When beginning the module, I wasn’t exactly sure what to expect from it. In fact, when picking it at the end of first year I expected I’d be going into another maths class like at school – which filled me with excitement. I have to say I was a little disappointed when I found out this wasn’t the case.
However, the module has allowed me to explore so many areas of maths that I didn’t think of before. Who would have thought maths was necessary when riding a motorbike?
At the beginning of the module Liping Ma and her Profound Understanding of Fundamental Mathematics confused me terribly. I just couldn’t get my head around the meanings and explanations of the 4 principles she used to describe what a PUFM was. When reading her book, I was submerged into this and found out how important it really is. When looking back onto my first placement I’ve realised even more how necessary this is. One of my first maths lessons didn’t exactly go to plan and I ended up getting myself mixed up and confused by the questions the pupils were doing. The lesson was on area – straightforward to someone who has done Higher Maths – but when the pupils were coming to me confused about one particular question, I was beginning to get flustered when my explanations weren’t helping them to understand. I have now realised how important it is to have PUFM as it allows you, as the teacher, to explain much more to the pupils in depth and breadth. With this deep understanding, you are less likely to get confused yourself, which is vital when trying to instil confidence and understanding in the pupils.
Throughout the different inputs I found it fascinating to unpick all the different areas where maths is used. My favourite input was the one on Logistics and Supply Chains, which included information about food miles and how much it costs to fly or ship things to us, how things are packaged to maximise space when shipping and retailers having to choose what to stock in their stores. We then did a role play exercise and game to see how demand planning in stores worked. We had to work in pairs to choose what 5 items and how many of each item we would buy per quarter of the year, without going over budget, to see who could make the biggest profit. This allowed us to see how effective stores have to be when choosing what to stock, as if they buy too much of something and it goes off or people don’t buy enough of it, this will all be money wasted. They have to be able to budget their money efficiently and buy what will sell most. A tricky process even in a make-believe game.
Overall, I think the module was very effective at providing me with more maths knowledge and helping me to see how important it is that I do have a good maths knowledge for going out into schools. I need to be able to give the pupils in my class the best opportunity to learn maths in a fun and challenging environment that pushes them to the best of their ability. I believe the interaction in this module has helped me realise how important that is.
Category Archives: edushare
Maths and Sport
As a child I wasn’t particularly sporty. However, I did try. In my 6th year of school I did crash Higher PE which was certainly an eye opener to how bad at sport I really was. I was forever put in the good team, instead of the really good team but this didn’t mean to say I didn’t try. It just wasn’t meant for me. For my higher performance I did dance, as this is the one sport – even though I was constantly reminded by the boys in my class that it wasn’t a sport – I really excel in. As part of this I had to analyse and evaluate my performance looking at how I stayed in time with the music and with the others I was dancing with etc. And now I think about it, I was using some maths that I didn’t realise before. Although this is the basics of maths such as counting to 8 to make sure I do each move on the right beat, it still counts and is one of the Basic Ideas talked about by Liping Ma.
In the session yesterday with Richard, we were looking at how maths is used in sport in particular football. It is used in the score, timing so you know the length of the match, formations, points, the league table and I’m sure there could be more. We then went on to look at a table of the first ever premier league season, which is very different to how we see it today. We then had to convert it to show how it would be shown today. This shows how maths evolves and how things can be simplified to make it easier for the consumer/customer to observe and understand. It’s also important to be able to understand many Basic Ideas of maths in order to be able to enjoy the things we do. You wouldn’t think maths had a lot to do with football but if you couldn’t count, read numbers, tell the time etc. you wouldn’t be able to enjoy such simple things in sport as the majority of us can.
We also created our own/adapted current sports to have new rules/equipment in order to make some of the mathematical features more prominent/important. I think this helped identify why some things are in place in sport e.g. changing a win in football from 2 points to 3 points as it can make for a more exciting game or a more exciting league/title race. It also helped identify what mathematics is actually involved within different sports when you wouldn’t really notice them otherwise.
Ma, Liping. (2010). Knowing and Teaching Elementary Mathematics: teachers’ understanding of elementary mathematics in China and the United States. New York: Routledge.
Maths and Art
In last week’s input with Anna we were looking into the relationship between maths and art. We looked at Mondrian, Fibonacci and the Golden Ratio – Phi.
