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This video is about how to solve
quadratic equations. Let's begin
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by saying exactly what a
quadratic equation is. It's an
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equation that must contain a
term that has got X squared in
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it, so we can have three X
squared minus five X squared, or
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perhaps just X squared on its
own. The equation can also have
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terms in. X so it might have
a term 5X or perhaps minus 7X
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or perhaps North Point 5X. It
can also have constant terms
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just numbers, so perhaps 6.
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Minus Seven a half, etc.
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It can't have any other terms in
it. It can't have any higher
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powers of X in it, so it can't
have X cubed in it. Can't have
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things like one over X in it.
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So what does our most general
quadratic look like?
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AX squared it must have this X
squared term in it and a is just
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a constant. It can be one as it
is here, One X squared. It could
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be 3. It could be minus five. It
could be any real number.
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Plus BX, now this term
may not be there.
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Be could be 0.
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Plus, CC is the constant term
and again that term doesn't have
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to be there. See could be 0.
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And then we say equals Nord, so
that's our most general
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quadratic. And what we're going
to have a look at is how to
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solve all the different
varieties of this kind of
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equation that you can meet.
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There are four
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basic ways. 1st
Way is by Factorizing.
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I'm going to assume that you
know how to factorise, but there
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is another section of the video
that is to do with Factorizing
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quadratic expressions. So if
you're not sure how to factorise
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perhaps it would be a good idea
to look at that.
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2nd method is by
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completing.
The
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square. Now again,
I'm going to assume that you
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know how to complete the square,
but again, that is another video
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that relates to completing the
square, so if you're not sure
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how to do that, perhaps you
might look at that video first.
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Then we're going to have a look
at how you use the formula.
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There's a special formula for
solving quadratic equations.
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We're going to be using that.
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And finally, how to solve a
quadratic equation using graphs?
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Of these four methods, two of
them are by far the most common.
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And Whilst one doesn't want to
say you mustn't understand
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everything, you can pick a part
of what you do. You really do
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need to concentrate on
factorising and the formula.
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Those are the two most important
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ones. So let's begin by having
a look at how to factorise and
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solve a quadratic equation.
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I'll begin with
three X squared
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equals 27.
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There is no extra, but that
still doesn't stop it being a
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quadratic equation 'cause it's
got this X squared term in.
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So we begin by writing it
equals 0, so I take the
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27 of each side.
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So we have three X squared
minus 27 equals 0.
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That's the first step, and one
that you must do every time.
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Next, look for a common factor.
Is there a common factor in the
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terms on the left hand side of
this equation, and if there is,
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let's take that common factor
out and here we have three X
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squared and also 27 which has a
factor of three in it. 27 is 3
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times by 9, so we can take out
the common factor.
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All three and that will leave us
with X squared minus 9 equals 0.
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Inside this bracket, now we have
the difference of two squares.
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We have X squared takeaway 9
which is 3 squared and this is
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a standard piece of Factorizing.
So that's three brackets, X
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minus three X +3 equals 0.
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Now when we multiply 2
expressions together and we're
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not quite sure of their value,
but we do know what they give
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us. In this case zero. We can
make certain deductions about
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them, so if I have one number
multiplied by another number
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and the answer is 0, then one
of these numbers.
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That one or that one or both
of them are zero. So we have
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X minus three equals 0.
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All X +3 equals 0,
so we end up with
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X equals 3 or X
equals minus three.
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Notice 2 answers and that will
be a theme that I will
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return to again.
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Let's just recap there what we
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did. First of all, we put
everything equal to 0. Then we
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extracted, took out any common
factors. Why should you do that?
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Well, let's just run through
this one. Again, 3X squared
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equals 27 and let me break a few
of the rules that I've just
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said. So let me cancel both
sides by three, since obviously
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three goes into three X squared
and leaves us.
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X squared and free goes into
27 and leaves us with nine, so
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I've got X squared equals 9.
Now let me do the natural
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thing which is to take the
square root of both sides.
