-
Let's consider the formula
for the period of a simple
-
pendulum of length L is
formula is T period.
-
Is equal to 2π?
-
Times the square root of L
over G&L is the length of
-
the pendulum.
-
Now on Earth, we tend to
regard G's being fixed it.
-
There is a little with
altitude, but we tend to
-
think of it as being fixed.
-
Just supposing we had a pendulum
of a fixed length L, and we took
-
it somewhere else. Let's say the
moon or Mars.
-
Somewhere out of the solar
-
system. Gravity there would not
be the same and we might want to
-
measure gravity, so one of the
ways will be to take our
-
pendulum, set it swinging.
-
And measure the time.
-
Once we measured the time, we
could then use that to Calculate
-
G, but before we could do it, we
would need to know what G was in
-
terms of the rest of the symbols
in this formula. So we need to
-
rearrange this formula so that
it said G.
-
Equals.
-
Now it's what?
-
Goes instead of this question
mark that we're going to have a
-
look at in this video. We're
going to be looking at how we
-
transform formally, how we move
from an expression like this.
-
To another expression.
-
Involving exactly the same
variables, but one that helps us
-
answer the questions that were
after in terms of a different
-
variable. To do this?
-
Transformation of formula will
need all the techniques that we
-
had in terms of solving
equations, so the video solving
-
linear equations in one variable
might be very useful to have a
-
look at, but let's just recap by
having a look.
-
A simple linear equation.
-
So the one going to take
three X +5.
-
Equals 6
- 3 * 5
-
- 2 X.
-
Now we've got this equation we
want to solve it for X, so our
-
aim is to end up with X equals.
-
So one of the first things
we would do is multiply out
-
the bracket.
-
So we have minus three times by
5 is minus 15.
-
Minus three times by minus
2X is plus 6X.
-
Next, we can simplify this
bit. Here three X +5
-
equals 6X, and now six
takeaway 15 is minus 9.
-
Now, one of the things we would
want to do is to try and get all
-
the ex is together. So we were
three X here under 6X there, so
-
will take 3X away from each
side, so that's three X
-
takeaway. Three X +5 equals 6X
takeaway, 3X minus 9.
-
3X takeaway 3X the X is go.
We've known left and then we've
-
got this. Five is equal to six X
takeaway 3X. That's three X
-
again takeaway 9.
-
Now we need to get the constant
terms, the numbers together. So
-
to do that we would add 9 to
each side. So we 5 + 9 is equal
-
to three X minus 9 + 9.
-
So again, we're doing to the
same thing to both sides. Here
-
we took three X away from each
side. Here we're adding nine to
-
each side, so five and nine is
14 equals 3X, and we minus 9 +
-
9.0. Now we need to divide both
sides by three.
-
So we have 3X over three an 14
over 3, dividing both sides by
-
three, and so those three
canceled and we're left with X
-
equals 14 over 3. Now I've
written this out very fully.
-
I've written out every step that
I've said, but we wouldn't
-
normally expect to see all of
that written down.
-
Starting from here.
-
The next line we'd expect
to see is this one because
-
we say Take 3X away from
both sides and we'd expect
-
to see that as the result.
-
Then we'd say add 9 to both
sides, and So what we would
-
expect to see having done that
would be that.
-
And then we, say, divide both
sides by three.
-
And so we see that So what we
would see written down in our
-
exercise book or on a piece of
paper that carried the
-
solution to this equation will
be something like this.
-
OK, we've been through the
steps now of solving an
-
equation. These techniques,
particularly idea of a balance
-
of keeping the same on both
sides by doing the same thing
-
to both sides is what we're
going to do when we look at
-
the transformation of
formally.
-
So let's begin with our
first formula V equals U
-
plus AT. And the variable
that we're going to try and
-
find is TI.
-
T is the variable we're going to
find what is T expressed?
-
In terms of the rest of the
letters or symbols that there
-
are in this formula well, in
order to model this, what I'm
-
going to do is I'm going to
write down an equation which
-
looks like this, but it just got
-
numbers in. With a T there as
the unknown. So what we might
-
have is something like this.
Seven for V5 for you.
-
Let's say a tool
for A and then T.
-
Now what would we do to solve
this equation? The first thing
-
we try and do is get the TS on
their own and so to do that,
-
we take 5 away from each side.
