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- [Lecturer] Let's solve
a couple of problems
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on Newton's second law.
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Here's the first one.
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We have an elevator, which is moving up.
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And let's say the mass of the elevator,
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including the passenger
inside, is 1,000 kilograms.
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Now the force, the tension
force of the cable,
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let's say that's about 7,800 newtons,
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our goal is to figure
out what the acceleration
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of this elevator is.
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We're also given that the
gravitational force acting
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on that elevator, including
the passenger over here,
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is about 9,800 newtons.
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So, how do we figure this out?
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Well, the first thing
that comes to my mind is,
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"Hey, we have some forces
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and we have some motion
variables like acceleration.
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What connects forces and motion variables?
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What connects forces and motion?
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Newton's second law.
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So, the first thing I try to do
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before applying Newton second law is I try
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to draw a free body diagram.
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So lemme do that.
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What's the way to draw
a free body diagram?
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We try to get rid of unnecessary details.
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Use a box to represent
your object of interest.
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Our object of interest is this elevator
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and the person over here.
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So, that's our box.
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It's mass is 1,000 kilograms
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and let's draw all the
forces acting on it,
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which are the forces acting on it.
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Well, we have an upward
force that's tension
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and we have a downward force
that's the force of gravity
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and our goal is to calculate
what the acceleration is.
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And how do we do that?
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Well, we use Newton second law,
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which says the acceleration
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should equal the net
force acting on an object
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divided by its mass.
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And of course, since we're
dealing with vectors,
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we can put arrow marks over here.
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The direction of the
acceleration will be the same
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as the direction of the net force.
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Okay, now we can calculate
the net force from this
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and we can calculate, we know the mass,
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so from that we can
calculate the acceleration.
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So why don't you pause the video
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and see if you can plug in the numbers
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and find the acceleration yourself first.
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All right, let's try.
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So our acceleration
would be the net force.
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How do I figure the net force out?
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Well, the total force,
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well they're since in
the opposite direction,
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we'll subtract them.
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So, I'll just take the bigger number.
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So 9,800 newtons, which
is acting downwards.
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We need to take care of the direction.
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From that, I'll subtract
the smaller number,
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that is 7,800 newtons
upwards divided by the mass,
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which is 1,000 kilograms.
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And if you simplify,
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we will get 9,800 minus 7,800 is 2,000.
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Nice numbers, 2000 newtons.
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But what direction is it?
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The downward one wins, right? It's bigger.
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So, the net force will be
in the downward direction.
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It's divided by 1,000 kilograms
and that gives us two.
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So, our acceleration becomes
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two meters per second square downwards.
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Okay, we found our answer,
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but one of the best ways to
gain deeper insights is to try
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and see if this kind of makes sense.
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Can you get a feeling for
what's going on over here?
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Okay, now the first question
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that we could be having
over here is, look,
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the net force is downwards
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because gravity is winning, right?
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So the total force acting on
this elevator is downwards
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and yet the elevator is moving up.
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Why is that? (chuckles)
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Well, remember, force does not dictate
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the direction of motion.
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Force tells you the direction
of acceleration, okay?
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The elevator could be moving,
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objects can be moving
whatever direction it wants.
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When you put a force on it, it tells you
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what direction it should accelerate.
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So that's the key thing.
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So, there is no problem that
the force is acting downwards,
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but the elevator is moving upwards.
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Secondly, what does it mean
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that the acceleration is downwards?
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See, if the net force is downwards,
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the acceleration has to be downward.
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But what does it mean
the elevator is moving up
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and the acceleration is downwards?
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Ooh, this means since the velocity
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and the acceleration is
in the opposite direction,
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this means the elevator is slowing down.
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That's what it means for velocity
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and acceleration to be in
the opposite direction.
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If they're in the same direction,
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it means they're speeding up.
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So, this means our elevator is going up,
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but it is slowing down, which
probably means that, you know,
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it's probably about to stop.
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Maybe this person has probably reached
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his destination or something.
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All right, onto the next problem.
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This time we have a sledge at
rest whose is 70 kilograms.
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Our goal is to push it
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and accelerate to six meters per second
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in about two seconds, let's say,
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so that, you know, it
can nicely slide down
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and we can enjoy the ride.
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Now, there is going to
be some frictional force.
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Even though we're on ice and everything,
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there'll be some frictional force.
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Let's say the friction
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that this ledge will experience
is about 200 newtons.
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The question now is what is
the force with which we have
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to push on it so as to
achieve all of this?
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So how do we figure this out?
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Well, again, the first thing
that comes to my mind is
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that look, we're dealing with
forces and we have motion.
