3D Transformations

Unit Description

Students are introduced to volume as a measure of filling and to surface area as a measure of wrapping.  After developing strategies for measuring the surface areas and volumes of rectangular prisms, students use their new knowledge to develop strategies for measure the surface are and volumes of cylinders, cones, spheres, and irregular solids.  They also study the relationships between surface area and volume.  This unit will also stimulate and sharpen students’ awareness of symmetry and to begin to develop their understanding of the underlying mathematics. 

Enduring Understandings

Essential Questions

·         As the dimensions of a prism and cylinder change, so does the volume and surface area.

·         Strategies for finding volume of any three dimensional figure will work for any similar three dimensional figure.

·         Patterns can be used to predict attributes of design.

·         Designs can change position without changing shape.

·         The angles formed by a transversal passing through parallel lines have a distinct relationship.

·         Which system of measurement is most appropriate for situations?  Why?

·         Is there a constant relationship between the dimensions and volumes of different shapes?  If so, why?  If not, why not?

·         How can the relationship between the angles formed by parallel lines and a transversal be determined?

·         Is the angle relationship formed parallel lines and a transversal consistent?

·         In transformations, what changes?  What remains the same?  Why?

·         How do I know that a shape has symmetry?  Congruence?

Students will know…

·         Volume (the amount of space inside of a figure measured in cubic units)

·         Surface area (the sum of the areas of all surfaces and side surfaces of a three dimensional figure.

·         Circumference (the length of a circle, measured by multiplying the radius by 2 and pi.)

·         Prism (a solid with two bases that are formed by congruent polygons that lie in parallel planes.)

·         Cone (a solid with a base, a vertex not contained in the same plane as the base, and a lateral surface area composed of all points in the segments connecting the vertex to the edge of the base.

·         Symmetry (shows congruence of a shape when folded about a center point.)

·         Translation (slides figures the same distance in the same direction.)

·         Relationship of angles formed by parallel lines and a transversal (corresponding, vertical, alternate interior, alternate exterior, supplementary, complementary)

Students will be able to…

·         Conceptualize volume as a measure of filling an object.

·         Discover that strategies for finding the volume and surface area of a rectangular prism will work for any prism.

·         Reason about problems involving the surface area and volumes of rectangular prisms, cylinders, cones, and spheres.

·         Determine which rectangular prism has the least (greatest) surface area for a fixed volume.

·         Estimate the volume of an irregular shape by measuring the amount of water displaced by the solid.

·         Understand the relationship between a cubic centimeter and a milliliter.

·         Recognize and describe symmetries of figures.

·         Create figures with specified symmetries.

·         Give precise mathematical directions for performing reflections, rotations, and translations.

·         Determine angle measures formed by parallel lines and a transversal by measuring only one angle.