| 00:00 | well they always have a copy to . Mhm. Happy thoughts. You |
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| 00:09 | . $20. Oh yes, I it would be that one. Oh |
|
| 00:21 | , no. They do eat in asia. Yes, I'll come back |
|
| 00:32 | them. Stop them. So. hmm hmm hmm hmm hmm hmm hmm |
|
| 00:39 | . Hopefully everyone also remote uh schedule is after script that was well. |
|
| 00:58 | the second thing we have to do and this is our story customs, |
|
| 01:05 | presidents from one of the problems The implants and support what or like |
|
| 01:16 | similar. So I guess what? you for that. Given that the |
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| 01:22 | was actually enough Africans that have been . I don't feel so bad enough |
|
| 01:35 | touted as anything class victor. Obviously is a serious issue or something that's |
|
| 01:47 | class. What about remember stuff. we'll see what response the preferences inquest |
|
| 02:02 | the gambles because yes, I do for a remote taxes. But I |
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| 02:07 | that formal schedule it is Of So I guess I presume it's |
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| 02:24 | yep. So, and as I , so that's what I will do |
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| 02:34 | when next week I will be once week and I would hope together. |
|
| 02:44 | examples this week. So you have . Mm hmm That's close. Close |
|
| 02:53 | . Closed notes. Yes. no, no. Mm hmm. |
|
| 03:08 | is my reference. The former Either way obviously exposed books. There |
|
| 03:20 | different types of questions and his open are not so sure. Mhm. |
|
| 03:31 | question. But usually attractive design So it's not a question of memorizing |
|
| 03:44 | all. Ah but so that more now that reminds me very much they |
|
| 03:56 | some principle and that should be probably generation or for stuff solution four clients |
|
| 04:07 | you're not thinking about it. That's . I definitely remember pretty much. |
|
| 04:22 | about you? What formally shades can have formally sheets? Yes in the |
|
| 04:31 | except maybe some simple things that I to remember of his life status us |
|
| 04:40 | simple very common function that resolved I corporate on that almost every lecture. |
|
| 05:01 | yeah find them is to design So I tried to do with the |
|
| 05:12 | , the reasoning and telling us what understood from it that it's important part |
|
| 05:16 | to memorize got some defense. You there is something there's something and examples |
|
| 05:32 | kind of innovation calculations simple for us do it. So it's a conservative |
|
| 05:46 | to problems think about this. they're coming. Mhm. Yeah. |
|
| 05:59 | ? Right. We'll understand there's someone that that were attending the high performance |
|
| 06:11 | we were talking about having the student thinking that we're probably ending the hybrid |
|
| 06:19 | of the class that they couldn't quite . What? Oh I see. |
|
| 06:24 | for the lectures will continue to do . So for the rest of the |
|
| 06:28 | is just at the exams they It's easier for us to manage and |
|
| 06:36 | will do them in class but all lectures we will continue to offer that's |
|
| 06:43 | hungry. So it's okay other questions it's not. So I will and |
|
| 07:05 | to start start start with calculus clients I mentioned very briefly at the end |
|
| 07:12 | the spectrum so I can't. Okay various the reason because France as I |
|
| 07:22 | this, let's place the collection of owners instead of falling over. So |
|
| 07:28 | talk about the contestants but there are to construct what. So I think |
|
| 07:41 | difference is I said last time when sort of alluded to with you. |
|
| 07:51 | What same song that was very easy understand in that case was biographical and |
|
| 07:59 | meals from the integration. And we a way off constructing those conduct them |
|
| 08:09 | that integration method was. But the between what did you sing or Simpson |
|
| 08:22 | compliance is that there is conditions on movement. So when you move from |
|
| 08:27 | interval to the next, there was conditions. Yeah. Well we did |
|
| 08:35 | symptoms in addition to the state board in the functions that there was 10 |
|
| 08:42 | but otherwise of course no condition or that should connect and the continuous |
|
| 08:47 | Yes. How smooth. Mr Right. So that's respond to be |
|
| 08:54 | difference about all those clients. And want to talk about what kind of |
|
| 08:59 | conditions you can refer and what the and how you can construct. So |
|
| 09:12 | they're going to be I guess one concept that this sounds. No, |
|
| 09:16 | not already knows being used for the and the nose were the ones or |
|
| 09:26 | independent variable um values public. We to do interpolation. Now there's these |
|
| 09:37 | that independent variable values where you want have smooth movements, condition. So |
|
| 09:48 | the nuts and the notes can be same one shoulder and several examples but |
|
| 09:55 | are not necessarily saying you can construct so that you have in the the |
|
| 10:04 | points kind of a different from wherever want. And I'll show you an |
|
| 10:10 | support because it's just so the two have different purposes. That's the thing |
|
| 10:20 | conceptually. That should be alright. . So we have this already in |
|
| 10:29 | of rule effectively, but now they're approximation of the piece um function. |
|
| 10:40 | want to talk about dr admission So I think that most of |
|
| 10:45 | I hope all of them systematically. is kind of used for they probably |
|
| 10:53 | smoothness conditions that in this case it's explicit on the sidelines with another bunch |
|
| 10:59 | examples. But one thing that is and this uh construction of this destroys |
|
| 11:11 | function that it is continuous and that the case also chapters or because the |
|
| 11:18 | is all go we have the function from the state fund segments constructed subject |
|
| 11:24 | function to them. Um I'll come to that, wow. So and |
|
| 11:39 | . So this is coming, that's what it would look like that. |
|
