5

(a)XkYkf (xk)_4 -2.8 ~0.7 : 1 0.0 1.4 3 2.1...

Question

(a)XkYkf (xk)_4 -2.8 ~0.7 : 1 0.0 1.4 3 2.1

(a) Xk Yk f (xk) _4 -2.8 ~0.7 : 1 0.0 1.4 3 2.1



Answers

$$\begin{array}{c|c|c|c|c|c} \boldsymbol{x} & 1 & \frac{1}{2} & \frac{1}{4} & \frac{1}{8} & \frac{1}{16} \\ \hline \boldsymbol{y} & 0 & -1 & -2 & -3 & -4 \end{array}$$

In this problem when it find the General Association to assist them explain. T a x t were a solution to this problem. It's done in June. Steps third way to find out from them Intermeeting Capital X team And then the solution Little pigsty capital Extensive matrix times the backbone of constant Hey, so the first step to solve this problem is to find the eye of obvious off matrix values off A are given by finding a series of the artist as a thank you Just the Matrix. But this woman's our say one likes my mistress are Chu blends for 16 7 are finding these attorney in his preliminary minus part. Killed plus very R squared minus three are plus one on these factors out hope us you are mine serious off this this quality one part equals 10 on the multiplicity is how many times this proctor years on this station. This case is important to find generalize. Hi. That way, we're going to do next find the eye in Victor's 100 off the interest. So the first step is to find Melas base of a okay, which is the Matrix? Why? For for true 4 16 6 So this matrix is equivalent to the matrix. What for? Cyril? Cyril? One still. So the normal space up these magics is generated by only one vector. For what? So I am So they know space of defense matrix his own. This pact just want so we need to find them. Tree Jin is a victim 11 regular. So thanks to Jules, I So the next terrorize. I didn't find it in our face off this square off our square off our tricks, eh? Till picture that trial's hey, three zero, which is a queer winter. Very explain for trigger to sort of serve cereal. Looking at the long sprays of these 641 on the vector three. Syria. This like they're already appear that I am a here. What? I have found that this would be in their virginal eyes. Victor, that Okay? Soho Where were wasted? Still see. So is majors a minus? The power to only provides too. Hide your victim. Yeah, start. The next step is to go over the matrix. A mindless, I think during these fine all day up to them three as well. So we compute the cure of this major. This is zero X so we can take having an independent backdoor. Kids would be. What? Ciro Ciro, Sister Lena In pain. It's a weird British three Victors for So this comes from a spy to equal 32 Fritz, you're a Jew that comes from a high square and your three that comes from a minus. It's important from which no other space inspectors come from. So you can compute Matrix X to the power. Thirst, Compute! It's fixed So please matrix doing by three columns Each column a each of the vectors I think the 1st 1 explain t comes from hour. Why, it's one. But this comes from the majors. A. So this will be eat to the polar T That's 18 times Medical, for this is our first. The second call to a T more comes to one and two. This I know space of this world. So is E T. What's tee times a minus? I you too. Both of these. So it's okay. So what? We compute the ex team Thanks to you, he sees the better a t times 32 Hey, four Finally ext. T He's come for part three. It's the most basic of a minus, so e t Thanks. One a warning this high? Yes. Very close on call tears for Hey. Hi, us, sir. So this will be the victor T There's wants or so times negative, too over too. Hey, So these are the three columns off our. So where were we? Find the general solution. You're 60 is equal to come thereafter. See one sit. Sit way Computer service will be equal to C one X y g c Extra cheese hicks treatment. Okay, so you would see one g never before Syria, which is the first call? That's sit your three miners for dear. Sure. Finally I see three 12 t plus for school. What for? Which part of Kong's X t extra t that we use Pre misstated found. But it's fine. It's some of the inspector's overs, Vincent. It's the final solution to our

