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Name: ______________________________
Geometry Period _______
Unit 2: Constructions
In this unit you must bring the following materials with you to class every day:
COMPASS
Straightedge (this is a ruler)
Pencil
This Booklet
A device
Headphones
Please note:
You may have random material checks in class
Some days you will have additional handouts to support your understanding of
the learning goals in that lesson. Keep these in a folder and bring to class
everyday.
All homework for this unit is in this booklet.
Answer keys will be posted as usual for each daily lesson.
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Constructing an Inscribed Hexagon
Today’s Goal: What are constructions? How do we use the geometric compass? What is some new vocabulary related to
constructions? How do I construct an inscribed hexagon? How do I construct an inscribed equilateral triangle?
What are geometric constructions?
Tips for using our compass!
1.
2.
3.
4.
5.
6.
What makes a good construction?
Visualize what the end result should look like before you begin!
Leave all construction marks!
Full circles or arcs are fine!
You must PRACTICE PRACTICE PRACTICE!
2-1 Notes
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Before we construct, let’s kick start your knowledge!
*Did you know?
The side length of a hexagon is equal to its circumradius - the distance from the ___________________ to a
___________________________________. (This is also the ___________________________________________.)
Before we Construct!
FACT CHECK
What are the defining characteristics of a regular hexagon?
Which of the following is an example of an inscribed hexagon? a) b) c)
What does it mean for a hexagon to be inscribed?
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Let’s Construct!
Construct a regular hexagon in the space below: Keep it small it has to fit in this box!
Take it to the next level!
Sketch an equilateral triangle inscribed in a circle
Fact check: What are key features of an equilateral triangle?
Using our construction of a hexagon how can form an equilateral triangle inscribed in a circle?
Make construction marks (just like
a hexagon) then…
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Try it!!
Construct a hexagon inscribed in a circle Explain each step you took to complete your construction
1. Set compass to the same measure of the radius
2. Plot any point on the circle to start
3. Put point of compass on the point and draw an arc the length of the radius
4.Place compass where you just sketch an arc and draw another arc. Repeat this step until you have 6 arcs in total around the circle
5. Use a straightedge to construct each side of the hexagon
6. All done!
Construct an equilateral triangle∆𝑨𝑩𝑪 inscribed in a circle
Explain each step you took to complete your construction
1. Draw circle with a center at point P
2. Set compass to the same measure of the radius
3.
4. Put point of compass on the point and draw an arc the length of the radius
5.
6.
7.
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2-1 Practice
1. What type of hexagon are we constructing in this lesson? What does it mean for a geometric figure to be regular?
(Use your device to look up the definition for “regular,” with respect to geometric figures.)
2. Error analysis! Analyze the student work to the right for parts a-c:
a. Identify what the student did well.
b. Identify where the student made a mistake. Be specific when describing what the mistake was.
c. With a different colored pen/pencil and the given arc marks, correctly complete the construction of an inscribed
hexagon.
3. How can you expand your construction of a regular hexagon to construct a regular dodecagon with twelve
congruent sides? Try it below!
STOP here! Check
the key in a
different color!
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Jot it down! What are the steps you took in this construction? (Use numbered steps)
2-1 Homework Complete each of the following problems. Check your work on the website when you’re done.
1. a) How can you construct an equilateral triangle using the construction of an inscribed hexagon?
b) Construct an inscribed equilateral triangle inside circle p.
2)
Watch the assigned video and try your constructions on this page. Mastery of the content of this
video is essential for our next lesson in class. Failure to watch the video will result in confusion and
your inability to interact with your peers throughout the lesson. This page will be checked tomorrow
in class and an entrance ticket into class will be assigned to prove your mastery of the concept.
Video on Edpuzzle! Sign in through “Google!!”
a) What are we constructing in the video? ___________________
b) What is special about this geometric figure? _______________________________________
Try it again!
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Apply It!
3) Mr. Gino has three cats. He has heard that cats in a room position themselves at equal distances from
one another and wants to test that theory. Mr. Gino notices that Simon, his tabby cat, is in the center of his
bed (at S), while Snowball, his Siamese, is lying on his desk chair (at J). If the theory is true, where will he
find Checkers, his tuxedo cat? Use the scale drawing of Mr. Gino’s room shown below, together with (only)
a compass and straightedge. Place an M where Isosceles will be if the theory is true.
4) Construct equilateral triangle QRS with side length MH and a vertex at R:
R
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Perpendicular Bisector and Inscribed Square
Today’s Goal: 1) How do I construct a perpendicular bisector through a given segment?
2) How do I construct a square inscribed in a circle?
