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We're asked to factor 20u squared v minus 10uv squared.
And when they say factor a binomial like this, an
expression that has two terms like this, they really mean
break it up into the product of one or more terms. So let's
see if we can do that.
And the easiest way we can do that, is say hey, is there any
common factor?
In particular, let's find the greatest common factor of each
of these terms and then divide that out.
Or you can almost imagine, un-distribute it out, and I'll
show you what I'm talking about in a second.
And eventually you'll be able to do this in your head, but
we'll work through it step by step right now.
So what is 20u squared v if we factor it out?
20u squared v, if we do into the prime factorization, it is
20 is 2 times 2 times 5.
Right?
That's 2 times 10, that's 20.
u squared is times u times u and then v is just one v.
So we just rewrote 20u squared v into kind of a product of
its smallest components, its most fundamental components,
prime numbers and just u's and v's.
Now let's do the same exact thing for the 10uv squared.
So we'll put that minus sign there so that we haven't
fundamentally changed the expression.
10 is, if we break it down to its prime factors, 2 times 5.
Then we have one u times one u times v times v.
That's what v squared is, times v times v.
Now what's the greatest common factor of these two terms
right here?
Well let's see.
They both have one 2.
They both have one 2 right there.
Maybe I'll circle that one, I could have circled that one.
They both have one 5-- that's one 5, one 5.
They both have one u, one u there, one u there.
This one has two, but only this one has one, and they
both have at least one v.
So the greatest common factor is 2 times 5 times u times v.
So I could rewrite this expression, I can kind of
un-distribute the 2 times 5 times u times v,
and what'll we get?
If we wrote 2 times 5 times u times v, and we say that's
going to be-- this expression is equal to this times what?
Well if you factor the 2 times 5 times u times v out, all
you're going to be left with in this first term is the 2
times u, so 2u here.
And in the second term, all you're going to be
left with is a v.
Right?
All this other stuff gets factored out.
All you're going to be left with is a v.
Hopefully you see, if I multiply 2 times 5 times u
times v times 2u, I'm going to get this first term here.
So if I were to distribute it, I would get this first term.
And if I multiply 2 times 5 times u times v times this v
over here, I'm going to get this second term.
So this expression, and that expression is
the exact same thing.
We have factored it out, now we can
simplify it a little bit.
2 times 5 times u times v we rewrite as 10uv.
And then inside the parentheses, we of course have
a 2u and then a minus v.
And we're done!
We have factored the expression.
Now you won't be doing it to this granular level, but this
is the best way to think about it.
Eventually you're going to say, hey, wait, look, the
largest number that divides both of these is a 10.
Because you could see 10 goes into the 20, 10 goes into 10.
And, let's see, a u goes into both of these, and a v goes
into both of these.
So let me factor out a 10uv, and then if I divide this
thing by 10uv, I'm going to be left with 2u.
And if I divide this by 10uv, I'm going to just
be left with a v.
So that's another way to think about it.
Let me do that right now, so we could say that this is the
same thing.
Another way of approaching it, you could have said that this
is the same thing as-- Well, the largest number that
divides both of these is 10uv, and that's going to be times
20u squared v over 10uv minus this thing.
10uv squared over 10uv.
This expression and this are obviously the same thing.
If I were to distribute the 10uv it would cancel out with
each of these in the denominator right there.
So they're the same thing, but we can do is we
can simplify this.
We could say that 20 divided by 10 is just 2, u squared
divided by u is just a u, v divided by v is just 1, 10
divided by 10 is 1, u divide by u is u, v squared divided
by v is just a v to the first power.
So you're left with 10uv times the quantity 2u minus v.
Either way you get the same answer.