• #### Transformations and Isometries - Concept

##### Math›Geometry›Transformations
How to determine the types of transformations, the definition of isometry, and how to say and write a transformation's new image.
• #### Translations - Concept

##### Math›Geometry›Transformations
How to describe a translation; how to interpret ordered pair rules.
• #### Translations - Problem 1

##### Math›Geometry›Transformations
How to perform a transformation when an ordered pair rule is given.
• #### Translations - Problem 2

##### Math›Geometry›Transformations
How to write the rule for a transformation that has already been performed.
• #### Reflectional Symmetry - Concept

##### Math›Geometry›Transformations
How to identify and describe reflectional symmetry.
• #### Rotational Symmetry - Concept

##### Math›Geometry›Transformations
How to define rotational symmetry and identify the degree of rotational symmetry of common regular polygons.
• #### Translations - Problem 3

##### Math›Geometry›Transformations
How to describe a translation when an ordered pair rule is given.
• #### Reflections - Problem 2

##### Math›Geometry›Transformations
How to reflect a figure over x = 2.
• #### Rotational Symmetry - Problem 1

##### Math›Geometry›Transformations
How to draw a figure with a given degree of rotational symmetry.
• #### Reflections - Problem 3

##### Math›Geometry›Transformations
How to find the minimal path between two objects.
• #### Reflections - Problem 1

##### Math›Geometry›Transformations
How to reflect a figure over the y-axis.
• #### Reflections - Problem 4

##### Math›Geometry›Transformations
How to describe the transformation given by (x,y) -> (-x, y+1).
• #### Reflectional Symmetry - Problem 1

##### Math›Geometry›Transformations
How to draw a figure with horizontal but not vertical symmetry and vice versa.
• #### Reflections - Concept

##### Math›Geometry›Transformations
How to describe the effect of a reflection, how to describe the effect of the ordered pair rules (x,y) -> (-x, y),(x,y) -> (x, -y), (x,y) -> (y, x).