Learn to Solve Sin & Cos Equations (Solving Trig Equations) - Part 1 [16] - By Math and Science
Transcript
| 00:00 | Well , welcome back . The title of this lesson | |
| 00:02 | is called solving equations with trig functions . This is | |
| 00:05 | part one . Essentially what we're doing in this lesson | |
| 00:07 | is we're learning to solve elementary equations that involve trig | |
| 00:11 | and metric functions . So just like regular equations , | |
| 00:13 | you want to solve for the variable right ? Like | |
| 00:15 | X squared plus two equals three . You want to | |
| 00:17 | solve for X in these equations . The variable we | |
| 00:20 | want to solve for is going to be data right | |
| 00:23 | ? But it gets more complicated because the issue is | |
| 00:25 | that since the unit circle is a circle and they're | |
| 00:28 | often multiple angles in a unit circle that have the | |
| 00:31 | same sine and cosine . Very often in trigonometry , | |
| 00:33 | you can actually have multiple angles , multiple answers for | |
| 00:37 | the the equation that you're trying to solve . So | |
| 00:40 | what usually happens is when you're given a trig and | |
| 00:42 | metric equation , it'll say solve this equation and uh | |
| 00:47 | the answer for data must be between this range between | |
| 00:49 | zero and 360 degrees or between zero and pi or | |
| 00:53 | whatever . The problem may give you a range of | |
| 00:56 | data that is that is acceptable for the answer to | |
| 00:59 | that equation . So what you need to remember is | |
| 01:02 | that the previous lessons , we've already talked about this | |
| 01:04 | , that when you take an arc sine or an | |
| 01:06 | arc co sign or an arc tangent , the calculator | |
| 01:10 | or the computer or the whatever device you're using is | |
| 01:12 | always going to give you the fundamental kind of base | |
| 01:16 | angle in the base range of those uh , inverse | |
| 01:20 | trig functions . And so then you might have to | |
| 01:23 | often take that base angle and look at what the | |
| 01:25 | problem is asking you for and and add 180 degrees | |
| 01:29 | or do some other kind of generations to get to | |
| 01:32 | the actual answer to the problem . Ask you for | |
| 01:35 | so long story short , inverse sine , inverse coastline | |
| 01:37 | , inverse tangent . As operations always give you angles | |
| 01:40 | back in certain ranges , but the problem may say | |
| 01:42 | the angles that acceptable for answers for these equations are | |
| 01:46 | in in in a known range . And so you | |
| 01:47 | may have to to add or subtract or convert . | |
| 01:50 | This is where you have to start using your brain | |
| 01:51 | and you can't just like plug things in . You | |
| 01:54 | have to know what the what the question is asking | |
| 01:56 | you for . So for instance , let's just say | |
| 01:59 | let's do a very simple equation . Sine of theta | |
| 02:02 | is equal to zero , solve for theta . But | |
| 02:05 | It's also known that Fatah can be only in the | |
| 02:08 | range between zero and 360 degrees . Notice it's including | |
| 02:14 | zero but not quite including three and 360 but it's | |
| 02:17 | bigger than zero , less than 3 60 . So | |
| 02:20 | that means essentially the whole unit circle what is basically | |
| 02:23 | telling you is solve that equation . But the angles | |
| 02:26 | that you ain't right down is your answer can be | |
| 02:29 | anywhere between zero all the way around 23 60 but | |
| 02:33 | not including 3 60 because then you'd be back right | |
| 02:35 | on top of where you started from . So many | |
| 02:38 | angles at all , even though we know that this | |
| 02:40 | is a a sign . So when we do the | |
| 02:43 | arc sine , it's only going to give us angles | |
| 02:45 | back in a certain range . We have to provide | |
| 02:47 | essentially all of the angles that satisfied that equation in | |
| 02:51 | this range . So let's just go through with it | |
| 02:54 | and you'll see what I'm talking about . All right | |
| 02:56 | . So I had to be solved this thing . | |
| 02:57 | We apply an inverse sine to the left and an | |
| 03:00 | inverse sine to the right . When we apply an | |
| 03:02 | inverse sine operation to the left , it annihilates the | |
| 03:05 | sign and all that were left . With this data | |
| 03:07 | on the right hand side , we have the inverse | |
| 03:10 | sine of zero . This is what we have to | |
| 03:13 | do . So we applied the inverse sine to the | |
