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In this video, we're going to be
having a look at a particular
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form of trigonometric function.
So in order to get into this
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form, let's just consider 3
cause X +4 sign X.
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Now it's two terms.
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And ideally, if we were going to
solve an equation or do
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something useful with it, it
might be better if it was one
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term. So the question is, how
can we bring these together?
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Let's have a look at the graph
of this function.
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So we'll get into the right mode
on the Calculator and graph and
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will graph three cars.
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X.
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Plus four sign X.
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And now we've graphed it.
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We can see that it's looking
like a periodic function.
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Looks In other words, rather
like sign or cause.
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So if we look at the little
ticks on the Y axis, we can see
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that it's approximately 5 high.
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On the peaks and approximately 5
deep on the troughs.
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So if it looks like causal
sign, let's graph.
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Cause. X. So
there's cause X plowing along.
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You can see they both look
periodic and what we want to do
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is to change cause X into.
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What we had to begin with.
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So let's remember that the
height of the peaks was five and
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the depth of the troughs was
five. So let's multiply cosine
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by 5, so we'll graph.
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5 calls X.
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And what we see is, we've gotten
almost exact copy. It's just
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displaced a little bit.
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Things are happening a little
bit too soon.
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OK, that being the case, how
much too soon it seems to come
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if we look at the ticks on the X
axis and look at the distance
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between the two peaks.
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We seem to be about 1 unit on
the X axis early.
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So let's correct that and
let's graph.
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5.
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Kohl's
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Of X minus one.
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And that's almost correct. It's
just covering over.
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The graph and making it a little
bit thicker, so it seems that we
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can write this as 5 cause X
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minus one. Now my Calculator
was working in radians, so
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this one is one Radian.
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3 calls X +4 sign. X
is 5 cause X minus one.
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Well, 3, four and five or a
pythagoreans triple.
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3 squared +4 squared
equals 5 squared.
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So that kind of size to us. If
we had any function, A cause X
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Plus B cynex, could we bring
this function? These two
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functions together as one
function like that, and if we
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did it with the number that went
in front with the square root of
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A squared plus B squared.
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Cause of X minus something,
let's call it Alpha. And
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then what is Alpha?
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OK, all we've done is some graph
work, made some guesses what we
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have to do now is work with
algebra and work with our trig
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functions and our trig
identities to try and see if
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this little bit here at the
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bottom. Can actually be made
to work, so that's our next
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step. So let's start with where
we want. We want to end
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up a number are multiplying
cause of X minus Alpha.
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Equals are now cause of
X minus Alpha is one
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of our addition formula, so
we can expand it as
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cause X cause Alpha plus
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sign. X
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sign Alpha That's
multiply out that bracket are
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cause X cause Alpha plus
our sign X sign Alpha.
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Now I want to rewrite this
so it's very clear what I
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am multiplying cause X by. So
here I am multiplying cause X
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by our cause Alpha and I'm
multiplying synex buy our sign
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Alpha. So let's make that very
clear off 'cause Alpha times by
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cause X plus our sign Alpha
times by sign.
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Thanks and what we want is
that this should be a cause
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X Plus B sign X. In
other words, this our cause
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Alpha will be A and this
are sign Alpha will be B
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so we can make that
identification are cause Alpha
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is a. And B is
our sign Alpha.
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Now, how can we bring these
together? Well, one way is to
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notice that cost square plus
sign squared is one. So let's
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Square this one, A squared
square. This one and add the two
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together. A squared plus B
squared is R-squared cost
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squared Alpha plus R-squared,
sine squared Alpha.
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And there's a common factor of
R-squared that we can take out,
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leaving us Cos squared Alpha
plus sign squared Alpha.
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This is one of our basic
identities, Cos squared plus
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sign squared at the same angle
is always one and so that gives
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us our squared. So the thing
that we said was a possibility,
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in fact is a result that if we
take A squared plus B squared,
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take the square root, we do
indeed end up with are the
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number that goes in front here
of the cosine.
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But what about the Alpha? Have
we got enough information at
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this point here to find Alpha?
Well, let's bright these two
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equations a equals our cause.
Alpha and B equals R. Sign Alpha
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down again, but this time let me
write them above one another.
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So we write these down
again, but this time.
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Going to write.
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The top and the other one
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directly underneath. By doing it
like that, it suggests the
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possibility of dividing this
equation into this equation and
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so we have B over A is equal
to R sign Alpha over our cause
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Alpha. We can divide top and
bottom by R and we're just left
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with sign out for over 'cause
Alpha, which we know is Tan
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Alpha. And so now we
can workout what Alpha is,
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because Alpha is the angle whose
tangent is B over A.
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So what we've got now is
that we can write any expression
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of the form a Cos X
Plus B Sign X.
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As a function which is our
cause X minus Alpha.
