| 01:34 | I don't know. Yeah. So right. So I was thinking |
|
| 01:49 | was it's the curse of construction. starting with his his press constant. |
|
| 01:58 | Spiers mm hmm. They ended up getting is probably gonna smoke and shapes |
|
| 02:05 | higher the degree for the spine. spine because of come on then you're |
|
| 02:14 | combination depending on that's obviously the degree the spine increases by one wherever step |
|
| 02:26 | . So what was it? Uh then there may I stand up. |
|
| 02:32 | great. Eventually something approximation function within combination of spine solved whichever degree he |
|
| 02:46 | . Um So in this case G just the representation or the consequence of |
|
| 02:54 | in this, in your combination of of the cave. And then when |
|
| 03:00 | comes to the place and then we're to use this d to approximate some |
|
| 03:07 | functions has said some of the Mm hmm. Then there was this |
|
| 03:16 | you towards the end of last slide last lecture to basically or as they |
|
| 03:26 | made for making things convenient instead of to go through. So these steps |
|
| 03:34 | for funding the cd case or the order these points the best to try |
|
| 03:41 | reduce it to um things based on piecewise constant. Mm hmm. |
|
| 03:51 | So this was just one step and to show that to start with something |
|
| 03:56 | is a combination of 70 degrees There is kind of way of reducing |
|
| 04:04 | instead of linear combination of one order over these points. And there is |
|
| 04:13 | way of computing the corresponding coefficients the combination of lower order these spines and |
|
| 04:21 | can continue with this process over and This was an expression of this |
|
| 04:29 | So one of the advantages of having kind of form is that for any |
|
| 04:34 | X there's only one of these guys is not zero. So once you |
|
| 04:41 | the interval then there's only one of eyes that is A non zero and |
|
| 04:48 | for that new gaps. The value this finger combination as being this |
|
| 04:56 | Now the coefficients that started out and guess it's expression the idea is that |
|
| 05:07 | are constant, suitably chosen constant together , I have desirable properties so they |
|
| 05:14 | not functions of acts in this process we see they become dependent on |
|
| 05:24 | And I'll show an example later I have to do this. So that's |
|
| 05:30 | thing that I want this like Uh she said yes. So so |
|
| 05:39 | though this is an infinite sum. from just this picture and some other |
|
| 05:50 | and not right for anything degree. , if it's part of this |
|
| 05:58 | they have just abounded support which was interval of the in this case independent |
|
| 06:06 | X Where there are non zero. basically this intimate sometimes of being a |
|
| 06:14 | some that only was a few of points and how many involves depends on |
|
| 06:20 | breed the big spot. So I as far as they were kind of |
|
| 06:27 | a little bit better and I don't there is not so pretty that just |
|
| 06:31 | of see what's going on. So ended up with this some of the |
|
| 06:38 | here where This is K two These are the ones that are start |
|
| 06:47 | here that are not dependent on facts then the subsequent columns here are ces |
|
| 06:57 | from the others in the first column saying this form right here. So |
|
| 07:01 | kind of the curse is done in superscript phones. Okay down so that |
|
| 07:09 | camera as well all the way into depths terrible and depending upon where you |
|
| 07:17 | your ex evaluation to be invested in interval that determines what the lower subscript |
|
| 07:25 | . Insurance objects. Oh in the points for. They're not in terms |
|
| 07:34 | defining a variable you can see So it's texas and just interval there |
|
| 07:43 | a few of them that that's what Hello playback. I am the degree |
|
| 07:51 | the this plan is the support interval the piece points stretches kind of further |
|
| 08:00 | from something notes. So that's why get a bunch of these things that |
|
| 08:05 | need that is determined by the degree he's fine. So, so it's |
|
| 08:15 | of things for me, come at least I think about it as |
|
| 08:20 | they want some point here. They depending on what degrees at this point |
|
| 08:25 | have kind of started um earlier That's right. So you have to |
|
| 08:40 | um Yeah, so we're going to this. We can conclude for |
|
| 08:49 | So let's see what oh and that's point here is to show that the |
|
| 08:54 | of them Um as 1 um that relevant there are degrees span because of |
|
| 09:04 | . There is only one of them any given X. Is mm hmm |
|
| 09:08 | and all of the others are So the internet, someone picking up |
|
| 09:12 | of the Australia and I'm also sure that's right too simplistically for first degree |
|
| 09:20 | because and in that case there's an between two slides because the support is |
|
| 09:25 | too well. So in that case ramped up at the same rate as |
|
| 09:30 | other one ramp down. So there's also ended up being one ah the |
|
| 09:37 | fascinated by picture. And then now can also ensure what's done by induction |
|
| 09:42 | is being done here uh for any green spine. Well that's okay but |
|
| 09:52 | of them are always fun. So yeah, so in this case it's |
|
| 10:01 | us over that the coefficients into one any given function is okay. The |
|
| 10:08 | is that these some of these. some of the beast that's quickly instructed |
|
| 10:16 | , then we have the formula here so on. There's conduction something but |
|
| 10:23 | far as simple. So this is , Both of these places are |
|
| 10:30 | whether it's for all lines forgiven supreme then we can see that these two |
|
| 10:38 | as for the access cancels out. what the gap is that uh, |
|
| 10:47 | same expression um the top and the . So either. Mm hmm. |
|
| 10:58 | and that best at getting this some wants. So it's started preserved If |
|
| 11:02 | happens three times for the one for Hello. So in that case baseball |
|
| 11:14 | have been used once here to start the and some of the values issues |
|
| 11:21 | the first month this formula and shoulder person steps here ends up being |
|
| 11:31 | So the minister becomes to some of zeros that we already suffering. |
|
| 11:43 | What you set out to do So any questions on that Yes manipulation of |
|
| 11:51 | expressions. So hopefully they want to now. So they want basically this |
|
| 12:02 | of these funds the transportation for some if more precisely the way we do |
