Why? His point is, this idea does not carry through. As soon as the student encounters multiplication of fractions (or of decimals), it won't work. You can't think of 3/4 x 6/11 as repeated addition.
He feels it's better to portray multiplication as a scaling process: say 5 x 9 means 9 is scaled by a factor of 5. Then, students can have a true "aha" moment as they discover for themselves that you CAN use addition to find the answer to 5 x 9. But, Devlin says, they should be taught and shown the multiplication idea as a scaling process.
Now, I feel that Devlin has a point here... so since I'm constantly in the process of writing math materials for my Math Mammoth series of books, and right now I'm writing lessons on multiplying decimals for 5th grade, I took this idea just yesterday and tried to go with it.
Unfortunately, I immediately ran into problems.
Let me illustrate.
I thought, we need to illustrate the idea of scaling. So I thought, kids might know scaling from computer programs such as scaling images, or scaling maps. I was going to use a picture of a toy car:
and scale it by a factor of 2, to let it be TWICE as big. I scaled its width and length by a factor of 1.414 so as to make the AREA to be twice the original:
.But I realized, kids would feel that that's NOT twice as big... they might feel it needs to be scaled like this, doubling the width and height:
. But then, of course, the area is quadrupled (which 2nd or 3rd grades wouldn't automatically know).Right there I gave up. I SURE don't want to get them confused by doubling the width, height, or area... Later on they need to learn that IF you multiply the two dimensions by some factor r, the area will be multiplied by r2.
I did write for my lesson an illustration of scaling a "stick", or a line. In that one-dimensional situation we won't run into this problem. But even so, I would be extra careful of using it a lot, because surely some student will ask about scaling two-dimensional images, and then we have confusion.
I would find it more natural to present the idea of multiplication to 2nd and 3rd graders as "multiple copies", such as 2 ×
= .Even our word "multiply" refers to multiple copies of the same... people and animals "multiply", we talk about multiples, etc. We use the word "times" referring to doing the same thing over and over, such as "I opened the door three times".
Then, when it comes to multiplication of fractions and of decimals, one has to bring in the idea of taking a part:
1/2 x 7 means 1/2 OF 7. I do not see a problem there.
Later one can tie these "two meanings" of multiplication together with the scaling idea... maybe... somehow... I just do not know myself how to do that without confusing the idea of scaling the width/height by some factor and the area being scaled by the square of that factor.
Or maybe I'm all wrong and it IS possible to use the idea of scaling images?
Maybe someone should TRY it on a few classrooms of kids and see what happens over the years.
Update: Joe Niederberger has left an excellent comment on the issue at Let's Play Math blog. I feel I need to quote him... hope he doesn't mind:
Devlin unfortunately makes the mistake of thinking of multiplication as one "thing". It’s true multiplication of any two real numbers cannot be simply reduced to repeated addition, however, the multiplication of any two integers *can* always be reduced (or thought of, or defined by) repeated addition. Even though we call them both "multiplication" technically they are different functions.
In fact, we learn somewhere along the mathematical way that functions (like multiplication) are only properly defined by specifying their domain (among other things). Two functions that have different domains cannot be the *same* function. One function can be the extension or restriction of another, but they are not the same.
This is the basis of the confusion. Multiplication of integers *is* repeated addition, in some form or other (Peano uses a recursive definition - recursive, repeated; I say to-mae-toe, you say to-mah-toe.) Multiplication of rationals is a different animal (related, but different.) Same for multiplication of reals, complex numbers, etc. All different functions even though they build on one another.
Again, multiplication of rationals is technically a different function, in fact, an extension of multiplication on integers. Defining it requires that multiplication of integers has already been accomplished — and that, yes, means that repeated or recursive addition has already been put in the soup.
Essentially, we can define multiplication of whole numbers (and integers) as repeated addition. We have to define multiplication of fractions in a different way - but that is not a problem. It is extending the idea of multiplication in a way that it will "match" or "work" for integers as well.
Sideline... in other words, multiplication of fractions can be defined as
a/b * c/d = (ac)/(bd) which is the familiar rule. (BTW, definitions vary. That's why I can't say that multiplication of fractions would always necessarily be defined this way.)
If you have integers y and z, they can be written as fractions as x/1 and y/1, and multiplying them using the definition of fraction multiplication we get:
y/1 * z/1 = (yz)/(1*1) which equals yz.
Later on, multiplication of real numbers and that of complex numbers are defined still differently, as "extensions" of the idea of basic multiplication.
Other bloggers have their take, too:
If it ain't repeated addition... by Let's Play Math, Devlin on Multiplication by Rational Math Education, and Devlin's Right Angle at Text Savvy.
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