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Physics Videos 34 videos

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Physics: Graphs Tell Stories, and Stories Tell Us Equations 11 Views


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Description:

Graphs tell stories, and stories tell us equations. We hope graphs choose a good story to tell us...maybe Harry Potter, or something.

Language:
English Language
Subjects:

Transcript

00:01

No grafs tell stories and stories tell us equations Okay

00:06

using graphs to tell a story that's Pleasant feeling that's

00:13

What stories Dad in the matter A lot of math

00:21

Okay Equations instead Action movie equation Yeah Okay who didn't

00:31

love story time when they were a kid Who indeed

00:35

you'd gather around have your mom or dad or your

00:38

teacher read from a picture book and they'd hold up

00:41

the pages so you could see the illustrations everyone would

00:44

Who and ah and physics is just like that Okay

00:50

there may be a few small differences but think of

00:53

grafts They tell us stories through pictures We just need

00:56

to know how to read them If you've been following

00:59

along with our course so far you've already seen a

01:02

bunch of displacement versus time Graphs like this one Displacement

01:06

versus time gives us information about velocity versus time And

01:10

in the same way velocity versus time tells us about

01:13

the acceleration versus time But rather than just yammer on

01:17

about it let's see what story this graph is telling

01:20

us What do we see here We see something that

01:24

starts moving picks up speed then slows down What story

01:28

could we think of that fits this Sure there are

01:31

a lot of situations to choose from That would match

01:33

this like a car going from one stop Sign to

01:35

another Although the car would probably be going faster than

01:38

this What if uncle frank decides to relive his roller

01:42

disco glory years The seventies were a crazy groovy time

01:47

Now frank isn't the king of the roller rink like

01:49

he used to be So when he comes to a

01:51

hill he's just gonna roll with it literally he's not

01:55

going to add any force He's just going to pray

01:58

he doesn't fracture his pelvis We'll be observing him helping

02:01

the video of disco uncle goes viral so we'll say

02:05

frank is rolling in the positive direction away from us

02:08

He rolls down the hill for about two point five

02:11

meters when he starts going up the next hill which

02:14

means he slows down of course and he stops after

02:18

ten seconds five meters away from the us Sure that

02:22

story where it's great for those graph Maybe not so

02:24

great for frank though And what does this graph tell

02:27

us about velocity over time Well since the overall slope

02:31

of the line is upwards the velocity will be positive

02:34

And since this is a curved line the velocity isn't

02:37

constant It changes throughout the time period So if we

02:41

were to plot out a velocity versus time graph It

02:43

would look like this Frankie starts out at zero meters

02:48

per second preaches a max of one meter per second

02:51

and then gravity kicks in and slows him down until

02:54

it's back teo zero meters per second Before we go

02:57

onto acceleration let's look at the slope of the velocity

03:00

graph more carefully And let's Think about what it means

03:03

for acceleration We can see that the slope is constant

03:07

and positive from zero to five seconds then abruptly changes

03:12

to constant and negative in the five to ten second

03:15

region That abrupt change of five seconds tells us that

03:19

is the moment when the acceleration was not uniform In

03:22

other words acceleration changes at five seconds as we're sure

03:26

you mutter in your sleep these days acceleration is the

03:30

change in velocity divided by the change in time Yep

03:34

That equation looks pretty familiar So for the first part

03:37

of the velocity graph the outboard part we would figure

03:41

out the acceleration like this Well look at the change

03:44

in velocity from second zero two second four Why aren't

03:48

we going all the way to the top two second

03:50

five Because we already know that the acceleration at that

03:54

time is zero that's the transition point So in that

03:58

four second time span the velocity goes from zero meters

04:01

per second Two zero point eight meters per second We

04:05

divide that change in velocity by that change in time

04:09

to find that our acceleration for the first four seconds

04:12

And when we do the math we find that the

04:15

acceleration is a constant point Two meters per second squared

04:19

let's Slap that sucker on the acceleration versus time graph

04:23