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And we know that all will be the
square root of A squared plus B
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squared, and the Alpha will be
the angle whose tangent is B
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over a. And that is a
very very useful tool to have
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at ones disposal. It reduces two
trig functions to one trick
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function makes it so much easier
to deal with.
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So let's have a look at how we
can use this to solve equations
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and also how we can use it to
determine Maxima and minima of
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functions. So will begin with an
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equation. Route 2.
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Cause X. Plus
sign X equals
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1. Now if we
compare this with the standard
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form we've been working with, A
cause X Plus B Sign X and
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a is equal to two and B
is equal to 1. So we can
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calculate are. All is the square
root of A squared plus B
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squared. So that's the square
root of 2 all squared plus one
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squared. 2 all squared is 2.
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1 squared is just one, so this
is Route 3.
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So what we've got is
now our cause of X
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minus Alpha, so we've got
Route 3 cause of X
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minus Alpha equals 1.
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What we have to do is we've got
to workout what Alpha is so.
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We know that Tan Alpha
is equal to B over
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A. And so that's
one over Route 2.
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And so we need to know what does
that tell us about Alpha?
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Well, one of the things we
haven't specified is what's the
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range of values of X and what
units are we working in. So
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let's say we're going to be
working in radians, and that we
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want X to be between plus and
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minus pie. So if X is in radians
then Alpha's got to be in
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radians. I will now bringing the
Calculator in order to work that
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out. So I want the angle
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whose Tangent. Is.
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1. Divided by.
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Square root of.
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2.
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And that angle is nought.
.615 lots of other figures,
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but will stop there for
the moment radiance.
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So now I know what our is and I
know what Alpha is.
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I'm not going to write down
North Point 615 for a little
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while. I'm going to keep it as
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Alpha. But the equation that
we're now trying to solve is
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Route 3. Cause of X
minus Alpha is equal to 1
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and we know that we want
X to be between pie and.
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Minus pie. Let's have a look
at What is this cosine want to
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do that? We're going to divide
both sides by Route 3.
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And so we have cause of
X minus Alpha is one over
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Route 3. So what is X
minus Alpha?
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Let's just draw a little graph.
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To help us see what we're
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looking at. Between
plus and minus pie.
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The cosine graph.
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Looks like that.
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There's plus pie.
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As minus pie, this is minus π by
two, and this is π by 2.
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So we're looking for two
answers across here.
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Come down. To there.
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So let's have a look for one of
them. An hour Calculator will
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tell us this one here.
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So the angle that
I want is the
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angle whose tangent is
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one. Divided by the square
root of 3.
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And that is.
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Nought
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.95 5.
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Now if that's not .955
there, remember our
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Calculator will give us this
one. Then the other one by
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symmetry is minus N .955.
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Well, now we've got X minus
Alpha. What we need is X, so
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this will be X equals nought .9.
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55 plus
Alpha or
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minus nought.
.955 plus
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Alpha. And if
you remember Alpha, we
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calculated as nought. .615. So
we can write the value
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of Alpha rent.
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And work out these two.
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Values of X, so
we add these two
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together. We're going to
get 1.570.
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And if we take these two.
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We're going to get minus
nought .340 so if we
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work to two decimal places,
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that's 1.57. And minus
nought .3 four radians.
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So let's take another example.
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It's time you have cause
X Minus Route 3.
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Sign X is equal to 2.
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And we'll take X to be in
degrees and between North.
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And 360.
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OK. Well, slight
difference here. We've got a
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minus sign and not a plus sign,
so let's see what this means. A
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must be equal to 1 because we've
got one cause X&B must be equal
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to minus three.
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And this is going to make a
difference to what happens.
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Let's leave it on one side for
the moment and go ahead with our
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calculation. Are will be the
square root of A squared plus B
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squared. Which will be the
square root of 1 squared plus
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minus 3 squared.
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1 squared is one.
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Minus Route 3 squared is 3, so
it's a square root of 1 + 3,
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which is 4 and so are is 2.
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So what we've got now is
2 cause X minus Alpha equals
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2 and we can divide
throughout by these two to
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give us cause of X minus
Alpha equals 1.
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This should be relatively easy
to solve provided we can workout
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what Alpha is. So what is
Alpha now? Remember we calculate
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Alpha's tan Alpha is B over
a, which in this case is
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minus Route 3 over 1, which
is just minus Route 3.
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This is a problem to us.
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It's a problem because
previously all the answers have
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been positive and we have had
positive A and positive be and
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we've gone straight for the
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first quadrant. Let's just
remind ourselves what we mean by
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Quadrant. I'll write down again.
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10A. Which
is calculated as B over a.
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Let's just remind ourselves what
these are that are sign Alpha
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and our cause Alpha.
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And in this question then minus
Route 3 over 1.
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Revise what we know about
quadrants. This is the first
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quadrant. The second quadrant.
