photo booth project
DESCRIPTION
- PowerPoint PPT PresentationTRANSCRIPT
Photo Booth ProjectTransformations and Technology
Directions for importing pictures:1. Open Picture2. Right Click3. Copy4. Go to Power Point Slide5. Right Click ‘Paste’6. Right Click on Picture7. ‘Send to back’8. Resize as necessary to fit slide and graph
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!
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.
A A’
B B’
C C’
Example for how to line up your picture
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.
A A’
B B’
C C’
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.
A A’
B B’
C C’
Example for how to line up your picture
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.
A A’
B B’
C C’
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.
A A’
B B’
C C’
Example for how to line up your picture
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.
A A’
B B’
C C’