Who is online

We have 495 guests and no members online

Geometric textbook "Polyhedra and sweep"

 

4-pir

 

cube

 

Tr-pir

 

tr-pr

''Polyhedrons and developments'' – this is a new set of teaching geometrical models, which is intended for demonstration of various polyhedrons and their developments. The set is arranged so that allows from each model of a polyhedron easily to obtain all types of its developments, and this in its turn gives the chance visually and logically to master inobtaining of the developments from polyhedrons and vice versa – from developments of polyhedrons.
''Polyhedrons and development''complement the geometric transformable models “Nane”. “Nane” models allow receiving numerous transformations of geometrical models, but with their help it is impossible to show the developments of stereometric bodies. The set of the models ''Polyhedrons and developments'' fills this gap and allows to demonstrate the geometric bodies. The models of a new set are arranged so that it is possible to place in them “Nane” models and combining both models, to show different opportunities of geometrical figures and bodies. Two main details of the components of a new set of models are the triangle and the square, which are connectedto each other with the help of a special lock. The set consists of ten triangles and ten squares,with the help ofwhich it is possible to obtain:

  1. Triangular pyramid (tetrahedron) and cut-out shapes.
  2. Quadrangular pyramid and cut-out shapes.
  3. Pentagonal pyramid.
  4. Triangular prism and cut-out shapes.
  5. Abridged triangular pyramid and cut-out shapes.
  6. Cube and cut-out shapes.
  7. Truncated triangular prism and cut-out shapes.
  8. Truncated rectangular prism and cut-out shapes.
  9. Rectangular parallelepiped and cut-out shapes.
  10. Correct octahedron (octahedron) and cut-out shapes.
  11. Icosahedron (icosahedra) and cut-out shapes.
  12. Variousstarpolyhedron.

Receiving different models of the triangular pyramid, for example, is as follows:

Method I.

We take four triangles, we connect so that to obtain a triangular pyramid.

Method II.

At first we display the development/cut-out shape of this model on a table, and then we receive the required model.

The originality of models is that from each one it is possible to receive all developments/cut-out shapes of this model. By means of these models it is possible to make and solve interesting tasks. Forexample:

Task 1.

Choose from the figures those, which are considered as the developments/cut-out shapes of a cube.

cub-razv

Task 2.

To designate the tops of a triangular pyramid ABCD with the letters A, B, C and D, so that the triangular pyramid (octahedron) is turned out.

burg
 

Task 3.

The figure depicts all developments of the correct octahedron (octahedron) EABCDF. The tops of the octahedron are designated by letters E, A, B, C, D and F, so as to obtain an octahedron.

vosm
  By means of this set the educational process can be organized with high efficiency. For this purpose at first the pupils are given a task to draw the development of any polyhedron, then to carry out an inspection of correctness of the drawing (developments) with application of models. The training provided in such a way allows to acquire practical skills of receiving spatial bodies, and visually to display this process. It is also possible to carry out competitions on speed of assemblage of different polyhedrons, suggesting pupils to collect, for example, an icosahedron (icosahedra) and to receive its development.
Using these models in the course of geometry teaching, (especially stereometry), the teacher can reach more effective result, than working without them. The set can be applied as the constructor, it is also useful for pupils of all classes, and the use of models in pre-school groups can be organized in the form of geometrical games.

Thanks to the transformable qualities, the modelsgenerate an interest in geometry, promote logical and constructive thinking, and develop spatial imagination.

The possibilities to get new polygons are almost unlimited, wherein you can see for yourself.

Who is online