Notes 2-17-04

Tuesday, February 17th

Reminder:
Project Proposals and one (or two) portfolio entries should be submitted for preview feedback and advice by Thursday, February 26th.
Optional Labs for Wingeometry and other technology?
5- 10 minutes: Brain storming time for project ideas.... media and message.

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What about the symmetries of a Frieze Pattern on a Strip....

Translations and Reflections

...|p|q|p|q|p|q|p|q|p|q|p|...

This pattern has vertical axes for reflective symmetries between each p and q... and a translation symmetry taking each letter to the next letter of the same type... and also twice as far, and three times as far , and more....

The same is true for the following pattern:

...|d|b|d|b|d|b|d|b|d|b|d|...

Notice the difference -180 degree Rotations and Translations are symmetries for the next pattern.

...|p|p|p|p|p|...
...|d|d|d|d|d|...

The following pattern also has glide reflection symmetry, for example taking p to b and q to d, etc.
It also has a 180 degree rotational symmetry with center midway between the vertical reflection axes and the letter p and d or q and b.

...|p|q|p|q|p|q|p|q|p|q|p|...
...|d|b|d|b|d|b|d|b|d|b|d|...

What are the possible symmetries of a Frieze Pattern on a Strip....

What about the symmetries of a tiling?

Based on the group of symmetries for these patterns,
there are seven possible distinct types of frieze or Border Patterns:

translation

horizontal
reflection

vertical
reflection

reflection +
reflection

glide
reflection

rotation

reflection +
glide reflection

Show FAPP Video on symmetry and patterns.

What about the symmetries of a tiling? There are 17 distinct symmetry groups for tiling the plane. They can be described by the following diagrams indicating the symmetries of the figures as below:

or with figures as illustrated by the following

Field Patterns

translations

reflections

reflections +
reflections

glide
reflections

reflections +
glide reflections

rotations (2)

reflections +
rotations (2)

rotations (2) +
glide reflections

rotations (2) +
reflections + reflections

rotations (4)

reflections +
rotations (4)

rotations (4) +
reflections

rotations (3)

reflections +
rotations (3)

rotations (3) +
reflections

rotations (6)

reflections +
rotations (6)

Do activity on recognizing symmetries in frieze and planar patterns.

One of the features of almost all we have done so far this term, the proofs of the Pythagorean Theorem, Dissections, Tilings and Symmetry have involved

Rigid Motions in (or about) the plane. Also called "Isometries"

Orientation preserving

Translations

Rotations

Orientation reversing

Reflections

Glide reflections

Classification of Isometries

Next Class...Video : Isometries
The video introduced the four isometries we have discussed:
reflections, rotations, translations, and glide reflections.

It was shown that the product of two reflections is either a rotation (if the axes of the reflection intersect) or a translation (if the axes of the reflection are parallel).

Wingeometry demonstration for reflection- one and two reflections
What about 3 reflections? How to figure out.... match features.

Every plane isometry is the product of at most three reflections.

Two reflections = rotation or translation.

Three reflections = reflection or glide reflection

Preserve
Orientation Reverse
Orientation

No Fixed points Translation Glide reflection

Fixed Point(s) Rotation Reflection

Using Isometries to recognize symmetries of a figure or tiling.

translations	reflections	reflections + reflections
glide reflections	reflections + glide reflections	rotations (2)
reflections + rotations (2)	rotations (2) + glide reflections	rotations (2) + reflections + reflections
rotations (4)	reflections + rotations (4)	rotations (4) + reflections
rotations (3)	reflections + rotations (3)	rotations (3) + reflections

	Preserve Orientation	Reverse Orientation
No Fixed points	Translation	Glide reflection
Fixed Point(s)	Rotation	Reflection