Use the tools to perform a [b]translation[/b] that will take the original figure [i]GHIJ[/i] onto the image [i]G'H'I'J'[/i]. [br][br]Describe the translation that will take the original figure onto the image.[br]
Use the tools to perform a [b]translation and then a rotation (in that order)[/b] that will take the original figure [i]ABC[/i] onto the image [i]A'B'C[/i]'.[br][br]Describe the translation and rotation that will take the original figure onto the image.[br]
Use the tools to perform a sequence of rigid transformations (a [b]translation, then a rotation and then a reflection -- in [i]that[/i] order[/b]) that will take the original figure [i]RSTU[/i] onto the image [i]R'S'T'U'[/i].[br][br]Describe the translation, rotation, and reflection that will take the original figure onto the image.
Sometimes it isn't always necessary to use a [i]specific angle measure[/i] when doing a rotation. Here is another way to describe a rotation:[br][br][u]Rotate figure [i]ABC[/i] about point [i]A[/i] so that point [i]C[/i] coincides with [i]C'[/i]. (see picture below)[br][br][/u](We would still need to do a reflection to finish this problem, but we're only concerned about the rotation phrasing for this example.)
Write a sequence of rigid transformations that will take figure [i]VWXYZ [/i]onto the image [i]V'W'X'Y'Z'[/i].[br][b]No tools this time[/b], just imagine what the transformations would be. [u]Describe the rotation in general terms [/u](not a specific angle measure) like the previous example above.