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We're told to factor 4x to the fourth y, minus 8x to the
third y, minus 2x squared.
So to factor this, we need to figure out what the greatest
common factor of each of these terms are.
So let me rewrite it.
So we have 4x to the fourth y, and we have minus 8x to the
third y, and then we have minus 2x squared.
So in the other videos, we looked at it in terms of
breaking it down to its simplest parts, but I think we
have enough practice now to be able to do a little bit more
of it in our heads.
So what is the largest number that
divides into all of these?
When I say number I'm talking about the actual, I guess,
coefficients.
We have a 4, an 8, a 2.
We don't have to worry about the negative signs just yet.
And we say, well, the largest, of, the largest common factor
of 2, 8 and 4 is 2.
2 goes into all of them, and obviously that's the largest
number that can go into 2.
So that is the largest number that's going to be part of the
greatest common factor.
So let's write that down.
So it's going to be 2.
And then what's the greatest, I guess, factor, what's the
greatest degree of x that's divisible into
all three of these?
Well, x squared goes into all three of these, and obviously
that's the greatest degree of x that can be divided into
this last term.
So x squared is going to be the greatest common x degree
in all of them.
2x squared.
And then what's the largest degree of y that's divisible
into all of them?
Well, these two guys are divisible by y, but this guy
isn't, so there is no degree of y that's
divisible into all of them.
So the greatest common factor of all three of these guys
right here is 2x squared.
So what we can do now is we can think about each of these
terms as the product of the 2x squared and something else.
And to figure that something else we can literally
undistribute the 2x squared, say this is the same thing, or
even before we undistribute the 2x squared, we could say
look, 4x to the fourth y is the same thing as 2x squared,
times 4x to the fourth y, over 2x squared.
Right?
If you just multiply this out, you get 4xy.
Similarly, you could say that 8x to the third y-- I'll put
the negative out front-- is the same thing as 2x squared,
our greatest common factor, times 8x to the third y, over
2x squared.
And then finally, 2x squared is the same thing as if we
factor out 2x squared-- so we have that negative sign out
front-- if we factor out 2x squared, it's the same thing
as 2x squared, times 2x squared, over 2x squared.
This is almost silly what I'm doing here, but I'm just
showing you that I'm just multiplying and dividing both
of these terms by 2x squared.
Multiplying and dividing.
Here it's trivially simple.
This just simplifies to 2x squared right there, or this
2x squared times 1.
That simplifies to 1, maybe I should write it below.
But what do these simplify to?
So this first term over here, this simplifies to 2x squared
times-- now you get 4 divided by 2 is 2, x to the fourth
divided by x squared is x squared.
And then y divided by 1 is just going to be a y.
So it's 2x squared times 2x squared y, and then you have
minus 2x squared times, 8 divided by 2 is 4.
x to the third divided by x squared is x.
And y divided by 1, you can imagine, is just y.
And then finally, of course, you have minus 2x squared
time-- this right here simplifies to 1-- times 1.
Now, if you were to undistribute 2x squared out of
the expression, you'd essentially get 2x squared
times this term, minus this term, minus this term.
Right, if you distribute this out, if you take that out of
each of the terms, you're going to get 2x squared times
this 2x squared y, minus 4xy, and then you have minus 1,
minus 1, and we're done.
We've factored the problem.
Now, it looks like we did a lot of steps.
And the reason why I kind of of went through great pains to
show you exactly what we're doing is so you know exactly
what we're doing.
In the future, you might be able to do this
a little bit quicker.
You might be able to do many of the steps in your head.
You might say OK, let me look at each of these.
Well, the biggest coefficient that divides all of these is a
2, so let me put that 2, let me factor 2 out.
Well, all of these are divisible by x squared.
That's the largest degree of x.
Let me factor an x squared out.
And this guy doesn't have a y, so I can't factor a y out.
So let's see, it's going to be 2x squared times-- and what's
this guy divided by 2x squared?
Well 4 divided by 2 is 2.
x to the fourth divided by x squared is x squared.
y divided by 1, there's no other y degree that we
factored out, so it's just going to be a y.
And then you have minus 8 divided by 2 is 4.
x to the third divided by x squared is x.
And then you have y divided by say, 1, is just y.
And then you have minus 2 divided by 2 is 1.
x squared divided by x squared 1, so 2x squared divided by 2x
squared is just 1.
So in the future, you'll do it more like this, where you kind
of just factor it out in your head, but I really want you to
understand what we did here.
There is no magic.
And to realize that there's no magic, you could just use the
distributive property to multiply this out again, to
multiply it out again, and you're going to see that you
get exactly this.