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Square root of X squared is X
and the square root of 9 is 3.
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Only got 1 answer if we
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look back. 2 answers.
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I've lost one by factorizing. I
was able to get two factors and
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that gave Me 2 answers.
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In doing this step from here to
here and taking the square root,
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what I have forgotten is that as
well as 3 squared be equal to
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9 - 3 squared is also equal
to 9. So at this point I
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should have said or X equals
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minus three. Now it's very easy
to make this kind of mistake and
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lose one of the answers. So the
best way to tackle these is the
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way that I just set out.
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Write them as equals. 0 take out
common factors and then look at
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a factorization leading to
giving you 2 answers.
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Let's take another example. This
one will take us five X squared
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plus three X equals 0. It's
already written as equals 0, so
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we don't have to worry about
that first step. So the second
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step is to look for a common
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factor. I've got five X
squared plus 3X, so I've got
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a common factor here of X
so I can take that out,
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leaving me with five X +3
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equals 0. And here again I've
got 2 numbers.
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X and 5X plus three. I'm not
sure what they are, but what I
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do know is that in multiplying
them together, I've got 0.
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This means one of them must be 0
or the other one must be 0, or
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they're both 0, so I can write
down X equals 0 or 5X. Plus
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three is also equal to 0, so
there's one answer, X equals 0,
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and now this is just a simple
linear equation, linear.
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Remember because it's just got
an X in it. Now X squared's ex
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cubes, no one over X is.
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Just an X and this solves quite
easily. 5X equals minus three,
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taking three away from both
sides and then dividing both
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sides by 5 - 3 over 5.
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So there are my two solutions, X
equals 0 and X equals minus
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three over 5. What I'd like to
do is just perhaps run through
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this one again and show you
where the mistakes can come when
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tackling equations like this.
'cause what's special about this
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one is there's no constant term
an ex squared term, an ex term,
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but no constant term.
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So what might be the
mistake that we would
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make when doing this?
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Let me state that we might very
well make it say, Oh yes, a
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common factor of X one there in
the X squared term and one
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there, so I'll cancel by that.
X5 X +3 equals 0, dividing each
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term by X and then 5X is equal
to minus three, and then X is
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equal to minus three over 5.
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One answer X equals minus 3/5.
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If we go back with X equals 0
and X equals minus 3/5, we've
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lost this answer. Here we've
lost X equals 0.
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Why? Because we didn't look for
a common factor at this point.
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We went straight on to simply
divide throughout by the X
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instead of taking it out as a
common factor. So you must be
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aware of that with quadratic
expressions, were looking for
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two answers to solutions to
roots. Those are if you like the
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different words that we use.
Answers, solutions, roots, they
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all mean. The same thing.
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OK, we looked at two particular
cases. One where we did not have
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an exterm and another one where
we didn't have a constant term.
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So now. Let's have a look at.
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One that's got both
of those in.
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X squared minus 5X plus 6
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equals 0. We're going to solve
this by Factorizing.
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So to factorize a quadratic we
need to search for two numbers
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that when we multiply them
together will give us this
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number here. 6.
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An when we add them together
will give us this number here
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minus 5. So we look at that
and 3 * 2 would give us 6 and
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minus 3 N minus two added
together would give us minus
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five, but minus three times
minus two is also six, so those
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look like good choices, minus
three times by minus two gives
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us 6 and minus three plus minus
two gives us minus 5.
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So. We take this expression
again X squared.
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Instead of minus 5X, we write
this as minus three X minus two
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X +6 equals 0. Now we look
at these two terms and we take
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out the common factor. In this
case that's X and that leaves us
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with X Times X minus three.
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Now we look at these two terms
and we take out again a common
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factor. Well obviously there's
two, but this is minus 2X, so it
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cost. This is minus two X I'm
going to take, minus two as the
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factor minus two brackets X. And
now I need to put something in
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here so that I have minus two
times gives me plus six, and
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that must be minus three.
