Thursday, January 26th
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Transcript of Thursday, January 26th
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Thursday, January 26th• Please complete the warm up and write
down homework
Warm Up1. How do you know if two shapes are
similar?
2. Sharon bought a shirt for $42.50 and a pair of jeans for $52.75. If there’s a 8% sales tax. What will the total be?
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Corny Joke of the Day
What type of animal needs oil?
Mice because they
“squeak”
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Have you used your holiday present yet?
Staple your extra 10 points to any Homework, Quiz, or
Classwork assignment Turn it into the math bin
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Checkpoint Answers Scored out of 14
GREAT JOB!!!! Remember to watch your decimal
placements
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Symmetry Preview
Write down your definition of
symmetry and draw examples that you think represent it!
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Symmetry
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OUR MISSION
Learn to identify line symmetry and learn how to rotate figures!
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A figure has line symmetry if it can be folded or reflected so that the two parts of the figure match, or are congruent. The line of reflection is called the
line of symmetry.
What is it?
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Part 1 Lines of symmetry in regular polygons
Regular polygons: All side lengths and angles are
congruent
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Can you find the rule?Find the number of lines of
symmetry in each shape and fill out the chart.Shape Number of Sides Lines of symmetry
Triangle
Square
Pentagon
Hexagon
Octagon
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4 lines of symmetry
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DiscoveryFor a regular
polygon the lines of symmetry is the same as
the number of sides!
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Fun FactA dodecagon is a 12-
sided regular polygon. This means that it has
___________lines of symmetry!
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Part 2 Determining if the lines given are the lines
of symmetry
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Determine whether each dashed line appears to be a line of symmetry.
The two parts of the figure appear to match exactly when folded or reflected across the line.
The line appears to be a line of symmetry.
#1
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Determine whether each dashed line appears to be a line of symmetry.
The two parts of the figure do not appear congruent.
The line does not appear to be a line of symmetry.
#2
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Determine whether each dashed line appears to be a line of symmetry.
The two parts of the figure do not appear congruent.
The line does not appear to be a line of symmetry.
#3
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Determine whether each dashed line appears to be a line of symmetry.
The two parts of the figure appear to match exactly when folded or reflected across the line.
The line appears to be a line of symmetry.
#4
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Group DiscussionHow many lines of symmetry does the following shape have?
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NOT EVERY SHAPE HAS A
LINE OF SYMMETRY
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Does this have a line of symmetry?
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1 line of symmetry
Is there a line of symmetry. If so, how many?
Smile Symmetry
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Corporate Logos Find the symmetry
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Class Discussion 1. Situations that demonstrate
reflection
2. Situations that demonstrate rotation?
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Transformations
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Cut out the first letter to your name!
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A rigid transformation moves a figure without changing its size or shape. So the original figure and the transformed figure are always congruent.
The illustrations of the alien will show three transformations: • A rotation• A reflection• A translation*Notice the transformed alien does not change in size or shape.
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Type #1 Rotational
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A rotation is the movement of a figure around a point. A point of rotation can be on or outside a
figure.
The location and position of a figure can change with a rotation.
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The figure moves around a point.
It is a rotation.
Example #1
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The figure moves around a point.
It is a rotation.
Example #2
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Rotations are measured by Degrees.
Rotations can turn Clockwise or Counter Clockwise
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Clockwise“like a clock”
Counter-Clockwise“opposite of a
clock”
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90°
180°
360°
• A full turn is 360°• of a turn is ¼ 90°• of a turn is ½180°• of a turn is ¾270°
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Just Watch! Draw a 180° rotation about the point
shown.
Trace the figure and the point of rotation.Place your pencil on the point of rotation.Rotate the figure 180°.Trace the figure in its new location.
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Draw each transformation.Draw a 180° clockwise rotation about the point shown.
Trace the figure and the point of rotation.Place your pencil on the point of rotation.Rotate the figure 180°.Trace the figure in its new location.
A AYou Try #1!
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Draw each transformation.Draw a 90° counter clockwise rotation about the point shown.
Trace the figure and the point of rotation.Place your pencil on the point of rotation.Rotate the figure 90° Trace the figure in its new location.
K
You Try #2! K
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Type #2 Reflection
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When a figure flips over a line, creating a mirror image, it is called a reflection. The line the figure is flipped over is called line of reflection.
The location and position of a figure change with a reflection.
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There are 2 types!
Horizontal: flips ACROSS
Vertical: flips UP and DOWN
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Practice Problems1. Reflect Vertically
2. Reflect horizontally
J
B
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TYPE #3 TRANSLATION
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A translation is the movement of a figure along a straight line.
Only the location of the figure changes with a translation.
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WHITEBOARD PRACTICE
Determine the transformation!
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The figure is flipped over a line.
It is a reflection.
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The figure is moved along a line.
It is a translation.
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The figure moves around a point.
It is a rotation.
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The figure is flipped over a line.
It is a reflection.
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The figure moves around a point.
It is a rotation.
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The figure is moved along a line.
It is a translation.