For this
discussion your group must answer the following essential questions:
· How do we apply specific transformations?
· How do we identify transformations in a plane using function notation?
· What properties are preserved under transformations?
· How do we use notation to describe/represent transformations?
· What types of symmetry appear in transformations?
Your responses must be clear, concise, and must contain
explanations that appeal to all learning styles in our classroom. You can
create explanations with notes, pictures and links to videos that may enhance
the class understanding of the topic.
This comment has been removed by the author.
ReplyDeleteTransformation: Is a one to one mapping of
ReplyDeletepoints in the plane to other points in the plane.
to transform the geometric figures you must rotate the geometric figure so that it lines up with the other figure perfectly.
link : https://www.khanacademy.org/math/geometry/transformations/coordinate-plane-transformations/v/performing-a-rotation-to-match-figures
Hey Devante base on the video: So how do you know that it is exactly 180 degrees when rotating the figure, and not another degree?
ReplyDeleteWhat types of symmetry appear in transformation? : Line symmetry and rotation symmetry. http://www.nzmaths.co.nz/transformation-level-2
ReplyDeleteCan you only rotate the figure clockwise, counterclockwise,or it doesn't really matter?
ReplyDeleteTransformations isn't only about rotating their are others, We learn this is class and we review it today.
ReplyDeleteI'm still confused about the relationship to notation and translation
ReplyDeleteFebruary 28, 2014 at 10:01 AM
ReplyDeleteWhat types of symmetry appear in transformation? : Line symmetry and rotation symmetry. http://www.nzmaths.co.nz/transformation-level-2
a translation of a graph, we mean a shift in its location such that every point of the graph is moved the same distance and in the same direction. Essentially, think of lifting the graph out of the paper, moving it around, and then placing it down at a new location.
ReplyDeletehttp://math.ucsd.edu/~wgarner/math4c/textbook/chapter2/transform_functions.htm
-John Walker