angles are ______
Page 9 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
Vertical
Angles are ______
Activity 6
Calculate the unknown angles and provide a geometric reason for each statement.
6.1
Redding lane and Creek Road are
parallel streets that intersects Park Road
along the west side of Wendell Park.
If β 1 = 1180, then what is β 2?
6.3
Find the value of π₯.
6.2
Find the value of π₯.
6.4
The painted lines that separate parking
spaces are parallel.
The size of β 1 = 600.
What is the size of β 2?
Page 10 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
MEMORANDUM: DAY 2 & 3:
Warm Up
1.Parallel lines are two lines that are always the same distance apart and never intersects. 2.A transversal is a line that intersects two lines at two different points.
3.When a transversal cut a set of lines, 8 angles are formed.
Activity 3
Part 1
3.1.1 Angle 6
3.2.1 Angle 5
Part
3.3 Alternate interior angles
Activity 4
4.1.1 Angle 5
4.2.1 Angle 7
4.3.1 Angle 6
4.4.1 Angle 8
Activity 5
Name Angles Transversal EF intersects parallel lines
AB and CD
Interior Angles
β 3; β 4; β 5; β 6
Alternate Interior
Angles are equal
β 3 and β 6; β 4 and β 5
Corresponding
Angles are equal
β 1 andβ 5; β 2 and β 6; β 3 and β 7; β 4 and β 8
Page 11 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
Vertical
Angles are equal
β 1 and β 4; β 2 andβ 3; β 5andβ 8; β 6andβ 7
Activity 6
6.1
Statement Reason β 1 = β 2
β΄ β 2 = 1180
(π΄ππ‘ β π , βπππππ )
6.2
Statement Reason
π₯ = 640 (π΄ππ‘ β π , βπππππ )
6.3
Statement Reason
π₯ = 1300 ( β π ππ π π‘ππππβπ‘ ππππ ; π΄ππ‘ β π ; πΆπππ β π )
6.4
Statement Reason
β 1 = β 2 β΄ β 2 = 600
(πΆπππ. β π , β πππππ )
Page 12 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
DAY 4: ACTIVITY 7 & 8: LESSON PRESENTATION/DEVELOPMENT
Work through the following activity:
Co-interior angles
The angles π΄πΊπ» and πΆοΏ½οΏ½πΊ in the figure are called co-interior angles. They are on the same side
of the transversal.
Consider the figure below and answer the questions that follow.
7.1 What do you know about πΆοΏ½οΏ½πΊ + π·οΏ½οΏ½πΊ? Explain.
7.2 What do you know about π΅πΊπ» + π΄πΊπ»? Explain.
7.3 What do you know about π΅πΊπ» + πΆοΏ½οΏ½πΊ? Explain.
7.4 What conclusion can you draw about π΄πΊπ» + πΆοΏ½οΏ½πΊ?
Give detailed reasons for your conclusion.
7.5 When two parallel lines are cut by a transversal, the
sum of two ____7.5.1____angles is ____7.5.2___.
7.6 Another way of saying this is to say that the two
co-interior angles are ___7.6.1___
The prefix βco- βmeans together. The word βco -interiorβ means on the
same side.
Page 13 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
CONSOLIDATION/CONCLUSION
THE FOLLOWING FACTS ARE EXTREMELY IMPORTANT.
Summary of the theorems of parallel lines:
F U n
Corresponding angles
Corresponding angles lie either both above or both below the parallel lines and on the same
side as the transversal. They are the angles in matching corners and are equal. Always look out for the F shape.
Co- interior angles
Co-interior angles lie on the same side of the transversal between the parallel lines. These angles
are supplementary. Always look out for the U shape.
β + β = 180
Alternate angles
Alternate angles lie on opposite sides of the transversal and between the parallel lines.
They are equal in size. Always look out for the Z or N shape.
Corresponding angles Co-interior angles Alternate angles
Page 14 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
HOMEWORK/CONSOLIDATION:
Activity 8
Corresponding angles
If a transversal cuts through two parallel lines, then the pairs of corresponding angles are
equal.
If DB//EC and ABC is a transversal,
then 1ΛB C corr. 's DB//EC
In each of the following calculate the angles marked with x, y and z. Give reasons in
each case.
8.1
8.2
8.3
Page 15 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
Alternate angles
If a transversal cut through two parallel lines, then the pairs of alternate angles are equal.
If AB//CD and BC is a transversal, then ΛB C (alt. 's AB//CD )
Reason: alt. βs AB//CD
In each of the following calculate, with reasons, the angles marked by small letters.
8.4
8.5
8.6
Co-interior angles
If a transversal cut through two parallel lines, then the pairs of co-interior angles are supplementary i.e.
add up to 180
Page 16 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
Reason: co-int. βs PQ//TR
In each of the following calculate, with reasons, the angles marked by small letters.