In this video, we're gonna go through the answer to question number 21 from chapter 9.5 so as to find the fundamental Matrix or a fundamental matrix Thio the Matrix Different equation. A X prime equals a Times X where is and Tricks, which had three by three matrix given here on this upright. So it's fine fundamental matrix for this equation. We're gonna have to first find the three Aiken values and then find their respective I come back to us and then from that we conform the from Dimension Matrix. Okay, So to find the Eiken values we look at the matrix a minus r I find this. It's evident. So we have minus, uh out into the leading diagonal. And then you get this matrix. Okay, so expanding the determinant along go minus our times by right. Do you want to matrix and seven, uh, minus one times by two by two matrix a turban and 01 87 minus R. Okay, so this is gonna be minus, uh, close by s. So this is gonna be minus seven. Uh, plus, uh, squared. Close 40 minus zero times. Somebody. Sorry. Zero. Uh, then minus minus eight is plus. Okay. This is gonna be a cubic polynomial. It's gonna be minus R cubed plus seven. Uh, squared. Minus 14. Huh? Close aides. This could be fact arised into, uh, minus one minus two for minus R. Okay, So when that's equal to zero, they would just read off The Eiken values which are are is equal to see one, two, and four. Okay, It's not gonna find I'm vectors associating with those Ivan values. So we do that by looking for a vector you want, but satisfies a minus. One times I was one of the first I can tell you. Touched by a defector you want. I think it's there. I want this a Linus I look like Well, it looks like AA minus one 10 zero minus 11 eight minus 14 six times by you, Which we could write Capone wise as X. Why is that? He was there. And then this is us. The quite easy. Just read off. What's wise that need to be. There's look at the top row with the matrix. Ah, that's basically saying the minus one times x plus y zero. So if x is one that why must be equal to that that one as well. And then looking on the second row, if wise one then accept and said it also one. So, uh, factor is just one more want. And you can substitute those values of X y zed into the bomber off the metrics just to make sure that that works on. Of course it does. So move on to the second item. Specter, It's associated with Ivan. Value are equals two. So the same process a minus two I it's gonna be minus 210 zero minus 21 AIDS minus 14 five. Okay, most probably by BET you two, which will rise. Likewise. That. Okay, so again, we can read up quite easily. Here you two is. Okay. Well, if X is one, then why is gonna be too based on the top row? Why is to then, based on the second road, Zed is gonna be two times two is four. That's a second. I value that. Sorry. Second, I'm vector on Third Director would find in the same way. So a minus for I times you three. Yeah, close. They were Okay, So this matrix gonna be much for one 00 minus 41 eight minus 14. It was six. Minus seven minus four. Just three times by a factor. You three which were my ex wives, That because they were so that full again, we could just quite easy read off. What? The components of you three comm Bay. If the ex opponent is one in the white component, must be four. Based on the first row is that component must be 16 based on September. Okay, so therefore the fundamental matrix it's gonna be the first column is gonna be the first item Vector, which one won once was bye bye e to the the power of the first I can value, which was one times t. That's easy. It's the tea. It's the thing. Second column is gonna be Eat the two tea to ease the TT on for each of the TT for column is gonna be beat. The 40 for each of the 40 16 eats the 40. So that's the fundamental matrix to this matrix virtual body

This question asked What type of function models the data. What we know is that in our White Column, if we multiply one times 1.2, we have 1.2. Then if we multiply the next two times the difference that we just figured out 1.2 times. 1.2 we have 1.44 Do it again, 1.44 times 1.2 we get 1.73 Therefore, if you're multiplying the same number as you can see, we're doing it by 1.2 each time. This is an exponential model.

Okay, So for this particular question, we're asked to determine if this is a 1 to 1 function. So for wonder ones, what we want to look for is Do we have any repeating? Why values or f of X values? That would be different X values. And so if we look at this table, all of the values are different. So this is in fact, a Yes, this is one toe one.


