5

Problem 2: Cousider the differential equation+ 4" For each of the statements in (4) (e) below , determine whether it is true or lalse(a) The equation is Bernon...

Question

Problem 2: Cousider the differential equation+ 4" For each of the statements in (4) (e) below , determine whether it is true or lalse(a) The equation is Bernonlli, AIL solutions have a limit of for % 60_ (c) If ylr) is a solution. then so is ylr 1). All solutions cliverge to for o0. All solutious are either strictly increasing Or strictly decreasing:

Problem 2: Cousider the differential equation + 4" For each of the statements in (4) (e) below , determine whether it is true or lalse (a) The equation is Bernonlli, AIL solutions have a limit of for % 60_ (c) If ylr) is a solution. then so is ylr 1). All solutions cliverge to for o0. All solutious are either strictly increasing Or strictly decreasing:



Answers

Are the statements in Problems $38-45$ true or false? Give an explanation for your answer. The solutions of the differential equation $d y / d x=$ $x^{2}+y^{2}+1$ are increasing at every point

Forgets heuristics. Wind. Double prime What it's for. Nothing. Why Crime was eight. Why great, You know that? Why is he felt soon? C one each fx over six. Pussy to agent eight x. Okay, let's take the first derivative. This is equal to home one over six C one each of ex of six. Plus it's C to enter a text. Why double time is equal to won over 36 c one each of X over six plus eight times eight, which is 64 seats You e to eight specs. K plugging this into our equation. You get six one owner 36 c one needs an X over six or 64. See you, too. Need thio eight x minus 49 times one over six feet X over a six foot peak. See 2886 What's this thing? Weren't eating X over six. Proceed to 86. Okay, now expanding. This gets one over six when it's 49 over eighth or bring it over six times you want you to the X over six plus six times 64 minutes 49 98 states t to each of a text. This is actually so And this is also Oh, there's a plus it here, actually, when you some honest, This is also equal to know. Do we get Darryl? If you could choose

Yes, they were ex squared. Why double time? But it's too. Why? But it's three x squared plus one and he was down. Okay, we know not. Why of X because he could see one x two plus two x rated one plus x squared Ellen to close 1/2 Let's take my prime is equal to to see one expert receipts you x better too 1st 2 x, but one of X plus x My double time. This is equal to to Z one was to see two extra 93 plus two out in X plus three. You cannot put in what we know. Torto Friendship equation Replacing Why a double prime? Why prime in why we get that X squared to see one? Because to see two x three that's to end of X. It was three. When is two times he won X to see two. Excellent one. What else do we have? We have minus three x squared. That's one that expanding. This would get stats to use C one X squared Plus Do you see two expected one plus two x squared Ellen x three X squared minus two c one X squared minus two seats. You accepted one minus two X squared, Ellen. But it's one of his three X squared. That's one You could go. Okay. What can we can't sell? Aren't ones cancel the three X squared misting cancers over here? Everything catches so we get so is equal to zero.

Let's start off with Ry which is going to be Y. Echo C. One E. To the negative X. Times Co signed two x. Class C. two E. to the negative bags. Mhm. I have two x. Okay. We take the first derivative. A crime that's kind of giving us we're going to want to use the Product growth. So we're gonna have c. one times um I have a negative E. To the negative X. Cook sign to rex. And then nothing gets added with um either the negative Alex, right times the co sign or the negative sign. Mhm. two X. Times two. So it's really complicated. But we want to make sure that we keep all this group together that would be one derivative of this term and then it's gonna be very similar for the other term as we'll see.

