-
We're now going to have a look
at adding and subtracting
-
fractions. Let's start
with 1/5 +
-
2/5. Here I
-
have 1/5. And
here 2/5.
-
If we add them together.
-
We have 3/5.
-
So what I've done is added the
numerators of the two fractions.
-
So 1 + 2 gives me 3/5.
-
Let's have a look
at another example.
-
Let's say we have 1/8
another one 8th.
-
And. 5/8
So in the same way.
-
I have 1/8.
-
Another rates, so that's 2
-
eighths. And then 5 eights
to add on. So that gives me
-
a total of 7/8.
-
If we're adding like fractions,
so the fractions are all of the
-
same size. Here we had eighths,
so all the denominators were
-
eight. We can just
add the numerators.
-
Here the denominators were
fifths. They were the same size,
-
so we could add the numerators.
-
Subtraction is very similar.
-
Let's have 5/8.
-
And this time will take
away 3/8.
-
The denominators are the same,
so we have the same type of
-
fraction. So we can just do
five takeaway. Three gives us 2
-
eighths. And if we put that into
its lowest form.
-
That's one quarter.
-
Let's have a look at another
addition one now, this time
-
let's have 3/5 + 4/5.
-
And when we add them three
at 4 gives us 7 fifths.
-
So we've added two proper
fractions and they've added
-
together to give an improper
fraction of fraction that's
-
larger than one. And if we write
it as a mixed fraction, 5 goes
-
into Seven, once with two left
over. So that's exactly the same
-
as one and 2/5.
-
OK, let's look now at what
happens when we have fractions
-
where the denominators are not
-
the same. Let's say
we have 1/2
-
+ 1/4. So let's have
-
a look. We have 1/2.
-
Plus 1/4.
-
We can add them together.
-
But what do we end up with? How
can we describe the fraction
-
that we have?
-
Well, we know that 1/2.
-
Is the same.
-
That's two quarters.
-
So if we change our half, we
find an equivalent fraction of
-
two quarters and then add our
quarter. We are now in the
-
situation where the denominators
are the same.
-
So we can simply add the
numerators so we get 3/4.
-
Let's have
a look
-
at 3/4
-
+ 3/8. The
denominators are not the same.
-
So imagine now we have 3/4.
-
And we have 3/8.
-
What we need to do?
-
Is to make these.
-
Into eighths. Go back
looking visually again.
-
Those are three quarters.
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Nicer
-
3/8.
-
Well.
In fact, visually we
-
can see an answer.
-
Straight away. We've got a whole
one here and one 8th.
-
But let's actually see.
-
What is happening numerically
here? We can't turn eighths into
-
the quarters very easily if
we've got two of them. Yes,
-
that's a quarter. But we've got
this one left over.
-
But what we can do is turn our
-
quarters. Into eighths
because 2 eighths fit very
-
nicely into a quarter.
-
So what we have instead of 3/4
is 2 eighths there, 2 eighth
-
there and two eighths there.
-
So we have 6 eighths.
-
Plus Are
-
3/8. Now again.
-
We have fractions with the same
denominators, so we can just add
-
the numerators, so we get 9
eighths which we saw at the
-
beginning. Is a whole 1.
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With one 8th leftover.
-
Now here we've used fractions
where they're in the same sort
-
of family because 8th fitted
exactly into quarters.
-
Quarters fit exactly into halfs.
-
What happens when it's not quite
-
so convenient? Well, let's have
-
a look. At
1/2 + 1/3.
-
So what we wanted to add
-
together is 1/2. Plus the third.
-
Now if we tried to turn the half
into thirds, we'd have
-
difficulty 'cause it doesn't fit
a whole number of times.
-
So what we need to find?
-
Is a fraction of the
-
denominator. That fits into
-
thirds. As well as into half.
-
And in this case.
-
That fraction is
6.
-
We can fit 26 into our third
and a half.
-
Is 36.
-
So we're finding an
equivalent fraction for half
-
is 36. And
a third is 26.
-
So again, with the denominators
now the same.
