Which Transformations Can Be Used To Map A Triangle With Vertices A(2, 2), B(4, 1), C(4, 5) To A’(–2, –2), B’(–1, –4), C’(–5, –4)? A 180 Rotation About The Origin A 90 Counterclockwise Rotation About The Origin And A Translation Down 4 Units A 90 Clockwise Rotation About The Origin And A Reflection Over The Y-Axis A Reflection Over The Y-Axis And Then A 90 Clockwise Rotation About The Origin

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Which Transformations Can Be Used To Map A Triangle With Vertices A(2, 2), B(4, 1), C(4, 5) To A’(–2, –2), B’(–1, –4), C’(–5, –4)? A 180 Rotation About The Origin A 90 Counterclockwise Rotation About The Origin And A Translation Down 4 Units A 90 Clockwise Rotation About The Origin And A Reflection Over The Y-Axis A Reflection Over The Y-Axis And Then A 90 Clockwise Rotation About The Origin. A 9 0 ∘ 90^ {\circ } 90∘ counterclockwise rotation about the origin and a translation down 4 units 1 calculate the translation vector by subtracting the coordinates of the image from the original. A 180∘ rotation about the origin.

How many triangles in the diagram can be mapped to one another by
How many triangles in the diagram can be mapped to one another by from brainly.com

A 90∘ clockwise rotation about the origin and a reflection over the. Answer the transformations that can be used to map triangle abc to a'b'c' are a reflection over the origin followed by a rotation of 90 degrees counterclockwise. 3) rotation of 180° about (0,0) rotation of 90° counterclockwise about (0,0) 4) 10 which transformation would not always produce an image that would be congruent to the original figure?

A 180∘ Rotation About The Origin.


Consider a triangle whose vertices are (2 2), (4 2) and (4 4). Find the concatenated transformation matrix and the transformed vertices for rotatation of 90 about the origin followed by reflection. 3) rotation of 180° about (0,0) rotation of 90° counterclockwise about (0,0) 4) 10 which transformation would not always produce an image that would be congruent to the original figure?

A 90∘ Counterclockwise Rotation About The Origin And A Translation Down 4 Units.


A 90∘ clockwise rotation about the origin and a reflection over the. A 180° rotation about the origin a 90 counterclockwise rotation. A 9 0 ∘ 90^ {\circ } 90∘ counterclockwise rotation about the origin and a translation down 4 units 1 calculate the translation vector by subtracting the coordinates of the image from the original.

Answer The Transformations That Can Be Used To Map Triangle Abc To A'b'c' Are A Reflection Over The Origin Followed By A Rotation Of 90 Degrees Counterclockwise.


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