Conceptual Understanding
1) Harrison has two city parks, P1 and P2. The city council would like to add a Starbucks in town (YAY!), and would like
the Starbucks to be an equal distance to both parks. Identify a few possible locations for the Starbucks, and label
them as S1, S2, S3, etc. on the map.
Let’s Discuss: With your elbow partner, what geometric details do you see in your construction?
2-2 Notes
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Part I: Perpendicular Bisector: VIDEO TIME! Let’s watch our next construction before moving forward!
a) What are we constructing in the video? _________________________
b) What is special about this geometric figure? 1.______________________________________
2.______________________________________
Extend your thinking: Locate the midpoint on one of the segments
above and label it M.
Try another!
Construct the perpendicular bisector of side AC in the triangle below.
Try it here!
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Part II: Inscribed Square Construction
Before we construct!
FACT CHECK
Squares
Imagine it! In the box below, SKETCH what a square inscribed in a circle would look like:
Now, sketch in the diagonals of that square.
What are the diagonals the same as in the circle?
Given the following circles, try to construct an inscribed square. Extra Circles provided for scrap work!
List the steps you took to construct an inscribed square:
1) Start by drawing in the _________________________ with a straight edge
2) Construct the _____________________________________ of the segment from step 1
3) Draw vertices where your two segment intercept the circle, and connect 4 sides using your straightedge.
Take 1
Take 2
Perfection
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Part III: Mixed Construction Practice
1) ∆𝐴𝐵𝐶 is shown below. Is it an equilateral triangle? Justify your response (NO MEASURNG WITH RULERS!)
2) Construct equilateral triangle QRS with side length MT and a vertex at R:
R
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3) a. On the coordinate plane, plot the points M(1,2)
and N(-1,4)
b. Construct the perpendicular bisector between those
two points
c. Algebra review: Write the equation of the line you
just constructed.
.
4) Using your knowledge of what you know how to construct at this point, explain how you would…(include sketches)
Construct a Midpoint Construct a Right Angle Construct a 60° angle
5) Construct 3 different polygons inscribed in a circle:
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6) In a square diagonals are ________________________________ of each other.
7) When a polygon is ____________________ in a circle , all of its vertices are ON the circle.
8) Use a compass and straightedge to divide line segment AB below into four congruent parts. (Leave all construction
marks)
9)
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Circumscribe a Circle Around a Triangle (circle around a triangle)
Today’s Goal: What is and how do we locate the circumcenter of a triangle?
How do I construct a circle circumscribed around a triangle?
Do now on your own!
In the following triangle, construct the perpendicular bisectors of sides AB and BC
Hint: Turn your paper to make it easier.
What type of point did you construct on side AB?
What type of point did you construct on side BC?
Locate the point that the two perpendicular bisectors intersect at and label it R
With an elbow partner!
Use the ruler provided to measure:
a) The distance between vertex A and point R.
b) The distance between vertex B and point R
c) The distance between vertex C and point R
What conclusion can be made about these distances?
2-3 Notes
Let’s get to work!
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Together!
When two lines or more intersect at the same point, this point is called a point of
_______________________.
You’ve just constructed a point of concurrence called the __________ .
FACT CHECK –Circumcenter- Using technology! http://www.mathopenref.com/trianglecircumcenter.html Formed when two or more __ Intersect.
Equidistant from of the triangle.
Can be found _____ ___,___________ or _______ of the triangle.
Complex Constructions that involve the Circumcenter Circle circumscribed around a triangle
To circumscribe means to ___________________________.
Based on the definition above, if you are circumscribing a triangle, what shape do you expect to be
constructing?
Before we construct!
FACT CHECK: CIRCLES
Center:
Radius:
A segment that extends from _______________ of the circle to the
edge of the circle
The lengths of all radii in a circle are _____________
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Analyze the Following Step-by-Step Construction
With your elbow partners, examine the steps used when constructing a circle circumscribed around a triangle,
then answer the following questions:
Step1 Step 2 Step 3 Step 4 Step 5
1. What simple construction happened in steps 1 and 2?
2. Based on your answer from question 1, what type of point is point O in the construction step 3?
Explain!
3. In step 5, if we extended a segment from O to C, what type of segment is OC?
Quick Summary!
A circumcenter is formed by constructing the of two
or more sides of a triangle.
A circumcenter helps us construct _______________________________________.
The circumcenter is from the vertices of the triangle.
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Practice
1. Watch the video of a circle circumscribing a triangle on EdPuzzle.
2. Try it! Either try with the video, or on your own the following:
Construct a circle that is circumscribed around triangle ABC. ( or the triangle inscribed in the circle)
3. What is the circumcenter of the triangle whose vertices are A(-7,0), B(-3,8), AND C(-3,0)?
Remember!