So this would be 2. Over here
-
equals 2 T, so having done
that there, let's do it here.
-
V minus U taking you away from
each side.
-
Now we would divide both sides
by two over here.
-
In order to end up with just T
on its own, so let's do the
-
same. Here. A is what multiplies
by T, so we need to divide
-
everything on this side V minus
U over a equals T. That's it.
-
Notice everything here is over
a, not just one part of it, but
-
both the whole expression.
-
The minus U over a.
-
Let's take another
one. V squared equals
-
U squared plus 2A S.
-
And this time, let's say the
symbol that I'm going to try and
-
find all the variables that I'm
going to try and find in terms
-
of all the others, is you.
-
So that's the case. Again,
I'm going to write down an
-
equation over here which
looks like this one.
-
So let's have.
-
25
-
equals U squared.
-
+9.
-
Weather 9 is in place of this
lump here of algebra.
-
So what would we do here? Our
first step would be to take
-
nine away from both sides. So
let's do that. 25 - 9 equals
-
U squared and that gets us EU
squared on its own. So let's
-
do that over here. Let's take
this lump away from both
-
sides. 20 squared minus 2A S
is equal to U squared.
-
Now what I would want to do now
is to take the square root of
-
both sides 'cause I want just
you and here I've got you
-
squared. So I need the square
root of 25 - 9 and I want the
-
square root of all of that not
square root of 25 minus the
-
square root of 9. I want the
square root of 25 - 9, so again
-
I've got to do the same over
here I want the square root of.
-
All. Love it.
-
Let's just check why I need the
square root of all of this.
-
25 - 9 is 16, so that 16 equals
U squared. Take the square root
-
of both sides. Four is equal to
you and we're happy. That's the
-
answer. But what if I do the
square root of 25 minus the
-
square root of nine? Well,
that's 5 - 3 is 2, which is not
-
the answer very definitely not
the answer, so we need to take
-
the square root of everything,
not just each little piece. And
-
so this over here has to be the
square root of all of that.
-
I've been working so far with
the formula that are for uniform
-
acceleration, so let's continue
with that and take.
-
Another one of them S equals
UT plus 1/2 AT squared, and
-
this time it's a.
-
Then I'm going to be looking for
can I rearrange this formula?
-
Can I transform it so it says a
-
equals? Again, let me model it
with an equation. Let's say that
-
S is 21, but U times by
T is 15 + 1/2 of a
-
Times by 9.
-
And it's this a the time after
first of all. Let's isolate the
-
term with the unknown in it. So
that's the ater. So let's take
-
15 away from both sides. So I'm
21 - 15 is equal to 1/2 of
-
a times by 9. So again, let's do
that here. Let's take this lump
-
away. S minus Utah equals 1/2.
-
AT squared, so again, my first
steps are to try and isolate the
-
variable. The term that I'm
-
looking for. Now this one
looks a bit complicated. We
-
got a half. There would be
nice to get rid of the half,
-
so let's multiply both sides
by two. If we do it at this
-
side, that's just a times by
9. We do it this side 2 * 21
-
- 15 and it multiplies all
of it. So let's do the same
-
here. Multiply both sides by
2, two times S minus UT.
-
Equals AT squared.
-
Going back to the equation we
got equals a Times by 9. I just
-
want a on its own and so I must
divide both sides by 9.
-
Here the thing that's doing
the multiplying it's T
-
squared. So let's divide both
sides by T squared and in the
-
same way as I divided
everything by 9, I've got to
-
divide everything here by T
squared.
-
And that gives me a.
-
Notice I haven't made any
effort to cancel because T
-
is not a common factor. It
is not a common factor.
-
No, we've been working with the
equations that are to do with
-
uniform acceleration. But there
are some other kinds of
-
equations that we need to gain
practice at and in order to
-
develop these skills, I'm going
to start with some made up
-
equations that don't have
physical applications in the
-
real world, but we will come
back once we've developed those
-
skills to looking at some real
equations that do contain
-
physical applications that we
will be able to transform, but
-
we need to develop some skills
to begin with. So first of all.
-
Let's take this expression,
let's call it rather than a
-
formula.
-
So then we have Y times 2X plus
one equals X Plus One and the
-
thing that we're going to be
after is X. Can we rearrange it
-
so it says X equals?
-
Well gain, let me
try and model this.