|
| 12:11 | at this point. And then of we have to do even approximations now |
|
| 12:17 | interpolation is that they want this expression this sort of the exact same values |
|
| 12:24 | the selected points for the interpolation. we want the exact match and we |
|
| 12:31 | this impression to fill out an estimate my tea between the no more points |
|
| 12:39 | the interpolation. So the question is do they get these? And in |
|
| 12:47 | cases the simple process and for the for this zero in the first |
|
| 12:55 | Calling on House. It's a bit competent for the second renewing these points |
|
| 13:03 | I will go through don't 40 persons not former drank it. So, |
|
| 13:17 | one thing that I think it's but keep in mind certain things are very |
|
| 13:26 | or the same as for the spine based on binomial. So we did |
|
| 13:34 | about something. So also different. all these things are computed um It's |
|
| 13:42 | or less the same for 1st and degree polynomial. Zero, first degree |
|
| 13:49 | . These points. As for the , it's quite different. I would |
|
| 13:53 | for second to me these parts. one thing that is permanent also that |
|
| 14:02 | there at all for 2nd and 3rd second and higher degree. These lines |
|
| 14:10 | lines. These points based on the meals. The there was degrees of |
|
| 14:17 | . So we have to make Ah I think the prosthetics clients based |
|
| 14:26 | binomial. I was used to refer the second derivative at one of the |
|
| 14:32 | points. And so the doctor responds was second related to the both imports |
|
| 14:38 | 2° of freedom. So all right with me. These plants and they |
|
| 14:48 | the very responsible for these first So that is pretty simple. So |
|
| 14:55 | you want to be zero degree. He's fighting for this asbestos. |
|
| 15:03 | But it's constant. The payments are and dispensed. So, but it |
|
| 15:15 | . So remember that necessarily or from properties of the least concept. They're |
|
| 15:21 | and non-0 and then there are one a particular in the morning and everybody |
|
| 15:28 | . So in this case to do in a combination of the zero degree |
|
| 15:32 | plans, it's pretty straightforward just to that's the conditions, the values that |
|
| 15:41 | want to interpolate at that point because of his eyes there one at the |
|
| 15:50 | hand point. That's quite one. argument absolutely close the installation point |
|
| 15:58 | Yeah. Mm hmm. So you spend an answer in constant why I |
|
| 16:07 | the interval from whatever the notes are inspirational. So that's pretty step |
|
| 16:21 | Oh first. So first responders, not that much more complicated. So |
|
| 16:32 | this case when I first really wants kind of help function. So The |
|
| 16:38 | is students of all this within your of two. Ah these fines that |
|
| 16:43 | kind of shifted 40 degree. Mm . These plants are shifted by |
|
| 16:50 | So About the functional one laps after . Staff. Yeah. So in |
|
| 16:58 | case that's the property again. Ah way the these points are index, |
|
| 17:07 | ends up being this practical function always when there is a difference in one |
|
| 17:14 | Arguments that the er here and then zero. The argument that ci But |
|
| 17:20 | arguments plus one. Then it's a . So by the display, there's |
|
| 17:27 | one of these first degree. He's standing. That is, wow Any |
|
| 17:34 | of the interpolation points because of these to the left. zero. They |
|
| 17:38 | down until the right. It just up. So there's only one of |
|
| 17:43 | that there is and don't tell your . So it's not gonna they just |
|
| 17:49 | the wait in the linear combination of functions or first degree boost lines as |
|
| 17:57 | the integration our values. That's the . So, but it's pretty |
|
| 18:08 | The new interpolation or the zero for something. There are first degree in |
|
| 18:17 | parts in the sense that was also because when we look at the these |
|
| 18:28 | ah they uh and our kids get about the first example. Mm |
|
| 18:39 | So that's the first order no Then the coefficients in the first order |
|
| 18:48 | . The two were fully determined by interpolation conditions. So we didn't need |
|
| 18:52 | else. And we couldn't specify anything except continue waiting. Not great. |
|
| 19:04 | that's fine. Yeah, it sounds how this works. That was |
|
| 19:09 | There's only one that they want to that nonsense. one thing to |
|
| 19:18 | No, it's tough. Ah for they left most. And also they |
|
| 19:28 | there's the first thing we explained that starch to the left for this. |
|
| 19:33 | don't necessarily have. Oh, the and similar. The last one first |
|
| 19:42 | spine that extends one in the yard you want to do. Not. |
|
| 19:49 | interpolation. So and that will come sooner degrees. Find steps. There |
|
| 19:57 | for the interpolation or any spines. has to date. Conscientious. All |
|
| 20:04 | to the left to the right. you are contribute to the population. |
|
| 20:14 | . Okay. 0 1st. Please . Okay, I'm sorry, a |
|
| 20:24 | bit. Mm hmm. So the general form again. Oh, |
|
| 20:34 | . We need at this point. . A millionaire combination. Okay. |
|
| 20:42 | . And for whatever it is in book and it's also reflected on the |
|
| 20:47 | that changed there. Simple for the from C to a now will |
|
| 20:54 | Well, a bunch of the slides , but there's nothing different compared to |
|
| 21:01 | was used before. Yeah. So that's when I discovered Tyrone in this |
|
| 21:15 | , inc conditions do not get sufficient to the all of the coefficients and |
|
| 21:23 | accommodation. And there's kind of one when K is to the face of |
|
| 21:32 | . Oh okay, that's fine. kind of respect what goes on |
|
| 21:37 | which they have. This problem And in order to account for the |
|
| 21:47 | interval, uh and the indexing that used for the playing the starting point |
|
| 21:57 | response. That invested support is three from the second baseline. There was |
|
| 22:04 | for them first through the spine. why it's convenient to use this form |
|
| 22:12 | there is a difference in the index that kind of reflects more or less |
|
| 22:16 | far to the left. You need account for the second degree spots. |
|
| 22:23 | they're further back then shifted by two there are zero. So you don't |
|
| 22:28 | to worry about them and there's so and that's what I think it's a |
|
| 22:35 | of details slides but I thought it be good to go through it against |