| 11:44 | now instead of having the single Maryland not because it's peaceful seniors. So |
|
| 11:51 | a different peaceful single function between their . And it's one of the so |
|
| 11:58 | the spine is that this whole collection as and when it comes to the |
|
| 12:03 | base line weapons, all these polynomial about the most first degree. So |
|
| 12:11 | one of the polynomial looks like this they can all of the different coming |
|
| 12:16 | . But in this case different. huh. This place slopes on the |
|
| 12:22 | times between the not which are also used their notes. And this particular |
|
| 12:29 | because there is also where the interpolation done. Mm hmm mm hmm mm |
|
| 12:34 | . But the knots miss than where corner no meals doing each other. |
|
| 12:39 | that's what you have broadcast competition. here's some of the requirements for thanks |
|
| 12:49 | countless is fine. And I think one of the first degree that that's |
|
| 12:56 | to be closer. That means that end points. Oh, They are |
|
| 13:01 | one the access of interest between A B. That the end points should |
|
| 13:07 | included for the polynomial. Uh Sorry. But it's starting at |
|
| 13:15 | Should, you know the first three normal. But it should also be |
|
| 13:18 | for a consumer. The last function divide that big. The enforcer bunch |
|
| 13:25 | interior points published from the US. conditions. Um, so, and |
|
| 13:38 | continuity sense. Now there are different um, on this interval and different |
|
| 13:50 | over this interval. So the what's bottom here. Despite this the harder |
|
| 14:00 | continuity and there's going to approach. on election point whichever. Sometimes I |
|
| 14:08 | such that to take the limited to to us from the left side and |
|
| 14:13 | coming to the value s from the side for larger X values the limit |
|
| 14:21 | process. It's the second that that's working community conditions. Um So your |
|
| 14:32 | go back and look at what they . And the chapters are also that |
|
| 14:38 | in fact what this stuff is all use this in defining the integral in |
|
| 14:46 | space for the function there in And B. This construction with |
|
| 14:52 | Is that formally? It's fine. not? So the condition was the |
|
| 15:01 | should be included and that's obvious the space firstly in the function that is |
|
| 15:09 | in the Iraqi Soldier. But I it will be. So that's kind |
|
| 15:16 | what else is it? You it is Each of these different polynomial |
|
| 15:22 | the first order polynomial. Just checking too. And it wasn't next. |
|
| 15:31 | was supposed to be continuous. Yes, correct. Nice. Here |
|
| 15:41 | . So in this game. the fact of the matter and basically |
|
| 15:46 | chapters or will kind of defined. , that's fine. The first two |
|
| 15:52 | then use the stuff for the That was it. So not |
|
| 15:58 | A great example the pictures are trying figure out with this separate polynomial. |
|
| 16:04 | they have There's three different inter rocks one. It's 1 - zero. |
|
| 16:10 | is the one and 1 15 and each one we have it polynomial |
|
| 16:17 | So now we're going to try to out if this is dang what? |
|
| 16:25 | no you have to have a closed too. Finance one is included. |
|
| 16:33 | the first polynomial A certain well defined -1 And the other is the last |
|
| 16:42 | in which is also one of the on certain posts in there. |
|
| 16:50 | That's also so I might contain sm for that zero is equal to |
|
| 17:02 | But then the as X approaches zero sms is from above. Is |
|
| 17:12 | Yes. Okay. So yes. they're not there are one or the |
|
| 17:21 | . Right? That's what to pay . They kind of going at |
|
| 17:27 | It's an internal 10 and one is internal one particular next time. So |
|
| 17:35 | a right so controlled. Um And first ah not here from the best |
|
| 17:45 | X. and the gun goes to . On the other hand this polynomial |
|
| 17:51 | becomes is continuous. Actually points out happens I have been putting on the |
|
| 18:02 | the fact that The other not for value Then it is in fact there |
|
| 18:09 | is continuous at the other one. it doesn't help you. It has |
|
| 18:13 | be continuous with all the uh space . So now that's the question, |
|
| 18:24 | they're constructed and they come down with most is perfect and simple example. |
|
| 18:31 | , well we talked about how Manami is there can use this formulation. |
|
| 18:37 | the question is, can we use for also or just specifying what common |
|
| 18:53 | ? So why not just use each of them on the wall? So |
|
| 19:14 | it kind of worked for the first is flying but that's kind of the |
|
| 19:19 | thing that it doesn't work. Mhm reason is that by doing the construction |
|
| 19:28 | in the bottom of the interval, doesn't capture the small press condition between |
|
| 19:36 | things for us. It needs something . And working currently smooth for the |
|
| 19:43 | degree is finding was only continuity but thinking about activities and the game continues |
|
| 19:49 | well. Mm hmm. That was that. Oh with the film. |
|
| 19:59 | , so this is just yes will more or less the same thing as |
|
| 20:04 | we have what they did for the all known except again think of |
|
| 20:12 | But then there's a perspective between two points. So then this one best |
|
| 20:21 | right there down. Let's go get think the board some cases. So |
|
| 20:26 | use this new formulation where you then it's one endpoint another. So |
|
| 20:32 | hmm. Mm hmm mm hmm. to the next 10 points. Some |
|
| 20:37 | their kids um for each polynomial then needs Us to specify two things I |
|
| 20:47 | to specify the the starting value from interval. Am Nr cases. |
|
| 20:54 | so these are two parameters are holding pints straight sides. It's always going |
|
| 20:59 | have to end parameters. two Parameters every interval. Mm hmm. This |
|
| 21:06 | never end into the wall to the . Mm hmm. Ha. Also |
|
| 21:13 | doing the interpolation here, We basically two conditions. One police, one |
|
| 21:19 | the two conditions as well. So are and that I was using um |
|
| 21:29 | the success some comments and I would to write to gold And in that |