Piet Mondrian was a Dutch artist who focused on Pointillism and Cubist art. His art was very geometric and is seen a lot in modern day art. – https://www.guggenheim.org/artwork/artist/piet-mondrian?gclid=CjwKCAjwssvPBRBBEiwASFoVd_XWXluR5gKRvWAB9ZhvVXuoW08LlVXAJYz3SyyIHQROWYoqqD5VpBoCdMYQAvD_BwE
When creating my Mondrian style art I wasn’t exactly sure how it related to maths as I wasn’t focusing on any maths concepts when doing it. I think this would need to be brought in explicitly so that children were actually learning some key maths concepts for example using the art to look at angles. However, I do think this is a good way to relax the pupils as when doing it I felt very calm and at ease which can enable learning (Hayes, 2010).
Next we went on to look at Fibonacci. This was something I had heard of before as I had done it in school myself. The sequence begins at 0 and 1, naturally, and goes on by adding the two numbers before it. E.g. 0 1 1 2 3 5 8 13 21 34 etc. The numbers of the Fibonacci sequence can be used to draw squares on graph paper in a spiral or circular direction. As you can see on the picture (ignore the blue lines – mistakes made by me along the way) the sequence begins in the centre with 1cm square then to the right another 1cm square is added. This is because in the Fibonacci sequence 0 + 1 = 1. The sequence is then continued, 1 + 1 = 2 so a 2cm square is added and so on.
This can then be used to draw a spiral from the middle of the first square and through the centre of every square on the page. This is known as the golden spiral or the golden ratio which can be symbolised by Phi. This video clip explains the spiral and how it’s seen in nature.
https://www.youtube.com/watch?v=iEnR8zupK0A
Phi denotes a special ratio of line segments. This ratio results when a line is divided in a special way. The lines are seen in the rectangles created on the graph paper. For example, the squares of 1, 1, 2 and 3 beside each other show a rectangle. Pickover (2009) said “we divide a line into two segments so that the ratio of the whole segment to the longer part is the same as the ratio of the longer part to the shorter part”.
(a+b)/b = b/a
The formula can be used with any rectangle in the sequence and the answer will come out to 1.6 every time or very close. This answer is seen by artists to be the number of beauty. This might explain why it’s seen in so many beautiful natural and living things on the planet, or maybe it’s another phenomena with no explanation which makes our planet so wonderful.
Hayes, D. (2010). Learning and Teaching in Primary Schools. Exeter: Learning Matters.
Making Maths Fun
Last week in an input with Eddie we explored how to make maths fun in our classrooms.
The activity we did involved looking at tessellation – fitting shapes together to make a pattern with no gaps. We had to cut out the shapes we wanted – from a choice of triangles, squares and pentagons – and design a pattern which involved the shapes fitting together with each other. We were then to stick our patterns onto card and could paint them if we wanted to.
When completing the task the atmosphere in the room was very calm and relaxing, everyone was focused on what they were doing and the basic processes of cutting, sticking and designing a pattern were somewhat therapeutic. I could feel zen in the room, or in myself at least.
So, the objective of the task was to show the importance of making maths activities fun for pupils. I personality wouldn’t use the word fun to describe it, but I have a different outlook of what fun is compared to a child in primary school, although it was enjoyable to complete the task. When I was doing something that I actually took pride in and wanted to finish I wasn’t thinking about how this was actually doing maths – which made me think it’s always important to relate to the maths side of the task and not just a fun arts and crafts activity, but both. It’s necessary to show the links to the mathematical concepts so that pupils are still learning.
I tried to take this on in my own practice and created 6 different angles stations in my formative observation in 1pp1b. Some stations included an angle tarsia, an angle treasure hunt and an angle poster which the pupils had to measure and name the angles on the poster created with bright tape. I could really see the concentration from the pupils when doing something active for a change, as there was a lot of textbook maths in my class. Doing tasks in different ways and allowing pupils to see there is not only one method or one way to do something is very important, bringing change into maths makes it exciting and not the same thing every day. (Boaler, 2009).
Boaler, J. (2010). The Elephant in the Classroom: helping children learn and love maths. London: Souvenir Press.
What is maths?