All right, silver problem. Nine You had to find whether they're given the function is a solution to the difference. Like Waka. So we all agree we already have. Why? And I'm gonna factor out and eaten Negative seven x to see even exists implore So it's give me each of the next of seven x times, See one for a C two acts and we're well derived from here. So why prime is Eagle Teoh Negus seven times GTO, Mega seven. Next I can see one for CTO axe and then for us we'll see one false teacher, ext arrived. It's just seat. So it's gonna be see if he resigns. Eaten negative seven x and then we drive it again. So why Double time is going to be 49 times eating? Negative, sir. Next time C one plus C two X minus seven times Teacher, Thanks. Eating like this. So next little minus seven times. See it here Times eating like seven axe And now we just deport these Jared Derivations into our differential equation and see if it all equals 20 So why don't look fine? It's gonna be for us and the UAE Prime is gonna were gonna multiply a 14 was well, they re whenever we have for our UAE prime. So actually, I'm just going to write everything out so soon. 49. Like eating, they get some light exercise see on the post Tito Axe, and these two terms are exactly the same. So if you just combine them so steamy, negative for team size CTO times eating like there's so next and then we multiply 14 with y prime. So it's gonna be minus 98 times using leg. So on Lex, time stealing for CTO axe, then costs 14. See, it's here, science teaching here a sudden axe, and then we just add the and then we multiply 49 with y. And then we added. So this just in Indiana plus 49 tires, you turn there. So next time C one plus c two x and see if everything cancels out. So we have minus 14 C to each of them. They're going to sell next in plus 14 C two songs each and negative son. Next these were cancelled house and then we have, like all of the same terms, except we have a positive 49 1st 49 minus 98. Well, 49 foots 49 zeros in 98 which means all three of these terms cancel out. And in the end, we just get zero. Which means the givens for Given the function is indeed a solution to the differential equation. And now we have the graph, like certain particular solutions with various A C one and C two values. And we have to see, like I want all the grass have have in common. I'm not exactly sure what they're looking for. When I graphed among older graphs basically looked something like the site here it's one. Here's another one and I even have a graph look like this. So basically, the only common feature I could find with all these graphs is that once you like, approach one or something, then they just, like, flattens out zero. Yeah, I think that's basically s


