Problem 1 of 5 (20 points) Solve the following ODE by the method of variation of...
PROBLEM 37: Find the general solution to inhomogeneous ODE y" 3y 2y 4t using the method of undetermined coefficients with the guess yp = At + B PROBLEM 38: Solve the inhomogeneous ODE 13 cos(2t) y" 7y12y + using the method of undetermined coefficients PROBLEM 39: Find the general solution for y"4y4y exp(-2t) + using the method of undetermined coefficients
2. (30 pts) Use the method of undetermined coefficients to solve the following ODE y"5y6y -12 e-2=, y(0) = 0, y'(0) = -3
II) Find the general solution of the following ODE of the 2nd order using the method of undetermined coefficients (25 points) y"+2y' y 2xsinx
Problem #2: Consider the following statements. [6 marks) (1) The particular solution of the ODE)" - 6y' + 9y = 5e3x is given by yp = Cre3x where C is an undetermined constant. (ii) The procedure of finding series solutions to a homogeneous linear second-order ODEs could be accurately described as the "method of undetermined series coefficients". (iii) Most of the material in Lecture Notes from Week 3 to Week 5, inclusive, can be extended or generalized to higher-order ODES...
(10) 3. Solve the ODE byhenethod of undetermined coefficients 1" - 4y - 12y = re
Solve y''-4y'=8e^t (a) By using undetermined coefficients - superposition method. (b) By using variation of parameters.
5. Solve the linear, constant coefficient ODE y" – 3y' + 2y = 0; y(0) = 0, y'(0) = 1. 6. Solve the IVP with Cauchy-Euler ODE x2y" - 4xy' + 6y = 0; y(1) = 2, y'(1) = 0. 7. Given that y = Ge3x + cze-5x is a solution of the homogeneous equation, use the Method of Undetermined Coefficients to find the general solution of the non-homogeneous ODE " + 2y' - 15y = 3x 8. A 2...
1. Second order ODE (25 points) a. Consider the following nonhomogeneous ODEs, find their homogeneous solution, and give the form (no need to determine coefficients) of nonhomogeneous solution. (12 points) i. 44'' + 3y = 4x sin ( *2) ii. J + 2 + 3 = eº cosh(22) b. Find the general solution of y" + 2Dy' + 2D'y = 5Dº cos(Dx) where D is a real constant with following steps i) Determine homogeneous solution, ii) Find nonhomogeneous solution with...
3. Using undetermined coefficients / annihilator or variation of parameter and Cauchy to solve the following: (40 pts) a) 3y"- y"+ 2y'-9y = 130e2+ - 18x² +5 (10 pts)
3) Solve for the following ODE using Variation of Parameters y' – 4y' + 4y = x?e? a) Determine the characteristic equation and its roots, and solve for the complementary solution yn (6 marks) b) Solve for particular solution Yp using Variation of Parameters (13 marks) c) What is the general solution y ? (1 mark)