-
We can just add the numerators
and we see we've got a total of
-
5, six, 3 + 2 giving us 5.
-
Let's try another one now.
-
Let's look
at 1/4
-
+ 2/5.
-
Now. We
need to find a number
-
for our denominator.
-
That for is going to fit into so
it can be divided.
-
Into quarters, and that five is
going to fit into.
-
Well, let's have a look at some
numbers that four and five fit
-
into. Let's start with full.
-
Well, two Forza 8.
-
Three Forza 12. So
these are all numbers
-
multiples of four sixteen
-
2024. And so on.
-
And let's have a look at numbers
that 5 fit into was 510.
-
15
-
20 Ha, I
can stop there because I've now
-
found a common number of one
that's in both.
-
The force on the fives
-
so 20. Is a
-
common denominator. So we're
going to change our quarters.
-
Into Twentieths.
-
Well, how many?
-
Did we need 12345? So five
20th is the same as a
-
quarter? And 2/5.
-
Well, we need it.
-
1234
-
20th make one face, but
we've got 2/5 so we've
-
got eight twentieths.
-
So in total now we've got the
denominate are the same.
-
Eight at 5 gives
us 13 twentieths.
-
Let's have a look at this
now numerically. We've done it
-
by. Thinking about it by perhaps
visualizing it in our heads,
-
let's have a look at numerically
what's actually happening.
-
There's 1/4
-
+ 2/5.
How did we arrive
-
at this 20?
-
Well, we were looking for a
number that both four and five
-
fitted into a common number.
-
So what you could say we did
here is actually multiplied. The
-
four and the five.
-
4. Goes into 25 times.
So what we did is
-
multiplied 4 by 5.
-
Now. With our fractions,
whatever we've done to the
-
denominator to find an
equivalent fraction, we must do
-
the same to the numerator.
-
So we had to multiply this one
by five also.
-
Our 2/5.
-
We multiplied the five by four
to make 20.
-
Whatever we multiply the
denominator by, we must multiply
-
the numerator by and our
numerator was too.
-
So we have to do 2 * 4.
-
And this is how we arrived at
our five 20th 155.
-
4 fives are 20.
-
2408
-
So that's a plus, and five
fours or 20, giving us a
-
total of 13 twentieths.
-
Let's have a
look at Subtraction.
-
This time, let's
have 3/4 takeaway.
-
16 So again, we're
looking for numbers that both
-
four and six fit into.
-
Let's have a look
at our force 48.
-
1216
2024 and so
-
on. And
our sixes multiples
-
of six 612-1824.
-
And so on.
-
The reason I've written so many
is that I want to point out to
-
you that there.
-
Might be more than one common
-
pair. 12 is a common
denominator, both four and six
-
fit into 12.
-
But also there's another one
-
here 24. And those four and six.
-
Fit into 24 and in fact if we
multiply 4 and six together we
-
get 24. But as you can see in
this case that's not the lowest
-
common denominator. It's not the
lowest number that is common to
-
both of these denominators.
-
We want to use the lowest one
'cause if we don't we then need
-
the end of the calculation to
actually reduce the fraction to
-
its lowest form, and it's much
easier to deal with smaller
-
numbers. So we try and find the
-
lowest one. So we want to write
for. We want to turn it into an
-
equivalent fraction with 12 as a
-
denominator. So what have we
done to fall to make it 12?
-
We've multiplied by three, so we
must multiply the numerator by
-
three. What have we done to our
six to make it 12?
-
We've multiplied by two.
-
So we must multiply our
numerator by two.
-
33943 twelve takeaway. Once too
is 26 twos at 12, now
-
are denominators are the same,
so we can simply subtract the
-
numerators, giving us a result
of Seven twelfths.
-
So what we're doing when we add
and subtract fractions?
-
Is we need to make sure that
the denominators are the same
-
before we do the addition of
the subtraction. If they're
-
not the same, then we need to
find the lowest common
-
denominator between the
fractions and then find
-
equivalent fractions, and then
we can do the additional
-
subtraction.
-
What we need to look at now is
when we have mixed fractions.
