Transformations Through Flags
Table of Contents Translations Rotations Dilations Reflections Tessellations David A. David C. Matt Dom Ethan
Translations David Angione
Summary A translation is when you slide a figure on a coordinate grid without turning or flipping the figure.
Vocabulary Vector- A quantity that has both direction and magnitude, or size. Initial Point- The starting point of the vector. Terminal Point- The ending point of the vector. Component Form- A format in which to describe a vector that combines the horizontal and vertical components. Vector Form- A format in which to describe a vector by putting the change in the x-axis on the left, and the change in the y-axis on the right. Needs special parenthesis. <.
Concepts You can write component form by following this model. (x, y)=(x+a, y+b). You can write vector form by putting the change in the x-axis on the left, and the change in the y-axis on the right. Needs special parenthesis..
Mathematical Examples The figure was translated four spaces to the right, and two spaces up. The figure on the left is the original shape, and the figure on the right is the shape after the translation.
Activities 1.Graph a figure with points: A=(-4, 0), B=(-4, 4), C=(0, 0), and D=(0, 4). 2.Fill in the figure with the colors of the country that you family is from. 3. Translate the figure by using the vector. 4. Graph the new figure and name each point. 5. Fill in the new figure with the country that you would like to visit.
Real-Life Applications A real-life application is when someone raises a flag to the top of a flagpole, or when they lower a flag down to half staff.
Key Terms Rotation- A transformation where a figure is turned around the center of rotation as an isometry Isometry- the figure is the same before and after the transformation Center of Rotation- A fixed point that can be inside or outside the shape Angle of rotation – the measure of degrees that figure is rotated about a fixed point A rotation of the Japanese flag with the center of rotation outside of the shape
Rotation About The Origin The center of rotation, the origin, is located at (0,0) The equations for rotations about the origin are – R 90° (x,y) = (-y, x) – R 180° (x,y) = (-x,-y) – R 270° (x,y) = (y,-x) – R -90° (x,y) = (y,-x)
Rotation About The Origin (continued) The flag is rotated 180 degrees about the origin Use R -90° (x,y) = (y,-x)
Rotational Symmetry Rotational Symmetry- A figure has rotational symmetry when the figure can be mapped onto itself by a clockwise rotation of less than 180 When you rotate the flag of Switzerland, one of the two square flags, 90 degrees you will get the same shape which means the flag has rotational symmetry Click to see
The Angle of Rotation When an Object is Reflected Over Two Lines When you reflect a figure over two lines that are not parallel the angle of rotation is double the angle between the two lines For example, angle ACB is 65 degrees so when the triangle reflects over the two lines the angle of reflections is 130 degrees 65 degrees A C B
Real Life Situation The flag needs to be rotated so it can go on the pole How many degrees counter clock-wise does the flag need to rotated about the center of the flag so it can be corrected? Answer
Real Life Situation Answer 180 degrees counter clockwise
Rotation Activity What is the angle of rotation between flag A and flag D? A B C D Answer
Rotation Activity (answer) 270 degrees
Dilations Matthew Wechsler
Key Definitions Dilation- a transformation in which a polygon is enlarged or reduced by a given scale factor around a given center point Reduction- 0 < X < 1 Enlargement- X > 1 Reduction Enlargement
Matrices
The Flag Situation You have a small flag. You want it to be larger but it has to stay the same shape, what is the scale factor of the smaller flag to the larger flag? Then find x X Answer
Activity Get a piece of graph paper Draw a rectangle with the points: (-4, -1) (-1,-1) (-4, -4) (-1, -4) Make the scale factor for the new shape 2.5 What are the new points? Answer
(-10, -2.5) (-2.5, -2.5) (-10, -10) (-2.5, -10)
Reflections By Dominick Gagliostro
Key Definitions Reflection- a transformation which uses a line that acts like a mirror, with an image reflected in the line. Line of Reflection- the line which acts like a mirror in a reflection Line of Symmetry- a line that divides a figure into two congruent parts, each of which is the mirror image of the other. When the figure having a line of symmetry is folded along the line of symmetry, the two parts should coincide.
Normal Reflections Reflections over y-axisReflections over x-axis
Reflections when X isn’t zero
Minimum distance Description To find the minimum distance. First reflect point A. Next draw a line from A’ to B. Then the point where that line crosses the x-axis is the minimum distance. Original Points /
Minimum Distance continued
Real World Application The cemetery wants to put an American flag in their cemetery for two war veterans that were recently buried there. They want it to be the minimum distance between both graves. Find the minimum distance to help the cemetery out.
Real World Application Where do you put the flag? Answer
Tessellations
What Are Tessellations Tessellations are a repeating pattern of figures that completely covers a plane without any gaps or overlaps.
Some Vocab An edge is the intersection between two bordering tiles. A vertex is the intersection of three or more bordering tiles. A regular tessellation is when a tessellation uses only one type of regular polygon to fill up a plane. A semi-regular tessellation uses more than one type of regular polygon to fill up a plane.
Tessellations & Symmetry Translational symmetry is when a translation maps the tessellation onto itself Glide Reflectional symmetry is when a glide reflection maps the tessellation onto itself – glide reflection is when you reflect then translate an object Rotational symmetry: when a rotation of 180 degrees or less is performed on a tessellation and the resulting image is the same as the original image Reflection or line symmetry: when a figure is reflected across and axis and the image is the same as the original Point symmetry: when a tessellation rotates 180 degrees and the image is the same
Will It Tessellate
Flag Tessellations
How To Make A Tessellation
Construct Segment AB
Construct Point “C” above AB
Mark the Vector From A B Translate Point “C” by the Created Vector
Construct the Remaining Sides of the Parallelogram
Steps 4-7 Construct Irregular Segments
Construct Your New Polygon’s Interior
Translate the Polygon Interior
Translate the Newly Created Column
Bibliography heartstrings/com-american-flag-pub-dom/ heartstrings/com-american-flag-pub-dom/ development.pusd.schoolfusion.us/modules/groups/group_pages.phtml?gid=942978&nid= development.pusd.schoolfusion.us/modules/groups/group_pages.phtml?gid=942978&nid=
Links content/uploads/2013/02/England-flag-art-background.jpg content/uploads/2013/02/England-flag-art-background.jpg wallpapers.com/bulkupload/flagwallpapers/Canada/canada -flag-wallpaper.jpg wallpapers.com/bulkupload/flagwallpapers/Canada/canada -flag-wallpaper.jpg wallpapers.com/bulkupload/flagwallpapers/Greece/greek- flag.jpg wallpapers.com/bulkupload/flagwallpapers/Greece/greek- flag.jpg patriotic.jpg patriotic.jpg
Bibliography key.htm key.htm ?flagHistory=y ?flagHistory=y http%3A%2F%2Fwww.university500.com%2Fwp- content%2Fuploads%2F2012%2F02%2F1288-map-of-flags-of-the- world-wallpaper-wallchan-1024x768.jpg http%3A%2F%2Fwww.university500.com%2Fwp- content%2Fuploads%2F2012%2F02%2F1288-map-of-flags-of-the- world-wallpaper-wallchan-1024x768.jpg
Pictures les/2012/10/us_flag.png les/2012/10/us_flag.png flag/Italy/flag-italy-XL.jpg flag/Italy/flag-italy-XL.jpg