Let's look at the other part That part has the

04:26

downward slope A second six through ten Another four seconds

04:31

Man at second ten our velocity is zero meters per

04:35

second at second Six it's point eight meters per second

04:40

giving us a change of negative point Eight meters per

04:42

second Divide that by the change in time which gives

04:46

us an acceleration of negative point Two meters per second

04:50

squared Well pop that on the graft too So right

04:53

now our graph looks a little dysfunctional huh A little

04:56

disconnected like us before our first cup of coffee So

05:00

let's fix that by adding the point at the five

05:03

second mark where The acceleration is zero Then we can

05:07

connect our two horizontal lines much better Looking at that

05:11

disconnected graff was making us itch It's a super important

05:15

to keep the time when the acceleration is changing out

05:18

of both the before and after pictures Think of what

05:21

would happen if we looked at zero through five then

05:24

five through ten then at the five second point we'd

05:27

have a vertical line Ah vertical line on a time

05:30

graph is bad Very very bad acceleration is change in

05:35

velocity over change in time if there's no change in

05:39

time that means we'd be dividing by zero And as

05:42

we were all taught in math class when you divide

05:44

by zero you open a portal to hell that swallows

05:48

the universe in a fury apocalypse Ok it's not quite

05:52

that bad but she can't divide something by nothing It's

05:55

nonsensical and in math terms is considered undefined And if

06:00

you have a vertical line on an acceleration vs the

06:02

time graph that would mean that the acceleration was infinite

06:07

Which just know nope Uh uh not gonna happen So

06:13

graph carefully when acceleration is changing So displacement velocity and

06:17

acceleration are all related part of one big happy family

06:22

let's take a look at some ways to work with

06:24

them Time for some equations We've already looked at some

06:29

basic equations Displacement equals final position minus the original position

06:34

Velocity equals the change in displacement over a period of

06:38

time Acceleration is the change in velocity over a change

06:42

in time But how about this bad boy What the

06:46

heck is is trying to say let's Break it down

06:49

x final is our final displacement wherever we've ended up

06:54

in other words x sub zero is our initial displacement

06:58

also known as where we started out these sub zero

07:01

is our initial velocity and t stands for time so

07:05

this is initial velocity multiplied by the elapsed time a

07:10

is acceleration pretty standard Auntie is still time But in

07:14

this part we square it so putting it all together

07:17

our final displacement equals our initial displacement plus our initial

07:22

velocity times the time period plus one half acceleration times

07:28

time squared Now you may look at this See all

07:33

those variables and want to crawl under your desk and

07:35

die We get it But all those variables are a

07:38

good thing because it means that if we have enough

07:41

info we can solve for the initial velocity initial or

07:45

final displacement time or acceleration Look at that versatility That's

07:50

like the swiss army knife of equations How about this

07:54

one This says that the final displacement minus the initial

07:58

displacement equals the final velocity minus the starting velocity divided

08:03

by two multiplied by the elapsed time So to put

08:08

it another way the change in displacement equals the average

08:11

velocity multiplied by the elapsed time so we can know

08:15

how far we went If we have our average velocity

08:18

and a clock that could definitely come in handy But

08:22

what if we don't have the time Well we always

08:25

have the time for math But what if no one

08:27

was watching the clock So we don't know how much

08:30

time passed Good news there's An equation we can use

08:33

in that situation Here it is Let's Break this one

08:37

down The final velocity squared equals the initial velocity also

08:42

squared two times acceleration times the difference between the final

08:48

displacement and the initial displacement which is also known as

08:52

the change in displacement This cuts the time right out

08:55

and lets us solve for the initial or final displacement

08:59

initial or final velocity and acceleration How do we know

09:03

which equation to use We take attendance that's How Just

09:07

like in class for these kinds of questions we've only

09:10

got six variables that we're going to run into We've

09:14

got the displacement brothers that's initial and final displacement and

09:18

the velocity twins initial and final there too Then we've