|
| 22:42 | for me first time I thought it fast and try to figure out how |
|
| 22:46 | actually works. So um so this again just from the definition that it's |
|
| 22:56 | to die. And then As in of three in the malls then you |
|
| 23:05 | the properties on the study states. um this is a claim right? |
|
| 23:15 | we started to plug in TJ is . Ah this point has to then |
|
| 23:24 | obviously yes cyril. And but it's then yeah so so they find that |
|
| 23:42 | not zero. So I did the that was zero and then it tells |
|
| 23:48 | of for any X. So they this pointy ear there This one is |
|
| 23:56 | zero And the other one. Yeah think they will get hurt daemon. |
|
| 24:09 | also is zero. So when you're obviously this is non zero and this |
|
| 24:16 | non zero and this guy is So so trump Davis directed this picture |
|
| 24:23 | any one of them here at any of the nose, two of them |
|
| 24:28 | non zero. The crm between So so then if I look at |
|
| 24:41 | infinite sum here and that particular Well known there's sort of a day |
|
| 24:49 | this one. Yeah, it just to worrying about to all of |
|
| 24:57 | 2nd The Baby's Point. So this okay. So in order not to |
|
| 25:03 | to figure out what the A's Ah the first step we're going to |
|
| 25:09 | through them was I tried to do . The Persian steps. Mm |
|
| 25:17 | Mr using 2nd degrees. These points use when filling out too. |
|
| 25:25 | using there are thinking this one. um so this is the version but |
|
| 25:38 | uh with them, you know the . So we have this system specific |
|
| 25:45 | this diversion form of what we do just plugging in the proper governance arguments |
|
| 25:54 | instead of X. Then if I this and I'm going to have this |
|
| 25:59 | first women say it's too. So the first week this one is in |
|
| 26:05 | same one as food and it's the thing. Subscript genuine. Still. |
|
| 26:09 | the starting point. I'm just going the one shifted by one in the |
|
| 26:14 | . So that's why I shifted up part and otherwise this factors and TJ |
|
| 26:23 | statistics and that's changing. Mhm This gives us Uh huh. This |
|
| 26:36 | down there. Yeah. Technologies. started after looking at one of these |
|
| 26:46 | we needed. He's fine. And we have another one that we also |
|
| 26:52 | to do. But this this expression Doesn't need to win this one. |
|
| 26:58 | then we also from this movie too up what these please sponsor. So |
|
| 27:09 | was from the previous line so Somehow they don't cut. This is |
|
| 27:20 | first degree. So this is this here um that this has this support |
|
| 27:28 | so that is C. J. terrible so long this guy um from |
|
| 27:42 | first civilian back here um signed up by the by construction capable tomorrow. |
|
| 27:58 | so then again this is the help and so that's easy. Right? |
|
| 28:03 | have function as um So let's see plugging these two things that they stepped |
|
| 28:13 | up this one and this one now simplifies center to this special in |
|
| 28:21 | And the other one that was in expression that is you can do the |
|
| 28:30 | thing. And then This is important also that's another one that's zero sell |
|
| 28:42 | selling okay The texture on this one is young have function And one at |
|
| 28:56 | point. So now we have the term. Yeah. This expression |
|
| 29:02 | there's also some very racial between think all night. So hopefully now what |
|
| 29:12 | got is plugging things into this expression we Right, that's enough this to |
|
| 29:19 | any question here. Um Yeah. boats as unknowns please. Any values |
|
| 29:31 | coefficients are the weights of the difference part and eventually these needs to be |
|
| 29:43 | . So we got interpolation suffering. . So so you can see from |
|
| 29:57 | equation. Right? In some ways you know one of them said they |
|
| 30:04 | compute data plus one version. This not the incorporation condition of all the |
|
| 30:11 | . I know. So we have here. So basically if we have |
|
| 30:15 | zero then we could computer the other and this um the formula for this |
|
| 30:25 | please. Bye. So what they're is they want to get in the |
|
| 30:34 | or something support of the the second with these points, we ended up |
|
| 30:44 | one more um weighting coefficient a in of giving work these points than the |
|
| 30:55 | of interpolation forms. We have Interpolation . So one of the ice storm |
|
| 31:03 | next was and then still name any swan. So these are the last |
|
| 31:09 | values as opposed. Yeah. So the one thing we have freedom also |
|
| 31:17 | secondary at this time and that they want to be a freedom that with |
|
| 31:21 | being polynomial interpolation. So that's no in terms of degrees of freedom |
|
| 31:29 | And they're different ah for the These clients are only no more |
|
| 31:37 | But they expressed in this because she Well, this was economy and this |
|
| 31:49 | in common than you think. So we get so many questions. So |
|
| 31:56 | have one to do your freedom and question of producer and in the public |
|
| 32:01 | have a machinery that yes to something sensible. It's always that's I don't |
|
| 32:14 | what to do themselves and minimize um square of the magnitude of the coefficients |
|
| 32:20 | be more positive and negative. So kind of natural to square them in |
|
| 32:25 | to get rid of no science and look at magnitudes. Oh, |
|
| 32:34 | So yes, they set out to the square sum of all the coefficients |
|
| 32:42 | order to do that. Rewrite basically and reorganize this equation to this starts |
|
| 32:52 | one of the Okay, so you get the next one to this question |
|
| 32:58 | from the structure of this equation. figure out what the outputs and datas |
|
| 33:04 | . And that's the question. And was fairly easy to see the |
|
| 33:10 | The right hands are divided by the from the passport similar. It's not |
|
| 33:16 | hard to see that position for the is simply this no, this expression |
|
| 33:27 | . So it's fairly straightforward together this I guess a little bit more messy |
|
| 33:35 | drama. So what we want to , so that essentially is okay, |
|
| 33:41 | we have this kind of diversion formula carry out the substitution and his formula |
|
| 33:47 | the program. And then we actually something that is related to one of |
|
| 33:53 | coefficients and choose a zero Starting So watch your hand up if you |
|
| 33:58 | get all the other ones through this . And the second part of saying |