| 03:14 | left that dropped it away inverse sine to the right | |
| 03:17 | . Now we remember that inverse sine from previous lessons | |
| 03:22 | . We've done this in the last lesson . The | |
| 03:24 | inverse sine of the arc sine only returns values back | |
| 03:27 | like from a calculator in this quadrant from negative pi | |
| 03:31 | over two up to positive pi over two . So | |
| 03:35 | if you stick numbers in the calculator and hit inverse | |
| 03:38 | sine inverse sine inverse sine , you'll always get angles | |
| 03:40 | between negative pi over two and positive pi over two | |
| 03:43 | . You will never ever get angles anywhere else in | |
| 03:45 | the circle because that's the kind of the basic range | |
| 03:48 | that covers all the bases . And so that's the | |
| 03:51 | only ones you're going to get back . But our | |
| 03:52 | problem says , give me all angles between zero and | |
| 03:55 | 3 60 that satisfy this . So what you have | |
| 03:58 | to do is find like the basic angle that works | |
| 04:01 | and then check and see if there's any additional angles | |
| 04:03 | around the unit circle that also work . Right ? | |
| 04:06 | So , let's just go through it . All right | |
| 04:08 | . What angle is such that the sine of an | |
| 04:12 | angle is going to give us zero ? All right | |
| 04:14 | , we do that in a calculator . What do | |
| 04:16 | we have here ? Well , if you look at | |
| 04:17 | 0° , the sign is the projection onto the y | |
| 04:20 | axis . So zero degrees . There is no projection | |
| 04:23 | . So the sign of zero is zero . So | |
| 04:25 | , we know that feta can be zero degrees or | |
| 04:29 | zero radiance . And notice that this is the angle | |
| 04:32 | that will be given back to us in the calculator | |
| 04:34 | . Go ahead and hit zero in the calculator , | |
| 04:36 | inverse sine . And you're gonna get zero degrees or | |
| 04:38 | radiance , whatever mode you're in . And that is | |
| 04:40 | right in the middle of this range , negative pi | |
| 04:42 | over two up to five or two zeros right in | |
| 04:44 | the middle . So that's why it gave us that | |
| 04:45 | as an answer . However , are there any other | |
| 04:48 | angles around the unit circle that also give the sign | |
| 04:52 | of that angle to be zero ? Well , if | |
| 04:53 | you look on the other side of the unit circle | |
| 04:55 | over here at pi , what is the sine of | |
| 04:58 | pi ? Well , the projection onto the y axis | |
| 05:00 | over here is also zero . So it's outside the | |
| 05:03 | range of the fundamental range of the arc sine function | |
| 05:06 | . The calculator will never give you pies and answer | |
| 05:08 | . But our equation says give me all angles from | |
| 05:11 | 0 to 3 60 that satisfy this Only in this | |
| 05:14 | range though . And so we then know that this | |
| 05:16 | is one of the angles And then we put in | |
| 05:19 | and down here . And then we say that data | |
| 05:21 | can then be 180° or pie radiance . Just writing | |
| 05:26 | it in degrees and radiant . So we get some | |
| 05:27 | practice with both . So that's what you write down | |
| 05:30 | . So we're looking for all angles in this range | |
| 05:32 | where the sign is zero , the sign is zero | |
| 05:34 | right here , the sign is zero right here . | |
| 05:37 | If I go around again Notice there's no equal sign | |
| 05:40 | under 3 60 . So I don't write 360° now | |
| 05:43 | because it's not included in the range of data that | |
| 05:45 | it wants . But you I mean obviously you know | |
| 05:48 | that you can keep spinning around the unit circle , | |
| 05:50 | adding 3 60 adding 3 60 over and over and | |
| 05:52 | you'll get tons of angles . But all of those | |
| 05:54 | other ones are outside of the range it cares about | |
| 05:56 | . So that's why I harp so much about what | |
| 05:59 | the uh kind of the basic range of an arc | |
| 06:02 | sine our coastline is . That's why I emphasized it | |
| 06:05 | so much because that's the angle the calculator will give | |
| 06:07 | you . It's like the base angle . But in | |
| 06:10 | real equations , you often have a wider range of | |
| 06:12 | angles that you're hunting for that satisfy the equation . | |
| 06:15 | So you need to get the base angle first and | |
| 06:17 | then often you add 1 80 or subtract 1 80 | |
| 06:19 | or something . Notice the first thing we got with | |
| 06:21 | zero and then we added 1 80 that also satisfies | |
