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Can an image and its translation image demonstrate rotation symmetry?
Wiki User
โ 13y ago
It can be thought of rotational symmetry along the axis
Wiki User
โ 13y ago
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Could an odd number of reflections ever be a rotation?
Of course. A reflection of any symmetric shape about a line perpendicular to its axis of symmetry will be a rotation of 180 degrees around the point on its axis of symmetry which is halfway between the pre-image and the image.
What are the four kinds of symmetry?
Rotation: move the object around the plane. Each rotation has a center and an angle.Translation: move the object on the plane without rotating or reflecting it. Each translation has a direction and distance.Reflection: mirror image of the object. Always has a mirror line.Glide Reflection: combination of a reflection and translation along the mirror line.
Is rotation always creates a congruent image to the original figure?
Figures are congruent if and only if they are related by a translation, reflection, or rotation, or some combination of these transformations.
What is reflectional summetry?
Reflection symmetry, reflectional symmetry, line symmetry, mirror symmetry, mirror-image symmetry, or bilateral symmetry is symmetry with respect to reflection
What are the three transformations of math?
The 3 transformations of math are: translation, reflection and rotation. These are the well known ones. There is a fourth, dilation, in which the pre image is the same shape as the image, but the same size in the world
Could an odd number of reflections ever be a rotation?
Of course. A reflection of any symmetric shape about a line perpendicular to its axis of symmetry will be a rotation of 180 degrees around the point on its axis of symmetry which is halfway between the pre-image and the image.
What are the four kinds of symmetry?
Rotation: move the object around the plane. Each rotation has a center and an angle.Translation: move the object on the plane without rotating or reflecting it. Each translation has a direction and distance.Reflection: mirror image of the object. Always has a mirror line.Glide Reflection: combination of a reflection and translation along the mirror line.
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.
The new figure formed by a transformation?
The new images can be: A translation, a reflexion, an enlargement and a rotation.
Is rotation always creates a congruent image to the original figure?
Figures are congruent if and only if they are related by a translation, reflection, or rotation, or some combination of these transformations.
What is the property of a figure that can be reflected across a line so that the image coincides with the pre image?
The property is Reflection Symmetry, Line Symmetry or Mirror Symmetry
What are the three transformations of math?
The 3 transformations of math are: translation, reflection and rotation. These are the well known ones. There is a fourth, dilation, in which the pre image is the same shape as the image, but the same size in the world
What is reflectional summetry?
Reflection symmetry, reflectional symmetry, line symmetry, mirror symmetry, mirror-image symmetry, or bilateral symmetry is symmetry with respect to reflection
When a line of symmetry divides an image, it splits the image into two congruent parts on either side of the line of symmetry?
true
When a line of symmetry divides an image its spells the image into two congruent parts on either side of the line symmetry?
true
What is the image of point 3 and 5 if the rotation is 180 degrees?
What is the image of point (3, 5) if the rotation is
What is a mirror-like image?
Symmetry