|
| 34:04 | how do you yet the gammas and and this equation from iterating their present |
|
| 34:14 | on this question. So then we an expression here for have to prosecute |
|
| 34:20 | gammas and deltas and now that's You get all the days I know |
|
| 34:28 | to a zero. So in order get an expression, well that's fine |
|
| 34:34 | . But now these professions that are independent, the ace just dependent on |
|
| 34:44 | intervals for the population and inflation So now until you can get an |
|
| 34:51 | for fine only being, you the function of a zero with the |
|
| 34:59 | for christians. And so this is it is being. So there's some |
|
| 35:04 | were not Now with the performance will for how to compute a one A |
|
| 35:09 | , et cetera. We got something this. So this is basically that's |
|
| 35:16 | for me living space. And then part of the usual thing you want |
|
| 35:22 | minimize something and context is there evidence the derivative to zero and protected the |
|
| 35:30 | of this question. You got something this and then they can just directed |
|
| 35:35 | herds another question here, a bunch petitions for the zero. There's no |
|
| 35:43 | of the renovation, there's no It's just that in your function in |
|
| 35:48 | zero. So you know, that's proportionality constant respect in front of eight |
|
| 35:53 | some costs and putting derivative is zero you find in zero sports basically. |
|
| 36:05 | this formula to them it's um contents the coefficients in front of the zero |
|
| 36:14 | to the delta squares of the in summer. That's where it's from the |
|
| 36:22 | postponing one time and you know what are. And then another procedure for |
|
| 36:31 | okay cereal. And once you have zero then you can use this is |
|
| 36:36 | question you get all the other So, so that was the question |
|
| 36:48 | difficult. Some more on the show next cervical or examples that they have |
|
| 37:00 | many questions on the legacy contact. relevant sounds simple. Some of them |
|
| 37:13 | ? So so the point in this we used to find the coefficients and |
|
| 37:23 | is used in the second degree spines the outputs of the balance. That |
|
| 37:28 | the interpolation values and they're not start . And of course you did with |
|
| 37:34 | the points of us began whatever the along the population of sports. But |
|
| 37:39 | that's really in the input this procedure was described and figures out for a |
|
| 37:49 | from doing minimization of the square some these competitions and then the substitution for |
|
| 37:55 | to get a place based on What? So so this is then |
|
| 38:08 | the obvious what goes on in this . I tried to comment on |
|
| 38:13 | Um, this is kind of obvious just use an age that's before for |
|
| 38:19 | interval life they can have variable with world lines index according to ah where |
|
| 38:29 | one remember that. So in that means that interval is between in this |
|
| 38:36 | zero and the -1 and again have -1. So that kind of arbitrary |
|
| 38:43 | 2s to have the interval to the , 00. And similarly and the |
|
| 38:58 | one endpoint, right? But then extend and say well the interval to |
|
| 39:06 | point we don't have on the right able to the last thing we have |
|
| 39:12 | the integration points and then when they where this come from right. So |
|
| 39:23 | impression there was correspondent zero was That zero and then zero. Yeah. |
|
| 39:34 | intervals here come, they were the . So not it becomes a I |
|
| 39:45 | want the first one is higher. and then the post form On this |
|
| 39:56 | one. So that's why it's So that's probably get a negative |
|
| 40:03 | And then the other one was come . The first timer 0, 0 |
|
| 40:11 | 20 employees zero. This one and same thermal blankets too. And this |
|
| 40:17 | an acceptable one x 1. So that case we get the number two |
|
| 40:21 | front of West europe this expression to started. And then because this |
|
| 40:29 | so the first one is simply historic products. Mhm. At this |
|
| 40:36 | Now the first one before we started minus one squared is one. So |
|
| 40:43 | to get this to be. So to get things started. Well, |
|
| 40:50 | was located, I'm trying to, question was the hospital of the |
|
| 41:01 | that was Severa and Severa was the proper science between the festival of |
|
| 41:10 | Yeah. Things are we have to the relation between Yeah, the other |
|
| 41:17 | and 2 grandma was a little bit about formula was this guy. Now |
|
| 41:25 | can see that's supposed to be wrote text and the gold corners and stuff |
|
| 41:33 | the technical term is better consumers but the first time and then our clients |
|
| 41:41 | the inspirations conditions in it and Mm hmm. But you can trace |
|
| 41:51 | what they called. Lines are called to This formula is almost directly from |
|
| 41:59 | one and 2 and two is Um, this follows from this |
|
| 42:09 | So we can define what the United and other correspondents. Oh, what's |
|
| 42:22 | ? So that's true. Mm And I guess the last one was |
|
| 42:33 | to recur version actually computes a so gave us a zero and then, |
|
| 42:38 | know, it's actually rewriting this equation that his former The previous day one |
|
| 42:45 | then we started and then the next . So this routine is said and |
|
| 42:55 | that took them the inspiration values and and how many intervals we have and |
|
| 43:03 | just returns the coefficients and generally But but actually for me where, |
|
| 43:15 | , but it's essentially computes he's No. Such that within one degree |
|
| 43:24 | freedom that uses to realize where someone . Oh. Mhm. Okay. |
|
| 43:35 | the next thing is then, so , they have a machinery. He |
|
| 43:44 | the A's for each other such that also satisfies things. Operation competition. |
|
| 43:54 | . And I asked the question To this one and or to evaluate this |
|
| 44:02 | we developed this machinery to try to within their combination of 0° plants instead |
|
| 44:09 | directly within the second degrees plants. that's what we're using. And this |
|
| 44:21 | here and I looked at let's see . So I try to relate it |
|
| 44:27 | how things were done in this general of the way that statement Instead of |
|
| 44:34 | direct evaluation with respect to the 2nd is fine. Mm hmm developing in |
|
| 44:40 | recursive formula for coefficient. So I have to worry about one of the |
|