|
| 21:35 | then yes to find a particular you need to figure out, switch |
|
| 21:40 | , exit the argument if you use formulation instead of spending that kind of |
|
| 21:47 | them a no meals and we kind already have in the world that's fixing |
|
| 21:54 | something else. And that's one. look at the accuracy and it looks |
|
| 22:01 | little bit different the structure. So , I want to talk to It |
|
| 22:09 | just using this while there is a which is sometimes for continuous and rice |
|
| 22:18 | related to the make a point. say that the derivative. It's a |
|
| 22:30 | function that at least the Derivative between main points. Yes. Equal to |
|
| 22:41 | . So, um, that's important one single. And I don't mind |
|
| 22:47 | this module of the continuous deserves especially look at function violence at three different |
|
| 22:54 | . You will the United States and between A and B. And then |
|
| 23:02 | the maximum difference between these two function . Ah that will be different. |
|
| 23:09 | you and me anywhere in the But the point that I want to |
|
| 23:13 | this is basically if you will be then it's just a nice function |
|
| 23:20 | well behaved then the maximum value Difference function values of those points eventually zero |
|
| 23:29 | As opposed to zero then well then has not helped in the function. |
|
| 23:34 | . Yes. Well you're the So that's something for the ceremony is |
|
| 23:43 | couple of sites that follows here. continuity and addressed themselves Specific and a |
|
| 23:55 | 870 positive number then there is. so you have a function that takes |
|
| 24:04 | input arguments the X. And then . Value of Earth that the same |
|
| 24:11 | the other the way also we have learning this simplicity. So if this |
|
| 24:18 | an important that as an output through different input values ah and regardless of |
|
| 24:28 | Excellent. What about this book than some sense, if there are close |
|
| 24:36 | , then also the difference in the values are close enough and it's kind |
|
| 24:42 | stated backwards in some sense of you this difference and function values to be |
|
| 24:50 | than whatever epsilon depicts. And if uniformly continues, you can always find |
|
| 24:55 | extreme violence. There are also closed they're coming up on the functions that |
|
| 25:01 | held by the late the principal. . Um, so if you just |
|
| 25:08 | the small difference in the they just to figure out small, someone needs |
|
| 25:15 | be to satisfy variation for difference in function. Violence after it's small |
|
| 25:21 | And as soon as probably continues, can always find figure out yourself. |
|
| 25:25 | parallel victor parra between A and C. And 3/4 of the way |
|
| 25:38 | . Ah, So that's good. and that's what said, well, |
|
| 25:46 | it's continuous about behavior can use that . There can be no beef. |
|
| 25:51 | deliberative distraction. That's kind of what 40 cents. So it's just |
|
| 26:00 | Let's continue. Okay. That is just to complete itself from here. |
|
| 26:11 | terms of the river things, you think of it. There's basically three |
|
| 26:15 | squared And if that's where effects is than export is 16 and that |
|
| 26:24 | Yes, you are Than users and morning and that's But this notion of |
|
| 26:34 | continuity, it's done. And here's an example please discussed earlier Suggested about |
|
| 26:46 | interject one direction losing so that everyone or used tractors always or any one |
|
| 26:56 | these rules. It doesn't work because over X. The derivative of one |
|
| 27:03 | Rex. It's not bounded that they're to do m one sufficiently both. |
|
| 27:12 | , except for zero them. can't find this uniform or comfortable. |
|
| 27:26 | are other forms of integration. Integration interaction and that's this sport. So |
|
| 27:39 | this case to go back to the and they didn't put a normal approximations |
|
| 27:44 | picking up what the error and the nation was between the function F and |
|
| 27:52 | polynomial. And in that case he to take your serious expansion and the |
|
| 27:59 | term was that um less than the or the driver? The proper factor |
|
| 28:09 | terms of in front of the derivative the border that was not into. |
|
| 28:21 | . Some indicate a serious expansion. then we have the intermediate point between |
|
| 28:27 | endpoints on the interval. And then was the tail issues in terms of |
|
| 28:34 | is done highly related. They choose use this module is a continuity that |
|
| 28:39 | it's the function Now that is continuous has narratives. Then you can use |
|
| 28:46 | they had on the previous slides and error between the functional polynomial. The |
|
| 28:55 | and obvious in terms of these And we can look at each one |
|
| 28:58 | the intervals in this kind of this of knowledge, he's going to maximize |
|
| 29:03 | benefit. How much the function of and No, no, something |
|
| 29:14 | Mm hmm. So it looks the . But there's some intuition about thinking |
|
| 29:20 | the intervals and assuming that's a nice . That's not a lot of the |
|
| 29:25 | smaller the variable costs. Yes. , promotional consideration. And there's a |
|
| 29:35 | of expressions I so of the book overlooked at the as an exercise that |
|
| 29:43 | managed love to this one. That the first derivative. Oh the |
|
| 29:53 | And with a maximum of first limited meat. Of all of the h |
|
| 30:01 | Any any one of these. It's length intervals but it doesn't have to |
|
| 30:09 | but any interval of length and the term of the derivatives in that think |
|
| 30:14 | all. And then you have this all. Ah this one, it |
|
| 30:22 | a little bit better if it also a second relative that behaves well. |
|
| 30:26 | this one is actually Electoral eight And the version and it was about one |
|
| 30:37 | the length of the innovation. But have a sense the way of proving |
|
| 30:40 | this is actually true. So from . Mhm. Um So, so |
|
| 31:03 | this clients, because again, we um this unicorn continuity is dealing with |
|
| 31:10 | intervals. Um when we did the population before it was wonderful and normal |
|
