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photo booth project

Overview : This activity is intended to be a fun way to discover the various properties of transformations. A transformation is when an object shifts up, down, left, right, rotates, reflects, or any combination there of. I have provided sample slides to help you understand how to align your pictures.

Have fun! 

Photo Booth Project

Directions for importing pictures:

Open Picture

Right Click

Copy

Go to Power Point Slide

Right Click ‘Paste’

Right Click on Picture

‘Send to back’

Resize as necessary to fit slide and graph

Transformations and Technology

reflection over the y axis picture is normal
Reflection over the y axis(picture is normal)

Example for how to line up your picture

  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the Y Axis.
reflection over the y axis picture is normal1
Reflection over the y axis(picture is normal)
  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the Y Axis.
reflection over the x axis picture needs to be sideways
Reflection over the x axis(picture needs to be sideways)

Example for how to line up your picture

  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the X Axis.
reflection over the x axis picture needs to be sideways1
Reflection over the x axis(picture needs to be sideways)
  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the X Axis.
reflection over the line y x picture needs to rotate so line of symmetry lines up with dotted line
Reflection over the line y = x(picture needs to rotate so line of symmetry lines up with dotted line)

Example for how to line up your picture

  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the line y=x.
reflection over the line y x picture needs to rotate so line of symmetry lines up with dotted line1
Reflection over the line y = x(picture needs to rotate so line of symmetry lines up with dotted line)
  • Choose 3 distinct points on your picture. Label your points A, B, and C. Find the coordinates of these points and fill them into the table below.
  • Find the coordinates A’, B’, C’. (For ex, A’ represents the original point A reflected.) Find the coordinates of these points and record them in the table below under A’, B’, C’.
  • What pattern do you notice as points move from their first to second position? Make a generalization for Reflections Over the line y=x.
rotations dilations
Rotations & Dilations

Following the same procedure, rotate your photo 90, 180, and 270 degrees about the origin.

Dilate twice: once by a factor >1, then by a factor <1.