A circumcenter
can be inside, on,
or outside the
triangle!
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4. A martial arts expert is standing at point E in a triangular ring with three of his equally talented students
that are standing at A, B and C. The worst place he could stand is where the three students could deliver a
chop or leg kick to the expert at the same time. Which point of concurrency would represent this worst
place he could stand?
5. Construct a circle circumscribed around triangle MNO.
STOP here! Check
the key in a
different color!
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2-3 Homework
Complete each of the following problems. Check your work on the website when you’re done.
1. Answer the following based on the class notes from 2-3 and new vocabulary:
a) What is the name of the point of concurrence that is equidistant from the three vertices of the triangle.
b) What type of segment needs to be constructed twice to locate this point?
c) Where can this point be located with respect to a triangle?
2. A. What type of construction is shown below?
b. Solve for z.
3. A. What part of the circle are segments AB and BG?
b. What is the relationship between AB and BG?
c. Hence, if AB = 5y - 6 and BG = 24, solve for y.
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Watch the assigned video and try your constructions on this page. Mastery of the
content of this video is essential for our next lesson in class. Failure to watch the
video will result in confusion and your inability to interact with your peers throughout
the lesson. This page will be checked tomorrow in class and an entrance ticket into
class will be assigned to prove your mastery of the concept.
Video on Edpuzzle! Sign in through “Google!!”
a) What are we constructing in the video? ___________________
Jot it down!
What are the steps you took in this construction? (Use numbered steps)
Try it!
P P
Construct lines perpendicular to the given line through point P in both examples.
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Constructing Altitudes and Squares (using side length)
Today’s Goal: How do I construct altitude and a square (given a side length)?
Explain each step you took to complete your construction
Construct the line perpendicular to AB through point P:
1. Place needle point on point P and swing the compass through segment AB so that it crosses the segment twice.
2. Label the two points of intersection, Q and R.
3. Construct a perpendicular bisector of segment QR.
4. The constructed line should pass through point P; This is the line perpendicular to AB thorough point P
Push Your Skills
Construct any size right triangle BEF:
How do the constructions on this page compare to the construction from your check in/video last night?
2-4 Notes
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Before we construct!
FACT CHECK:
What is an altitude of a triangle?
In Words Sketch
a line that extends from _______________
of a triangle and is _________________ to
the ___________________ side.
Considering your sketch, what will the construction of an altitude require?
Let’s try this together:
Construct an altitude in Triangle MNO label it MP Steps:
1. Place needle point on point M and swing the compass through segment NO so that it crosses the segment twice.
2. Label the two points of intersection, A and B.
3. Construct a perpendicular bisector of segment AB.
4. The constructed line should pass through point M; this is the line perpendicular to BC thorough point x.
5. This is the altitude of the
triangle.
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List the properties of a square. With your shoulder partner, discuss how these properties
can be used in the construction of a square.
Construct a square given a side length 1) Watch me
2) Try on your own
3) Follow steps provided
Constructing a Square 1. Extend line segment AB using a straightedge on side A.
2. Construct the perpendicular line at point A (just like yesterday’s class)
3. Measure the distance from A to B with your compass.
4. Needlepoint on A; swing arc above the line segment to mark distance of
AB. Mark the intersection of this arc with the perpendicular line. Label D. (extend perpendicular line with
straightedge if necessary)
5. Needlepoint on B; swing arc above the line segment to mark distance of AB.
6. Needlepoint point C; swing compass to cross at the arc made in step 5. Label the intersection C.
7. Draw segment CD and BC. Done!
Properties of a
Square
Construction(s) that would lead
to this property
Visualize
Diagonals are
perpendicular
bisectors
-Perpendicular Bisector
Construction (Use when inscribed in
a circle)
Adjacent sides are
perpendicular
All sides are
congruent
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Let’s Construct!
Using only your compass and a straight edge, construct a square with side length XY:
You Try!
Using only your compass and a straight edge, construct a square with side length AB:
X Y
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2-4 Homework
Complete each of the following problems. Check your work on the website when you’re done.
1) Using a compass and a straightedge, construct the line that is perpendicular to the given line and passes through
point p.
2) ON the line below, construct square MATH whose side length is equal to AB
3) The diagram below shows the construction of a line through point P perpendicular to line m.