| 31:21 | . Um So the whole interval is be as opposed these boys are smaller |
|
| 31:28 | of all. So in that case we wanted to talk traditional daughters stuff |
|
| 31:35 | increase the number of interpolation points Better approximations. But when it came |
|
| 31:47 | this, another function that wasn't right? Because we added points and |
|
| 31:51 | they were equal space, they started get more and more mature is so |
|
| 31:55 | deviation the maximum difference between the polynomial and the active german function that increasing |
|
| 32:02 | more points. So this notion all of dealing with this modules are continuity |
|
| 32:14 | looking at small intervals and test As said that one. And the point |
|
| 32:21 | it's better we expect to approximation you have low order polynomial on small |
|
| 32:34 | so you can have the same number points. But instead of trying to |
|
| 32:38 | one polynomial off to use a a small number of points that no |
|
| 32:44 | no meals and then you get But that's the reason why clients are |
|
| 32:54 | very widely used. So we get collection of the enormous and 70% of |
|
| 33:02 | over because you have a better approximation what function. Any questions on |
|
| 33:15 | Start the second. So I have great force. So that's simple. |
|
| 33:29 | the polynomial is on each one of symptoms. Maybe up to a degree |
|
| 33:35 | be constant, first or second degree not higher than second degree. Still |
|
| 33:43 | same role. That should be post And now for the second degree polynomial |
|
| 33:52 | have both the polynomial itself. For collection there should be continuous at the |
|
| 33:59 | while Camilla's join each other but also first thing of it. So you |
|
| 34:10 | at the first degree polynomial is the , The inner function. Obviously the |
|
| 34:15 | was not continue to consider the but everyone is also the first derivatives. |
|
| 34:26 | standards from the left side on the side of the other side. Um |
|
| 34:33 | one of them. Alright, so see that's an example. Let's try |
|
| 34:40 | figure out whether this one is what explains. So now the conditions was |
|
| 34:48 | to distribute them. I understand that what we are included. There is |
|
| 34:58 | first people in order to have is the second degree this from 2nd reading |
|
| 35:05 | but it's not voluntary so that's two less. So this has the potential |
|
| 35:10 | be a. That explains for that need to verify not only that it |
|
| 35:19 | um but also that the derivative is . Okay but this one was eating |
|
| 35:31 | institute so now we need to figure out one third. Ah The function |
|
| 35:40 | up for the polynomial. The correctional are continues so there's the right value |
|
| 35:47 | the zero not in the 11 not the same but also driven itself. |
|
| 35:56 | see and that's why I'm here. can start with the function itself accused |
|
| 36:05 | polynomial Are the values of three knots same for the left, left and |
|
| 36:13 | from the normal. I want to it zero and 0. So he's |
|
| 36:26 | on the same values that's right. off one of our respect one. |
|
| 36:36 | . Alright. So it's continuous. was good. So then you put |
|
| 36:40 | on the next side. So now a question about the driven um but |
|
| 36:47 | also have said this continues right Now can look at the derivative at |
|
| 36:55 | That should be if the driven team explain when it comes to x. |
|
| 37:02 | this is -3. That's what zero. The same values five |
|
| 37:12 | that one. And on the next is uh, one person. So |
|
| 37:20 | one turns into minus T. Rex the derivative two. That's one. |
|
| 37:29 | , this one um, the derivative mine too. Um, so the |
|
| 37:42 | . So now is also continuous. that was one that closed interval and |
|
| 37:52 | the functionally the collection of calling your form a continuous function and the derivative |
|
| 38:01 | this production of polynomial of the knots also continues. So I want to |
|
| 38:09 | case for now. It's a question the reconstruction, it's true that the |
|
| 38:18 | . Mm hmm. But I may a first degree in investment again. |
|
| 38:25 | then you're gonna stop formulation with each interpolation exported to the endpoints that the |
|
| 38:31 | of the line and we have enough to specify. Now we have a |
|
| 38:41 | bit more. Mm hmm. Are worried about somehow? We have don't |
|
| 38:48 | up for me going on right and that things a little bit more because |
|
| 38:57 | only have three. Something on the of the slide, right, has |
|
| 39:06 | values that needs to be said specifying there first a great, we only |
|
| 39:12 | D. N C. Effectively. they have three product military reforms. |
|
| 39:19 | . So now we just believe three foundations. Now the interpolation part. |
|
| 39:30 | best for ourselves that the yes, best for the endpoint conditions are right |
|
| 39:37 | them. Yeah, mm hmm. have a condition on the value of |
|
| 39:48 | cubes but the next and the right the interpretation but that's too. But |
|
| 39:55 | the Simpson rule was stuck in preparation in the mid point but we don't |
|
| 40:03 | that thing. You don't know the . Y you just have to. |
|
| 40:13 | . So this is something that I right, we have interpolation conditions against |
|
| 40:19 | this future and conditions right there for , given what we know what with |
|
| 40:26 | . So there's still to learn conditions it was for the first degree. |
|
| 40:30 | that now we're still missing and conditions we needed three. So right. |
|
| 40:41 | what they did. So look, , I don't know what to use |
|
| 40:48 | tradition on what that explains that not the function but the derivative also needed |
|
| 40:53 | be 13. So when we look and not the derivative of the following |
|
| 41:01 | the left and the on the right for any intervals that obviously and |
|
| 41:11 | not in the middle Double two and there is. Mhm. So that |
|
| 41:23 | with us. Now you can have things up three and - launched so |
|
| 41:29 | still missing. Well, well, see, wow. So that's what |
|
| 41:37 | said and the one is used for expands is one degree of freedom that |
|