-
With an equation. So all
I need to do to model
-
this as an equation is
replaced the Y by three.
-
And if I was to solve this
inequation, my first step would
-
be to multiply out the bracket.
So let's do that. 6X plus three
-
is equal to X plus one.
-
So let's do that over here.
Multiply out this bracket. So
-
that's two XY Plus Y.
-
Is equal to X plus one.
-
Our next step with the equation
will be to get all the excess
-
together. So I would take X away
from both sides, so that would
-
be 6X takeaway X +3, and taking
the X away from this side just
-
leaves me with one. So let's do
that here. Let's take this X
-
away from both sides, so have
two XY minus X Plus Y.
-
Is equal to 1.
-
Now I would naturally want to
combine these two in some way.
-
6X minus X is just 5X.
-
I can't really do that at this
side, but what I can do is
-
gather together the terms in X
by taking out X as a common
-
factor. So we take out X from
this as a common factor. The
-
other factor is 2 Y minus.
-
And taking X out
of there is one.
-
Plus Y equals
1.
-
What now? Well now I've got my
ex is together over here. Let's
-
write this as 5X plus 3 equals
1. My next step will be to leave
-
the X term on its own by taking
three away from each side.
-
So let's do that here. Lead
the Exterm on its own by
-
taking the other term. That's
why away from both sides.
-
Now I'm just going to simplify
this. Five X equals minus two,
-
and in order to solve this to
get a value of XI need to divide
-
both sides by this number 5. So
that's X equals minus two over
-
5. So if I come back to this
this term in the bracket, two Y
-
minus one is the term that's
multiplying the X, and so I need
-
to divide. Both sides by so X
is equal to 1 minus Y over
-
2Y plus. Sorry made a mistake
there. Two Y minus one.
-
I just look again at what we've
done here. We've mimic the
-
solving of an equation. First,
we multiplied out the brackets.
-
Then we got the terms together
-
in X. The variable
that we were after.
-
Having got those terms together.
-
We then isolated them so that
they were on their own.
-
So we need to bear that in mind
and follow it through.
-
Let's take another expression Y
over Y plus X.
-
+5 is equal to X.
-
This time. We're going to be
finding why we're going to be
-
getting Y equals, and we want
some lump of numbers and X is
-
over this sigh.
-
So let's model this with an
equation Y over Y plus 3
-
+ 5 is equal to 3.
-
Look at this side. Here we've
got an algebraic fraction.
-
Y over Y plus 3Y plus three is
the denominator. It's in the
-
bottom of the fraction.
-
So in order to get rid of that,
we need to multiply everything
-
in this equation by this
denominator. So I'm going to
-
write that out in full Y over Y,
plus three. Put that in a
-
bracket times Y plus 3.
-
Plus five times Y.
-
Three is equal to three times Y
plus three. Let me just
-
emphasize we have to do the same
thing to both sides, so here
-
I've had to multiply everything
on both sides of the equation by
-
this term Y plus 3.
-
Here those will cancel out,
just leaving me with why, so
-
let's do that at this site.
Let's multiply everything by
-
this term Y plus X so we know
this first one. When we've
-
multiplied it by wiper sex is
just going to give us Why.
-
Plus five times by Y
plus X is equal to
-
X times by Y plus
X.
-
Coming back to the equation
here, faced with a lot of
-
brackets, we know the first
thing we would do is multiply
-
out the brackets. So let's do
that, why?
-
Plus five times by Y is 5
Y five times by three is 15
-
is equal 2 three times by Y
is 3 Y and three times by
-
three is 9.
-
Do the same here, why?
-
+5 Y.
Five times by X Plus 5X is
-
equal to X times by Y is
XY&X times by X is X.
-
Square.
-
On this side now we would like
to get all of our wise together.
-
So we've Y plus
-
5Y6Y. Take away 3 Y
so we've six. Why
-
already and we're going
to take away 3Y. Plus
-
15 is equal to 9, so
let's gather all the
-
wise together Y +5. Y
is 6 Y.
-
I need to bring this term over,
so I'll take XY away from both
-
sides minus XY.
-
And then let's just write down
the other terms.
-
Now here I simplify this. I'd
have six Y takeaway 3 Y and that
-
would just leave me with three Y
plus 15 equals 9. I can't do
-
that here, but the thing that I
can do is bring them much closer
-
together by taking out why.