| 44:46 | you don't think we spot. The incursion former public coefficients now |
|
| 44:54 | But the second one against final A So A is here and this |
|
| 45:01 | formula that they have there it So then it was just the starting |
|
| 45:09 | in this case is our age that out of the proficient procedure and then |
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| 45:16 | them into this formula and eventually ended The coefficient from zero linguine spine correspondent |
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| 45:25 | the Evaluation .22s. So in this we have three for questions. Um |
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| 45:38 | , yeah. Using the 2nd degrees famous too. and then the final |
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| 45:46 | and it's also interesting -1 and So that there are three elements first |
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| 45:54 | . And I noticed that student the . So in this case, so |
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| 46:05 | first equation is in play computing the thing Now The 1st element in the |
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| 46:14 | column. And the second line convinced new Senegal this formula substitution, therefore |
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| 46:25 | . And then once we have those can be used again the same and |
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| 46:32 | the same formula here again. The coefficient for zero, everything why? |
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| 46:43 | then is one in the intervals for values that we want to be |
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| 46:48 | Yes. Mm hmm, mm mm hmm. Any questions. So |
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| 47:05 | wasn't an entirely Samuel machinery either for wow, 2nd degree and 3rd degree |
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| 47:14 | versions. That's fine as you may , was quite a few decorations and |
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| 47:19 | they get older values and then we to try the system in the |
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| 47:25 | Um The gaps on professionals. ah, okay. Sorry. There |
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| 47:36 | a picture and yeah, they don't all the difference a little bit |
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| 47:42 | But the points of this comparison, the second degree. This point sources |
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| 47:51 | degree Flatow 765. So this is polynomial, one higher order. That |
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| 48:00 | isn't well. And in particular That's your mind and your friends is |
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| 48:09 | yet right now to respond. But is not much different from this |
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| 48:14 | but one is on the left of installation point. Come on mr |
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| 48:18 | But otherwise both are very well behaved It's sort of 1° in some |
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| 48:26 | Just kind of showing a little so there better behavior. It's still |
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| 48:31 | better work or these points because it's of small the life I'm supposed to |
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| 48:38 | sarcomas and that behavior as states formed basis increases. Mm hmm. I'm |
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| 48:53 | comfortable doing that but it's just more remind you. But there's no need |
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| 49:03 | inspiration points and and not to Someone can also define, okay, |
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| 49:14 | you can find a dispatch from a thing. No lo forms from their |
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| 49:20 | was just these points that I should like to be. So that's what |
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| 49:37 | was going to stop mentioned in terms interpretation but this is fun. |
|
| 49:48 | so a couple of more points about No one is going through and ah |
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| 49:57 | derivatives. So what we talked about there, it appears um get approximations |
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| 50:05 | on derivatives are you said? Except functional values or you can also I |
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| 50:13 | took the view that and I think the functionality is to use and just |
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| 50:20 | approach as being points for which that used for doing interpolation and generate the |
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| 50:27 | and the security of the polynomial. the same thing can be done in |
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| 50:32 | of the approximate. So they will accept the functions for these points. |
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| 50:41 | , they may also be useful to out how do they get derivatives of |
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| 50:47 | . So that's what happens in the year, you know. So it's |
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| 50:52 | having to start with the international formula that. These finds that this is |
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| 50:58 | case that we can find something taking the minutes on it. So |
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| 51:04 | have the definite movement directly. In , derivatives work it all out. |
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| 51:10 | a performing arts. If they work out, take the derivative with respect |
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| 51:13 | X products and activities. First Thanks the other one and then this |
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| 51:22 | thanks to the attitude of this Which one of the best introduction to |
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| 51:30 | figure it out. And then when done that to basically show what this |
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| 51:36 | the form, the derivative of Chester that's so first, um, it |