| 41:45 | can use sponsors slightly different problems. one has to suggest someone can for |
|
| 41:54 | specify the derivative is one of the conservative in terms of this movement condition |
|
| 42:01 | only a the interior, not not . So you can arbitrarily choose |
|
| 42:08 | We want the for instance of zero the second derivative this area or something |
|
| 42:13 | that. But wanted to your freedom these interpolation conditions and the smoothness doesn't |
|
| 42:27 | this in terms of the conditions and . So the first thing is to |
|
| 42:33 | enough conditions that they can specify for parameters will be 2nd step, how |
|
| 42:39 | we use it to actually get So here we are actually pathetic |
|
| 42:51 | And those are probation conditions we talked and that is enough conditions. And |
|
| 43:02 | there were foundations on the river. and we'll find that sort of a |
|
| 43:12 | procedure is being used in the Yes. Two. Uh huh. |
|
| 43:22 | we're still close enough. I think is. Okay, so so the |
|
| 43:33 | um starting point ah that has been in the book for defining responds. |
|
| 43:44 | this darks. So the highest order that is supposed to be continued in |
|
| 43:53 | second of a difference. 1 2nd is flying only the first derivative is |
|
| 44:02 | to be continued. So if you a quadratic polynomial, take the derivative |
|
| 44:10 | we get the first degree polynomial. so so this is kind of now |
|
| 44:17 | of doing your phenomenal itself, it like distributive but it's kind of doing |
|
| 44:23 | straight kind of approximation between. Do you have any values at the |
|
| 44:28 | and 4 but they don't know So we're going to have a machinery |
|
| 44:34 | figure out how to get those But if they were known they can |
|
| 44:38 | a straight line approximation that started first and make sure it's continuous. The |
|
| 44:45 | derivative doesn't have to have an additional condition. It just has the big |
|
| 44:52 | . So, so this is essentially little bit just the water is written |
|
| 44:59 | different things But this is kind of new 10 or so formulation from a |
|
| 45:04 | line between ah Ci Ci plus one the now the derivative five past |
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| 45:14 | that one. And so it's just straight fund in terms of the request |
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| 45:23 | , when we looked up earlier neutral intended to write the constant first at |
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| 45:29 | of the endpoints and second term was slope of the line fans moving along |
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| 45:36 | lines of years before. So and of course they needed continuity of the |
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| 45:48 | polynomial themselves. So the left and right polynomial should have the same |
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| 45:53 | So now I think that's an equation the views and that's fine. No |
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| 46:01 | integration for this than the and it's of victim in his performance. So |
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| 46:12 | wines, it's the concept that it the relative it disappears. Um So |
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| 46:19 | we can see the derivative of this . This is fresh. So now |
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| 46:25 | in so basically in this one we figured out that this constructive subjects |
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| 46:33 | It's your crime but then did not to serve them. This new function |
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| 46:39 | also considered. Did that here? we'll figure out if that's my |
|
| 46:47 | So yeah. So quick plug in T. R. And this expression |
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| 46:55 | this film scores And what is that function value or at the left hand |
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| 47:01 | of that is what it was supposed be in an Interpol insert function. |
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| 47:09 | And that's the content. What's that have done here. But um let's |
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| 47:17 | at the function value of Q. . C. I. Plus |
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| 47:22 | Yeah. We're also sorry not jumping . So let's look at. Uh |
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| 47:32 | . Sorry. Uh He was first by construction must begin T. |
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| 47:39 | And this expression is for the ways becomes er and plus one This becomes |
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| 47:44 | one. And then you can see the story is private, straightforward to |
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| 47:52 | expression. It was constructed. That shouldn't be surprised that now it looks |
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| 47:59 | this if you believe in that if look at the construction of the next |
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| 48:05 | ci last one just to face. mean I passed one everywhere there's also |
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| 48:11 | that then Next polynomial tr plus one its left hand point. The ci |
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| 48:19 | one which is also the value of left for no one at the |
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| 48:25 | So you can see that the derivative Wisconsin. Okay, so now let's |
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| 48:35 | what happens here. So now this mhm right. It is necessary and |
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| 48:47 | shoulders. The he's palla normal as right does the same value of why |
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| 48:58 | respond in this case as the next . So the ipad first interval has |
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| 49:04 | left. If that's constructed in the way that everything here will just |
