A few years ago(Dec 29, 2006) a lady named Nancy Kitt sent a question to the Teacher2Teacher Service at the Math Forum and asked about a factoring method called the Bottoms Up method:
One of my former students showed me the following method to factor
trinomials.
I want to know HOW and WHY this method works.
3x^2 + 14x + 8 Multiply AC, that is 3 x 8 = 24
Now look at B = 14. We are looking for two numbers
multiplied together to give 24 and added to give 14. The numbers will be
+12 and +2.
(x + 12)(x + 2)--- put the two factors 12 and 2 inside the parentheses,
but put x as the first term in both parentheses.
Now, since A was 3, divide the two factors 12 and 2 by 3
(x + 12/3) (x + 2/3)
12 will divide by 3 giving 4.
2 does not divide by 3. Therefore, multiply the x by 3, giving the final
factorization of (x + 4) (3x + 2).
(she followed this with a second example)...
This is the COOLEST method I've ever seen. However, I have NO CLUE HOW
or WHY it works!!!!!!
I want to use this method this semester, and I'd like to have an idea why
it works?????
I responded (helpfully, I hope) with a post to explain the substitution method
Well, the secret is that 8 = 24/3...
If you consider that the solutions of x^2 + bx +c = 0 are the same as the
solutions of 2x^2 + 2bx + 2c etc... then you are a step closer to
understanding the solution....
If we take 3x^2 + 14x + 8 = 0 and let x=u/3 (or u=3x) and substitute we get
(3(u/3)^2 + 14 (u/3) + 24/3) = 0 and now if we simplify the first term
we get
u^2/3 + 14 u/3 + 24/3 = 0
now if we multiply all terms by 3 we get
u^2 + 14u + 24... and solve to get the two solutions you had, u=12 and u=2,
but remember that we wanted x, not u, and x=u/3 thus the final solution...
(And then I added two other methods that are not well known or understood)
Then I posted a second note in case she might want some historical information...
Just a little addendum on the history of this method (I was writing up an
article on factoring and thought of your question). The substitution of Z=ax to
make a solution pliable dates back to the ancient Babylonian clay tablets
according to Boyer's History of Mathematics. They used it in order to make
a trinomial (ax)2 + b(ax) =ac so that they could solve using their method
of completing the square. The idea of factoring had to wait a LONG time
until Thomas Harriot came up with it around 1600-1621 (he died in 1621 but
his method was not published until 1631, ten years after his death)..
By the way, I can not find any reference to "bottoms up" name for this...
can you help ME?
So several years later, I still wonder... does anyone have a clue how/why this term was applied, or any other detail about the history?
Nate said...As a matter of fact, I just learned this method today from a few of my students who refer to it as 'slide and divide' although I'm not sure if that will help you to trace the history." After a little searching I came across a solution to calling it "Bottoms Up". The name relates to the nearly final state where after, in our example, you get to (x + 12/3) (x + 2/3), You can simplify the left side fraction to a whole number, (x+4) but the right side requires the "magic, bottoms up, so we take the 3 in the denominator and write it in front of the leading term on the top, ie (3x+2)... BLAH!!!!
I still have not found any historical references to this method and the creation of either name. If you have information or sources, please share.
1 comment:
I wanted an assistant that doesn’t require coding skills, so I tried Halper as no-code ai business assistant . I could set up automated messages, reminders, and client tracking in minutes. No technical knowledge was needed. It handles repetitive tasks automatically and keeps my workflow organised. Even for small businesses, it’s powerful but simple. I spend less time on admin and more on actual business growth thanks to this assistant.
Post a Comment