Question

Consider the initial value problem.

y(0) = 1.

Apply the Fundamental Existence and Uniqueness Theorem to show that a solution exists. Solve the IVP using your favorite method. What is the domain of definition of the solution function?

Answer 1

Solution : The given initial value problem is :- with 4 (0) 21.... (1) comparing (1) with dy f(x,y) we get; Liety) att ty? f(ty and obe tetty 244 dy ty so we see that for the given initial value 02 and at + t.42' t tty oblem, 2 exist and is Clearly both fet, f) and of bounded around 1 (0,1); Y [ since y (0) = 1] are defined and Since both fet, y) and af (ty) Hence, continuous at all powits St hence by the fundamental existence and conclude that uniqueneles theorem, we can in some open interval exist a anigte solution centred at GARA.0 and is unique in some (possibly smaller) interval centred at 0. VP by the Now we shall solve the given variables. methods of separation of so we have, dy a tt ty? de ett

y tent dt. Ithu 2 * Juhea ratung we I dy Itert det a tan-' (g) - tett plient et + c. tan (y) 2 terte-étC; where c is the integration constant. Using the initial condition (2) in the above equation we ger; 9 (0)2 1. a tanti (1) - -Ite. T - e -!+e. 1+ 4. 21 C2 1/4) 2 - te e et + Ty tl. ya tan (5+ lo et te t). of the solution function The domain of definition At na ; n being IS :- Tile-etter F 2 an integrer 4 a l-ettet t Atna vp is :- Answer :- The general solution of the given Y z tan (t+1-et-te-t). of the solution function d of definition the domain is ;-, all ť sätietying's i lett tet t Itna ; n bang 1 an 0 inheges. I