On Monday in our third Discovering Maths input we were asked the questions what is maths and why do we teach it? This got me into thinking so what actually is maths, other than the basic formulas and calculations we always think of?
We use maths on a daily basis without even knowing and when we do use it we don’t think about how we do it or why we do it, it just happens. There’s countless occasions from the moment you wake up to the moment you go to sleep where maths is used without even thinking about it e.g. checking the time when you wake up and throughout the day, using money to buy things, even looking at a parking space and checking the size and angles to see if you’ll fit. All these things use the maths skills we are taught from day 1 to make our day to day life that bit easier, so of course we need to teach it!
Some of the main problems with teaching maths in school are maths anxiety and the idea of maths being boring. To me, a lover of maths, it could never be boring. It’s logical, there’s a problem that can always be solved and it requires strategic thinking which comes with great satisfaction when getting an answer right. So why is it that some people find it so stressy and plain?
A main factor which contributes to “maths anxiety” can be the idea that people are just not born with a maths brain. You hear it all the time in schools and work places that someone’s brain just isn’t wired up properly in order to be able to be good at maths. I used to think this was true to some extent, as I believed I had a maths brain but not a language one – which by the way, was never an excuse allowed to be used in my school’s English department – but now having gone into a class on my first placement, I have seen some people either just don’t try or don’t have the confidence to push themselves. Being a maths enthusiast made me really try and give the pupils different strategies and activities to help them to be successful and realise that they all can be successful even when they find something tricky. I think it’s so important for teachers, and us as student teachers, to really facilitate the learning of maths in an active and creative way, and encourage pupils to find what works for them so they know that it is possible to be good at maths and do well even when they seem to be struggling or think they just can’t do it.
Albert Einstein said “Do not worry about your difficulties in mathematics. I can assure you, mine are still greater.” showing that even the smartest minds find things hard and confusing, but you have to persevere and keep trying in order to make a breakthrough and succeed.
Reflection TDT
After recently receiving our grades for our Values module I have been able to look back and reflect on the lack of work I did for this module and realise that I need to be much more proactive and dedicated when it comes to extra work and reading at home. My grade being worse than expected has really opened my eyes to the amount of work and effort you need to put in on your own in order to be successful.
At school, especially in 6th year I usually got by quite well without having to do an excess of revision and extra work as I did most of my stuff in class or in free periods. Also having two easy subjects and one Advanced Higher in 6th year, which I really enjoyed and engaged with, I found it very simple to manage my work load in school and not have to do a lot of extra work at home. This got me in a bad habit when it came to starting university as I wasn’t motivated or prepared for the amount of work I was going to have to do. This really came over in my mark for my Values essay and definitely emphasised how much work I will need to do to improve.
By reflecting and looking back I have realised that I will need to put in a lot more work this semester if I want to keep up the high standard of work I produced in school and will need to really engage with extra reading and tutor directed tasks to stay focused and up to date. I think this grade has really shocked me and allowed me to see that university will not be as simple as I thought it would be.
I think reflection is a really big part of learning as it allows you to easily look back and evaluate how well or how badly something went and can let you make improvements. It’s a really good way to let you look at what you did really well and why it went well, and also what didn’t go so well and what you can do to make that better. In order to progress you need to be able to realise when you make mistakes or when something doesn’t go to plan, but you also need to have the tools to be able to improve these things or change the way you do something so as to move forward and develop.
Why teaching?
When writing my personal statement to apply to university I was told many times not to state that teaching was my passion as it would be seen as cliché and cheesy but how else do you describe something that you’re so enthusiastic about?
The main reason I chose to study teaching was because of my love for working and interacting with children and seeing how your efforts allow them to improve and grow. Witnessing children progress with something they find tricky or doing well in a situation which they would usually feel uncomfortable because you have encouraged and helped them, is definitely worth the sometimes hard or difficult times you can have during university or work.
I enjoy being in a role of responsibility and being someone that people feel they can turn to for advice in tough times. Both of which are qualities that a teacher require as you need to be able to nurture your pupils enough so that they feel comfortable in your classroom environment. I think I can incorporate empathy and dependability into my teaching style so that pupils can put their trust in me in order to improve their school experience.
I am looking forward to be able to work with different year groups and different kids during university placement and gain the skills that will allow me to help children in the best way I can as that is why I haven chosen to study teaching.