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| 51:45 | sense that there's one degree lower Because every time it takes the derivative |
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| 51:48 | respect to the independent variable X. degree. So what's going on? |
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| 51:55 | that's what you get. That's another . Then these finds have been used |
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| 51:59 | yes, but you can use them represent the serenity for the case signals |
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| 52:05 | wife and they said it was the working into what you get. And |
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| 52:15 | more that's the question is of this came from this. So This is |
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| 52:24 | of the stuff to show investors that you can express the derivative of |
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| 52:31 | Again, I'll you have some approximation some function you have that was expressed |
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| 52:38 | the linear combination of thinking despite, then each one of them ends up |
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| 52:46 | so, okay, what is one in the combination of claimant is one |
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| 52:50 | finds and it's the best for them it in because they've taken the derivative |
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| 52:57 | doing a summation commute. So derivative that was going down here and then |
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| 53:05 | plug in the expression take the derivative this that we have worked enough up |
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| 53:11 | and then it gets this kind of and changed the summation index. You |
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| 53:21 | the same door. Cool. Sounds on both terms here. But then |
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| 53:27 | have to account for it when you at the different factors scenario, that's |
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| 53:33 | else in terms of the derivative of approximation that case finds. It becomes |
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| 53:41 | linear combination. Oh chain one is for one because you know, are |
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| 53:46 | spots for christians here can be arrived the original coefficients and the order of |
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| 53:59 | So it's best if you have essential desserts or derivative, these fines, |
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| 54:11 | derivatives cylinder combination of the one that lower these spines. And since we've |
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| 54:19 | of worked out how to evaluate such , then they can use it before |
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| 54:25 | figure out what the yes they justify went through ah to this novel |
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| 54:34 | coefficients are different than the original. , it's still there studying the combination |
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| 54:40 | spots. The next one was the . So the other one that was |
|
| 54:54 | useful in the past integration. And we can also show that ah and |
|
| 55:05 | case is kind of an indeterminate what to do um, podcast and |
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| 55:12 | respect one prediction. The spy is vineyard combination of these blinds that extends |
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| 55:22 | I mean that's mm hmm. Finally are integrating Hello? Possibly to |
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| 55:31 | So the rest of it depends on . Thanks. Some of us just |
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| 55:39 | the younger. I don't want to just I think we're integrating mhm. |
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| 55:48 | clients, they figured these kind of combination of them in order to approximate |
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| 55:52 | function do than gaps. Another expression has different coefficients. But since we're |
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| 56:04 | That means the degree of at this has to be 1° harder because if |
|
| 56:09 | want to go back to the instagram take the derivative on the right hand |
|
| 56:15 | , right hand down the degree and enormous forgot and then there's some questions |
|
| 56:21 | figure out what these coefficients are. integration. Yeah, it takes responding |
|
| 56:31 | to take Thanks. So yeah, is basically both point and you have |
|
| 56:41 | you can take the rivet in summit hi fingers but I'm not going to |
|
| 56:50 | you to do that and many times what's wrong principles. Okay. So |
|
| 57:08 | , making the terminal you want inspiration . You get unlimited some again because |
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| 57:17 | only for any given excellent value over argument and the response that is on |
|
| 57:24 | final number of them. There are zero sum in the end finances of |
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| 57:35 | the spines. Um as you can from this expression here when you get |
|
| 57:41 | higher or at this point, Interval support is longer one more interval and |
|
| 57:49 | why he said this. And they justice performance uh population. That was |
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| 57:55 | escape. Also one step further to left depends on small the response I |
|
| 58:06 | Yeah, accounted for or included in submission the current. Well let's go |
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| 58:14 | the point of interest. Les I was just taking a half far |
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| 58:20 | to you need to go for the of the response to actually reach the |
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| 58:24 | are interested. So that was pretty just size of business. Does he |
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| 58:36 | to find space clients software from And I think most of the, |
