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2. Solve the following set of homogeneous first-order ODEs using the substitution y = vx. (a)...
number 5 please 1-14 ODES. INTEGRATING FACTORS Test for exactness. If exact, solve. If not, use an integrating factor as given or obtained by inspection or by the theorems in the text. Also, if an initial condition is given, find the corresponding particular solution. 1. 2xy dx + x2 dy = 0 2. xºdx + y°dy = 0 3. sin x cos y dx + cos x sin y dy = 0 4. €3°(dr + 3r de) = 0 5....
Solve A,B,C,D step by step please 2.- Obtain the general solution of the following homogeneous differential equations A. y dx - (2x2 + 3xy)dy = 0 B. y' y2- 3xy C. y(In y2 – In x2 + 1)dx – xdy = 0; y(1) = e" D. y' = (x+y-1,; y(0) = 1
In Problems 3-6, find the critical point set for the given system. dx 4. dx = x-y, 3. dt y1 dt dy dy = x2 y2 - 1 dt = x + y + 5 dt dx dx x2- 2xy y2- 3y 2 6. 5. dt dt dy dy 3xy - y2 (x- 1)(y 2) dt dt
A.9. First-order linear non-homogeneous ODEs having one dependent variable are of the form dy + P(x)y = f(x). Beginning with yp = uyż, where yı = e-SP(x)dx and is thus a solution to Y + P(x)y = 0, and given that the general solution y = cyı + Yp, use variation of parameters to derive the formula for the general solution to first-order linear non-homogeneous ODES: dx y = e-SP(x)dx (S eS P(x)dx f(x)dx + c). You may use the...
4. Find the general solution to each of the following non- homogeneous second order ODES. d²y dy -2+ y = -x + 3 dx dx2 Hint: Use the method of undetermined coefficients in finding the particular solutio day b) dx2 + y = secx Hint: Use variation of parameters for finding the particular solution. > The following problem is for bonus points. -- Solve the following ODE: dy + 5y = 10e-5x dx
2. Solve the following ODEs using an appropriate method. a) (ex + 1) .y = ev sin x b) dy 1 = -y - dx y=x. x > 0 c) (2x2y3 + 3y2) dy = -xy4 dx Cid
Solve by D-Operator Method for the following set of simultaneous ODEs: dx/dt+ y − 2x = 0 dy/dt+ 3dx/dt+ 4y = 0 Given that x(0) =0 and y(0) = 1
3. (25 points) Given a series of ODES: dy = 6e– y2 +224/7 = 62 + 3y Given initial conditions y(0)=0, 2(0)=1, and I = 1; dra dx dx x=0 solve the system using 2nd-order Runge:Kutta method (Heun's method) with step size of h = 1. dy (Hint: Treat- dy dz as separate ODES) dx2
2. Solve the given Bernoulli equation by using an appropriate substitution. dy 2xy = 3y4, (1) - 22 dx x2
(5 points) Find all 5 equilibria for the system of first order ODES dx = x(4-y-12) dt dy = y(x2-1) dt