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Physics: The Basics of Trigonometry 35 Views
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Description:
What are the basics of trigonometry? And why are we learning about this in a physics course? Both good questions. In this video, you'll learn about sines, cosines, tangents, and more... and about how these concepts are applied to physics. Sorry - math and physics go hand-in-hand. Let's just hope they regularly use Purell.
Transcript
- 00:02
Basics of trigonometry.....[mumbling]
- 00:46
In this lesson we're gonna be talking about triangles aren't specifically right [Triangle teaching a class of students]
- 00:50
triangles and as we're sure you know right triangle is a triangle with a
- 00:54
right angle also known as a ninety degree angle and wait are you confused?
- 00:58
wondering if you clicked on a geometry video by mistake well no this is
Full Transcript
- 01:03
definitely physics and physics uses a lot of trigonometry sine cosine tangent [Trigonometry record playing]
- 01:08
you know all the classics just in case you haven't played around with trig
- 01:12
before it's the study of right triangles now you may think well what's there to
- 01:17
study three sides 90 degree angle boom got it but believe it or not
- 01:21
mathematicians managed to make it a bit more complicated and why is this
- 01:26
important to physics well to answer that let's take a drive say we need to get
- 01:30
from home to the store and the good news is it's a straight shot just a quick two [Home and store on a google map]
- 01:35
kilometer drive away and hey we're physicists that's the value of length
- 01:39
kilometers well we've done plenty of work with that kind of thing so we're
- 01:43
just rolling along here and just knowing we have to drive two kilometers isn't [Right triangle driving a car]
- 01:47
going to get us to the store you also have to know what direction to go right
- 01:51
otherwise we might just end up in the middle of nowhere so we need to know
- 01:55
how long the drive is and which way we're going like if the store we're
- 02:00
driving to is two kilometers to the east that's the difference between scalar and
- 02:05
vector quantities well a scalar quantity is it's something
- 02:10
that just has a value you might see that referred to as a magnitude but when we
- 02:16
said we needed to drive two kilometers that was a scalar value a vector
- 02:21
quantity has both a value aka a magnitude and a direction all right so
- 02:27
two kilometers to the east is a vector quantity now we're gonna come back to [Bucket of scalars appear]
- 02:31
scalars and vectors later in the course but it's important we know the basics
- 02:34
here why why is that important well it's pretty obvious that vectors give us more
- 02:39
information and we like information and all vectors can be broken down into
- 02:43
perpendicular horizontal and vertical components using......... trigonometry
- 02:49
yes! all right so let's say the magic word to open up the wonderful [Magician waving wand]
- 02:53
world of trig sohcahtoa not quite the classic like Shazam
- 02:58
but sohcahtoa is a little more useful in the real world before we explain what
- 03:03
that word means well let's take a close look at a right triangle again the
- 03:07
defining characteristic of a right triangle is that 90-degree angle the [90 degree angle in triangle appears]
- 03:11
side of our triangle opposite the right angle is the hypotenuse it's the longest
- 03:16
side of the shape so obviously we've got two other angles and two other sides
- 03:21
well the two other angles are called the complementary angles and what are those [Complimentary angles highlighted]
- 03:26
sides called well they're called the adjacent and the opposite sides but
- 03:31
which is which different which well it depends on which angle were working with
- 03:36
so let's just pick one of the complementary angles and we'll go with
- 03:40
this one well the side of the triangle that's next to the angle and not the
- 03:44
hypotenuse is our adjacent side and the side that's opposite this angle is
- 03:49
well the opposite side makes sense right if we look at the other angle instead [Opposite angle highlighted]
- 03:53
the adjacent and opposite sides change oh and now whichever angle we're looking
- 03:58
at gets this theta symbol it's just a way to show which angle we're dealing
- 04:02
with there are mathematical functions that are a part of trig yeah these
- 04:06
functions relate the angles of a triangle to the lengths of its sides and
- 04:10
you might be asking yourself huh yeah so let's take a second and break a triangle [Man scratching head and stopwatch appears]
- 04:16
down all right what makes a triangle a
- 04:19
triangle those three angles right that's why it's tri angle and if we measure
- 04:23
those angles with the protractors we all keep under our pillows well we find that
- 04:28
when we add up all those angles the sum is 180 degrees and that goes for every
- 04:33
triangle the three interior angles always add up to 180 degrees so in a [Selection of triangles appear]
- 04:38
right triangle we already know that one angle is precisely ninety degrees which
