Category Archives: Discovering Mathematics

The Meaning of Mathematics – Maths defined

Numbers, sums, equations, patterns, sequences, problem-solving, formulas, confusion…

What comes into your head when you think about ‘maths’? Should we think more about ‘mathematical concepts’ and look deeper into what maths is all about, rather than accepting maths as being solely about numbers and work books?

‘Mathematics’ is defined as,
“The abstract science of number, quantity, and space, either as abstract concepts (pure mathematics) or as applied to other disciplines such as physics and engineering (applied mathematics)”.  (Oxford University Press, 2015)

So, what is maths? Maths can be confusing for many people. Many people believe you either have a ‘maths brain’ or you do not. I believe maths can be confusing, however I passionately argue that maths, the majority of the time is equations and formulas to follow. My view is maths can be straight-forward, if you allow it to be, or as the teacher, if you facilitate it right; it’s made up of steps and strategies. The difficult concept to grasp in maths is understanding those strategies, formulas and equations. Given you have that understanding, you are able to follow the steps and reach your solution – your answer.

However, saying that, is maths all about finding an answer? The problem-solving involved in mathematics is easier for me personally, because I enjoy being challenged to think and to think about problems from various perspectives. So, I enjoy the aspect of thinking about maths in contexts, as it has a purpose. I like to think of this as meaningful learning. In summary, I view problem-solving in mathematics as meaningful learning.

That’s not to abolish that other elements of mathematics are not intended purposeful learning. As stated by Scottish Government,
“Mathematics is important in our everyday life. It equips us with the skills we need to interpret and analyse information, simplify and solve problems, assess risk and make informed decisions.” (Scottish Government, Education Scotland, 2015)

I agree with this – maths is important. Maths can be used everywhere in situations, without us recognising that we are using our mathematical understanding. How would we be able to tell the time? How would we be able to implement time management skills? How would we know to recognise significant dates? Would you know when your own birthday is approaching? How would we manage finances and handle money? I could not think of one occupation or career that does not involve mathematical elements in some way. Could you?

Maths is fundamentally important in every day life, I agree.


References

Oxford University Press (2015) Oxford Dictionaries: Language Matters. Available at: http://www.oxforddictionaries.com/definition/english/mathematics. Last Accessed: Nov 5 2015.

Scottish Government (2015) Education Scotland: Mathematics. Available at: http://www.educationscotland.gov.uk/learningandteaching/curriculumareas/mathematics/. Last Accessed: Nov 5 2015.

The educator’s conceptual view – know what you are teaching!

Limited subject matter knowledge restricts a teacher’s capacity to promote conceptual learning among students. Even a strong belief of “teaching mathematics for understanding” cannot remedy or supplement a teacher’s disadvantage in subject matter knowledge. A few beginning teachers in the procedurally directed group wanted to “teach for understanding.” They intended to involve students in the learning process, and to promote conceptual learning that explained the rationale underlying the procedure. However, because of their own deficiency in subject matter knowledge, their conception of teaching could not be realized. Mr. Felix, Ms. Fiona, Ms Francine, and Ms. Felice intended to promote conceptual learning. Ironically, with a limited knowledge of the topic, their perspectives in defining the students’ mistake and their approach to dealing with the problem were both procedurally focused. In describing his ideas about teaching, Mr. Felix said: “I want them to really think about it and really use manipulatives and things where they can see what they are doing here, why it makes sense to move it over one column. Why do we do that? I think that kids are capable of understanding a lot more rationale for behavior and actions and so on than we really give them credit for a lot of times. I think it is easier for anybody to do something and remember it once they understand why they are doing it that way“.”
– Liping Ma, Knowing and Teaching Elementary Mathematics (2010, page 36)


The most important thing to remember when teaching maths – when teaching anything – as the teacher, the educator and the facilitator, is that you must understand what you are teaching. This is what Ma (2010, p. 36) is talking about here.

As a teacher and a professional educator, you are responsible for providing knowledge to your learners, not just passing it to them as information in a book or in the form of confusing statistics and facts, but as an understood conceptual view of the content. If you do not understand what you are teaching, this may invite opportunity for confidence to fall in your learners – you are the trusted educator in the classroom, on which your learners depend on to provide subject matter with an understanding you have thoroughly revised, in order to adapt the content to best explain it to them.

Outsmarted?… Imagine this. You are planning a lesson – a maths lesson. You have a vague and somewhat passive understanding of the content you intend to teach. And so you think your learners will trust that you understand what input they are going to receive, because, after all, you are the teacher. Right? That passive understanding you have, is only going to brush off onto your learners. Children are observant and will easily pick up on your mistakes, your struggles and perhaps your lack of confidence when you are teaching them. So, you plan your lesson, still intact with your passive understanding of the content you intend to teach. Then it comes to your lesson and your learner outsmarts you. Perhaps in the form of a question, that you cannot answer. Is this due to your negligence?

Your learners depend on you to know what you are talking about, and here, Ma, explains the profound importance to approach your intended learning content with a conceptual view – if you understand, you have more chance of your learners understanding!

 


References

Ma, L. (2010) Knowing and Teaching Elementary Mathematics – Teachers’ Understanding of Fundamental Mathematics in China and The United States. London: Routledge.