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| 49:09 | That's one. So it's obvious that actress 1st polynomial has its left end |
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| 49:15 | is that's one sort of thing is show that The left hand point the |
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| 49:22 | pulling over for respect to your class also. Yes sir. So |
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| 49:34 | so if they just insists that that true University of Drug Ntr plus one |
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| 49:42 | this expression um hmm. Then you it so we can see our first |
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| 49:51 | whatever it is. X. By arguments you left last month then it's |
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| 49:58 | right hand side should evaluate to by custom. So if you do that |
|
| 50:08 | . Now and This equation plugging in . R. Plus one then you |
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| 50:14 | tr plus one minus T. And we have a denominator disappears and |
|
| 50:20 | um denominator. And then this is the managed ci and then you just |
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| 50:27 | terms. So we had it to equal to the high plus one. |
|
| 50:32 | you can say that that's on the hand side and we can move the |
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| 50:35 | the left hand side. Um These parenthesis became tr plus 1, 1 |
|
| 50:41 | so They spent around two and clean up. And then the question more |
|
| 50:48 | to um relationship in this case between derivative value of ci one of the |
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| 50:57 | with the nervous but there are other and if this relationship holds then both |
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| 51:05 | . Prime, thank you are continuous all. Now these were given interpolation |
|
| 51:15 | and these were the given not. were often used for incorporation in this |
|
| 51:21 | . So this is a known So basically You can just start at |
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| 51:27 | equals zero and then all the other followers. And then you can go |
|
| 51:33 | and stick it into this question and you have the definition of pulling |
|
| 51:39 | Mhm. So I think that's for seventh year. So and this is |
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| 51:47 | of disease for the derivative values. So if you start with the zero |
|
| 51:56 | all the rest of it follows as function of Z0 Now. And that's |
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| 52:02 | the C0 was a derivative. The 10 points if you should agree it |
|
| 52:11 | on the previous slide but you can that to zero and then all of |
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| 52:14 | other ones. So so this is aware of them getting the coefficients |
|
| 52:26 | All of us 2nd degree polynomial was all the do we know? |
|
| 52:37 | So that's where that was the That was. That's a good |
|
| 52:44 | Yes. So that's where we have conditions from the smoothness conditions inc gave |
|
| 52:53 | the two man and I never said conditions on the first day of |
|
| 52:59 | Did you have ammunition and -1. we were missing. And that's a |
|
| 53:03 | of freedom. So One can do against one type of super spies. |
|
| 53:10 | you use this criteria it could be one and their their policy. But |
|
| 53:16 | need to make one decision on your if the machine doesn't. And so |
|
| 53:23 | this this would be zero. And you said that 200 then what we |
|
| 53:30 | follow. So 74 27. So have a instruction in the polynomial secondary |
|
| 53:49 | . And this is something for not for that defines the second degree |
|
| 53:56 | each of the intervals. And then was needed was the seas and the |
|
| 54:01 | . You get out of this machinery is defined except for Say the starting |
|
| 54:09 | . That was an arbitrary choice. these are known from the circulation. |
|
| 54:17 | is again that summarizes and this is example of it. Just for the |
|
| 54:25 | is fine darkness. Yes. The thing is well, you know, |
|
| 54:35 | can see this that the derivative on left and the right is the same |
|
| 54:39 | in my school Burns Doctor Shopping. all the difference. Yeah. And |
|
| 54:47 | this finishing use the different obviously because that it is not serious and responsible |
|
| 54:52 | something. So let's illustrate again the rule as I said a few |
|
| 55:07 | Doesn't have the smokiness conditions between wow conservative intervals just to see if someone |
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| 55:14 | this ambulance. But there's no small foundations don't english with the loss. |
|
| 55:30 | . Both into all. That's It's a little more time. But |
|
| 55:34 | one who continues yes, continue conservative . That's why the correctional quadratic polynomial |
|
| 55:47 | is underlying the Simpsons. Ooh, not define this part. Yeah, |
|
| 56:00 | more question. That's the point. the next example is one that is |
|
| 56:12 | trying to illustrate that one type of . They don't nodes, nodes and |
|
| 56:22 | . I'm not the same. So choose that smoothness conditions and other |
|
| 56:32 | Mm hmm. Right from the So let's go. So in this |
|
| 56:47 | . So in this case the interpolation looks like Tuesday nights and get points |
|
| 56:58 | these intervals I guess where we know landings. Thus the two imports have |
|
| 57:05 | in the first so once no, collection of projected polynomial bring him to |
|
| 57:13 | in this case for the first section third separate but that is falling on |
|
| 57:20 | for these three intervals but they're supposed approximately function at the left and right |
|
| 57:29 | . Thus the three hit points and the interpolation of the voice and then |
|
| 57:38 | smoother condition supplies wherever or no one's to each other so small. This |
|
| 57:45 | to be. So the condition that notations you stand that we have the |
|
| 57:58 | . Are they interpolation points. And tease here the knots, the mother |
