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- [Voiceover] Let's give
ourselves some practice
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solving equations.
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So let's say we had
the equation 1/3 plus A
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is equal to 5/3.
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What is the A that makes
this equation true?
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If I had 1/3 plus this
A, what does A need to be
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in order for 1/3 plus
that to be equal to 5/3?
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So there's a bunch of
different ways of doing this,
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and this is one of the fun
things about equations is
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there's no exactly one right way to do it.
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But let's think about
what at least I think
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might be the simplest way.
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And before I work through
anything, you should always try to
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pause the video, and do it on your own.
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So what I like to think
about is can I have just my A
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on one side of the equation?
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And since it's already
on the left-hand side,
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let's see if I can keep
it on the left-hand side,
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but get rid of this 1/3 somehow.
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Well the easiest was I can
think of getting rid of
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this 1/3 is to subtract
1/3 from the left-hand
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side of the equation.
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Now I can't just do that from the
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left-hand side of the equation.
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If 1/3 plus A is equal to 5/3,
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and if I just subtract 1/3
from the left-hand side,
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then they're not going
to be equal anymore.
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Then this thing is going to be 1/3 less,
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which this thing isn't going to change.
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So then this thing on
the left would become
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less than 5/3.
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So in order to hold the
equality, whatever I do on the
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left-hand side I have to do on
the right-hand side as well.
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So I have to subtract 1/3 from both sides.
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And if I do that, then
on the left-hand side,
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1/3 minus 1/3, that's the whole reason why
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I subtracted 1/3 was
to get rid of the 1/3,
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and I am left with A is
equal to 5/3 minus 1/3,
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5/3 minus 1/3,
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minus 1/3, and what is
that going to be equal to?
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I have five of something,
in this case I have 5/3,
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and I'm gonna subtract 1/3.
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So I'm gonna be left with 4/3.
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So I could write A is equal to 4/3.
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And you could check to
make sure that works.
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1/3 plus 4/3 is indeed equal to 5/3.
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Let's do another one of these.
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So let's say that we have
the equation K minus eight
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is equal to 11.8.
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So once again I wanna solve for K.
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I wanna have just a K
on the left-hand side.
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I don't want this subtracting
this eight right over here.
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So in order to get rid of
this eight, let's add eight
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on the left-hand side.
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And of course, if I do
it on the left-hand side,
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I have to do it on the
right-hand side as well.
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So we're gonna add eight to both sides.
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The left-hand side, you
are substracting eight
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and then you're adding eight.
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That's just going to cancel out,
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and you're just going to be left with K.
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And on the right-hand
side, 11.8 plus eight.
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Well, 11 plus eight is 19,
so it's going to be 19.8.
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And we're done, and once again,
what's neat about equations,
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you can always check to see
if you got the right answer.
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19.8 minus eight is 11.8.
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Let's do another one,
this is too much fun.
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Alright, so let's say that
I had 5/13 is equal to
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T minus 6/13.
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Alright, this is interesting
'cause now I have my variable
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on the right-hand side.
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But let's just leave it there.
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Let's just see if we can
solve for T by getting rid of
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everything else on the right-hand side.
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And like we've done in the
past, if I'm subtracting 6/13,
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so why don't I just add it?
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Why don't I just add 6/13?
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I can't just do that
on the right-hand side.
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Then the two sides won't be equal anymore,
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so I gotta do it on the
left-hand side if I wanna
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hold the equality.
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So what happens?
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So what happens?
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On the left-hand side I have,
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let me give myself a
little bit more space,
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I have 5/13 plus 6/13,
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plus 6/13 are equal to,
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are equal to...
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Well, I was subtracting
6/13, now I add 6/13.
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Those are just going to add to zero.
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6/13 minus 6/13 is just
zero, so you're left with T.
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So T is equal to this.
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If I have 5/13 and I add to that 6/13,
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well I'm gonna have 11/13.
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So this is going to be
11/13 is equal to T,
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or I could write that
the other way around.
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I could write T is equal to 11/13.
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