Similar Solved Questions

4 answers
The speed of sound dry air 20 "€ 343.5 m $ and the frequency of the sound from the note (# ahove middle scale). Calculate the wavelength of the sound and the time will take travel 44.5 aCrOSS CODCCTt ball_the piano is 415.3 $"1 (according the American standard pitchWavelcngthTime
The speed of sound dry air 20 "€ 343.5 m $ and the frequency of the sound from the note (# ahove middle scale). Calculate the wavelength of the sound and the time will take travel 44.5 aCrOSS CODCCTt ball_ the piano is 415.3 $"1 (according the American standard pitch Wavelcngth Time...
5 answers
Select the correct name for the following compound_anthracenebenzopyrene phenanthrenepyrene
Select the correct name for the following compound_ anthracene benzopyrene phenanthrene pyrene...
5 answers
4+0<>8+VzUOHOBQI J41 JOJ JUBISUO? unuqInba 341JO onjBA 341 JILI+O 0 80z0*0 00* [ 017 IZIi W 00*9 = [a] 'W 007 = [o] W 00*€ = [v] unuqupmba le J! 9 z <7> J $ + V€ LOpOBQI 941 JQJ 'X JUBISUOJ unuqnba 341 JO onjBA 341 SI IBQM1SAjB182 e Suippe E0zaj Jo Junoute 34 Burseajoop JIJBjodu?1 J4 Burseajoop Fdj_Ip-Litelad-edlton natalnpm neneaenn lnadhMpICNu#a,nuld (TE)
4+0<>8+Vz UOHOBQI J41 JOJ JUBISUO? unuqInba 341JO onjBA 341 JI LI+O 0 80z0*0 00* [ 017 IZI i W 00*9 = [a] 'W 007 = [o] W 00*€ = [v] unuqupmba le J! 9 z <7> J $ + V€ LOpOBQI 941 JQJ 'X JUBISUOJ unuqnba 341 JO onjBA 341 SI IBQM 1SAjB182 e Suippe E0zaj Jo Junoute 34 Bu...
5 answers
Consider the following model: Zt + Zt-1 + 0.62t-2 = at 0.5at-1. (a) (5 points) Is the model stationary? Is the model invertible? (Why or why not?) (b) (10 points) Determine the autocorrelation function of the process_
Consider the following model: Zt + Zt-1 + 0.62t-2 = at 0.5at-1. (a) (5 points) Is the model stationary? Is the model invertible? (Why or why not?) (b) (10 points) Determine the autocorrelation function of the process_...
5 answers
Fins What Fins Fins keep - the li H heat the coils the eanitransfer air from adding out Aq flowing dirt: fins the over on V the . the the coils tubing ' closing - surface that pasn the - for aeas flows heat between more transfer? the easily. 8
Fins What Fins Fins keep - the li H heat the coils the eanitransfer air from adding out Aq flowing dirt: fins the over on V the . the the coils tubing ' closing - surface that pasn the - for aeas flows heat between more transfer? the easily. 8...
5 answers
19 Define on /1 operation * as the convolution; such that for X,y € /1 X*y 7 = such that 2 = Y-"fxc0-4Z} n = 0,1, Characterize * as fully consistent operation on /1 (meaning that z € /'), which is not obvious from the definition. (ii) type of operation such as semigroup, monoid, Or group. (Discussed in the class.)
19 Define on /1 operation * as the convolution; such that for X,y € /1 X*y 7 = such that 2 = Y-"fxc0-4Z} n = 0,1, Characterize * as fully consistent operation on /1 (meaning that z € /'), which is not obvious from the definition. (ii) type of operation such as semigroup, monoid...
5 answers
PHD PHD44LowILow4546SWMOIBS PHDLow47Mo7 High Low Low4849PHD PHD PHD PHD PHD PHD MS MS50161LoW52Moni53MowI54ow55 56 57 58 59 60 61IoW MowIMS SWLoWIIlowiMSBSWawl
PHD PHD 44 LowI Low 45 46 SW MOI BS PHD Low 47 Mo7 High Low Low 48 49 PHD PHD PHD PHD PHD PHD MS MS 501 61 LoW 52 Moni 53 MowI 54 ow 55 56 57 58 59 60 61 IoW MowI MS SW LoWI Ilowi MS BS Wawl...
5 answers
Suppose that people expect inflation to be 3 percent but that, in fact, prices rise by 5 percent. Describe how this unexpectedly high inflation would help or hurt the following:a. the governmentb. a homeowner with a fixed-rate mortgagec. a union worker in the second year of a labor contractd. a college that has invested some of its endowment in government bonds
Suppose that people expect inflation to be 3 percent but that, in fact, prices rise by 5 percent. Describe how this unexpectedly high inflation would help or hurt the following: a. the government b. a homeowner with a fixed-rate mortgage c. a union worker in the second year of a labor contract d. a ...
5 answers
