Differential equation 1. Chapter 4 covers differential equations of the form an(x)y("4a-,(x)ye-i) + +4(x)y'+...
(1 point) Consider the first order differential equation x' + = 25% = For each of the initial conditions below, determine the largest interval on which the existence and uniqueness theorem for first order linear differential equations guarantees the existence of a unique solution. (Write the interval in the form a < t < b) a. y(-7) = -0.5. help inequalities) b. (-1.5) = -5.5. help (inequalities) C. y(0) = 0. help inequalities) d. y(7.5) = 2.6. help inequalities) e....
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...
please help Fundamental Existence Theorem for Linear Differential Equations Given an IVP d"y d" y dy +ao(x)ygx) dx ... a1 (x)- + an-1 (x) dx" а, (х) dx"-1 yу-D (хо) — Уп-1 У(хо) %3D Уо, у (хо) — У1, ..., If the coefficients a,(x), ... , ao(x) and the right hand side of the equation g(x) are continuous on an interval I and if a,(x) 0 on I then the IVP has a unique solution for the point xo E...
Solve the differential equation: Y" + y = sec(x) given that the complimentary solution is ye(s) = ci cos(x) + c2 sin(x)
A Bernoulli differential equation is one of the form dydx+P(x)y=Q(x)yn. Observe that, if n=0 or 1, the Bernoulli equation is linear. For other values of n, the substitution u=y1−n transforms the Bernoulli equation into the linear equation dudx+(1−n)P(x)u=(1−n)Q(x). Use an appropriate substitution to solve the equation y′−5xy=y5x7, and find the solution that satisfies y(1)=1. y(x)=
dy Determine the region in the plane for which the differential equation 1. has a unique V1-y dx solution through the point (Xo. yo) Verify that the function is an explicit solution of the differential equation: 2. x2y" +xy'+y 0; y sin(In x) Give an interval of definition for the solution. Chapter 2 3. The graph represents the graph ofdyf). Sketch a direction field for the differential equation
Consider the differential equation (1-x²)y" - 5xy' - 3 y = 0 1. Find its general solution y = Xar, x" in the form y = doy1(x) + anyz(x), where yı(x) and y2(x) are power series 2. What is the radius of convergence for the series yı(x) and y(x)?
4. Consider the differential equation with initial condition r(0) = 0 (a) What does the existence and uniqueness theorem tell you about the solution to this IVP? (10 points) (b) Use separation of variables to find the solution for the IVP r(to) = Io for to +0. (5 points) (c) Are the solutions to b) unique? (5 points) (d) Sketch solutions for Xo = --1,0,1 and to = 1 and show that for all to and to the solution goes...
The solution of a certain differential equation is of the form y(t)=a exp(3t) + bexp(8t), where a and b are constants.The solution has initial coniditons y(0) and y’(0)=1.Find the solution by using the initial conditions to get linear equations fro a and by(t)=?
Verify that the given function is a solution to the given differential equation (c1 and c2 are arbitrary constants), and state the maximum interval over which the solution is valid. 14. y(x) = cix-3 + c2x-1, x2y" + 5xy' + 3y = 0.