-
Why does minus one times minus
one equal plus one or more
-
generally why when we take a
negative number and multiply it
-
by another negative number, do
we get a positive answer?
-
This is a question that has
plagued every student of
-
arithmetic. It disturbs us.
-
It disturbs us because it seems
to lie outside our familiar
-
experience. It doesn't seem to
-
fit. Let me explain by reviewing
the rules of arithmetic for
-
multiplying together 2 numbers.
-
And we should start by
multiplying 2 positive numbers.
-
Multiply positive 5.
-
By plus 3.
-
And we know the answer.
-
Is 15.
-
This. We're comfortable with it
matches our experience. When,
-
for example, were counting
counting money, so we can think
-
of 3 * 5 as representing three
piles, three separate piles.
-
In each pile, there being 51
pound coins. So in total when we
-
have them all together, we have
-
15. So 3 * 5 is 15
were quite happy with.
-
Next Let's see what happens when
we take a negative number.
-
Negative one for example, and
I'll put brackets around for
-
convenience. When we multiply
negative one by one, the answer
-
is minus one.
-
If we then multiply negative one
by two, the answer is minus 2.
-
And we can go on multiply
minus one by three, and the
-
answer is minus 3.
-
And you can see where developing
what really is a Times table for
-
minus one, but where convertible
with this, because again it
-
matches our experience. We can
think of it again in terms of
-
our bank account when dealing
-
with money. We can think of 1 *
-
1. As taking £1 out of our
account on one occasion only and
-
so our account is in deficit by
-
one pound. Two times minus one
we can think of as taking £1 out
-
of our account on two separate
occasions on what happens is our
-
account is in deficit by 2
pounds, and so on.
-
I multiplying a positive number
by a negative number, giving
-
rise to a negative answer is OK,
-
it fits. What then when we
multiply 2 negative numbers
-
together? Minus one times minus
one, but so the answer is
-
plus one. Why is
-
this so? Where on earth does it
-
come from? It didn't seem
to correspond to anything
-
in our familiar experience.
-
So what can you do?
-
Well, you could phone a friend.
That's if you've got a friend
-
who is a math teacher.
-
Or you could ask the math
-
teacher. And I recall doing
precisely that many, many years
-
ago. I asked him why does minus
one times minus one equals plus
-
one. And what he said was just
accept it. For now. You'll
-
understand it later on.
-
Very unsatisfactory, I
thought I ask a question but
-
I don't get an answer.
-
But
-
When you think of it, this
happens very often in life. A
-
question is posed, but the
answer is out of reach. For
-
example, when a small child asks
her parents what is a black hole
-
or where on earth where is
-
Infinity? The answer isn't
necessarily clear. In order
-
to appreciate the answer,
more information, more
-
knowledge is required.
-
So let's return to minus one
times minus one equal plus one.
-
What extra information is
required in order to
-
understand this?
-
It turns out that we need 2
extra bits of information, 2
-
rules of arithmetic.
-
And these rules are one the
rule of precedence.
-
What is presidents? Well,
presidents tells us.
-
Which operation to do first?
-
Well, next in any given
-
calculation. So if we look at an
example with positive numbers 3.
-
Times bracket 4 + 2. You can see
-
that. We've got multiple
multiplication to do, and we
-
have an addition to do. Which do
we do first? President says you
-
do what's in the brackets first.
4 + 2 is 6.
-
3 * 6.
-
Is 18. No problem.
-
So that's one.
-
Piece of information that we're
going to make yourself a second
-
that we're going to make use of.
-
Is the fact that multiplication
is distributive over addition?
-
Now what does that mean?
Multiplication is distributive
-
over addition. Well, that's best
appreciated again by an example.
-
And we can use the same example
that we've got here.
-
3 * 4 + 2.
-
It involves multiplication and
-
addition. If multiplication is
distributive over addition, it
-
means that this calculation is
equivalent to multiplying 3 by
-
4. And then adding three by
two 3 * 2.
-
And we can check
that this is so.
-
We've already worked out three.
-
Times bracket 4 + 2 using the
rule of presidents and the
-
answers 18. On the right hand
side with 3 * 4, which is 12.
-
Also we've got 3 * 2 which is
612 + 6 is 18, right outside
-
equals left outside.
-
So this fact that
multiplication is
-
distributive over addition
works for the numbers 3,
-
four and two.
-
As a second example, I'm going
to show it works when we have a
-
negative number. Say minus one.
-
Times 2 + 1.
-
Got two and one
both positive numbers.
-
And we multiply that bracket by
-
minus one. If multiplication is
distributive over addition, it
-
means that minus 1 * 2.
-
It means that the left hand side
is minus 1 * 2.
-
Plus minus 1 * 1.
-
There are precedents, the left
hand side we do what's in
-
the brackets first 2 plus one
is 3 times minus one.
-
Is minus 3.
-
On the right hand side, minus 1
* 2 is minus 2.
-
Minus 1 * 1 is minus one.
-
And you can see there on
the right hand side we have
-
minus two and minus one
added together, which is
-
minus three. So left hand
side equals right hand
-
side. I multiplication is
distributive over addition
-
for the numbers minus 1,
two and one.
-
Now the key.
-
For understanding why minus one
times minus one equals plus one.
-
Is that we insist that
multiplication is distributive
-
over addition for all numbers.
-
Whether negative or positive and
what we need to consider is
-
a particular calculation minus
-
one times. Same as we had up
there, but instead of two we put
-
minus one. Then if
multiplication is distributive
-
over addition, this is equal to
minus one times minus one.
-
Plus
Minus one times plus one.
-
Now for the left hand side using
precedents we do what's in the
-
brackets first minus one plus
one is 0.
-
Anything times zero, are you
minus one is itself Sarah, so
-
I left outside is 0 on the
right hand side. The first
-
term is minus one times minus
one, which is what we're
-
trying to determine.
-
And the end term. The last term
minus 1 * 1 is minus one.
-
So you can see that if we now
take one to the left hand side.
-
We have shown that minus one
times minus one is equal to plus
-
one. Why this result follows as
a direct consequence of these
-
two rules of arithmetic. The
rule of precedence and the rule
-
that multiplication has to be
distributed over addition.
-
So you see.
-
But my old school teacher, Mr
Dennison, was quite right when
-
he said. Accept it for
now. Lab you will only
-
understand it later on.