-
Let's say
we've got
-
5 and 3/4.
-
And we're going to take away one
and four fifths. How do we deal
-
with that? Well.
-
The first thing that we need to
do is to turn them into improper
-
fractions. We need to make them
so that they're all over, in
-
this case quarters, and with
this one, fifths.
-
Then we can do the process that
we've just done finding common
-
denominators and actually doing
-
the Subtraction. So first of
all, we need to find out how
-
many quarters we have here.
Well, we've got five whole ones
-
we want to make them into
quarters. So we multiplied by 4.
-
And then we're going to add the
sorry that we've got there. So
-
that's how many quarters we
-
have. I'm going to take away.
-
One and four fifths.
-
So. 1 * 5 that's how
many fifths are in a whole one
-
plus the four.
-
And that's how many fifths we
-
have. 4 fives are 20
+ 3 is 20 three quarters.
-
Take away once five is 5 plus,
the four is 9 fifths.
-
Now we need to find.
-
The common denominator of four
-
and five. Well, as we
found before, that's 20.
-
What have we multiplied 4 by to
make 20 that's five, so we have
-
to have 23 * 5.
-
Take away 20th. What do we
multiply 5 by to get 20? Well
-
that was four so 9 * 4.
-
So 23 * 5.
-
Five 20s or 100
three 5:15 so it's
-
115 twentieths takeaway for
9:30 six 20th.
-
Now I denominators.
-
Are the same. We can simply
subtract the numerators.
-
115 takeaway 36 is 79 so we
have 70 nine 20th and usually if
-
our question is given in terms
of a mixed fraction then we
-
ought to give our answer in the
-
same form. So 20s into
79 or twenty 20th make one
-
whole 1. And we've got three
whole ones there. Three 20s are
-
60. And then we've got
19 twentieths leftover. So the
-
answer is 3 and 19 twentieths.
-
Let's have a look at one
more example.
-
This time using three fractions,
so one and 3/4.
-
Plus 6 and 2/5.
-
+5 halfs so we've got a mixture
-
here. Of mixed fractions and an
-
improper fraction. Well, as
before, the first thing we need
-
to do is to turn these mixed
fractions into improper ones.
-
Here we have one whole 1.
-
We need to turn it into quarters
so we multiply by 4 and we add
-
the three. That's how many
quarters we have.
-
And then we add six whole ones.
We turn them into fifths, we
-
multiply by 5.
-
We add the two not so
many fests we have
-
plus our five halves.
-
Once for is 4 +
3 is 7 quarters plus
-
six 530 + 2. Thirty
2/5 + 5 halfs.
-
Now this time we need to find
common denominator of all three
-
of these denominators.
-
Now it's easier to think perhaps
of the largest 1 first, so if I
-
think and count up, perhaps in
-
fives. 5 obviously is not common
to these two 10. Well two goes
-
into 10, but the four doesn't.
-
So let's keep going 15. That's
no good 20.
-
Yep, five goes into 20. Two were
going to 20 and so will fall.
-
So 20 is going to be
my common denominator.
-
So it's just right. All the
-
denominators in. So what did I
-
do to fall? To get 20
I multiplied by 5.
-
So 7 must be multiplied by 5.
-
What did I do to five to get
20? I multiplied by 4, so I must
-
do 32 * 4. The numerator and the
denominator must be multiplied
-
by the same number.
-
And finally, what did I do to
the two to get the 20? I
-
multiplied by 10, so I must
multiply the numerator by 10.
-
7 fives gives us
-
35. Plus 430 twos
for 30s or 122, Forza
-
8 says 120, eight, 20th
plus 50 twentieths.
-
And if we add these altogether.
-
We get 100 and
-
28178.
-
213
20th.
-
And again, let's turn that back
to a mixed fraction. How many
-
20s? How many whole ones are
there in 213?
-
Well, 20 * 10 gets us
to 200, so that's ten whole
-
ones and 13 twentieths leftover.
-
So if we add one and three
quarters 6 and 2/5 and five
-
halfs, we get 10 and 13
twentieths.