-
The thing that I'm after as a
common factor. So let's take why
-
out of these two terms. Why
brackets? Why times by 6 Y means
-
I must have a 6 in their minus
XY means I must have a minus X
-
there plus 5X equals X squared.
-
Now over here I'd isolate this
term in why by taking 15 away
-
from both sides 3 Y is equal
to. Now this is 9 - 15,
-
so I've got to do the same
here. Take 5X away from each
-
side, isolating this term in YY
times 6 minus X is equal to
-
X squared minus.
-
5X.
-
This side now I've got 3 Yi,
just need Y so I would divide
-
everything on this side by
three. So I've got to do the
-
same with this. I've got to
divide everything on this side
-
by this term 6 minus X so we
have X squared minus 5X.
-
Divided by 6 minus X.
-
Put it all in a bracket to keep
it together. Notice I'm
-
attempting no canceling 'cause
there is no common factor in
-
this numerator and this
denominator. They do not share a
-
common factor, so that's my
answer and I finished. I've got
-
Y equals a lump of algebra
involving X is and numbers.
-
We started with a real formula.
We started with the formula for
-
a simple pendulum.
-
Of length Lt equals
2π square root.
-
L over G and the problem that we
posed was what was G in terms of
-
T? So G.
-
After G equals.
-
Let's have a look at a simple
equation. Let's say it's 10
-
equals 2π and I'll keep the two
Pike's. Part is just a number,
-
so 2π is just a number.
-
Square root
of 3 over G.
-
Now as an equation, this one is
a bit tricky because the G is
-
trapped inside this square root
sign. We need to bring it out
-
and the way to get a square root
sign to disappear, so to speak,
-
is to square both sides, reverse
the operation if you like, so
-
will square. Both sides of this
equation so 10 multiplied by
-
itself. I'm going to write it as
10 squared equals 2π multiplied
-
by itself, 'cause we're squaring
the whole of both sides times by
-
a nice square this.
-
Three over G.
-
Now we need to do the same here,
square the whole of both sides.
-
So that will be T squared.
-
2π all squared
L over G.
-
Coming back to the equation,
jeez, in the denominator I don't
-
want it there. I want it to say
G equals I want G upstairs, so
-
to speak, so I have to get rid
of it out of the denominator and
-
so to do that I must multiply
both sides by G.
-
So I've got 10 squared times.
G is equal to 2π squared
-
times three, so let's do that
here. Multiply both sides by G.
-
So I have T squared times
by G is equal to 2π
-
all squared times by L.
-
Gee, I want on its own. I want
to say G equal, so I must divide
-
by this thing 10 squared. So G
is equal to 2π all squared times
-
3, all over 10 squared.
-
And I can work that out. Let's
do the same with this G equals
-
2π all squared times by L, and
I'm getting rid of this T
-
squared by dividing everything
by T squared.
-
And we can leave it like that.
-
We can make it look a little
bit nicer if we want to buy
-
spotting that we've got a
square here under Square
-
there, and it might be nice
to combine those two.
-
Squaring process is by
writing 2π over T all
-
squared times by L.
-
Basically this is the answer
that we finished with.
-
Let's take another couple of.
-
Examples of real formula that we
might want to be able to
-
manipulate. So let's have a look
at the lens Formula One over F.
-
Is equal to one over U.
-
This one over V.
-
Let's say it's you.
-
That we're after we want you
-
equals. Well, let me write
down an equation.
-
Similar.
-
One over 3 equals 1 over U plus
one over 5.
-
I want to isolate this term
first in one over you.
-
To do that, I'm going to take
this away from both sides. 1/3
-
takeaway 150 is equal to one
-
over you. So let's do that.
Isolate this term in you.
-
And so to do that, we take away
one over V from both sides, so
-
we want over F.
-
Take away one over V is equal to
one over you.
-
Now, faced with problems
like this, it's very, very
-
tempting to simply turn
everything upside down.
-
Well, I just have a think about
that. This says 1/3 - 1/5. Now a
-
third is bigger than 1/5.
-
So 1/3 - 1/5 is a positive
number, so you at the very least
-
has got to be positive.
-
Watch what happens if I just
turn everything upside down.
-
3 - 5 equals U, which tells me
that minus two is equal to you.