| 06:24 | the equation . Often you'll be adding or subtracting 1 | |
| 06:27 | 80 sometimes other things , but that's a very often | |
| 06:30 | a very common thing that you will do . So | |
| 06:32 | that's the solution to problem number one . So , | |
| 06:35 | we have two answers and these two answers are equally | |
| 06:37 | valid When you put 100 and 80 in here signed | |
| 06:40 | 180 0 . When you put zero in here sign | |
| 06:42 | of zero is also zero . They both work . | |
| 06:44 | Now let's take a look at the tangent of uh | |
| 06:49 | I guess I'll put in Princess tangent of Theta is | |
| 06:52 | equal to zero . Tanja is equal to zero . | |
| 06:54 | And again , tha can be between zero and 3 | |
| 06:57 | 60 . But of course not including 3 60 . | |
| 07:00 | All right . Now , what we need to do | |
| 07:02 | to find data is apply the inverse tangent to both | |
| 07:04 | sides so we can get rid of this and and | |
| 07:06 | put data by itself . So Fada will be the | |
| 07:08 | inverse tangent . Arc tangent of zero . Or you | |
| 07:12 | can write it as tangent with little negative one there | |
| 07:15 | . All right . So , essentially what you're trying | |
| 07:17 | to do is you're trying to take the arc tangent | |
| 07:20 | of zero . Now , you know that tangent or | |
| 07:23 | arc tangent is going to only as a function . | |
| 07:25 | It's only going to give you values back in the | |
| 07:27 | right hand side of the plane . From negative pi | |
| 07:30 | over two up to pi over two . That's what | |
| 07:31 | we learned a long time ago . That's the basic | |
| 07:34 | answer . And you may have to look for additional | |
| 07:36 | answers in this range that satisfy the equation . So | |
| 07:39 | you can think of it like this but I actually | |
| 07:41 | prefer especially for tangent to come down here and say | |
| 07:44 | what we're really hunting for is the sign of some | |
| 07:47 | angle over the co sign of some angle and the | |
| 07:50 | and the rain and the angle is going to be | |
| 07:51 | in this range here um is gonna be equal to | |
| 07:54 | zero . Now , if you have sine over cosine | |
| 07:56 | equals zero . What you're trying to figure out is | |
| 07:59 | what angles make it such that when you do the | |
| 08:01 | division you get zero . So what this really means | |
| 08:03 | that since you want to zero here you want sign | |
| 08:06 | of the angle to be zero . Because if the | |
| 08:09 | numerator goes to zero you have a zero over anything | |
| 08:12 | you want is going to give you zero even infinity | |
| 08:14 | . So it doesn't really matter . Well it does | |
| 08:17 | matter but I'm just trying to tell you that to | |
| 08:19 | figure out the angles that make it go to zero | |
| 08:21 | . All you have to do is find out where | |
| 08:22 | the numerator goes to zero . Where is sign of | |
| 08:25 | zero equals zero . Where a sign of zero equals | |
| 08:28 | zero . The angle that you're looking for is zero | |
| 08:31 | degrees or zero radiance . So if you go put | |
| 08:35 | zero in a calculator and do the inverse to do | |
| 08:38 | the tangent of zero , you're gonna get zero . | |
| 08:41 | Um and it's also in the proper range . Alright | |
| 08:44 | , so here we are 0°. . But are there | |
| 08:47 | any other angles in this full circle range that make | |
| 08:51 | the tangent go to zero basically ? Are there any | |
| 08:53 | other angles that make the sign go to zero ? | |
| 08:55 | It's the same questions before we go over here to | |
| 08:58 | pie . And over here at Pi Sine of Pi | |
| 09:01 | is also going to be zero . So we also | |
| 09:03 | say and FAHA can be pie or 0° I guess | |
| 09:09 | I wrote it backwards , but you get the idea | |
| 09:11 | . So actually in this case we have two different | |
| 09:13 | equations and we get these exact same answers . And | |
| 09:16 | the reason that we get the exact same answers because | |
| 09:18 | the first equation was the sign . Tell me where | |
| 09:21 | the angles where the sign of that angle is zero | |
| 09:23 | . The second equation is tell me the angles where | |
| 09:26 | the tangent is zero . But when you think about | |
| 09:28 | it , that's the same angles where the sign is | |
| 09:30 | also zero . So it gives you the exact same | |
| 09:32 | answer , even though it's a different equation . And | |
| 09:34 | we have found all the angles in this range first | |
| 09:37 | by finding the fundamental angle in this range and then | |
| 09:40 | , you know , in this case adding 180 to | |