09:22

got acceleration and last but not least time no relation

09:26

between those two look through the question see which variables

09:30

were given and which we need to solve for So

09:33

if both displacements both velocities and acceleration are all present

09:37

and time isn't mentioned we'll pick the right equation for

09:40

the job and sometimes we might need more than one

09:43

equation like if there are different kinds of motion that

09:47

the car is at a stop sign accelerates then cruises

09:50

on the freeway for a while If we want to

09:52

know the total displacement we'll need an equation that describes

09:55

this displacement during the acceleration un equation that tells us

09:59

the final velocity and the one that tells us how

10:02

far the car went at that velocity or what if

10:05

we have a case of two moving objects like the

10:08

old classic of two trains if we have a train

10:11

going from chicago to detroit and another going from detroit

10:14

to chicago will need different equations for each to figure

10:18

out when they're going to crash Come on just having

10:21

them past each other is so boring So how does

10:24

this whole taking attendance thing work Exactly Let's see it

10:27

in action say we've got a superhero situation since we're

10:31

always staying on brand let's call her shmoop er woman

10:35

she's just chillin up on a roof when she hears

10:37

a distress call she takes off running thirty meters to

10:40

the end of the roof She hits the edge of

10:42

the roof and takes flight When she gets to the

10:45

end she has a velocity of five meters per second

10:49

How long does this sprint taker to cover those thirty

10:52

meters time for attendance Unnatural displacement here there mary is

10:58

And just because he's zero doesn't mean he's worthless What

11:01

about the final displacement Yep Thirty meters right Their initial

11:05

velocity Bingo Zero meters per second Final velocity That's definitely

11:11

showed up five meters per second acceleration Uh acceleration Anyone

11:17

sane acceleration Uh yes acceleration is out sick How about

11:22

time Oh yeah That's what we're trying to figure out

11:25

so which equation should be used Let's look at some

11:28

of our options since acceleration isn't involved we don't want

11:32

any equation with an a so we can scratch the

11:36

acceleration equation off the list and we can also scratch

11:39

captain versatile off also the big one with all the

11:42

variables we could use it but we'd have to calculate

11:45

acceleration first So let's look at something simpler This one

11:49

requires us to find the average velocity first again Sounds

11:53

like extra work and we know we don't want this

11:55

velocity equation It's whole thing is that it doesn't involve

12:00

time That leaves us with this equation Remember this one

12:04

final displacement minus initial displacement equals final velocity minus initial

12:10

velocity divided by two times the time that's got everything

12:16

we need Okay first of all let's isolate t that

12:20

is what we're trying to solve After all let's get

12:23

algebraic on It will start by multiplying both sides by

12:27

two so now we've got two times the difference in

12:29

displacement equals the difference in velocity times time one more

12:34

step to get t all by itself divide both sides

12:37

by the change in velocity Leaving us with this time

12:43

equals two times the difference in displacement over the difference

12:47

in velocity Let's start putting in the Numbers the final

12:50

displacement was 30 meters and the initial displacement was zero

12:54

meters so those go there and the final velocity was

12:58

five meters per second with an initial velocity of zero

13:02

meters per second So we'll pop that in right there

13:06

we won't actually do the whole subtracting zero from numbers

13:09

thing we think he can handle that just fine so

13:12

we have sixty meters on top and five meters per

13:15

second on the bottom sixty divided by five is twelve

13:18

and when we look at the units the meter's cancel

13:21

out leaving us with a time of twelve seconds and

13:25

shmoop er woman saves the day again A lot of

13:28

math is like telling a story we've got your beginning

13:31

when you get all the numbers and what to solve

13:33

for then you've got your middle where you make any

13:35

rearrangements and do the math and at the end you

13:38

got your answer but will grant you that meth is

13:41

in the most Popular story to tell You'll probably see

13:43

a superhero movie in the next few months But equations

13:48

Those aren't quite ready for the big screen yet Bring 00:13:50.818 --> [endTime] it back

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