Vesicle budding is associated with coat proteins. What is the role of coat proteins in vesicle budding? How are coat proteins recruited to membranes? What kinds of molecules are likely to be included or excluded from newly formed vesicles? What is the best-known example of a protein likely to be involved in vesicle pinching off?
Vesicle budding is associated with coat proteins. What is the role of coat proteins in vesicle budding? How are coat proteins recruited to membranes? What kinds of molecules are likely to be included or excluded from newly formed vesicles? What is the best-known example of a protein likely to be inv...
5 answers
A bronze bushing is mounted inside a steel sleeve. Knowing that thespecific weight of bronze is 0.318 Iblin" and of steel is 0.284 lb/in',determine the location of the center of gravity of the assembly.
A bronze bushing is mounted inside a steel sleeve. Knowing that the specific weight of bronze is 0.318 Iblin" and of steel is 0.284 lb/in', determine the location of the center of gravity of the assembly....
5 answers
Find the value of * 14using the following linear data122542Select one:Y = 50.4Y = 50.7None of the aboveY = 50.3Y = 51.1
Find the value of * 14using the following linear data 12 25 42 Select one: Y = 50.4 Y = 50.7 None of the above Y = 50.3 Y = 51.1...
5 answers
Supposef(x)=(x^3−4x^2−7)/xFind any inflection points.a) (1.8025,−7.8445)b) (4.3670,1.2759)c) (−1.0681,11.9669)d) (−1.0872,11.9694)e) (1.9129,−7.6518)f) None of the above
Suppose f(x)=(x^3−4x^2−7)/x Find any inflection points. a) (1.8025,−7.8445) b) (4.3670,1.2759) c) (−1.0681,11.9669) d) (−1.0872,11.9694) e) (1.9129,−7.6518) f) None of the above...
5 answers
Calculate the pressure exerted by 6.584 grams of bromine gas when it is confined to a volume of 3.52 L at 298.63 K (Five points) ewoll JeC 0S mou levooneino
Calculate the pressure exerted by 6.584 grams of bromine gas when it is confined to a volume of 3.52 L at 298.63 K (Five points) ewoll JeC 0S mou levooneino...
5 answers
Question 5 (6 + 6 + 8 = 20 points):Suppose that f(x) = 3x ~ 5and g(x) = ~2x +4(A) Find (fog)(x) and gof (x). Compare the values of the composite functions whenx =(B) Find (f + g)(x). State the similarities and differences between the forms (f0g)(x) and (f + g)(x):(C) Below is a piecewise-defined function generated by using and g:h(x) = if - 5 <x < 4 {o) if 6 < x < 9 Find h(-5) and h(7)
Question 5 (6 + 6 + 8 = 20 points): Suppose that f(x) = 3x ~ 5and g(x) = ~2x +4 (A) Find (fog)(x) and gof (x). Compare the values of the composite functions whenx = (B) Find (f + g)(x). State the similarities and differences between the forms (f0g)(x) and (f + g)(x): (C) Below is a piecewise-defined...
5 answers
Find the Taylor's or Laurent's series expansion for the function f(=) = in the region (I+2 )(2+2) H-l<1. ii) T<k-l<2 i) |4/>2_
Find the Taylor's or Laurent's series expansion for the function f(=) = in the region (I+2 )(2+2) H-l<1. ii) T<k-l<2 i) |4/>2_...
1 answers
15 . Determine whether o not S = {22 +1,8+2,-22 +x} is a basis for Pz_
15 . Determine whether o not S = {22 +1,8+2,-22 +x} is a basis for Pz_...
5 answers
CCeN Pt (VaAAA0z07 jauuncThis Question: 1 pt13 0f 22 (0Perform the indicated operation Simplify if possibleAx - 32 79 - zXAx + 24V0 (8 - xk8 +x)X+34(* + 8)(X - 8)(+8)X - 8) Tx+24 4(x + 8)(* - 8)
CCeN Pt ( VaAAA 0z07 jauunc This Question: 1 pt 13 0f 22 (0 Perform the indicated operation Simplify if possible Ax - 32 79 - zX Ax + 24 V0 (8 - xk8 +x) X+3 4(* + 8)(X - 8) (+8)X - 8) Tx+24 4(x + 8)(* - 8)...
5 answers
Calibri (Boay)JasteB I U ~ | Bv| * A ~XvfxDEProblem 2: Use Solver to find the values of X and Xz atthe minimum of the following equation:f(rux2) = 2Sxfxf + Sx3 + 1lxz - 15X1 12x2 + 55Where<X1 $ 5and0 $ *z < 2.5Remember to apply the constraintsl This is a two-variable problem similar to the video solution forxandy:This problem is worth 10 pointsGuessf(xuXz)Constraints
Calibri (Boay) Jaste B I U ~ | Bv| * A ~ Xvfx D E Problem 2: Use Solver to find the values of X and Xz atthe minimum of the following equation: f(rux2) = 2Sxfxf + Sx3 + 1lxz - 15X1 12x2 + 55 Where <X1 $ 5 and 0 $ *z < 2.5 Remember to apply the constraintsl This is a two-variable problem simila...

-- 0.020506--