| 09:42 | figure out additional ones . But I don't want you | |
| 09:45 | to think , Oh I'll just add 180 every time | |
| 09:47 | because it's not going to be the case , you | |
| 09:48 | have to think through it , right ? So let's | |
| 09:51 | take a look at the next one . Let's say | |
| 09:53 | we have the tangent of some angle theta and that's | |
| 09:57 | equal to one . And in this case the range | |
| 10:00 | of data for this equation can be between zero and | |
| 10:04 | 3 , 16 . And for this lesson , all | |
| 10:06 | of the ranges of data will be here . But | |
| 10:09 | just know that when you solve other equations down the | |
| 10:11 | line , more complicated equations , the range of data | |
| 10:14 | that you're told to to bind yourself by or to | |
| 10:17 | look for will be different . Okay , it maybe | |
| 10:20 | even between zero and 90 or zero and 100 and | |
| 10:22 | 80 it'll lock it down in different ways . Here | |
| 10:24 | , we're just starting . So we just choose the | |
| 10:27 | entire unit circle . Tell me all angles in the | |
| 10:29 | unit circle where the tangent of the angle is one | |
| 10:32 | . Okay , so you do the inverse tangent uh | |
| 10:35 | to to um to both sides . And what you | |
| 10:38 | basically figure out is that the uh data is going | |
| 10:42 | to be the inverse tangent of one , right ? | |
| 10:47 | The inverse tangent of the left , inverse tangent of | |
| 10:49 | the right . And so you go over here and | |
| 10:50 | say , well again , where is it going to | |
| 10:52 | give me angles back ? The tangent function gives me | |
| 10:55 | angles over here . All right . So you can | |
| 10:59 | think of it that way . You know I mean | |
| 11:01 | it's fine to say inverse tangent of one . But | |
| 11:03 | really , even though I wrote this here , really | |
| 11:05 | , I like to come down here and say , | |
| 11:06 | well the tangent is the sine of the angle divided | |
| 11:09 | by the co sine of the angle . And basically | |
| 11:11 | I'm trying to figure out all locations around the unit | |
| 11:14 | circle where the sign of the coastline is one . | |
| 11:16 | So when you think through it though , the tangent | |
| 11:20 | is sine over the co sign . So the only | |
| 11:22 | way that can be one is if the sign and | |
| 11:24 | the co signer equal in magnitude right equal . And | |
| 11:27 | that's only at 45 degrees because you know , at | |
| 11:29 | 45 degrees . The sign is a squared of 2/2 | |
| 11:32 | . And the co sign also the squared of two | |
| 11:34 | over to so . And that is also in the | |
| 11:36 | correct quadrant uh for the tangent up there or the | |
| 11:39 | correct , You know uh 45° up here is in | |
| 11:42 | the shaded region . So we then say that data | |
| 11:45 | can be 45° or pi over four , just converting | |
| 11:50 | its radiance there . And the reason that , you | |
| 11:53 | know that I'll just kind of write it off to | |
| 11:54 | the side . It's because the sine of pi over | |
| 11:59 | four over the co sign of pi over four is | |
| 12:04 | square root 2/2 over square root 2/2 . And that | |
| 12:08 | equals one . So that angle is the only angle | |
| 12:11 | that gives you a positive uh tangent of one like | |
| 12:14 | this and it's in the correct quadrant . Now the | |
| 12:18 | quadrant , the actual range of angles that we need | |
| 12:20 | to hunt for is the entire unit circle . So | |
| 12:23 | are there any other um angles where the tangent will | |
| 12:28 | be a positive one like this ? So you start | |
| 12:31 | thinking about it right ? Let's go over to our | |
| 12:32 | unit circle and actually look . So we basically said | |
| 12:36 | is the base angle for the solution to that equation | |
| 12:39 | ? Is that pirate before ? Because Sine over cosine | |
| 12:42 | is one that's the tangent right Now if we go | |
| 12:44 | over to this quadrant here , if we try to | |
| 12:46 | divide sign divided by co sign , we're still gonna | |
| 12:49 | get a one but it'll be a negative one because | |
| 12:51 | we divide here . If we go to this quadrant | |
| 12:54 | over here we'll have a sign divided by a coastline | |
| 12:56 | . But again it'll be negative one . So it | |
| 12:58 | can't be this quadrant and it can't be this quadrant | |
| 13:00 | . But if we spin all the way around totally | |
| 13:02 | diagonal . So this one over here at 225 degrees | |
| 13:05 | , the sign is negative square 2/2 . The coastline | |
