DIFFERENTIAL EQUATIONS
please give a comprehensive answer for thumbs up :)
(please give an ORIGINAL solution)
DIFFERENTIAL EQUATIONS please give a comprehensive answer for thumbs up :) (please give an ORIGINAL solution)...
Need help with Ordinary Differential Equations assignment. I will give a thumbs up to anyone that provides solution quickly. Find the general solution of the given differential equation: 2y' + 3y' + y = 21
Show all work/steps please. Will thumbs up! Differential Equations In Problems 1 through 10, an initial value problem and its ex- act solution y(x) are given. Apply Euler's method twice to approximate to this solution on the interval [0, , first with step size h 0.25, then with step size h 0.1. Compare the three-decimal-place values of the two approximations at x with the value y) of the actual solution. Question 3. y'y,y(0) = 1; y(x) = 2e* -1 Book...
2. Differential equations and direction fields (a) Find the general solution to the differential equation y' = 20e3+ + + (b) Find the particular solution to the initial value problem y' = 64 – 102, y(0) = 11. (e) List the equilibrium solutions of the differential equation V = (y2 - 1) arctan() (d) List all equilibrium solutions of the differential equation, and classify the stability of each: V = y(y - 6)(n-10) (e) Use equilibrium solutions and stability analysis...
Differential Equations with MATLAB/Plotting first order differential equations in Matlab/ Differential Equations MATLAB/IVP Matlab/IVP I'd really appreciate if I can get some help plotting these 3 first order differential equations as well as their comments. PLEASE! ANYTHING HELPS, I am very stuck :( EZplot and ODE 45 were mentioned in class and the instructions in class were not clear at all. Given the first order differential equation with initial condition. dy/dt = y t, y(0)=-1 Complete problems 1-3 in one...
just (A) (B) (C) 3. Consider the system of differential equations = z+9-1 (a) Sketch the r-nullcline, where solutions must travel vertically. Identify the regions (b) On a separate set of axes, sketch the y-nullcline, where solutions must travel horizon in the plane where solutions will move toward the right, and where solutions move toward the right tally. Identify the regions in the plane where solutions will move upward, and where solutions move downward. (c) On a third set of...
Please answer correctly, don't rush. I will give a thumbs up if answer is correct. Suppose that X ~ B(n1,p) and Y ~ B(n2, p) are independent. What is the distribution of X +Y? (a) Use the method of mgfs to determine this distribution. (b) Provide an intuitive verbal explanation behind the distribution of X +Y. What is an interpretation that can be given to X? to Y?
(Generalized Riccati Equation) Let po, p1, p2 : I -> R be continuous functions defined on an interval I of R. Then the 1st-order differential equations of the type Not sure how to solve y using the Ansatz v(x) := y(x)p2(x) Help is greatly appreciated :D (Generalized Riccati Equation) Let po, p1, p2 I -R be continous functions defined on an interval T of R. Then the 1st-order differential equations of the type is called generalized Riccati equations. It is...
Answer all Please! Thanks 1. Confirming Solutions to Differential Equations: Verify that each function does in fact solve the given differential equation. If there are parameters in the function (A. b. k), give the range of values of those parameters for which that function is a solution. The prime indicates differentiation with respect od dr' (b) y" + 4y = 0; y = A sin(kx + φ). (c) y"-4s, + 4y = 0, y = Axe . (d) x2y', +...
Please Answer Part b; 2. (Generalized Riccati Equation) Let Po, PI, P2:IR be continous functions defined on an interval T of R. Then the lst-order differential equations of the type is called generalized Riccati equations. It is another nonlinear ordinary differential equation. (a) Suppose, P2 differentiable and P2メ0 on T. By using the Ansatz v(x) :-y(x) P2 (x) for every x є 1, where y is a solution of (2), develope a method to solve the equation (2). Describe in...
Hello! I need help with this college level differential equations question. Please show work and thank you. 3. Consider the initial value problem y' (t) 1 0y(t) y(0) Clearly, the solution to the system is y(t) = et and 2(t) = e-10 t. Suppose we tried solving the system using forward Euler. This would give us with to 0, y(to) 1, and z(to-1. a. Show that the numerical solution for z(t) will only tend to zero if Δι < 2...