-
But we just agreed that you had
to be positive and not negative.
-
You can't do that.
-
These are fractions, and so
because their fractions we have
-
to combine them as fractions,
which means we have to find a
-
common denominator and a common
denominator for three and five
-
is a number that both three and
five will divide into.
-
Easiest number is 3 times by 5.
-
So three Zing to three times by
5, which is 15 goes five times.
-
So I found multiplied 3 by 5. I
must multiply by this one by 5,
-
so that's 5 minus.
-
I've multiplied 5 by three, so I
multiply this one by three
-
equals one over. You know if I
did that here, I've got to do it
-
over here. So I want
to common denominator.
-
Here the common denominator I
talk was three times by 5, so
-
let's take F times by vis.
-
I've multiplied F.
-
By the so I must multiply the
-
one. By faith.
-
Minus.
-
I've multiplied the V by F.
-
So I must multiply the one by F.
-
Now if I come back over here,
let me just simplify this. This
-
is 2 over 15 is one over you,
and now I've got a complete
-
fraction on both sides. I can
turn it upside down and say
-
that's what you is.
-
Now there was a lot of
calculation went on here. I
-
can't do that calculation here,
but I have got a complete
-
fraction here so I can turn it.
-
Upside down.
-
To give me you.
-
So let's take as our final
example the time dilation
-
formula from relativity.
-
The formula is T
equals T, not.
-
Divided by.
-
1. Minus. V
squared over C squared to the
-
power. 1/2 or square root.
-
So let's take some numbers and
in fact what we're going to be
-
after is we're going to be
looking for this expression
-
here, V over C. So I just
write that down there. That's
-
what we're going to be looking
for. Can we get V over C in
-
terms of T&T Nord?
-
So let's have 6
equals 5 over 1
-
minus X squared.
-
To the half. Now solving this.
-
What would we do? Well, we've
got a square root. Let's Square
-
both sides in order to get rid
of that square root. So that
-
would be 6 squared equals 5
squared all over 1 minus X
-
squared. So let's do that here.
Square both sides.
-
T squared. Equals TN
squared all over 1
-
minus V squared over
C squared.
-
Now, well here the term I want
in X is in the denominator. I
-
need it upstairs, so let's
multiply both sides of this
-
equation by one minus X
squared. That would be 6
-
squared times 1 minus X
squared is equal to 5 squared.
-
So let's do that here.
-
T squared times, 1
minus V squared over
-
C squared is equal
to T Nord squared.
-
Now I want the X squared bit.
-
And it would be nice perhaps to
multiply out the bracket, but
-
there's a slightly quicker way.
I can divide both sides by 6
-
squared, and that's nice. 'cause
it keeps the square bits
-
together, so to speak. So let me
do that one minus X squared is
-
equal to 5 squared over 6
squared. So I'm going to do that
-
here. Divide both sides by T
squared, 1 minus V squared over
-
C squared. Is equal to
TN squared over T squared?
-
Now.
-
Running out of paper here.
So what I'm going to do is
-
turn over and write this one
down at the top of the next
-
page, and this one as well.
-
So we've got 1 minus V
squared over. C squared is
-
equal to T not squared over
T squared.
-
And here, with one minus X
squared is equal to 5 squared
-
over 6 squared.
-
It's The X squared that we're
after so I can add X squared
-
both sides, so this is one
equals 5 squared over 6 squared
-
plus X squared. So let me add
V squared over C squared to each
-
side. One is equal to T not
squared over T squared plus B
-
squared over C squared.
-
Now I want the X
squared on it so.
-
So take this away from both
sides. 1 - 5 squared over
-
6 squared is equal to X
squared, so 1 minus T, not
-
squared over T squared is equal
to V squared over C squared.
-
Taking this away from both
-
sides. Almost there now it's
X that I want not X squared
-
selects. Take the square root of
-
both sides. So do the
same here. The oversee that I
-
want, so let's take the square
root of both sides.
-
And that's it. We have found
the ratio of the velocity to
-
the speed of light in terms
of the two times.
-
So. That concludes this video on
transformation of formula thing
-
to do is to treat it always as
though it was an equation that
-
you were trying to solve.
-
In terms of the variable that
you want, X equals G equals and
-
you just perform the steps as
though you were solving an
-
equation. If you keep that in
mind, then most of your problems
-
should be taken care of.