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Equals 0. Now I've got
one lump of algebra there. An
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one lump of algebra there, and
they share this common Factor X
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minus three X minus three. So we
take that out as a common
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factor. I'm we're left with
the other factor as X
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minus two X minus two.
Close the bracket equals 0.
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And so here I've arrived at 2
numbers multiplied together and
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they give me 0. So one of them
must be 0 or the other one must
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be 0 or they perhaps both 0.
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So if we just write that down
again, X minus three times by X
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minus 2 equals 0.
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Then either X minus three
equals 0 or X minus 2 equals
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0. This tells us that X must
be equal to three, or this
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one tells us that X must be
equal to two.
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And so again, we've arrived at
two possible answers.
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Let's take another one. This
time, let's take something that
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does not have a unit coefficient
in front of the X squared, so
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will take 2 X squared.
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Plus 3X minus 2
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equals 0. Now, in order
to solve this one, we're looking
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for two numbers that will
multiply together to give us 2
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times by minus two SO2 numbers
that multiply together to give
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us minus four where looking for
those same 2 numbers to add
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together to give us 3.
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Well. Four times by one
would give us four and if we
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made the one A minus 1 four
times by minus one, that would
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make minus four and four plus
minus one would give us 3.
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So these are our two numbers
that we need, so again 2 X
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squared and then the X term we
can rewrite us 4X.
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Minus X.
Minus 2 equals
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0. And we look at these
two terms for a common factor,
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and there's a 2 here and four is
2 * 2 and there's an X and an
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X&X in the X squared and X with
the 4X. So our common factor
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there is 2X, leaving us with X
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+2. And now we want to common
factor here and that will be
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minus one. Times
X +2 equals
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0. Again.
We have two lumps of algebra
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here and here, and in each one
there's a factor of X +2, so
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that's our common factor that we
can take out X +2 times by two
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X. Minus one.
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So again, we've arrived at two
brackets multiplied together X
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+2 times by two X minus one, so
one of these has got to be 0,
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or possibly both of them.
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Let's write that down again.
X plus 2 * 2
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X minus one equals 0.
So either X +2.
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Is 0 or.
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2X minus one is 0.
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This tells us that X is minus 2.
By taking two away from both
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sides. This tells us that 2X is
equal to 1. By adding one to
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each side, and now we divide
both sides by two. So we have X
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equals 1/2. So we ended up with
our two answers for this
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quadratic equation. Let's take
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another one.
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4.
X squared
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+9 equals
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12 X.
It doesn't say equals 0.
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So let's write it so it says
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equals 0. Four X
squared minus 12
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X +9 equals 0.
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Check common factor. Something
we didn't do in the last
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question, but then there wasn't
one. But these numbers are a bit
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bigger and there may just be a
common factor there. But as we
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look there is no common factor.
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Factorise it, we're looking for
two numbers that would multiply
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together to give us 36 four
times by 9. Ann would add
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together to give us minus 12.
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Well, six and six give us 36 and
if we make them both negative.
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Minus 6 times by minus six they
still give us plus 36, but now
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they add together to give us
minus 12. So we've got four X
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squared minus six X minus six X
+9 equals 0.
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In these two terms, we want the
common factor and that will be
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2X because this is four and six
and X squared and X, so will
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take the two X out, giving us 2X
minus three, and then here
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again. Common factor 6X9.
There's a common factor. There
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are three, but this is a minus
sign here, so we want minus
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three times by two X. That gives
us the minus 6X and minus three
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times by something has to give
us plus 9, so that will be minus
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three again equals 0.
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Two lumps of algebra. A common
factor in each one of two X
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minus three. Leaving us with
two X minus 3 *
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2 X and two X
minus three times minus three.
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One of these two or both of
them can be 0.
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So we have two X
minus 3 * 2 X
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minus three equals 0 and
so 2X minus three equals
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0 or two X minus
three equals 0.
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Adding three to both sides 2X is
equal to three, and so X is
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equal to three over 2.
