When I was growing up, they didn't worry about students being able to visualize concepts. They were concerned with the process. They wanted to know that you could follow the algorithm correctly and they used lots of short cuts and sayings to help you remember the steps
Over the years, there has been a move to providing visualization for the concept as it is being taught. After repeatedly looking at pictures on line, I think I finally figured out how to read the pictures showing dividing fractions. I also finally connected the idea of part to whole when dealing with dividing fractions.
For instance, I have 3/4th of a pizza I want to divide into 2 pieces. So the whole instead of four pieces making up the whole, I have 8 pieces of pizza if I had a whole pizza but only 6 pieces are relevant. Now we want 3 parts of the 6 so we each part of the pizza is 3/8th. On the other hand, if I have the same 3/4th of a pizza and I divide it into quarters, I am asking myself, how many fourths are there, so Im looking at the parts which means there are 3 one quarter sections.
So if I have 3/4 divided by 1/8, it means I start with 3/4th of a pizza and I want 8 pieces instead of four which means each piece is divided in half and my pizza now has 6 total pieces which is what I needed to find. On the other hand if I have two pizzas and I divide them into quarters, I end up with 8 pieces because each pizza is divided into four and four times two is eight.
As far as improper fractions go, I figured out that one needs to convert the improper fraction into a mixed number. The student would then draw the mixed number using circles or rectangles with the fractional part in it's own circle or square. After it's all set up, then apply the division. It's important to see it all in context and as a whole. This makes it so much easier to "see" what is happening.
Honestly every time I've tried to figure it out with pictures, I'd stumble around until it made sense and then promptly forgot how it worked. I think that is because I never took time to verbalize what was happening. The verbalization allowed me to focus on the concept while moving it from short term to long term memory.
The next thing I want to figure out is how to apply visualization to algebraic fractions. I'm not sure how to draw 1/(x-1) or 1/(x-1)/1/(x+2). My next step is to see if I can figure out how to express algebraic fractions while showing addition, subtraction, multiplication, and division of those same algebraic fractions.
Let me know what you think, I'd love to hear. Have a great day.
No comments:
Post a Comment