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Which transformations will result in an image that maps onto itself?
Rotate 360 degrees
Which sequence of rigid transformations will map the preimage ΔABC onto image ΔABC?
The identity transformation.
What are transformations that result is an image that is the same shape and size as the original?
They are translation, reflection and rotation. An enlargement changes the size of the image.
What three transformations have isometry?
The three transformations that have isometry are translations, rotations, and reflections. Each of these transformations preserves the distances between points, meaning the shape and size of the figure remain unchanged. As a result, the original figure and its image after the transformation are congruent.
What sets of transformations would create an image that is not congruent to its original image?
It is an enlargement
Which transformations will result in an image that maps onto itself?
Rotate 360 degrees
Which sequence of transformations on preimage ABC will NOT produce the image A'B'C'?
56
When a transformation is applied to a figure and then another transformation is applied to its image?
When a transformation is applied to a figure, the result is a new image of that figure. If a second transformation is then applied to this image, the overall effect is a combination of both transformations on the original figure. This sequence can lead to various outcomes, depending on the types of transformations used (such as translation, rotation, reflection, or dilation) and their order. The final image will reflect the cumulative effect of both transformations on the original figure.
Which sequence of rigid transformations will map the preimage ΔABC onto image ΔABC?
The identity transformation.
What transformations are similar to the original image?
The result of any of the following transformations, or their combinations, is similar to the original image:translation,rotation,enlargement,reflection.
What are transformations that result is an image that is the same shape and size as the original?
They are translation, reflection and rotation. An enlargement changes the size of the image.
What compositions of transformations will always produce the same image regardless of the order In which the transformation are performed?
Compositions of transformations that always produce the same image regardless of the order in which they are performed are known as commutative transformations. Examples include translations and rotations about the same point; applying these transformations in any order will yield the same final image. However, reflections and dilations do not generally commute with each other or with other transformations. Thus, using only translations and rotations ensures consistent outcomes regardless of the sequence.
What three transformations have isometry?
The three transformations that have isometry are translations, rotations, and reflections. Each of these transformations preserves the distances between points, meaning the shape and size of the figure remain unchanged. As a result, the original figure and its image after the transformation are congruent.
What sequence of transformation produces an image that is not congruent to the original figure?
A sequence of transformations that produces an image not congruent to the original figure typically involves a dilation combined with one or more rigid transformations (such as translation, rotation, or reflection). Dilation changes the size of the figure without altering its shape, resulting in a similar but not congruent figure. For example, if you dilate a triangle by a factor greater than 1 and then translate it, the resulting triangle will not be congruent to the original.
What sets of transformations would create an image that is not congruent to its original image?
It is an enlargement
Which sequence of tranformations may result in an image that is similar but not congruent to the original figure?
The transformation process is an 'enlargement'
What is an image in math?
It is the output of a function.A function is a mapping that associates an image to each pre-image. The term is often used in the context of transformations but need not be restricted to that use.It is the output of a function.A function is a mapping that associates an image to each pre-image. The term is often used in the context of transformations but need not be restricted to that use.It is the output of a function.A function is a mapping that associates an image to each pre-image. The term is often used in the context of transformations but need not be restricted to that use.It is the output of a function.A function is a mapping that associates an image to each pre-image. The term is often used in the context of transformations but need not be restricted to that use.
