The three types of dilations are an enlarged image (the image is larger than the preimage), a reduced image (the image is smaller than the preimage) and an equal image (the image is the same size as the preimage).
In mathematics, a preimage refers to the original set of elements that map to a particular element or set under a given function. Specifically, if ( f: X \to Y ) is a function and ( y \in Y ), the preimage of ( y ) (denoted as ( f^{-1}(y) )) is the set of all ( x \in X ) such that ( f(x) = y ). In the context of sets, the preimage of a subset ( B \subseteq Y ) is the set of all elements in ( X ) that map to ( B ) under the function ( f ).
R'
(3, 2)
2, -2
line or graph on a line in a math equation
The three types of dilations are an enlarged image (the image is larger than the preimage), a reduced image (the image is smaller than the preimage) and an equal image (the image is the same size as the preimage).
Dilations are a geometric transformation that results in the image being similar to the preimage.
Yeah, that's right it is called a preimage.
The answer is in the question! The orientation is the same as the preimage! Same = Not different.
A preimage is a transformed irritated or changed image. Such as a flipped triangle
A point or a line segment can be a preimage of itself because a line can be reflected or rotated.
Translation.
true
R'
true
Preimage