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10 points 2. Find the largest possible open rectangular box within tyy'-space in which the existe...
Question 2: A More detailed version of the Theorem 1 at page 24 of the textbook, called Picard's Theorem, says that If the function f(x, y) is continuous in a rectangle near the point (a, b), then at least one solution of the differential equation y' = f(x,y) exists on some open interval I containing the point If, in addition, the partial derivative is also continuous in that rectangle near (a, b), then this solution is unique on some (perhaps...
and 3. Find the eigenvalues and eigenfunctions for the given boundary-value problem. There are 3 cases to consider. g" + Ag = 0 y(0) = 0, y'(%) = 0 8. Given the initial value problem (3 – 4 g" + 2z +174 = In , g(3) = 1, y'(3) = 0, use the Existence and Uniqueness Theorem to find the LARGEST interval for which the problem would have a unique solution. Show work.
If f(x, y) is continuous in an open rectangle R = (a, b) x (c, d) in the xy-plane that contains the point (xo, Yo), then there exists a solution y(x) to the initial-value problem dy = f(x, y), y(xo) = yo, dx that is defined in an open interval I = (a, b) containing xo. In addition, if the partial derivative Ofjay is continuous in R, then the solution y(x) of the given equation is unique. For the initial-value...
2y (9 points) Given the initial value problem y' => y (xo) = yo. Use the existence and uniqueness theorem to show that a) a unique solution exists on any interval where xo + 0, b) no solution exists if y (0) = yo # 0, and c) an infinite number of solutions exist if y (0) = 0.
2y 1. (9 points) Given the initial value problem y' = y (xo) = yo. Use the existence and uniqueness theorem to show that a) a unique solution exists on any interval where x, 60, b) no solution exists if y(0) = % 70, and c) an infinite number of solutions exist if y(0) = 0.
x (9 points) Given the initial value problem y' 2y 29, 2014 ,y (xo) = yo. Use the existence and uniqueness theorem to show that a) a unique solution exists on any interval where Xo 70, b) no solution exists if y (0) = yo #0, and c) an infinite number of solutions exist if y (0) = 0.
6. (2 pts) Consider the following initial value problem: y' = (t + y)?y2 + sin(yº) + yety, y(0) = 0. This initial value problem satisfies the existence and uniqueness theorem criteria using interval (-0, 0) for both thet and y variables, and hence has a unique solutoin. Find this unique solution. Hint: None of the techniques we've learned for explicitly solving will work. Instead, try plugging the initial condition into the differential equation and think about what that tells...
For each initial value problem, does Picards's theorem apply? If so, determine if it guarantees that a solutio exists and is unique. Theorem (Picard). Consider the initial value problem dy = f(t,y), dt (IVP) y(to) = Yo- (a) Existence: If f(t,y) is continuous in an open rectangle R = {(t,y) |a<t < b, c < y < d} and (to, Yo) belongs in R, then there exist h > 0 and a solution y = y(t) of (IVP) defined in...
1200 2of material in available to smake a rectangular box with ae se and open top, And the dimensions of the bos of largest ohar 2. A rectangular box with square base and closed top is to have a volume of 1000 in. Find the dimensions of the box with the smallest amount of material used. 3. Use I'Hopital's rule to find 2 cos z-2+2 1200 2of material in available to smake a rectangular box with ae se and open...
3. (Existence/uniqueness theorem, Strogatz 6.2): Consider the system (a) Show by substitution that (t) sin, () cost is an exact solution. (b) Now consider another solution, with initial condition a(0)-1/2, y(0) 0. Without doing any work, explain why this solution must satisfy y2 < 1 for all t < oo. For the systems in problems 4-7, find the fixed points, linearize about them, classify their stability, draw their local trajectories, and try to fill in the full phase portrait. 3....