Previously, I’ve heard people say, “I cannot do art” or “Art is something that I just wasn’t gifted in”. This is why one particular maths workshop came as surprise to me as it demonstrated that you can do art using maths.
In class we created tessellations. Little did I know that this type of art links to basic ideas and concepts in maths such as properties of 2D shapes, angles, triangles, quadrilaterals, symmetry, proportion. It also links to longitudinal coherence since we can use these basic concepts of maths and build upon them to teach area and transformation (Ma, 2010,p. 104).
To create our tessellation, we had to look at the size of the shapes, how the regular shapes of an equilateral triangle, squares and triangles could fit together and why they did. Throughout the workshop we used a whole range of mathematical languages such as edges, sides, angles, pattern and symmetry.
We looked at the tiles in front of us and thought of what pattern we wanted to create. Once we had chosen our pattern, we placed the tiles down on the paper to see if the 2D, regular shapes would fit together. We found that there were going to be gaps however, we solved this challenge as we found that if we rotated some of the triangles, they would fit, leaving no gaps. Once we completed our tessellation, we painted it, using colours to emphasise the pattern created.
This workshop was useful as in the future if there are some pupils who for example say, “I can’t do maths but they say they are good at art, I can show them how both connect to one another, making maths or alternatively art more interesting, fun, engaging and relevant to the pupils as art can be created using mathematical concepts.
In the future, this activity would useful for teaching maths and for developing pupils understanding of fundamental mathematics. To start out, pupils could look at shape, angles and explore how shapes fit together. Pupils could be challenged by looking at why these shapes fit together. Pupils could explore this by using a protractor to see how all the angles add up to 360 degrees where the angles meet. Children could be further challenged by making their own shapes. They then could measure the angles to discover how and why they fit together. Additionally, I would like to make shapes relevant to pupils by showing them shapes in real life contexts because pupils might not think of shapes when looking at buildings for example, they could look at photos of the Pantheon in Rome, as the front of it is the shape of a pentagon.
References:
- Ma, L., (2010) Knowing and teaching elementary mathematics (Anniversary Ed.)New York: Routledge.
- Valentine, E (2017) Maths, creative? – No way! [PowerPoint Presentation], ED21006: Discovering Mathematics (year 2) (17/18). University of Dundee. 26 September.