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Of course, this is exactly the
same, so we can write down the
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same stuff. Two X equals 3 and X
equals 3 over 2.
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2 answers again.
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The same answer twice, because
I can say it like that. It
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enables me to keep up this
idea that quadratics are going
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to lead me to 2 answers and
answer may be repeated, but I
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still get 2 answers.
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Let's take one more example.
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X squared minus three
X minus 2 equals
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0. We're looking for two
numbers that will multiply
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together to give us minus
two and will add together
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to give us minus three.
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I gotta multiply together to
give us minus two. Well, that
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would suggest one and minus two,
but no matter how we try and add
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one and minus two together,
we're not going to get minus
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three. And if we said well,
let's try minus one and two and
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again and not going to add
together to give us minus three.
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In short, this question does
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not factorize. And because
it doesn't factorize, we're
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going to have to
look for another way
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of solving it.
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So how are we going to solve an
equation that does not factorize
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well? One option is completing
the square. I want to have a
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look at this, not because it's
the regular way in which we
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would try to solve an equation
that doesn't factorize, but
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be'cause. In doing it, we'll see
how the next method which is
-
using the formula actually
works. So let's have a look at
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what we've got.
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X squared Minus three X minus
2 equals 0. Now in order to
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complete the square, we look at
these two terms. Now this is an
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X squared and this is minus 3X.
So if I want to get a complete
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square which remember is like
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that. And I've got to have an X
in there and I've got to have a
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constant term here so that when
I do the squaring I'll end up
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with minus 3X.
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And we know how to do that. You
take a half of the number that
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multiplies the X, so that's
minus three over 2, so that when
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we multiply out, that bracket
will get X squared, will get
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minus 3X, but will also have an
extra term. We will have the
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square of minus three over 2
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extra. In other words, we'll
have added on minus three over 2
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squared, so if we've added it
on, we better take it off in
-
order to make sure that we've
got exactly the same value, the
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same expression, and then, of
course, I've got minus two here,
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so let's put that in.
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So now this expression is
exactly the same as that one, so
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let's keep this bit at the front
X minus three over 2 four
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squared, and now what's this?
Let's simplify this here. Well,
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minus three over 2 squared is 9
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over 4. Take away 2
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equals 0. So we've
got X minus three
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over 2 all squared.
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Minus, now let's write
this all over 4.
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Two over 4 is 8 quarters. I'm
taking away nine quarters and
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I'm taking away eight quarters.
Sign takeaway. 17 quarters
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altogether. Now this now looks
more manageable. Let me just
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turn over the page and write
this down again.
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X minus three over
2 all squared minus
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17 over 4 equals
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0. Now we're going to add the
17 over 4 to both sides, so will
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have X minus three over 2. All
squared is equal to 17 over 4.
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And now I'm going to take the
square root of both sides,
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remembering that I must get plus
or minus this side.
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So the square root of this will
be X minus three over 2 equals.
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To take the square root of this
I need the square root of the
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top, which is going to be plus
Route 17 over 2 or minus Route
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17 over 2 over the two, because
that's the square root of the
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four. Now I add this bit
to both sides to three over 2,
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so we have X equals 3 over
2 plus Route 17 over 2 or.
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X equals. The
square root of 17 over
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2. And just for the sake
of completeness, I'm going to
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put all of this over this too.
So 3 Plus Route 17 over 2 or.
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3 minus Route 17
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over 2. So that we've
done a question that involves
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completing the square.
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Again, we've got 2 answers, but
there are two further things to
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notice here. I've left these
square roots in. You would
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normally take a Calculator and
workout an approximate value.
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Of these two answers to a given
degree of accuracy, that might
-
be to two decimal places, it
might be to three significant
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figures, but these are exact
answers. The minute you put
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decimals in those answers are
not exact, they are
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approximations to a given degree
-
of accuracy. The third thing I
want you to notice is there form
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3 plus the square root 3 minus
the square root and over
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something because when we look
at the next method, you're going
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to see that form again.
