Welcome to I.S. 223's iteach/ilearn grade 8 math professional development.
Please comment any time before, during, or after the class.
Some sites we will use today are:
The iTeach/ilearn website
Mathsnet interactive transformaitons
Visual discription of a the three types of transformations.
Difficult examples of transformations
Two successive reflections
Good interactive examples of rotation
Thursday, August 30, 2007
Wednesday, August 29, 2007
How do we rotate a figure 90 degrees clockwise?
Edit Preferences ------ change the units from hundredths to ones. Be sure to check off apply to this sketch and to new sketches.
Create a geometric figure using the line segment tool
Probably the easiest to work with is a right triangle.
A (-7.7)
B (-2,1)
C (-7,1)
Be sure that all parts of your figure are deselected. Use the selection tool to click outside of your figure.
Using the selection tool choose each of the point on your figure.
Display ------ Label Points
Transform ----- Mark Center Alternatively, you can double click the origin (0,0. This indicates that you want to rotate the figure - right triangle - about the origin.
Use the selection tool to select the figure - right triangle - for rotation.
Transform ----- Rotate (90 degrees)
Using the selection tool, click outside the rotated figure. With the selection tool. choose only the points on the rotated figure.
Display ----- Show Labels
Create a geometric figure using the line segment tool
Probably the easiest to work with is a right triangle.
A (-7.7)
B (-2,1)
C (-7,1)
Be sure that all parts of your figure are deselected. Use the selection tool to click outside of your figure.
Using the selection tool choose each of the point on your figure.
Display ------ Label Points
Transform ----- Mark Center Alternatively, you can double click the origin (0,0. This indicates that you want to rotate the figure - right triangle - about the origin.
Use the selection tool to select the figure - right triangle - for rotation.
Transform ----- Rotate (90 degrees)
Using the selection tool, click outside the rotated figure. With the selection tool. choose only the points on the rotated figure.
Display ----- Show Labels
Tuesday, August 28, 2007
Reflecting over the Y Axis
Use the line segment tool to connect these point. You will create the points while creating line segments.
(-2, 1)
(-5, 5)
(-7. 2)
and back to (-2, 1).
Click the selection tool outside of the triangle to assure that no points or segments are selected.
Using the selection tool click each point on the triangle separately.
Display ----- Label Points
Mark the Y Axis for the reflection by double clicking or choose the Y Axis
Transform ----- Mark Mirror
Use the selection tool to highlight the triangle.
Transform ------ Reflect
Use the selection tool to deselect the reflected triangle.
Using the selection tool click each point on the relected triangle separately.
Display ----- Show Labels
What happens to the X coordinate, when we reflect in the Y Axis?
Please comment.
Use the selection tool to choose each point on the original and the reflected triangle.
Measure ----- Coordinates
What do you now notice about the x coordinate of the original and the reflected triangle?
(-2, 1)
(-5, 5)
(-7. 2)
and back to (-2, 1).
Click the selection tool outside of the triangle to assure that no points or segments are selected.
Using the selection tool click each point on the triangle separately.
Display ----- Label Points
Mark the Y Axis for the reflection by double clicking or choose the Y Axis
Transform ----- Mark Mirror
Use the selection tool to highlight the triangle.
Transform ------ Reflect
Use the selection tool to deselect the reflected triangle.
Using the selection tool click each point on the relected triangle separately.
Display ----- Show Labels
What happens to the X coordinate, when we reflect in the Y Axis?
Please comment.
Use the selection tool to choose each point on the original and the reflected triangle.
Measure ----- Coordinates
What do you now notice about the x coordinate of the original and the reflected triangle?
Subscribe to:
Comments (Atom)