| 13:09 | is also -2 or two because the projections are on | |
| 13:11 | the negative access . But when you divide them you | |
| 13:13 | still get a positive one . So basically by taking | |
| 13:17 | this and again adding 180° and going totally opposite . | |
| 13:21 | We get to another quadrant where the sign and the | |
| 13:24 | co signer negative . But the tangent is still a | |
| 13:26 | positive number so that we can say . And feta | |
| 13:30 | can be 225 degrees or uh five pi over for | |
| 13:37 | me . Just check myself 225 degrees or 554 And | |
| 13:40 | you circle both of those . So we're trying to | |
| 13:42 | find all angles within 360 degree circle that work 45°. | |
| 13:46 | . Works right here . It's kind of like put | |
| 13:50 | this out here , pi over four works and then | |
| 13:52 | if you spend all the way around over here , | |
| 13:55 | five pi over four or 225 degrees also works in | |
| 13:59 | quadrant . One sign over co sign gives you positive | |
| 14:03 | one . In quadrant three . Sign over coastline also | |
| 14:06 | gives you positive one because that sign and the coastline | |
| 14:09 | are both negative here . In this quadrant , the | |
| 14:11 | tangents negative and in this quadrant the tangents also negative | |
| 14:14 | because you have opposite signs on the sign and the | |
| 14:16 | coastline . So with Tanja , you really have to | |
| 14:18 | think about what quadrant you're in to get the correct | |
| 14:20 | answer . All right now , the last problem we | |
| 14:24 | have . I don't really want to say it's tricky | |
| 14:26 | , but it does require us to think just a | |
| 14:28 | little bit . All right , so let's solve the | |
| 14:32 | equation sign of feta Is equal to negative one . | |
| 14:36 | And let's do it in the same range . Data | |
| 14:38 | has to be bigger than or equal to zero in | |
| 14:41 | less than 360°. . So what we'll do is the | |
| 14:46 | same thing . We always do . Well come down | |
| 14:48 | here and we'll say imply the inverse sine to the | |
| 14:50 | left and the inverse sine to the right . So | |
| 14:52 | we'll have data is inverse sine of -1 . And | |
| 14:57 | we know that the inverse sine is going to prove | |
| 15:01 | in a calculator . Anyway , it's gonna give us | |
| 15:03 | angles back that are gonna be in the right hand | |
| 15:05 | plane like this . From negative pi over two up | |
| 15:08 | to positive pi over two . Okay , so let's | |
| 15:11 | go and take a look at this and see what | |
| 15:12 | happens essentially . What we're asking ourselves is what angle | |
| 15:16 | in that range is such that the sign of that | |
| 15:19 | angle is negative one . So , where can it | |
| 15:21 | be ? What is the sign of zero sign of | |
| 15:23 | zero ? Zero ? Because there's no projection on the | |
| 15:25 | y axis . What's the sine of pi over two | |
| 15:27 | ? Up here . The entire thing lies on the | |
| 15:30 | lines of the sign is one , but we want | |
| 15:32 | negative one . So if we go down here then | |
| 15:34 | we see , okay , down here at this angle | |
| 15:36 | , the sign is a negative one as well . | |
| 15:41 | Okay , so what we right here is to say | |
| 15:43 | , well the base angle of what the calculator would | |
| 15:45 | give us go and put it in the calculator , | |
| 15:47 | hit negative one , hit the inverse sine button and | |
| 15:49 | see what it gives you . It's going to tell | |
| 15:50 | you that the angle is negative pi over two , | |
| 15:53 | which is exactly in the range of what we said | |
| 15:55 | , negative pi over two , up to pie or | |
| 15:57 | two for the sign . And it's giving me negative | |
| 15:59 | pi over two because here the projection is exactly on | |
| 16:01 | the negative one part of the y axis . So | |
| 16:04 | this is the base angle , right negative pi over | |
| 16:06 | two . However , look at the answers it wants | |
| 16:09 | us to give us it says solve this equation but | |
| 16:12 | give me angles back that exists from zero up to | |
| 16:14 | 360 degrees . Let me ask you 0 to 3 | |
| 16:18 | 60 . 0 to 3 60 is negative pi over | |
| 16:21 | to between zero and 3 60 or zero and two | |
| 16:23 | pi . If you want to think about ratings . | |
| 16:25 | Is it in the range ? I mean we know | |
| 16:26 | that it's down here and we can find another angle | |
| 16:29 | that has the same label . But literally negative pi | |
| 16:32 | over two is not in the range because negative pi | |
| 16:34 | over two is actually even less than zero . So | |
