, or if you can't get to the Internet to watch the Math Masters
Muliplication Tables video.
I was going to call this "Using the distributive property of
multiplication", but who would have been tempted to read this??
Following on the heels of the brilliant and highly entertaining
Math Masters Muliplication Tables video, LearnHub readers are
brought back down to earth with this pedestrian yet useful
lesson.
Thanks to the two Andrews, we all know what 3 x 4 is. But, do you
know what 30 x 42 is? Or 63 x 15?
With a half-decent memory and knowledge of the distributive
property of multiplication, it's not that hard to work out these
tasks.
Take 30 x 42.
First, you know what 3 x 4 is, right? 12 of course. But it wasn't
3, it was 30 and it wasn't 4, it was 40, so add a couple of zeros
to get 1200.
But it wasn't forty 30s we were asked about, it was forty-two
30s.
However, we have already accounted for forty of the forty-two 30s;
all we need now is two more 30s, which is 60, and Bob's your uncle;
30 x 42 = (30 x 40 = 1200) {store that in your head} + (30 x 2 =
60) {retrieve the 1200 that you have stored}, so that 30 x 42 =
1200 + 60 = 1260.
We can do this because the distributive property of
multiplication says that 30 x 42 = 30 x (40 + 2) = (30 x 40) + (30
x 2).
Note the use of the parentheses to make it clear that
mulitiplication is performed before addition. The parentheses makes
it more readable as well.
I like to think of it as 30 being "applied" (i.e. distributed) to
as many parts of the 42 as you want - in this case 40 + 2.
Did you notice that when I accounted for the tow zeros, I was
unconciously using the comutative property? Because 30 x 42 = (3 x
10) x (4.2 x 10) = {gathering like terms i.e. the 10s} = (3 x 4.2)
x (10 x 10). Of course we all know what 10 x 10 is, but multiplying
fractional numbers mentally can be taxing.
What about 63 x 15?
63 x 15 = (60 + 3) x 15 = (60 x 15) + (3 x 15) = (6 x 10 x 15) + (3
x 15 ) = (6 x 15 x 10) + (3 x 15) = (6 x 15) [store this in your
brain} x 10 [add a zero to what you have just stored}+ (3 x15)
{piece of cake, hopefully} = (90 x 10) + (3 x 15) = 900 + 45 =
945
Finally, we look at a case where we take a multiplication task,
"build it up" to something we can handle, then "back off" to get
the desired result.
What is 20 x 19?
If you know that 20 x 20 = (2 x 2) x (10 x 10) = 4 X 100 = 400
then you realize that you weren't asked for twenty 20s, you were
asked for nineteen 20s. You have one 20 too many - so subtract, or
back off, a 20 to get 400 - 20 = 380.
You could have done 20 x 19 = (2 x 19) x 10 = 38 {hopefully} x 10 =
380.
To summarize, if you have to perform a multiplication such as
these, break the complicated case down into simple cases that your
brain can remember, then put the cases together.
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