Point C can be described as
Locally stable
Globally stable
Locally unstable
Globally unstable
Locally unstable
Explanation: The points near an equilibrium tend to move away from the equilibrium over a time period, then the equilibrium is called as “locally unstable”.
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Point C can be described as Locally stable Globally stable Locally unstable Globally unstable a b...
Point A can be described as Locally stable Globally stable Locally unstable Globally unstable a b UE
Please answer this question step by step correctly parts a, b, and c so I can understand it. I'm having trouble understanding VISUALIZATION OF DYNAMICAL SYSTEMS. For each part, determine all the equilibrium points by hand. Then, PLOT THE VECTOR FIELD AND THE PHASE PORTRAIT. From the phase portrait, determine stability(stable ISL, locally or globally asymptotically stable, or unstable) of EACH EQUILIBRIUM POINT. PLEASE ANSWER ALL THE PARTS. Here is the rest of the question. This is due tomorrow. 1....
Problem : Consider the systems A and B whose roots are shown below BI 1. Regarding stability, the systems are a) b) c) d) Both stable Both unstable A is unstable and B is stable A is stable and B is unstable 2. The responses of the systems to step input are characterized as follows: a) Both are underdamped b) Both are overdamped c) A is underdamped and B is overdamped d) A is overdamped and B is underdamped 3....
Problem l: Determine whether the following models are stable, unstable, or neutrally stable: b, c. x-3x+10x = 20 x+4x = 4
Fission occurs when____________________. A. a stable nucleus is bombarded by an electron B. an unstable nucleus is bombarded by a neutron C. an unstable neutron decays into quarks D. an unstable atom becomes an ion
5. Show that the zero solution of is asymptotically stable if b > 0 and unstable if b < 0. Does this depend on the sign of the constant k? 5. Show that the zero solution of is asymptotically stable if b > 0 and unstable if b
please help on all! mostly on 32, how can i tell from the directional field? dN 18) Given the differential equation dt and the initial condition No-5000 determine the limit. 4200 04N (1-N1) A) lim N(t) Does Not Exist Pihn 4200 4 00 B) lim N(t) t-n 04200 O lim N(t)-o t D) lim N(t)-4200 33) Sterile fruit flies are used in an experiment wshere the proportion that survive at least t days is given by e 0.25t The experiment...
|Iron has multiple stable and unstable isotopes. Let's focus on 52Fe and 45Fe. Which, if either of them, can decay by ejecting a nucleon? Show your conservation of energy calculations to verify your answer. |Iron has multiple stable and unstable isotopes. Let's focus on 52Fe and 45Fe. Which, if either of them, can decay by ejecting a nucleon? Show your conservation of energy calculations to verify your answer.
Show that the zero solution of y' =-y+y is asymptotically stable, but not globally, i.e. not all solutions tend to zero as t + Sketch all solutions in the (ty) plane, taken to = 0. Also sketch all solutions in phase space. What can you conclude about the solution y = 1?
Classify (if possible) each critical point of the given plane autonomous system as a stable node, a stable spiral point, an unstable spiral point, an unstable node, or a saddle point. (Order your answers from smallest to largest x, then from smallest to largest y.) x' = xy - 3y - 4 y' = y2 - x2 Conclusion (x, y) =( stable spiral point (x, y) =( unstable spiral point