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| 58:47 | that's another one that mentioned in the is yeah. And then double |
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| 58:54 | But as far as I remember, also America and most of them these |
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| 59:02 | in particular house how kind of like news because so when they're small of |
|
| 59:15 | hmm. Um sometimes let's start to a little bit about the next |
|
| 59:26 | So also mentioned responded in the question think free to ask questions about |
|
| 59:35 | Um, victor. Ah, not . Have any questions on whatever. |
|
| 59:41 | we talked about initializing problems in the video. Yes. So what recovering |
|
| 59:49 | the exam. What what, what would you call that? Chapter |
|
| 60:03 | . Okay. So, so initial . That's what you said. But |
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| 60:09 | find it, That's part of Chapter six. And um, and |
|
| 60:17 | when will you provide will be done Wednesday. Okay. I'll talk to |
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| 60:26 | tonight tomorrow so we can look at right. There are questions on |
|
| 60:38 | Santa began. Mm hmm. So I guess said it to do |
|
| 60:49 | So I'll say it one more time terms of cargo summarizing things about for |
|
| 60:56 | normal approximation. So brian said it the form of all and all about |
|
| 61:02 | is just the colonials and good. point of using lines are supposed to |
|
| 61:14 | them. A polynomial Interpolation is having spice polynomial 171 covering the hole in |
|
| 61:25 | wall. The following underground stuff. more points you have hopefully better |
|
| 61:39 | Yes, that's correct. Exactly in points. But what goes on between |
|
| 61:44 | interpolation points test? It's worse than world comes to happen. So less |
|
| 61:51 | more points that are correct. But you look at what goes on between |
|
| 61:56 | points, the exports. Well, that's why if you have many words |
|
| 62:03 | enormous, it tends to behave better the whole interval. Yeah. So |
|
| 62:08 | can use such many points. Forget , but there's a few of them |
|
| 62:16 | als and the second authority points on baseball. So that's some of the |
|
| 62:26 | offs and finds has become very popular many disciplines. The approximations of |
|
| 62:35 | I want to go to graphics that mentioned. My phone probably best to |
|
| 62:40 | the domain for trump for the audience policemen one of them that is |
|
| 62:49 | I'm sorry for work. The whole that becomes and it's the same |
|
| 62:59 | We've dropped us off many kinds of equations or part of the essential questions |
|
| 63:10 | , pressure and whatnot. I just to carve the remains of a small |
|
| 63:16 | . Time to wrap this up solution . That's the name with some form |
|
| 63:23 | despite the approximation in machinery supposed to the proficiency and it was like something |
|
| 63:32 | government for your business but a few just introducing emissions. Okay, so |
|
| 63:44 | not familiar with the initials of I guess. Thanks for that |
|
| 63:50 | So as I just mentioned, you , and science and engineering is very |
|
| 63:57 | to represents a problem by the financial for all of us to try things |
|
| 64:04 | over time. So you try to it can be all the space for |
|
| 64:07 | matter. But many times it's kind easy to think of it. I |
|
| 64:12 | I understand it depends on the the change sharpener and we're supposed to |
|
| 64:18 | resolution and there's kind of all this that will cover and now I don't |
|
| 64:29 | what they are about this thing. order has to be, whether it's |
|
| 64:35 | the first to know everything about involved . The differential equation comes in an |
|
| 64:46 | I guess success function of one independent or something that sends over time, |
|
| 64:56 | for something that is uh that's special dimensions as well. Trying to figure |
|
| 65:03 | the pressure in the box or As part of differential questions. Um |
|
| 65:14 | know more about this, Not such . So we just kind of example |
|
| 65:26 | somebody probably had done in some high physics or something or something, you |
|
| 65:29 | what happens and and the discharge that nerves or something help. It has |
|
| 65:36 | be your son, relate to So if you remember you actually have |
|
| 65:42 | capacity or something to recharge the That's different clubs. Focus the value |
|
| 65:47 | doing an interview. So Ambassador and took place to the resistor, I |
|
| 65:56 | know, take your foot from zero in the experiment. Think it's kind |
|
| 66:01 | exciting. He doesn't get a short to show something. But anyway, |
|
| 66:07 | in that case the capacity that's really discharge immediately. But if you have |
|
| 66:13 | resistor it takes a while. So in this case on this idea that |
|
| 66:20 | the voltage. So as the capacitor its charge and when the voltage current |
|
| 66:29 | it goes down and both pitched across resistor and for six months on the |
|
| 66:36 | but it goes down over time I the compassion of discharge and for whatever |
|
| 66:43 | this guy's that was horrible sight from is seriously kind of click the current |
|
| 66:49 | essentially the magnitude of the currency is The highest one, the voltage is |
|
| 66:53 | highest. And then eventually as this or close to zero because there's no |
|
| 67:00 | left. Then of course the there's no more electrons. So, |
|
| 67:09 | basically I have the zones law writers the voltage across resistance they posted the |
|
| 67:15 | . So there's just Through the Resistor . Um it's just and the current |
|
| 67:24 | is for the change in charge on capacitor. So the challenge is best |
|
| 67:32 | the derivative over time on the change time. So this is just the |
|
| 67:37 | are now and the charge disproportion of capacitance of the statistic times. |
|
| 67:45 | in this case the first order differential that involves on one side and in |
|
| 67:54 | case you have the politics on the side. And it's just all this |
|
| 67:58 | you can usually do that basically in yard. This kind of an impression |
|
| 68:03 | this shows up there are reptiles decrease about it from this source. |
|
| 68:11 | Is um there's no surprises proportion to time processes. It's called r See |
|
| 68:18 | tells you how fast things are And it's a question of the product |
|
| 68:22 | the anyway, so yes, that's example of how you kind of first |
|
