Skowron - Geometro for Accessible 3-D Geometry...1. building pyramids, prisms and more 2. accessible...
Transcript of Skowron - Geometro for Accessible 3-D Geometry...1. building pyramids, prisms and more 2. accessible...
1. building pyramids, prisms and more
2. accessible 3-D problemsEuler equationDiagonalsDirectionsMeasuring volume - prisms/pyramids, cylinder/coneNets
Labeling Distances in solids Cross sections
pentagonal prism
has a pentagon & 2 squares in EACH vertex.This property can be used as an instruction to build pentagonal prism.
Pentagonal prism is an example of an Archimedean Solid
Build a structure that has
a pentagon & 3 triangles in each vertex
Other solids can be built using similar instruction.For example:
pentagonal anti-prism
has a pentagon & 3 triangles in each vertex
Pentagonal anti-prism is an Archimedean solid
Compare pentagonal prism & pentagonal anti-prism
What are similarities and differenced between the two solids?
Properties of Archimedean solids
Regular polygons for faces
Not all faces identical – different polygons can be used
Convex
All vertices identical
Use markers to help count number of faces, vertices and edges in
solids
Pentagonal prism with stickers attached to faces
Pentagonal prism with white velcro markers attached to vertices and orange velcro markers attached to edges
Euler’s equationF + V - E = 7 7 12
6 8 12
6 6 10
7 10 15
4 4 6
2
2# faces # vertices # edges
Hexagonalpyramid
Square prism
Pentagonal pyramid
Pentagonal prism
Triangular pyramid
skewparallel perpendicular(normal)
orientation of lines
Velcro rods are attached to parallel/perpendicular and skew edges of Geometro cube
Find parallel edges in hexagonal pyramdFind parallel edges in pentagonal pyramid
Make a tetrahedronFind all pairs of skew edges in the tetrahedron
orientation of linesActivity:
diagonalsShow diagonals of pentagonal prism
How many diagonals are there in hexagonal pyramid?
Activity:
Show diagonals in an octahedron
How many diagonals are there in a square prism?
diagonals1. definition
2. how many diagonals in each polyhedron?
3. what is the pattern between properties of a polyhedron and the number of diagonals?4. where do the diagonals cross?
pentagonal prism, hexagonal pyramid, octahedron, square prism
Insert a pair of paper clips with velcro (one with hook and one with loop) into ends of a pre-cut drinking straw. You have a rod with sticky ends, now. The rods can be attached one to another to form triangles or other polygons.
The rods can also be inserted into solids to show any desired distance in that solid, for example a diagonal, edge, height of the solid or height of a face. The sticky ends of straws will attach to the sold’s edges, they can be placed inside or outside the solid.
Paper clip connectors
Triangle made of straws with velcro ends can be inserted into cube. One of the faces of the cube can be removed and the triangle can be touched.
of prism & pyramidCompare volume
Make square pyramid and square prism (w rectangles for sides)
Fill the pyramid with styrofoam packing peanuts. Transfer the peanuts to the prism. Label the level of filling using dry erase marker or straws with velcro. What fraction of the prism is filled? Estimate the volume of the peanuts using one cube inch tray.
of cone & cylinderCompare volume
Make cone and cylinder
Fill the cone with styrofoam packing peanuts. Transfer the peanuts to the cylinder. Label the level of filling. What fraction of the cylinder is filled? Estimate the volume of the peanuts using one cube inch tray.
Insert bent paper clip into the drinking straw. Insert the straw into tube made of paper measuring tape such that the straw is fully into the paper tube and only the velcro is outside the tube.
Make a hanging ruler
Enclose the stack of approximately 4.3inches (five colors) of foam squares in four Geometro squares. Remove or add a few foam square of the fifth color as needed, so that the cube is full. Place the cube such that the fifth color is at the bottom of the cube.Attach the hanging ruler to the front top edge of the cube –on the face without Geometro square. The ruler has to hang freely.
Volume of oblique solidsIn steps, remove the top inch of foam from the stack and incline the vertical sides of Geometro squares such that the new solid is filled again with the foam. Keep the ruler vertical and measure the height of the new solid. Discuss how the volume of the oblique prism decreases with the decrease of the height.
geometro
Adaptation of Geomero book “Nets of 3D Solids” for vision impaired students resulted in Student Geometro Workbook Kit, available from APH, http://shop/aph.org
www.aph.org
Nets of 3D solids
Discover, draw and describe polygons can be formed by cross sectioning a cube
Cross sections of solids
Use elastics or pipe cleaners to show the cross sections
National Museum of MathematicsManhattan, NYwww.momath.orgRing of Fire
to see how they show cross sections of solids
Refer to:
While using elastics to show cross sections of solids make sure the section is if fact flat. With elastic it is easy to produce configurations that do not represent a flat section, as shown below
cross sections of cylinder
circle ellipse rectangle
Show cross sections of cylinder using elastic bands
cross sections of cone
Show cross sections of cone using elastic bands & dry erase marker
circle ellipse parablola hyperbolatriangle