Learning geometry can be difficult and studies have shown that students need experience in "thinking" at different levels. The "van Hiele Model of Thinking in Geometry " provides strategies and suggested activities for helping students focus on levels of thinking in geometry and the role of instruction in helping students move from one level to the next.
The van Hiele model of thinking, designed to help students gain insight into geometry, uses five levels to describe student behaviors.
The levels have specific characteristics: the levels are sequential; each level has its own language and set of symbols; what is implicit of a class of shapes at one level is explicit at the next level (e.g., students use the properties of a class of shapes when classifying at Level 0, but they only begin to isolate and describe them when thinking at Level 1); and levels are subject to "reduction" by substituting a rote procedure for thinking.
Level |
Description |
Example |
0 |
Visual |
Judges shapes by their appearances. |
1 |
Analysis |
Sees figures in terms of their components and discovers properties of a class of shapes. |
2 |
Informal Deduction |
Logically interrelates previously discovered properties. |
3 |
Deduction |
Proves theorems deductively |
4 |
Rigor |
Establishes theorems in different postulational systems. |
Students need to move from one level to the next within each of the topics, van Hieles proposed a sequence of five "phases" of learning. These provide teachers a structure for organizing classroom instruction in geometry as described below:
Level |
Description |
Example |
0 |
Inquiry |
Students discuss and develop questions on a topic to be explored. |
1 |
Directed Orientation |
Students explore sets of carefully sequenced activities. |
2 |
Explicitation |
Students express explicit views and questions about inherent structures of their investigations. |
3 |
Free Orientation |
Students now encounter multi-step tasks and gain experiences in finding their own way of resolving the tasks. |
4 |
Integration |
Students form an overview in which objects and relationships are unified and internalized into a new domain of thoughts. |
Fuys, David, Dorothy Geddes, and Rosamond Tischler. "The van Hiele Model of Thinking in Geometry among Adolescents." Journal for Research in Mathematics Education Monograph No. 3. Reston, VA.: National Council of Teachers of Mathematics, 1988.