- 04:41
means that the other ninety degrees that are left over will be split up between
- 04:45
the complementary angles so if angle B here is thirty degrees it's buddy angle
- 04:49
C here will be 60 degrees and this is the basis of trig functions in fact
- 04:54
let's investigate one of these functions and we'll start with the sine function
- 04:58
well the sine of an angle is the ratio of the angles opposite side and the [Sine function of angle appears]
- 05:03
hypotenuse and since we're dealing with a ratio it doesn't matter if the
- 05:06
triangle is ginormous or if it's tiny if the angle is the same then the ratio
- 05:12
between the opposite and adjacent sides will be the same another one of
- 05:16
trigonometry's' greatest-hits is the cosine
- 05:20
all right the cosine is the ratio of an angles adjacent side to the hypotenuse [Cosine equation appears]
- 05:24
and last but not least is the tangent that's the ratio of the angles opposite
- 05:29
to its adjacent side okay one more time sine is opposite over hypotenuse cosine
- 05:34
is adjacent over hypotenuse tangent is opposite over adjacent how do we
- 05:41
remember this sohcahtoa and you thought we were just saying gibberish all right
- 05:46
well trigonometry started with this ancient Greek dude named Pythagoras and [Pythagoras with Greek friends appear]
- 05:50
the ancient Greeks took their math pretty seriously and cult even crew
- 05:54
around Pythagoras not a cult as in he was cool and underground and then he hit
- 05:59
it big and everyone called him a sellout a cult as in an actual religious cult
- 06:03
some ancient texts even claimed that if cult members told outsiders about some [Cult member whispering to outsider]
- 06:08
of the math they did well, that member would and should be killed that were a
- 06:12
bit more children then.. also a lot of this stuff was known in China and
- 06:16
Babylon thousands of years before Pythagoras but whatever
- 06:19
Pythagoras name lives on in the Pythagorean theorem might be the most
- 06:22
famous mathematical formula ever or at least close second to that e equals [Pythagoras and Einstein on stage together]
- 06:27
mc-squared the Pythagorean theorem says that the
- 06:30
some of the squares of the two shorter sides of a right triangle, lets call
- 06:35
those A and B equals the square of the hypotenuse which we'll call C so A
- 06:39
squared plus B squared equals C squared and knowing this formula means that if
- 06:44
we know any two sides of a right triangle we can solve for the other side
- 06:48
so if we know A and B we know that C equals the square root of a squared plus [C side of triangle square root of A and B side appears]
- 06:52
B squared Pythagoras you clever dog you thanks for
- 06:56
the help okay so, so far we've been talking a lot of math why don't we just
- 07:00
see all this math in action...Let's say we live out in the country somewhere and
- 07:05
we want to see if Granny Shmoop sent us some birthday cash or our mailbox is five [Woman walks out onto front porch]
- 07:09
hundred meters to the east and five hundred meters to the north we want to
- 07:12
make life a little easier and take the shortest route possible well let's start
- 07:16
by drawing out what we have so far aha it's like we've got ourselves a right
- 07:21
angle it also looks like two sides of a triangle and the shortest path to get
- 07:25
that birthday card from Grandma? Yeah, it's gonna be the hypotenuse of this triangle
- 07:29
right here so our old pal Pythagoras told us that A squared plus B squared
- 07:33
equals C squared and we've got an A and a B here they're both 500 so the [Pythagoras theorem and right triangle appears]
- 07:38
hypotenuse will equal the square root of the sum of 500 meters squared plus 500
- 07:43
meters squared go ahead grab a calculator you don't have one already [Person using a calculator]
- 07:45
and our calculator tells us that the answer is 707 point whatever a whole
- 07:51
buncha numbers that we don't really need to worry about because we only need two
- 07:53
around the closest meter so our little shortcut will be a 707 meters long and
- 07:58
we're dealing with a vector quantity here so we need to factor in that
- 08:02
direction 707 meters northeast and hopefully Grandma come through with a fat [Girl opens mail box and stacks of cash appear]
- 08:07
stack of cash but hold on a second just for funsies let's figure out the angle
- 08:13
we'll be creating by taking this path yes this is what we consider funsies now
- 08:18
we'll be honest we could totally cheat here if you have a right triangle where
- 08:21
the opposite and adjacent sides are the exact same length while the two
- 08:25
complementary angles are gonna be 45 degrees each but if we just spit out
- 08:30
that answer we'd never get to learn about the inverse trig functions yeah [Boy studying at his desk]
- 08:34
there are more than just three trig functions sine cosine and tangent each
- 08:38
have corresponding inverse functions those would be the arcsine, arccosine
- 08:42
and arctangent functions you might also see them written like the
- 08:47
original big three but with a negative one added in the superscript not that
