DIFFERENTIAL EQUATIONS PRACTICE PROBLEMS: ANSWERS
mathserver.neu.edu › ~bridger › U343DIFFERENTIAL EQUATIONS PRACTICE PROBLEMS: ANSWERS 1. Find the solution of y0 +2xy= x,withy(0) = −2. This is a linear equation. The integrating factor is e R 2xdx= ex2. Multiplying through by this, we get y0ex2 +2xex2y = xex2 (ex2y)0 = xex2 ex2y = R xex2dx= 1 2 ex2 +C y = 1 2 +Ce−x2. Putting in the initial condition gives C= −5/2,soy= 1 2 ...
Solution of Exact Equations - IIT
www.iit.edu › workshop_on_exact_equationsExact Equation If given a differential equation of the form , + , =0 Where M(x,y) and N(x,y) are functions of x and y, it is possible to solve the equation by separation of variables. However, another method can be used is by examining exactness. The whole idea is that if we know M and N are differentials of f,
DIFFERENTIAL EQUATIONS - Mathematics
www.ms.uky.edu › ~ejwh226 › Spring2018solution to a differential equation. Exact Equations – Identifying and solving exact differential equations. We’ll do a few more interval of validity problems here as well. Bernoulli Differential Equations – In this section we’ll see how to solve the Bernoulli Differential Equation. This section will also introduce the idea of