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What connects forces and
motion? Newton's second law.
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So, the first thing I'll
do is I'm gonna draw
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a free-body diagram.
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Again, I encourage you
to pause the video now
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or anytime later on.
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Whenever you feel more comfortable,
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pause the video and see if
you can complete it yourself.
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Okay, so anyways, let's first try
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to draw a free-body diagram.
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How do we do that?
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Well, again, we'll take
the object of our interest.
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In this case, the object of
our interest is this ledge
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whose mass is 70 kilograms
and just make it a square
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and then draw all the forces acting on it.
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What are the forces acting on it?
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I know there's frictional
force acting backwards
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of 200 newtons, but then I
also have the applied force
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by this person, which I,
we need to figure out.
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This is what we need to calculate.
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That is the applied force.
What are other forces?
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Well, I know that there's
also gravity acting on it
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and then there's a normal
force acting on it upwards.
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But we know that these forces are balanced
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and so they're not going to be useful.
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They're not going to affect
our situation over here.
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So, I'm just gonna draw them over here.
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They're there, of course, but
they're completely balanced.
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They're in the verticals,
they're not gonna affect it,
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so we'll not draw it.
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Okay, now that I have
my free-body diagram,
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let's go ahead and write
down on Newton second law.
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It says acceleration should
always equal the net force,
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which let me draw using pink now.
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Net force divided by the mass.
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Divided by the mass.
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Okay, so what do we do next?
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I need to find this applied force.
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So this means if I can
calculate the net force,
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then I can figure out what
the applied force is, right?
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So, from Newton's second law,
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I just need to figure out
what the net force is.
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For that, I ask myself, do I know m?
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I do. I know that m is 70 kilograms.
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Do I know the acceleration?
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Hmm, it's not given directly,
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but wait a second, I know
the initial velocity,
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I know the final velocity and I know
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that the change in velocity
should happen in two seconds.
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Whoo-hoo!
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That means I can calculate the
acceleration from this data.
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I can plug in and from
that I can figure out
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what the total force is going to be,
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the net force is going to be.
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And from that we can figure out
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what the applied force should be.
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Okay, so if you haven't done this before,
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why don't you now pause the video
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and see if you can put it all together
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and solve the problem?
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Okay, let's do this.
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So, let me first calculate
the acceleration.
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So our acceleration is going
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to be, well how do we figure this out?
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This is the final velocity
minus the initial velocity
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divided by the time taken.
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So, that's going to be, in our case,
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the final velocity is
six meters per second
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to the right minus...
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What's the initial velocity?
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Well, it's zero, it's at rest.
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So there is no initial velocity divided
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by time is two, two seconds.
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That gives us what?
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That gives us six by two is
three meters per second squared
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to the right.
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So I know my acceleration has to be
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to the right, which is
good news. (chuckles)
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It has to be to the right.
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We want this ledge to move to the right.
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So, that makes sense.
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So, we are on the right track over here.
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Okay, now, I can plug in
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and figure out what the
net force is going to be.
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So, if I just simplify that,
so net force is going to be,
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if I rearrange this equation
multiply by m on both sides.
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So I get net force to be
mass times the acceleration.
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And so now I can plug in
for mass and acceleration.
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What do I get? Well I get 70 kilograms.
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That's the mass,
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times the acceleration is three
meters per second squared,
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70 times three, seven times these 21.
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So, this is 210.
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So, I get that my net force is 210 newtons
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to the right of this,
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this acceleration was to the right.
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So, this will also be to the right.
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So, now that I've found my
net force, so my net force,
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the total force will be to the right
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and that is 210 newtons.
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From that, can I calculate
the applied force? Yes.
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So now, first of all,
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I know my applied force should be bigger.
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It has to be bigger
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because my total force
should be towards the right,
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which means if I subtract
the two from this,
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if I subtract this number,
I should get this number.
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That's the net force, all right?
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So now, now that I know all the directions
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and everything, I can
just subtract the numbers.
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So I can now say, "Hey, my net force
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that is 210 newtons should
equal this bigger number,
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the bigger force minus 200 newtons.
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Now, to get applied force,
I just add 200 on both sides
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so that I can get rid of this.
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And look, the applied
force becomes 210 plus 200.
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That is 410 newtons.
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And I already know it's to the right,
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so I know it's direction.
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So if I were to write down its direction,
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it's going to be, oops. (chuckles)
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Okay. Okay.
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I mean, okay, not the most
organized board over here,
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but let me just write it down
a little bit more neatly.
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So 410 newtons to the right.
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That's how much force we need to apply
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for all of this to happen.
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