Similar Solved Questions

5 answers
Calculaio tha pH ol & buller solution that is 0.260 Min HC_HyOz and e D1no Min NaC_H,Oz (K fr HC_HyOzis 1.8 x 10-5 ) Exprobe Yout andwior Rodacmn placesAEd
Calculaio tha pH ol & buller solution that is 0.260 Min HC_HyOz and e D1no Min NaC_H,Oz (K fr HC_HyOzis 1.8 x 10-5 ) Exprobe Yout andwior Rodacmn places AEd...
5 answers
Tha region R is boundad Dy x7 and * 7 Then| |sk,yda =f(x,yldydxand[ [tusaa =f(x, y)dxdyNote: You can earn partial credit on thls / problam
Tha region R is boundad Dy x7 and * 7 Then | |sk,yda = f(x,yldydx and [ [tusaa = f(x, y)dxdy Note: You can earn partial credit on thls / problam...
5 answers
Points) The equation of circle with radius and centre at the origin is T? +V' =r points) Use implicit differentiation to find the slope of tangent line to the circle somG point (T,y) points) Use this result to find the equations of the tangent lines of the circle at the points whose coordinate is I=r/v3
points) The equation of circle with radius and centre at the origin is T? +V' =r points) Use implicit differentiation to find the slope of tangent line to the circle somG point (T,y) points) Use this result to find the equations of the tangent lines of the circle at the points whose coordinate ...
5 answers
Perform each matrix rOw operation and write the new matrix.12 4R, -Ra ~ZR; +R4Complete the new matrix below
Perform each matrix rOw operation and write the new matrix. 12 4R, -Ra ~ZR; +R4 Complete the new matrix below...
5 answers
1 7i 1Ii ROGACALCLTZ1 Tpoint 11 11
1 7i 1 Ii ROGACALCLTZ 1 Tpoint 1 1 1 1...
5 answers
Filteen-year hond, which was purchased prcmium; has scmiannual coupons_ Thc amount for amortization of the premium the second coupon is $982.42 and the amount for amortization the fourth coupon 81052.02. Find the amount of thc prcmium_ Round yOur answer to the nearest cent. Answer in units of dollars_ Your answer must be within + 0.0%
filteen-year hond, which was purchased prcmium; has scmiannual coupons_ Thc amount for amortization of the premium the second coupon is $982.42 and the amount for amortization the fourth coupon 81052.02. Find the amount of thc prcmium_ Round yOur answer to the nearest cent. Answer in units of dollar...
5 answers
Use Algorithm 1 to find the transitive closures of these relations on $|a, b, c, d, e|$.a) ${(a, c),(b, d),(c, a),(d, b),(e, d})$b) $[(b, c),(b, e),(c, e),(d, a),(e, b),(e, c) mid$c) $[(a, b),(a, c),(a, e),(b, a),(b, c),(c, a),(c, b),(d, a),$,$(e, d) mid$d) ${(a, e),(b, a),(b, d),(c, d),(d, a),(d, c),(e, a),(c, b),$,$(e, c),(e, e)}$
Use Algorithm 1 to find the transitive closures of these relations on $|a, b, c, d, e|$. a) ${(a, c),(b, d),(c, a),(d, b),(e, d})$ b) $[(b, c),(b, e),(c, e),(d, a),(e, b),(e, c) mid$ c) $[(a, b),(a, c),(a, e),(b, a),(b, c),(c, a),(c, b),(d, a),$, $(e, d) mid$ d) ${(a, e),(b, a),(b, d),(c, d),(d, a),...
5 answers
Select the correct statements with regard to packet filters of a firewall:(i) They are usually driven by a table with information in regards to acceptable sources and destinations.(ii) Default rules about what needs to be done in regards to packets coming from or going to other machines.(iii) Can block TCP ports.(A) (i), (ii)(B) (ii), (iii)(C) (i), (iii)(D) (i), (ii), (iii)
Select the correct statements with regard to packet filters of a firewall: (i) They are usually driven by a table with information in regards to acceptable sources and destinations. (ii) Default rules about what needs to be done in regards to packets coming from or going to other machines. (iii) Can...
5 answers
Hamiltonian circuit or disprove its existence in the graph.
Hamiltonian circuit or disprove its existence in the graph....
5 answers
DETAILSWILLINALG9 3.R.002.[~/6 Points]Fnd the following minors and cofactors:Let A12 Jn8 6p_K31 and C3iM2z and Cz2 Mz2
DETAILS WILLINALG9 3.R.002. [~/6 Points] Fnd the following minors and cofactors: Let A 12 Jn8 6p_ K31 and C3i M2z and Cz2 Mz2...
5 answers
Teponth Axto RGF stinulsles pro (cration 0l cultured Dt cells The tutbideRGE 4 a ecepfor twrosne Kinase called RGFR Which of the tubant fipe 0f aenhion wod be m2stlikdly to prevent the KTwcontl the dowratre m SHZ domjin containing adaptor protein?Ton (Dulcorab smnity& RGFR for RGF JeanAleRnG zutra EE trahiunod nerora 'Horpneryuted on RGFR d erization to Kotr#ARCTR Roeotr
Teponth Axto RGF stinulsles pro (cration 0l cultured Dt cells The tutbideRGE 4 a ecepfor twrosne Kinase called RGFR Which of the tubant fipe 0f aenhion wod be m2stlikdly to prevent the KTwcontl the dowratre m SHZ domjin containing adaptor protein? Ton (Dulcorab smnity& RGFR for RGF JeanAleRnG zu...
1 answers
Determine whether the series converges absolutely or conditionally, or diverges. $$\sum_{n=1}^{\infty} \frac{(-1)^{n+1}}{n \sqrt{n}}$$
Determine whether the series converges absolutely or conditionally, or diverges. $$\sum_{n=1}^{\infty} \frac{(-1)^{n+1}}{n \sqrt{n}}$$...
5 answers
Calculate the Ksp forAs2S5(s) (MM =310 g∙mol−1) which has asolubility of1.4×10−2 g/100 mL. andgive a completed ICE table
Calculate the Ksp for As2S5(s) (MM = 310 g∙mol−1) which has a solubility of 1.4×10−2 g/100 mL. and give a completed ICE table...
5 answers
Obtain the general solution to the equation (4t + 4y + 1Jdt - dy=0The general solution is y(t) =ignoring Iost : solutions , if any:
Obtain the general solution to the equation (4t + 4y + 1Jdt - dy=0 The general solution is y(t) = ignoring Iost : solutions , if any:...
5 answers
Give your answer in Sl units and to three significant figuresQuestion 15 ptsA 3.57 HF capacitor anda 9.56 mH inductor are connected in series with an AC power source that has a frequency of 4.17 x10? Hz and peak voltage of 42 V: Take the initial time as zero when the instantaneous voltage equals zero:Determine the instantaneous current when t = 4.5x 10-4
Give your answer in Sl units and to three significant figures Question 1 5 pts A 3.57 HF capacitor anda 9.56 mH inductor are connected in series with an AC power source that has a frequency of 4.17 x10? Hz and peak voltage of 42 V: Take the initial time as zero when the instantaneous voltage equals ...
5 answers
34 What does carbonic acid decompose into?What are the major species that are present snoonbe UE solution of the strong acid Hl(aq)?
34 What does carbonic acid decompose into? What are the major species that are present snoonbe UE solution of the strong acid Hl(aq)?...
5 answers
(d) Do you reject Ho ? Yes/No:Solution:Is thcre enough evidence to support the claim at a = 0.05 level of significance?Solution:" 0,388%
(d) Do you reject Ho ? Yes/No: Solution: Is thcre enough evidence to support the claim at a = 0.05 level of significance? Solution: " 0, 388 %...

-- 0.018972--