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So how else might we tackle this
equation to remember what it was
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initially? It was this One X
squared minus three X minus 2
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equals 0. We saw that it didn't
factor eyes, so we did it by
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this method of completing the
-
square. So what we're going to
do now is look at the
-
formula. To do this, I'm going
to take it generally to begin
-
with. So here is our general
quadratic equation AX squared
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plus BX plus C is 0.
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And there is a formula which
will solve this equation for us.
-
And it's X equals
minus B.
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Plus or minus.
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And it's the plus or minus
that's going to give us the
-
two answers. The square root
of B squared minus four AC
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all over all over whole lot
over 2A.
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That's the formula for solving
quadratic equations, and
-
unfortunately you do have to
learn it. But if you say it to
-
yourself each time you write it
down, X is minus B plus or minus
-
the square root of be squared
minus four AC all over 2A helps
-
to remember. It makes it sound
stupid, but it helps to remember
-
it. So let's take this formula
and use it to solve the previous
-
equation that we just had.
-
So the equation that we had
was X squared minus three X
-
minus 2 equals 0. Let's begin
by identifying AB and see
-
there's One X squared. So a
must be equal to 1.
-
B is the coefficient of X,
and that's minus three, so B
-
equals minus. 3C is the constant
term, so here C is equal
-
to minus two. Let's write down
the Formula X equals minus B
-
plus or minus square root of
be squared minus four AC.
-
All over 2A by writing down
-
each time. It's a way of helping
to remember it. Now let's
-
substitute these values in.
-
So B is minus three, so that's
-
minus. Minus
-
3. Plus or
minus the square root of
-
B squared, minus three all
squared minus four times a,
-
which is one.
-
Times C, which is minus two,
will just extend that square
-
root sign all over everything
over 2A, which is 2 times by
-
one. Now let's tidy this up.
So we have minus minus three.
-
That's plus 3.
-
Plus or minus the square root
-
of. Minus 3 all squared is
-
9. Four times by one is 4
times by minus two is minus 8
-
and we've got this minus sign
here, which makes +8.
-
All over 2.
-
And what we see we've got is 3.
-
Plus or minus the square root of
17, all over two, which are the
-
answers that we had before.
Again, we can workout each of
-
these answers. 3 Plus Route 17
over two or three minus Route 17
-
over 2 using a Calculator. But
again, remember any answers you
-
get doing it that way. Our
approximate. These answers are
-
exact. Let's take one more
example of using the formula.
-
And the one that will take
this time, three X squared
-
equals 5X minus one.
-
It doesn't say equals 0, so we
must write it as equals 0,
-
'cause That's the form that the
formula demands. We have the
-
equation written in, so three X
squared and we gotta take 5X
-
away from each side.
-
And we've got to add 1 to each
side. That ensures that we have
-
that. Now let's identify AB&CA
is the coefficient of X squared,
-
which in this case is 3.
-
B is the coefficient of X,
which in this case is minus
-
5. See is the constant
term, which in this case
-
is one. Again, let's write
down the equation. X is minus
-
B plus or minus the square
-
root of. B
squared minus for
-
AC all over
-
2A. And make
the substitution.
-
B is minus five we want minus
B, so this is minus minus 5.
-
Close all minus.
-
Square root of B squared,
so that's minus five all
-
squared, minus four times a,
which is 3 times C,
-
which is one, and that's
all over 2A, two times
-
a, which is 3.
-
Now simplify this minus minus
five is +5 plus or
-
minus the square root of
minus five. All squared is
-
25. 4 * 3 * 1 is
12, and the minus sign is minus
-
12. All over 6.
-
So we just squeeze that one into
this space. Here we 5 plus or
-
minus the square root of 25 -
12, which is 13 all over 6. And
-
again there are two exact
answers there. 5 Plus Route 13
-
over 6 and 5 minus Route 13 over
6 we can workout their value
-
approximate value that is by
using a Calculator.