Which statement is demonstrated by this construction?
a) If a line is parallel to a line that is perpendicular to a third line, then the line
is also perpendicular to the third line.
b) The set of points equidistant from the endpoints of a line segment is the
perpendicular bisector of the segment.
c) Two lines are perpendicular if they are equidistant from a given point.
d) Two lines are perpendicular if they intersect to form a vertical line.
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4) a) In the accompanying diagram of a construction, what type of special
segment INSIDE a triangle, does represent?
b) What is the relationship between PC and AB?
5) Look at the construction of a square below. Identify two parts of the square and describe the specific constructions
that you might be able to use to create a square. (For example, “side BC can be created with a straightedge.” [This is just
an example. Yours should be more involved])
6) In triangle PQR, using a compass, construct an altitude from vertex P to side QR.
C D
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UNIT 2: CONSTRUCTIONS PROGRESS REPORT
You will work on a blend of concepts from this unit so far!
Stuck? Be resourceful, check your notes, look at videos from class
and from EdPuzzle, and use your peers!
Before we start…let’s check out the square one more time…
Together:
Using only your compass and a straight edge, construct a square with side length AB:
Complete this ENTIRE SECTION for HOMEWORK!
(STOP at 2-6)
2-5 Notes
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Construct an Equilateral Triangle whose side length is the length of AB
Construct an Equilateral triangle whose sides are the same length as AC on the line below.
Construct a line Perpendicular to the given line through point p
Construct an Altitude in the following triangle through vertex B
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Construct a square inscribed in circle Construct the midpoint of side AC, label it M
Construct an inscribed Hexagon Construct an Inscribed Equilateral Triangle
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Construct the circumcenter in the following triangle, Label it Q
Circumscribe a circle around the following triangle.
Construct a line through P perpendicular to OP *Note, your line should be outside of the circle not in!!
Construct the altitude of the following trapezoid through point B
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Watch the assigned video and try your constructions on this page. Mastery of the
content of this video is essential for our next lesson in class. Failure to watch the
video will result in confusion and your inability to interact with your peers throughout
the lesson. This page will be checked tomorrow in class and an entrance ticket into
class will be assigned to prove your mastery of the concept.
Video on EdPuzzle!!
a) What are we constructing in the video? ___________________
Video Practice:
b) Try it again!
Try it again!
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Constructing an Angle Bisector
Today’s Goal: How do I construct an angle bisector? How can we use our knowledge of angle bisectors to
construct extension constructions?
Let’s revisit the concept we learned last night!!
Angle Bisector
Steps Bisect ∡𝑫𝑶𝑩. 𝑺𝒉𝒐𝒘 𝒂𝒍𝒍 𝒂𝒓𝒄 marks
1. Using any setting, place compass point at O and swing an arc through both sides of the angle. Label the intersection with P and Q.
2. Using any setting, place compass point at P and swing an arc. Using same compass setting do the same from point Q. Label intersection point R.
3. Draw OR .
Group Talk:
In your groups discuss the following questions…be prepared to share out!
1. What is an angle bisector?
2. How would you construct a 600 angle? How would you construct a 300 angle?
3. How would you construct a 450 angle? Be specific (Number your steps)
2-6 Notes
Sketch your
thinking here!
Sketch your
thinking here!
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Using our answers from our share out, as a team, complete the following examples!
Example 1) Example 2)
Using a compass and a straightedge, construct an
equilateral triangle with side 𝐴𝐵̅̅ ̅̅ as a side. Using this triangle, construct a 30° angle with its vertex at A. (Leave all construction marks.) LABEL THIS ANGLE!
Using a compass and a straightedge, construct a 45°
angle with its vertex at the midpoint of segment 𝐴𝐵̅̅ ̅̅ . (Leave all construction marks.) LABEL THIS ANGLE!
Still have time?
Try to create a 30° angle a different way! (Sketch in your own starting points/segments first)
Question: What do math teachers think of owl of their
students?
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Challenge yourself!
1. Construct a 60 degree angle in 3 different ways! (Draw your own line segments/points to start)
2. a) Inscribe a square in the circle d
b) Construct a perpendicular bisector of any side of your
square
c) Mark the intersection point of the perpendicular bisector
and that side of the square with a Z
d) With a straightedge, connect point Z with the opposite
two vertices.
e) Describe what you constructed
Complete ALL problems on this page. Make sure you CHECK YOUR HW!!!
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2-6 Homework
1. Construct a circle circumscribed around the triangle shown below.
2. The measure of one interior angle of a regular pentagon is 108 degrees. Construct a 27 degree angle.
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3)
4) a. What types of segments are constructed inside of the triangle below? Use the markings to help you.
b. If <BAP = 2x and <CAP = 46, solve for x.
c. What is the measure of angle A?