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The third quadrant, the 4th
quadrant going round
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anticlockwise. Now in the first
quadrant, all of our trig
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ratios, a for all that all
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positive. In the second
quadrant, only the sine ratio is
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positive. In the third
quadrant, only the tangent
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ratio is positive, and in the
fourth quadrant only the
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cosine ratio is positive.
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Now we have 10 Alpha is
minus Route 3 over 1.
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So it's negative, which means
that we must either be in the
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second quadrant or the 4th
quadrant, which is where tangent
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is negative. So we have a choice
to make our angle Alpha is in
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here or it's in here.
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Let's have a look what we can
see from here are sign Alpha is
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minus Route 3 are cause, Alpha
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is one. That means sign Alpha
must be negative and cause Alpha
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must be positive.
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And it's in this 4th quadrant
where cause Alpha is positive
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and sign Alpha is negative.
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So our tan Alpha is minus Route
3 is in here somewhere.
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So let's draw a picture, this
time looking the same, perhaps,
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but where's the angle? Well,
we've got to have minus Route
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3 and one.
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This is our angle here.
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Alpha
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So that what we can see is that
if tan of Alpha is equal to
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minus Route 3, then Alpha must
be equal to. Now the angle whose
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tangent is plus Route 3 is 60
degrees, so this one must be
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minus 60 degrees.
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OK, we've got Alpha sorted out.
Let's just remember what our
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equation was. Our equation. We
had got down to cause of X
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minus Alpha was equal to 1.
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So now we need to put these two
pieces of information together
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to help us solve the full
equation. Help us find the value
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of X so it's turnover.
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And write these down. Alpha we
know is minus 60 degrees and
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we're looking to solve the
equation cause of X minus Alpha
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is equal to 1.
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And we know that X is to
be between North and 360
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degrees, so let's sketch our
cosine curve between North and
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360 degrees. We know that it
looks like that there's 360.
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There's 180, and here we have
90, and here 270 to squeezing
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that in there. We know that this
goes down as far as minus one.
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And these maximum points are up
at one. So what we can see
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there is that the angle whose
cosine is one is either zero
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degrees or 360 degrees, so X
minus Alpha is equal to 0
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degrees or 360 degrees.
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What is Alpha? Well, it's minus
60, so X minus minus 60
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is equal to 0.
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All 360 degrees.
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That's X plus 60 is equal
to 0 or 360 degrees and
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now we can take 60 away
from both of these. So X
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is minus 60 degrees or 300
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degrees. Remember the original
range of values of X was between
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Norton 360, so this is not an
answer minus 60 degrees. This
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one is the only answer within
our range of values of XX is
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equal to 300 degrees.
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Let's turn over.
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Now let's have a look at what
might be termed a calculus type
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example. In other words, a
question that's going to involve
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us with Maxima and minima.
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So what about this function
F of X is 4?
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Cause X +3.
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Sign X. Minus 3.
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Water, it's turning points. What
are its maximum and minimum
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values? Well. Knowing what
we do know from the previous
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work that we've done, we know
that we can express this bit for
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cause X plus three sign X as
5 cause of X minus Alpha.
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And then the minus three where.
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Tan Alpha is 3
over 4B over A.
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Now this function is now very
easy to deal with because we
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know all about a cosine
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function. The maximum
value of cause.
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Is
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warm. Never
gets any bigger than one, and so
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the maximum value.
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All F of X.
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Is. Well, it must
be 5 times by one.
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Minus three, which is just two.
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And when does that occur? Well,
let's think the maximum value of
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cosine is one when.
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The angle. Equals
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0. Well, in this case
the angle will equal 0.
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When X equals Alpha, so very
quickly we found out exactly
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where this maximum value is
exactly at what point?
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This function F of X has its
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maximum value. What about the
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minimum value? The least
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value. Well, let's think about
Co sign the least value of
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cosine is minus one never goes
any lower than minus one. When
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does that happen? That happens
when the angle is.
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Pie. Or 180.
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So what we know there is that
the minimum value.
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Of F of X most occur when
this is at its minimum. In other
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words, minus one, so it be 5
times by minus 1 - 3 which
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is just minus 8.
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And when will that happen?
Will happen when the angle
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X minus Alpha equals π.
In other words, when X
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equals π plus Alpha.
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So very quickly and with a
minimum amount of work, we've
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established a maximum value
under minimum value and based
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upon this information we could
go ahead and rapidly sketch the
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curve. So again, we see that
this form our cause X minus
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Alpha is a very powerful form
for us to know how to use and
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for us to be able to formulate
from expressions such As for
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cause X plus three sign X.
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It's a form that you really
do need to work with, and a
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form that you really do need
to practice. Initially. It's
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not so easy to get your mind
around, but it is possible
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to do so and it will pay
great dividends if you can.
