Introduction to Transformations. What does it mean to transform something?

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Presentation transcript:

Introduction to Transformations

What does it mean to transform something?

Geometrical Transformation a change in the position, size, or shape of a geometric figure

What does rigid mean?

1.rigid motion (congruent motion)- preserves the size and shape of a figure  translations  reflections  rotations 2.non-rigid motion  dilation 2 Types of Transformations

Transformations are functions that take points in the plane as inputs and give other points as outputs

With transformations, the pre-image is the original figure (input) the image is the transformed figure (output) to distinguish the pre-image from the image, prime notation is used points A, B, and C are inputs points A’, B’, and C’ are outputs

Is this transformation a rigid motion? (x,y)  (x-4,y+2) pre-image points A(0,0) B(2,0) C(0,4) A B C A’ B’ C’

Is this transformation a rigid motion? (x,y)  (x-4,y+2) A B C A’ B’ C’ Yes, this transformation is a rigid motion because the size and shape of the pre-image is preserved

Is this transformation a rigid motion? (x,y)  (2x,2y) pre-image points (0,0) (2,0) (0,4) A B C A’ B’ C’

Is this transformation a rigid motion? (x,y)  (2x,2y) No, this transformation is not rigid motion because the size of the pre-image is not preserved A B C A’ B’ C’

What happens as you go down a water slide?

Define Translate In Latin: Translate means “carried across”

Translations a translation is a transformation that SLIDES all points of an image a fixed distance in a given direction

Real world examples of Translations Scales of a butterfly

Translations lines that connect the corresponding points of a pre-image and its translated image are parallel and have equal measure. corresponding segments of a pre-image and its translated image are also parallel

Descriptive Notation Description using words to characterize a given translation Example: 7 units to the left and 3 units up

Coordinate Notation coordinate notation is a way to write a function rule for a transformation in the coordinate plane example: T(x,y)  (x+2, y-3) T (x+2, y-3) (x+2, y-3) is our function rule written in coordinate notation the pre-image is moving 2 units right and 3 units down applying this rule if (6,12) is a point on our pre-image, then (6,12) becomes (6+2,12-3), which is point (8,9) so point (6,12) on our pre-image transformed to point (8,9) on our image

Vector Notation Utilizes a vector to describe the translation. A vector is a quantity that has magnitude (size) and direction – Velocity is a vector (3 mph due north)

Vector the initial point of a vector is the starting point the terminal point of a vector is the ending point Initial point Terminal point

Component Form of Vectors denoted by specifies the horizontal change a and the vertical change b from the initial point to the terminal point  Negative indicates a motion of left or down

Draw the image of the pre-image shown below under the given translation vector:

Determining the translation vector given a pre-image and its translated image, determine the translation vector. Give a verbal description of the translation vector.

Practice