| 16:37 | the this is an example of when the bass range | |
| 16:39 | that a calculator gives you back is not in the | |
| 16:42 | range that they tell you the angle can be for | |
| 16:45 | the answer to that equation . So even though the | |
| 16:47 | calculator gives you that angle , you cannot circle , | |
| 16:49 | that angle is the answer . This is a great | |
| 16:52 | way to get a question wrong without really because you're | |
| 16:54 | not thinking about it , it gave you an answer | |
| 16:57 | outside of the range of what you're allowed to get | |
| 17:00 | . So how do you figure that out ? So | |
| 17:01 | then you say well , ok , I can't put | |
| 17:03 | pi over two down there . So what angle is | |
| 17:05 | in that range ? I know it's down here . | |
| 17:07 | So you go , well this is pi over two | |
| 17:09 | , I'm sorry , this is pi over two then | |
| 17:11 | to pi over two , this is three pi over | |
| 17:13 | two down here . So what you then say is | |
| 17:14 | data is really equal to three pi over two or | |
| 17:19 | um 270 degrees . This is the angle that you | |
| 17:23 | circle because three pi over two or 270 degrees is | |
| 17:26 | in the range , noticed 2 70 is right here | |
| 17:29 | . So if you want to check yourself , go | |
| 17:32 | down here to to 73 pi over two , the | |
| 17:33 | sine is negative one . So you can verify that | |
| 17:36 | . It's correct . I realize and I recognize that | |
| 17:38 | this gets confusing because I've been telling you that the | |
| 17:41 | arc sine only gives you angles back in a certain | |
| 17:43 | range and now I'm telling you to reject the answer | |
| 17:46 | that it gives you and give me another answer . | |
| 17:48 | Well that's that's the way the game is played . | |
| 17:50 | The calculator . As you get farther in math , | |
| 17:52 | you're gonna realize just using a calculator is not going | |
| 17:54 | to help you so much . Because the answer is | |
| 17:56 | a calculator gives , you can be outside of the | |
| 17:59 | range of what the problem is telling you to give | |
| 18:01 | you . The problem is saying only give me angles | |
| 18:04 | that make this equation work between zero and 360 degrees | |
| 18:08 | . Not including 360 . Don't give me any angles | |
| 18:10 | outside of that . So you stick this in there | |
| 18:12 | . You do the inverse sine or you think about | |
| 18:15 | the where it is in the circle and say , | |
| 18:16 | okay , that's a negative pi over two . So | |
| 18:18 | you circle pi over two and it's wrong . It's | |
| 18:20 | because negative private use not in this rain . So | |
| 18:22 | you have to think . You have to you can't | |
| 18:24 | just do you have to think , Okay , the | |
| 18:26 | angle is here . It's labeled as negative pi over | |
| 18:28 | two because that's the base angle of what the calculator | |
| 18:30 | will give me . But I need to express this | |
| 18:32 | location in this range . Okay . So I got | |
| 18:35 | to go in a positive sense poverty to private 23 | |
| 18:37 | prior to this is the same location , same angle | |
| 18:40 | now it's in the range and in this case I | |
| 18:43 | only have one angle in this range of a complete | |
| 18:47 | circle . That gives me the sign equal to negative | |
| 18:50 | one and all the other problems that had two angles | |
| 18:52 | that worked and there were 180° apart . Two angles | |
| 18:55 | work 180 degrees apart . Two angles work 180 degrees | |
| 18:58 | apart . Here I give you a problem where you | |
| 19:00 | do not have to angles 180 degrees apart . You | |
| 19:02 | only have one angle and also you have to reject | |
| 19:05 | your base angle anyway and count in the positive sense | |
| 19:07 | to get there . So that's why I can't tell | |
| 19:10 | you . Oh yeah . Just get the answers and | |
| 19:11 | add 1 80 all the time . You can't you | |
| 19:13 | can't do that . You have to know what the | |
| 19:15 | problem is asking and think logically about what's required . | |
| 19:18 | This problem only has one solution in this range . | |
| 19:21 | Okay , so make sure you can solve these yourself | |
| 19:24 | . They're all good little problems . They're not super | |
| 19:26 | hard , but they do require you to think . | |
| 19:27 | Follow me on to the next lesson . We're gonna | |
| 19:29 | get more practice with solving equations that involve trigonometry , | |
| 19:33 | trig and metric functions . |
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