- 08:52
the inverse functions are actually the negative first power it's really just a [Right sided triangle talking under spotlight]
- 08:56
notation convention and what do we mean when we say inverse well if sine(x)
- 09:01
equals y then arcsine y equals x or to put it another way if we know the
- 09:08
degrees in an angle we can use the sine function to find a value for the ratio
- 09:12
between the opposite side and the hypotenuse if we have a right triangle
- 09:17
with a complementary angle of 30 degrees the sine of that angle will be 0.5 also [30 degree angle of triangle appears]
- 09:24
known as 1 over 2 and since sine equals opposite over hypotenuse well that means
- 09:30
that the hypotenuse will be twice as long as the angles opposite side but
- 09:35
what if we don't know the value of that angle well if we know how long the
- 09:38
hypotenuse is and the opposite side is 30 meters for the big H here and 15 for
- 09:45
its little pal oh well we can do that division and find a ratio of 1 over 2
- 09:50
also known as 1/2 yeah we can pop that number into the arcsine function to see
- 09:54
how many degrees are in this angle and what do you know while the arcsine
- 09:58
function tells us the angle is 30 degrees so sine uses the degrees in an [30 degree angle highlighted]
- 10:03
angle to find how the opposite side and hypotenuse are related while its inverse
- 10:08
function arcsine uses the ratio of the opposite side and the hypotenuse to find
- 10:14
how many degrees are in the angle so let's find the value of this angle by
- 10:18
starting with its tangent sohcahtoa reminds us that the tangent is the
- 10:22
opposite over the adjacent and in this case both are 500 meters meaning our
- 10:27
tangent is 1 we can get the value for the angle by applying the inverse [Tangent angle formula appears]
- 10:31
function to each side of the equation now on the left hand side the inverse
- 10:37
tangent and tangent will cancel each other out
- 10:39
making the value of the angle equal to the arctangent of 1 plug that into your
- 10:44
calculator making sure you're using the inverse tangent and that it's set for [Boy using calculator]
- 10:48
degrees and we'll find out the value of the angle is yeah drumroll.......
- 10:52
45-degrees kind of anticlimactic since we already said that's what it would be
- 10:56
but still starting to see how all these triangles are gonna help us influence [Right triangles helping to lift mans boxes]
- 11:00
well that wasn't super heavy on the physics side so look at one more problem
- 11:04
remember our pendulum experiment well it's back baby we're not gonna just
- 11:09
forget about our little pendulum buddy so let's say we've got a pendulum that's [Man puts pendulum on door frame]
- 11:13
half a meter long and we want to know what the height of the weight would be
- 11:17
if we pull the pendulum to a 30-degree angle well because when we pull the
- 11:21
weight to this side it'll be higher up right here's a diagram it looks pretty
- 11:25
triangular doesn't it we've got L for the total length of the string and H for the
- 11:30
difference in height and we want to figure out what the difference in
- 11:32
height will be well let's label each part of this diagram obviously the
- 11:36
length of the string doesn't change so that makes our hypotenuse L which means [hypotenuse labelled L on triangle]
- 11:40
that the vertical part of this triangle equals L minus H and that 30-degree
- 11:45
angle will be our theta so for our angle the vertical side will be the adjacent
- 11:50
side and we know the length of the hypotenuse and yeah, sohcahtoa we've got
- 11:54
ourselves a cosine situation so here's the equation the cosine of theta equals
- 12:00
L minus H the adjacent side over L the hypotenuse now we just have to solve for
- 12:06
H we'll get everything on the same level by multiplying each side by L giving us
- 12:11
L times cosine of theta equals L minus H now we can isolate H the easiest way to
- 12:17
do that is to add H to both sides and then subtract L times cosine theta from
- 12:21
each side and that leaves us with this equation H equals L meters minus the
- 12:26
product of L times the cosine of theta now I can just plug in our numbers H
- 12:31
equals 0.5 meters minus the product of 0.5 meters times the cosine of 30 [Formula appears]
- 12:34
degrees when we use our calculator to find the cosine of 30 degrees there
- 12:38
we've only got one sig fig to deal with here so well that becomes 0.07 meters
- 12:43
also known as seven centimeters now that's bringing trig into the physical
- 12:48
world so there you go some old guy with a weird name did all this math few [Right triangle discussing trigonometry and Pythagoras appears]
- 12:52
thousand years ago and here we are doing it on some piece of technology that
- 12:55
would blow his ancient Greek mind that's right Pythagoras you might have taught
- 12:59
us that the shortest distance between two points is a straight line but we
- 13:03
know better the shortest distance between two points is
- 13:06
whatever our GPS tells us to do [Right triangle hands smart phone to Pythagoras]
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