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Identify the orientation where the image has same orientation as the preimage?
The answer is in the question! The orientation is the same as the preimage! Same = Not different.
Which type of transfoemation does not necessarily result in the image being congruent to the preimage?
An enlargement transformation
A preimage and an image are congruent in an isometry?
Yes. Being congruent is part of the definition of an isometry.
what- A triangle and a line of reflection are shown.Which of the following shows the preimage and the image?
bottom right
Why is a dilation not an isometry?
Because the image is not the same size as the preimage. To do a dilation all you do is make the image smaller or larger than it was before.
The figure shows the preimage and image of three points that have been reflected across a line and the preimage of quadrilateral RSTU. Is this statement true or falseThe image of RSTU reflected across the same line is DEFG?
False
Describe the difference between an image and a preimage?
A preimage is a transformed irritated or changed image. Such as a flipped triangle
How can the orientation of the image compare with the orientation of the preimage?
Well, honey, when we talk about the orientation of an image compared to the preimage, we're looking at whether the image is flipped, turned, or stayed the same. If the image is flipped, we call it a reflection; if it's turned, we call it a rotation. And if it stayed the same, well, that's just boring old identity. So, in a nutshell, the orientation can change through reflection or rotation, or it can stay the same.
What are the three types of dilations in math?
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).
Is preimage and image are congruent in a translation?
true
Identify the orientation where the image has same orientation as the preimage?
The answer is in the question! The orientation is the same as the preimage! Same = Not different.
Is a preimage and image are always congruent in a reflection?
Yup
suppose you are given a preimage and image?
perpendicular bisector
Given a preimage and image, which transformation appears to be a rotation?
answer
Given a preimage and image, which transformation appears to be a reflection?
answer
The figure shows the preimage and image of a 4th of July decoration. Is the image a reflection Answer yes or no?
no
Identify the transformation where the image has the same orientation as the preimage?
A translation