| 68:28 | differential equation that you probably have seen is that something fishy about the |
|
| 68:37 | So let's see, synonymous. So value problems attempted slide that the |
|
| 68:47 | the variable you have any question for it depends on same time and maybe |
|
| 68:54 | article itself. So what they had the previous side right there was the |
|
| 68:59 | of the voltage from one side uh rearranged things and on the other side |
|
| 69:06 | have the office itself. Um That a long time. So and then |
|
| 69:14 | this case we're given some starting points have this one was. So you |
|
| 69:21 | what the voltage is when you start experimental causing the local. So this |
|
| 69:28 | kind of the generic initial value problems formulated derivative for the rate of change |
|
| 69:37 | kind of known that this unknown in sense that you have an expression for |
|
| 69:42 | it depends on time and the variable . And then you have some starting |
|
| 69:47 | everyone can start start with developing so so in this case the first thing |
|
| 69:56 | just a single independent variable fee So that makes this kind of an |
|
| 70:01 | differential equation. And in this case only the song the text is just |
|
| 70:09 | single variable sort of. This is a very simple first order for more |
|
| 70:16 | equation but X can also director value not. For instance they get the |
|
| 70:22 | other questions and we'll talk about that well. Thank you. There's some |
|
| 70:35 | oh in terms of differential equations with variable um as this dependence on |
|
| 70:45 | Um in this case is very simple figure out how to do finally variable |
|
| 70:56 | . That has this lifetime delivery some these things you can kind of realistically |
|
| 71:02 | out blocked. They were soft on it because again you want to find |
|
| 71:10 | um behaves over time. This is you found this thing is depending upon |
|
| 71:18 | you are and figuring out what things this kind of derivative, it's affected |
|
| 71:25 | or distract from some of these solution . Then you have these values and |
|
| 71:31 | satisfy also the condition that is the team zero Then you should get |
|
| 71:39 | And the first time here that comes this becomes zero so 1 -1 is |
|
| 71:44 | also? So this solution is satisfied this equation and its initial condition and |
|
| 71:53 | can check the I normally don't you necessarily no from this equation to find |
|
| 72:05 | function whose derivative is the right time that's the reason what it is in |
|
| 72:10 | solutions to ordinary differential equations that it's to find but the functions or other |
|
| 72:19 | still. So that's what I'm certain this one. Okay I have some |
|
| 72:28 | of the stations here in our repeat family start over after. Ah so |
|
| 72:37 | the way anyone goes about this uh can use what we kind of learn |
|
| 72:47 | we talked about the integration. That's way of trying to figure out how |
|
| 72:50 | get the solution to no li ah one thing that can be cast it |
|
| 72:59 | something we know how to work with best recast it as an integration problem |
|
| 73:05 | in some ways it is because you to find that's my opinion over time |
|
| 73:11 | that's access officer that we integration or gravity ah differential or changing next. |
|
| 73:22 | you can take this equation here and that's kind of put the V. |
|
| 73:27 | . On the right hand side and do the integration. Say on a |
|
| 73:31 | interval form The 50 plus h. on the left hand side and corresponding |
|
| 73:39 | all the function that you have for derivative bad times the variable which which |
|
| 73:48 | the derivative restatement. So in this you got this expression now this one |
|
| 73:54 | obvious kind of that 50 and that's X 30 plus H minus X |
|
| 74:00 | So I can write this for the extra T to the right and science |
|
| 74:06 | now we have basically integration problem instead Yeah after solving ordinary differential equations and |
|
| 74:16 | know it's just an initial value You know what that something is supposed |
|
| 74:19 | be and the interval is too Then this integration into evolved. It |
|
| 74:30 | be perhaps pretty crude in terms of clever you are and during the integration |
|
| 74:37 | and that's what but this picture of so here's where we are and what |
|
| 74:43 | accretion tells you this finally um that's for the function that is and is |
|
| 74:56 | and when you're here the issue again T value and this function here then |
|
| 75:03 | essentially the tangent on the curves. you just use dysfunction at the starting |
|
| 75:11 | , you will end up here, is not necessarily where this function |
|
| 75:17 | So, but that's kind of one method is potentially do that. Um |
|
| 75:24 | I think this is here on this , so I can use exactly just |
|
| 75:30 | the attendants at that point. And on the function f it made the |
|
| 75:35 | about approximation. They also have the or drill for doing this thing. |
|
| 75:42 | yeah, and it would take The evaluated three endpoints. And then I |
|
| 75:48 | the average Joyce. Now this has problem. Anyone sees the problem. |
|
| 76:12 | problem is we're trying to find this , my name is lisa here, |
|
| 76:20 | we don't know this guy, we know this guy, so we don't |
|
| 76:23 | the sector. So this is what's as an implicit form. So |
|
| 76:36 | if they were to do this type approach just for today, what it |
|
| 76:44 | , you need to have some form , for instance, an interactive |
|
| 76:50 | ah you get some value and plug in here and you see what you |
|
| 76:54 | and then do something. Well, may eventually converge. But there are |
|
| 77:02 | then methods like this guy, it's because, you know, it's something |
|
| 77:07 | when you start, so if I think this integral is straightforward. So |
|
| 77:12 | you can directly compute X deposits, have this and this is known. |
|
| 77:18 | that's an explicit formula. And this is an interesting for a situation of |
|
| 77:25 | prominence dissolved. So we'll talk about message. But ah, explicit methods |
|
| 77:33 | doesn't worry your direction. That's They prefer to get a choice. |
|
| 77:43 | so this type of notice that will the last one to talk about on |
|
| 77:48 | inflow inflow is both approaches what But the number of inspiration steps to |
|
| 77:57 | Okay, Thank you for today. when you stay home and kind of |
|
| 78:02 | about, I hope to get practice . Mm hmm. Thank you. |
|
| 78:12 | . Thank you. Oh, |
|