|
| 58:09 | smokiness condition or something important conditions as smoothness conditions have taken points because there's |
|
| 58:18 | one polynomial so we can have some . But what? That was part |
|
| 58:25 | the thing that happens in and those were the same in the previous |
|
| 58:31 | Then we have to and an orbiter . That was only wonderful. |
|
| 58:39 | So uh let's see another. Uh . So so now we have this |
|
| 58:52 | a normal again, the first thing the derivative is um first the hateful |
|
| 58:58 | no help the second degree and yeah retrospective formulation for so I have a |
|
| 59:18 | and gracefully. It's still between the 10 points respectively. See And this |
|
| 59:32 | the interval that if you have an constant then is the difference between |
|
| 59:40 | no the and then define the solution that tells the point for them. |
|
| 59:56 | , it's a bit message to verify . In fact that's some of my |
|
| 60:05 | use the finance this particular way are . Well let's see from now again |
|
| 60:17 | can see what the values are first not. Um And point of the |
|
| 60:29 | law. So in that case we the 17 years. Another minus |
|
| 60:38 | So I hope so playing around with thing what yet um So minus the |
|
| 60:49 | and it's just an expression for talent the rest yet half of the financial |
|
| 60:58 | in um And the defendant. Mm . This Very, very point type |
|
| 61:12 | seven points. And we can also used for. Mm hmm. The |
|
| 61:18 | important ci plus one instead of this expression. You simplify it knowing what |
|
| 61:26 | is and then plug it in when won't talk to us. Now it |
|
| 61:31 | out. So it is a straight approximation. That's satisfying foundation. It's |
|
| 61:38 | dream that he would have been known marketing and evaluated. But I still |
|
| 61:42 | know the sea ice and this we need more conditions in order to the |
|
| 61:49 | . I want those. Um, I'm standing with you integration. So |
|
| 61:58 | we have accused and now we have cues. Then we can use the |
|
| 62:05 | condition double surprise. And that was of this was the constant that disappears |
|
| 62:16 | this depression zone. This is where can see. But that's a good |
|
| 62:19 | to see to make sure that this does what it's supposed to do. |
|
| 62:25 | which is the, it's just coming now the interpolation conditions and this |
|
| 62:32 | So this is the polynomial. And . Mhm. Inter promotion point index |
|
| 62:40 | one more than that index of the . So that this space we should |
|
| 62:46 | and the towel And that is my one in because it's sort of on |
|
| 62:54 | risk investments like this. No How High Class one And want to |
|
| 63:00 | them. This disappears and just So yes, but having the constant |
|
| 63:06 | the interpolation points then it satisfies the conditions for the people. And so |
|
| 63:18 | that case you have any interpolation one of the intervals ah and we |
|
| 63:28 | so let's see the next one that have summarized and then have it. |
|
| 63:35 | they interglacial conditions that was and they me for many of the conditions on |
|
| 63:43 | first derivative that was satisfied by construction by that too. And that's for |
|
| 63:49 | internal points. There's N -1 of . And this is very simple Examples |
|
| 63:55 | three intervals how the best teams are for they published. So we have |
|
| 64:04 | know what and plus and -1. we have two N -1 conditions. |
|
| 64:12 | the immediate conditions. So now the is what was not, I will |
|
| 64:27 | the continuity of the delivery. I think the prevention Prevention four. |
|
| 64:48 | , I will not do this. continuity condition on the polynomial. |
|
| 64:54 | Not to have the continuity on the delivered in that cannot have interpolation in |
|
| 65:03 | midst of not understanding ensuring that. rightfully so did you ever think of |
|
| 65:11 | same continuity? So that's send one well. Okay. And that things |
|
| 65:22 | . Mm hmm. That somehow you . Okay. Sylvester talking about. |
|
| 65:31 | we have where there is continuity on Tuesday birthday go. Internal points to |
|
| 65:40 | up with three N -2 in And then we have the incorporation of |
|
| 65:44 | two endpoints. But we did not yesterday, inc in the middle. |
|
| 65:49 | that's now that's two more. So they end up opinion and I think |
|
| 65:56 | so big let's say in terms of to, I had to put down |
|
| 66:02 | now look the continuity of rightful and one of the knots and then get |
|
| 66:12 | yeah, that is joining knots from left and the right side. That |
|
| 66:15 | supposed to be the same. And lots of expressions for the solo normals |
|
| 66:20 | then you that's great enough for And the right polynomial, they're supposed |
|
| 66:28 | be the same. Mm hmm. knowing what towers that that midpoint it |
|
| 66:36 | simplify expressions in terms of these and mill around and help with this |
|
| 66:43 | your best. Again. Any question looks up. So it's nothing. |
|
| 66:49 | the point is the continuity conditions and the left and right for the normal |
|
| 66:59 | but then we only have unknowns in case, You know, we have |
|
| 67:04 | wise are known because we know why the super and we know tao and |
|
| 67:10 | things you don't know or disease. we get an equation here. See |
|
| 67:15 | that put conditions obviously it should be order to satisfy the continuity conditions for |
|
| 67:22 | point on itself and it comes So what's known as these things as |
|
| 67:33 | values in the intervals that you suggested and we know about the length of |
|
| 67:39 | intervals are the edges. So the that are not announced or disease. |
|
| 67:47 | and I have this for Yeah and equations. But it's a tool of |
|
| 67:58 | And -1 sees for the internal So in principle make sure you have |
|
| 68:05 | equations. Mhm. Figure out Now one thing to looking for a |
|
| 68:14 | thing, it's essentially diagonal system of questions there. We unknown disease. |
|
| 68:26 | do you think of it as a spectrum type formulation for going over their |
|
| 68:33 | ? And that's basically three non 0 in a row that corresponds to the |
|