8.7
8.8
8.9
MEMORANDUM: DAY 4:
Activity 7
7.1 They are supplementary (their sum = 180Β°) because CD is a straight line.
7.2 They are supplementary (their sum = 180Β°) because AB is a straight line.
7.3 They are alternate angles and they are equal, because ABβCD
7.4 They are also supplementary (their sum = 180Β°).
This is because we have already shown that:
CοΏ½οΏ½G is equal to BπΊH (alt. β s ABβCD)
BπΊH is supplementary to AGH (β s on a str. line).
7.5.1 Co-interior angles
7.5.2 180Β°.
If PQ//TR and RQ is a transversal, then Λ ΛQ R 180 (co-int. βs PQ//TR)
T
P
Q
R
R
R
Q
Q T
T
P
P
Page 17 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
7.6.1 supplementary
Activity 8
8.1
π₯ = 1020 (ππππ. β π , ππβπ π)
8.2
π₯ = 650 (ππππ. β π , πΈπΉβπ·πΊ) π¦ = 650(ππππ. β π , π΅π΄βπ·π΄)
8.3
π₯ = 720 ( π£πππ‘. πππ β π )
π¦ = 720((ππππ. β π , π πβππ) π§ = 1080 ( β π ππ π π‘π. ππππ)
8.4
π = 1020(π΄ππ‘ β π . , ππβπ π)
8.5
π₯ = 1300 (πππ£πππ’π‘πππ)
π¦ = 1300(π΄ππ‘ β π , βπππππ )
8.6
π₯ = 360( π΄ππ‘ β π , π·π΄ βπΈπ΅) π¦ = 310( π΄ππ‘ β π , π΄π΅βπ·πΆ) π§ = 670(ππππ. β π π΄π΅βπ·πΆ)
Page 18 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
8.7
π = 350(ππ β πππ‘ β π , πΏπΎβππ)
π = 350( π£πππ‘ πππ β π )
8.8
π = ππππ(ππππ. β π, π«π©βπ¬π)
π = πππ(ππ β πππ β π, π¨π©βπͺπ«)
π. π 4π₯ + 2π₯ = 1800(ππ β πππ‘β π , ππβππ )
6π₯ = 1800 β΄ π₯ = 300
DAY 5: ACTIVITY 9: LESSON PRESENTATION/DEVELOPMENT
Warm Up activity: Do the 2 exercise in your workbook
Solve the unknown:
1. 4π β 6 = 34
2. 9π β 24 = 1 + 4π
Activity 9: Work through the example
9.1 In this diagram AB β₯ CD, EF is a transversal. Calculate the size of HGD.
Page 19 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
CONSOLIDATION/CONCLUSION
NOTE THE FOLLOWING IMPORTANT FACTS. YOU WILL BE REQUIRED TO APPLY THE
FACTS
When solving problems use what you know about the angles between
parallel lines cut by transversal to decide whether lines are parallel or not.
It is important to state in your reason that the lines are parallel. These alternate and
corresponding angles are equal and co-interior angles are supplementary ONLY if lines
are parallel.
The sum of the angles on a straight line is 180Β°.
When the sum of angles is 180Β°, the angles are supplementary.
When two straight lines intersect, the vertically opposite angles are equal.
When two parallel lines are cut by a transversal, corresponding angles are equal.
When parallel lines are cut by a transversal, alternate angles are equal.
When two parallel lines are cut by a transversal, the sum of two co-interior angles is 180Β°.
i.e. co-interior angles are supplementary.
HOMEWORK: Do the exercises
Activity 9
9.2 Determine the value of π₯ and π¦ in the following diagram:
Page 20 of 20
Grade 9 GEOMETRY OF STRAIGHT LINES:
(Draft)
MEMORANDUM: DAY 5:
Warm Up:
1. π = ππ
2. π = π
Activity 9
9.1
Statement Reason
π¨οΏ½οΏ½π = π¬οΏ½οΏ½π©
β΄ π¬οΏ½οΏ½π© = ππ + ππ
π―οΏ½οΏ½π« + π¬οΏ½οΏ½π© = ππππ
β΄ π + πππ + ππ + πππ = ππππ
β΄ ππ = ππππ
β΄ π = πππ
π―οΏ½οΏ½π« = π + πππ
π―οΏ½οΏ½π« = πππ + πππ
π―οΏ½οΏ½π« = πππ
(ππππ. πππ β π)
(ππ β πππβ π, π«πͺβπ©π¨)
9.2
Statement Reason
π: ππ + πππ = πππ
β΄ π = πππ
π:
ππ = ππ + πππ
β΄ π = πππ
(ππππ. β π, π»πΈβπΊπ·)
(πππ β π, π»πΈβπΊπ·)