-
And finding out what it tells us
about Route 30, but those are
-
two exact answers. If left in
-
that form. Now basically, if a
quadratic factorizes, then you
-
should solve it by using
factorization, 'cause it's
-
clearly much quicker than this.
-
Don't use completing the
square unless you
-
specifically asked to and
use this method by using the
-
formula. Solving by using
the formula for those that
-
do not factorize.
-
However, right at the very
beginning we did say there was a
-
fourth method. And so I just
want to look quickly at what
-
this 4th method is.
-
We said this 4th method
was by graphing.
-
OK. Let's have a look at
what we know about quadratic
-
functions. If X squared is
positive in our quadratic
-
function, then we're going to
get a U shaped curve like that.
-
If, on the other hand, X squared
is negative, then we're going to
-
get a Hill like that.
-
Now. Set on a graph.
-
Then we might have a graph.
-
That looks with a positive X
squared. Say something like that
-
or we might have a graph that
say looked like that we might
-
have a graph that looked like
-
that. Now this is the
-
line. Equals 0 the value
of the function equals
-
0, and so here we can
see our two values of X.
-
Here we can see one value of X
which makes the function equal
-
to 0. And we've said we call
that a repeated root or a double
-
route, but here the graph does
not reach the X axis, it does
-
not reach a value equal to 0.
And that means we actually have
-
no roots. So there are some
quadratic equations that you
-
cannot actually solve well.
Mathematicians make it happen,
-
so to speak, they make them
solvable by inventing a new kind
-
of number. But we're not going
to deal with that at the moment.
-
As far as we are concerned, we
either get 2 routes.
-
A repeated root.
-
Or for the moment.
-
No roots at all.
-
But you will see that we can
make an equation like this have
-
two routes in a very special
way. Clearly what we've done for
-
a positive X squared term we can
do for a negative X squared
-
term, because again we can have
a graph say that looks like that
-
and does not reach the X axis.
Or we can have one that's a
-
looks like that and just touches
the X axis. Or we can have
-
another one that looks like
-
that. And again two values there
and there a repeated value of X
-
there and no values of X there.
-
So bearing that in mind, let's
have a look at our.
-
Trial equation if you like the
one that we've used to start off
-
each of the last two sections, X
squared minus three X minus 2
-
equals 0, and let's think how we
can solve this by using a graph.
-
Let's just look at this bit.
-
The X squared minus three X
minus two and think of it as a
-
function, not as an equation
equals 0, but just a function.
-
Now one of the things is that if
we put in, say, a value of X
-
equals what. Let's say something
like one, then we've got one.
-
Minus 3 - 2 is clearly negative.
If I put in a value, let's say
-
something like 4, then I get 16
- 12 - 2. Well that's positive,
-
isn't it? 'cause it's an overall
value of two. If I put in a
-
value of, say something like
let's say minus two, then I get
-
4. Minus three times Y minus two
is 6, so I get 10 takeaway 28.
-
It's positive, so as I've gone
from one value of X, I've got a
-
positive value, then a negative
and a positive value of X. So
-
clearly it's going across the X
axis at some point. So what I
-
have to do is choose a value of
X or a range of values of X that
-
will enable me to graph that
different behavior. First of
-
all, positive values, negative
-
values. Positive values again.
-
So the range of values that I'm
going to take, I'm going to take
-
them going from minus 2.
-
In unit steps.
-
I'm going to go
up to five.
-
I'm going to calculate each
term in turn.
-
So let's just.
-
Rule those off out of the way.
-
X squared
that will be
-
4101, four,
916 and 25.
-
The next term is minus 3X.
-
So I have minus three times by
the value of X, so minus three
-
times by minus two is 6.
-
Minus three times
by minus one is 3.
-
Minus three times by zero is
0 - 3 times by by
-
one is minus three, and so
on, minus 6 - 9 -
-
12 - 15.
-
Now we come to the last term
minus two and that stays the
-
same because it's the constant
term, no matter what the value
-
of X is, so we can just write
in a line of minus Two's across
-
our table. Now we can workout X
squared minus three X minus two,
-
because it's going to be the sum
of each of these columns.