| 68:40 | scenes and they are kind of sliding um okay, it comes guests will |
|
| 68:49 | up from the slight soon. So have these conditions and then Yeah, |
|
| 68:55 | he's not the additional conditions to and . Before the specificity. Where's |
|
| 69:03 | Yeah. Yeah. So um That's for the first one. And |
|
| 69:19 | similar to the endpoint. Mm So just 10 points value where they |
|
| 69:31 | because of this form for the first . This The question and their natural |
|
| 69:39 | 101 t zero. The left stand . Do you have an expression? |
|
| 69:49 | the now involves non value and to this situation? Yes, this one |
|
| 69:56 | then you can give you the right environment interpolation condition. So now you |
|
| 70:04 | this relationship. So kind of in middle to have the strike there |
|
| 70:11 | Uh huh at the bottom of this and for I equals zero equals |
|
| 70:25 | Any questions for that. Oh this . No we're not. And that's |
|
| 70:34 | . So that's it. So so what I was thinking of respect |
|
| 70:39 | This is from the interpolation on the hand point and then we have this |
|
| 70:47 | journal points and then we have the question that comes from the population at |
|
| 70:54 | right hand point. So the best this now we have the china system |
|
| 71:01 | the question and you have enough Nothing can solve it for a lot |
|
| 71:07 | difference. Mm hmm. So it's little bit more complicated machinery to get |
|
| 71:13 | this space. The derivative values the Internals. # two in points. |
|
| 71:26 | it comes from the interpolation conditions in first. So that part of |
|
| 71:35 | So in the spines and events and they talked about um directed questions. |
|
| 71:41 | it was way back a lot of pay attention to try the ignition systems |
|
| 71:46 | you're going to use them to talk there's an ex alcoholic you end up |
|
| 71:52 | triangle systems in order. Yeah, following defines that's not fully known as |
|
| 71:59 | differences. Address to what they So once you have disease. |
|
| 72:11 | What? Mm hmm. Mhm That's . Any questions on that benefits. |
|
| 72:31 | one thing is that we have thursday between the degree of the spine and |
|
| 72:47 | to smooth best foundation 6 25 so Okay so so and so as to |
|
| 72:59 | it says at least in terms of have the first risk fine. I |
|
| 73:09 | to by the conditions on the derivative wouldn't end up there saying in every |
|
| 73:20 | and that obviously doesn't. So there a connection between how many derivatives thank |
|
| 73:29 | , forced to be continuous in respect the order of the So it is |
|
| 73:37 | to what distance sensors that can have driver thinks of an order up to |
|
| 73:46 | less than the order as part of most blessed condition. And that's probably |
|
| 73:54 | than two. In terms of the polynomial they worked out how to have |
|
| 74:00 | the function or the themselves to form continuous function but also derivatives was continuous |
|
| 74:08 | different thing boss. That was the order. They didn't try to do |
|
| 74:15 | . So that was an example of an example. So for the first |
|
| 74:20 | the function itself but no derivative. order fine function. The first one |
|
| 74:28 | everything but not trying to push it the so what this set of science |
|
| 74:37 | to tell you that if you try insist that even in the face, |
|
| 74:42 | of them but eric falling over the relative, it is the same but |
|
| 74:50 | knots left and right then in fact to push it to become one across |
|
| 74:57 | hall. So this is what it . So yeah, that's all for |
|
| 75:04 | one already in the sense of So besides a few look at the |
|
| 75:15 | learn from approaching and the correct or . So the african right. And |
|
| 75:19 | supposed to be the same for the conditions. And if you force it |
|
| 75:27 | B, that makes sense. These for the normal CS functions and forward |
|
| 75:34 | and right for normal P and Yeah. There's the other derivatives From |
|
| 75:43 | up to whatever and order community. want to be the same other |
|
| 75:52 | Well, that's that's coming continuity. . So now yes, I tried |
|
| 75:59 | push it. So it also includes empty of everything then the local potato |
|
| 76:06 | expansion. That's where all the derivatives the same. And in fact ends |
|
| 76:13 | , he told them them terrific than are in fact the same paranoia. |
|
| 76:20 | that's best for us. All one to stay with him. So one |
|
| 76:25 | to increase the degree of the polynomial the different intervals. Ah Such |
|
| 76:31 | there are always the one degree higher and everything that's a lot of this |
|
| 76:43 | . So I think that's what it's . Right, okay. No, |
|
| 76:50 | didn't, the second point talked about degree expands next time. So you're |
|
| 77:02 | among the most widely used the 2nd in response from the country function |
|
| 77:10 | . That's what we used to 2nd was not that sounds wrong, but |
|
| 77:21 | inside the views as well. And of the integration some of the |
|
| 77:32 | And as an aside computer graphics to some surfaces and low complexity, some |
|
| 77:43 | our genetic offspring desolate destruction and divisive domains. You lose your spine, |
|
| 77:50 | sub domain. This is the same breakfast part of the differential equations. |
|
| 77:59 | . We will construct their spending an that much of the main of the |
|
| 78:10 | and the whole system of equations based no these supplements from approximately or we |
|
| 78:21 | find out too. That's the final of finance and that's assembly lines, |
|
| 78:27 | formulation and also it speaks first approximation . Okay, thank you. |
|
| 78:41 | so they just hopefully the inquest later . Great. The radio report. |
|
| 78:53 | break for the midterm is gonna be monday after. Right. That's the |
|
| 78:59 | it's scheduled them. If there's an with that. But you know, |
|
| 79:05 | to the preference not to do it but have adapted as the usually is |
|
| 79:08 | case in this class. And then be the ring before spring break. |
|
| 79:14 | trying to give you some examples. one. Mm hmm. Uh |
|
| 79:21 | Okay, interesting. Thank you. you. Thank you. Thank |
|
