1. Find all the equilibria, draw the phase diagram, and classify equilibria as sources, sinks, or...
Find the equilibria of the difference equation and classify them as stable or unstable. (Enter your answers as comma-separated lists. If an answer does not exist, enter DNE.) 7x,? x2 + 10 X0 = 1, xo = 3 X+ +1 = stable unstable Use cobwebbing to find lim x, for the given initial values. lim x, Xo 3
Please help me 2 A (-1) -7 43 B(-1,-リ olat A,B,C. There are sources and sinks at Theve are al” stagnation point at DE Find the Aa and M 2 A (-1) -7 43 B(-1,-リ olat A,B,C. There are sources and sinks at Theve are al” stagnation point at DE Find the Aa and M
dy 3. (5 points): Consider the autonomous differential equation dt is given below. Draw the phase line and classify the equilibria. f(y) where the graph of f(y) Y 1 -0.5 0.5 1 y
Autonomous Equations 3 1)(2) for the following questions Consider ( 1. Draw the phase diagram, find the critical points, and mark them as stable or unstable 2. Find limo (t) for the solution with the initial condition (0) = 0.5. Autonomous Equations 3 1)(2) for the following questions Consider ( 1. Draw the phase diagram, find the critical points, and mark them as stable or unstable 2. Find limo (t) for the solution with the initial condition (0) = 0.5.
Draw the phase diagram of water and the phase diagram of carbon dioxide and answer the following questions: 1.Carbon dioxide is in what phase at -78oC and 1.0 atm? 2. Water is in what phase at 100°C and 1.0 atm?
Consider the following differential equation date = y2(y2 – 4). (a) Find all critical values. (b) Draw the phase diagram to classify each as stable, semi-stable or unstable.
Question 3 (20 points) Consider the following differential equation = y(y2 - 4). (a) Find all critical values. (6) Draw the phase diagram to classify each as stable, semi-stable or unstable.
PLEASE HELP! 1. Consider the equation d2x dt2 (a) (b) (c) (d) Find a conserved quantity or first integral for this equation. Rewrite the above equation as a system of two first-order equations. Find all the equilibria of your system and classify them. Sketch the phase portrait for your system.
For the circuit shown, find the impedance and phase angle. Draw an impedance phasor diagram and fill in the table below. Is the circuit inductive, capacitive, or (nearly) purely resistive?
help please asap Page 7 pulmts) A disease outbreak shows a rate of infection given by the differential equation dI e21-3(13- 12-421), dt for t measured in days and I(t) representing the number of infected individuals (in hundreds) at time t. Answer the questions below, showing all work and putting a box around your final answer. (a) (3 points) Find the biologically relevant equilibria of this differential equation. (b) (3 points) State the relevant stability theorem and use it to...