-
So we have six and four is 10
takeaway, two is 8.
-
One and three is 4 takeaway, two
is 2 zero and zero and minus two
-
is minus 2 - 3 and minus two
is minus five and one.
-
Minus 4 - 6 and minus two
add 4. That's minus eight and
-
four gives us minus 4.
-
9 and minus nine is zero and
minus two gives us minus 2.
-
Minus 12 and minus two is minus
14 and 16 gives us +2.
-
Minus 15 and minus two is minus
17. Add on the 25 and that gives
-
us 8. Notice what we've got is
symmetric across the table. Now
-
that just happened to be because
-
I picked. Values that were going
to give me a complete symmetry,
-
but you always find a degree of
symmetry in the table.
-
Now what I would need to do now
is make a graph. I don't have
-
any graph paper and so
effectively what I'm going to do
-
is. I'm going to draw a quick
sketch because we know what the
-
answer to this equation now, but
I just want to show you how you
-
would go about doing this so
-
it's. Do that.
-
We got out X axis.
-
Our Y access you've got values
-
minus 2. Minus one.
-
12 3.
Four and five, and I mark these
-
often even numbers 2.
-
4. 6.
8 and minus two
-
and minus 4.
-
So. Let's just flick back for a
couple of values here.
-
Minus two is 8 and minus one
is 2, so I've got a point
-
roughly there and a point
-
roughly there. Then when it
was zero, I had one here
-
minus 2. And we go. And
then at one and two they were
-
both minus four, so they were
there and there.
-
Then at three and four, they
were minus two and two, so they
-
were there and there. And then
at five it was back up here at
-
8 again so I can get a nice
smooth curve through these
-
points. And then back up today.
And where are my answers while
-
there here, that one and that
one? Those are the values of X
-
for which is X squared minus
three X minus 2 equals 0.
-
Supposing, however, haven't been
given that equation, but I've
-
been given X squared minus three
X minus 2 equals 6. Now, this
-
shows the advantage of graphs I
took a long time to work this
-
out, and to draw this. And How
do I draw on it neatly? Well, it
-
would have taken even longer,
but because I have drawn it, I
-
can use all the data I've got,
not only to solve the first
-
equation, but to solve this
equation as well, because all
-
I'm looking for.
-
Our values of X which make the
function bit equal to six. So
-
where is the function bit equal
to 6? Where we go across here
-
and we can see these are the
points on the curve where it's
-
equal to six and so if I come
down, these are the values of X.
-
Which correspond and I can just
read off those values of X. So
-
by drawing the graph I've not
only been able to solve that
-
one, but I've been able to solve
this one as well.
-
What about if I have X squared
minus three X minus 5 equals 0?
-
Can I use this graph again?
Well, it's got the front bit the
-
same. It's this bit that seems
to be different, so if it's
-
different, well, let's make it
-
the same. So let's make it X
squared minus three X minus 2.
-
And then what do I need to keep
it as minus five? Will I need
-
minus three equals 0? So now
this is my function bit the
-
same, so I'm actually looking
for when my function bit is
-
equal to three. And again,
that's within the possibilities.
-
Here we have the value three, we
can go across.
-
There and then we can come down
and read off the values of X,
-
which gives us that. So for all
drawing a graph took along time
-
it actually enabled us to solve
more than just the equation for
-
which we drew it.
-
So let's just recap.
-
There's a basic quadratic
equation X squared plus BX plus
-
C equals 0. There are four ways
of solving it, first by
-
Factorizing and you should try
that way first.
-
Second, by completing the
square, but that's not advised,
-
so to speak. Third, if it won't
factorize, use the formula and
-
those two ways factorizing and
using the formula. Other prime
-
ways. The first methods of
recourse that you should use.
-
Finally, just drawing a graph.
Time consuming but may be
-
beneficial if you've got a lot
of the same kind of equation
-
that you need to solve.
