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A rotation of 360 degrees will map a parallelogram back onto itself.

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9y ago

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what transformation will always map a parallelogram onto itself?

Linear transformation is a function between vector spaces that will always map a parallelogram onto itself. Some examples are rectangles and regular polygons.


Which trasformation will always map a parallelogram onto itself?

A transformation that will always map a parallelogram onto itself is a rotation by multiples of 180 degrees around its center. This rotation preserves the lengths of the sides and the angles, maintaining the shape and position of the parallelogram. Additionally, reflections across the lines of symmetry or the diagonals will also map a parallelogram onto itself.


What common transformation will map any parallelogram onto itself?

A common transformation that will map any parallelogram onto itself is a rotation by 180 degrees about its center. This rotation preserves the shape and size of the parallelogram while repositioning it in such a way that every vertex moves to the location of the opposite vertex. Additionally, reflections across the diagonals or the midpoints of opposite sides also map the parallelogram onto itself.


A rigid transformation always maps a figure onto?

Itself


Which transformation can map the letter S onto itself?

Rotation


What transformation can map the letter S onto itself?

Ft


Which transformation will map an isosceles trapezoid onto itself?

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How do you describe a transfermation that maps an equilateral triangle onto itself for translation?

For translation, the only transformation (not transfermation), is the null translation (0,0).


Does a paralleogram have rotational symmetry?

No, a parallelogram does not have rotational symmetry because it cannot be rotated onto itself. Rotational symmetry requires an object to look the same after being rotated by a certain angle.


Which different transformation would move the figure onto the image?

Its a transformation called translation. Hope this helps :)


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What single transformation maps abc onto abc?

The identity transforThe identity tranformation.mation.