Tuesday, January 5, 2010
In my past and current Mathematics classes, I have experienced a number of different teaching styles and techniques. Some have been successful, others have not. Every teaching technique I have experienced, however, has been influencial for my future students because now I know for myself what techniques will help those I teach. When I was first taught algebra, I was given steps and formulas to follow rather than explainations and applications. Because I was young, i needed that direct form of teaching to grasp the algebraic concepts. I think that is a good way to get young students interested and confident in Mathematics. The next level of understanding comes when those steps and formulas transform into meaningful operations needed to compute story problems or information given in an unexpected format. In order to teach this level of understanding, the educator must give examples of many different types of story problems and then allow students to come up with their own so that they can learn to think outside of exactly what they are told. Once a student can analyze a problem on their own and use concepts already taught and grasped, the teacher can become more of a guide and the student will progress more quickly. I have noticed that some educators prefer to only lecture, rather than allow input and participation from students. This environment prevents some learning because without students asking questions and commenting, the second level of understanding cannot be reached. It is still important, however, for a teacher to give students enough information so the ideas that the students are forming on their own are correct and relavant. To summarize, there must be a balance between the information given directly to the student and the information expected for the student come up with on their own. Each student will be at a different level and so it is important for the instructor to become familiar with and understand their students' level of understanding.
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I agree with your comment about different styles of teaching for different ages of students. I have never thought of that before and it is very true. At an earlier level the students just need to understand how to work the problem. Once high school hits students start questioning the purpose of math and then applications become important.
ReplyDeleteI wonder if your opinion could be strengthened by a few more supporting examples to show the relevance of the different teaching styles.
Rachelle,
ReplyDeleteI liked how you said that there must be a balance between the information given by the teacher and the information that a student comes up with on his/her own. I had never thought about that before, but I totally agree with it. If a teacher tells them (a.k.a shows them every problem that will be on the test) and doesn't give the student any room to explore the information already given in order to produce more information (a.k.a. produce answers to more in depth math questions) then they will never be able to fully learn.
A particular point in math that I feel you can include in your opinions would be that sometimes teaching in the classroom goes further than just the information given at the level that a class is at. It goes to how exactly that information is presented (which you might have covered and I just didn't understand). I believe that mathematics presented in creative and unusually ways will help those who don't learn "traditionally" really learn how to grasp math. I feel math educators as a whole learn the same way, but that way does not necessarily represent the way the majority of our students think and learn, and we must consider that when we decide to present mathematical information.
Thanks for the post on your blog!
Sorry I just called you Rachelle. I was reading her comments after your post. I MEANT Kelli. Haha
ReplyDeleteSo sorry!
So, your idea on balance was good. My favorite teachers have always been the one's that guide me just enough so that I can figure it out on my own. I guess I'm not catching what you think are negative ways of teaching math. I would have liked to have heard your thoughts on that.
ReplyDeleteI like how you talked about having the students interact. I think this is a challenge as a math teacher bc you can't just initiate discussions on math. I think they are very important though to include students instead of just lecturing them.
ReplyDeleteI do however feel that all math educators do not learn the same. I think math teachers also have their own learning styles just as students do.
Did you grasp the algebraic concepts by following the steps and formulas? Is grasping a mathematical concept illustrated by successfully completing a set of exercises? If you were given a random problem not in the book, would you know what to do with it and why you might try that?
ReplyDeleteIf students can already do the math, are they motivated to learn mathematical concepts in the story problems? Or do they just pull out random numbers and "do the math" on them? How can teachers get them to understand the concepts in a story problem and what they represent?
I really like your idea of balancing what is told and what is discovered.