2. You can use Dand write an operator instead of an equation in this question. (a) Find a constant coefficient linear homogeneous differential equation of lowest order that has n(x)-x , y2(z) = x2 , and y3(z) = eェamong its solutions. (b) Now find a different linear homogeneous differential equation of an order lower than the one in (a) that has the same y1,U2,U3 among its solutions. (c) Find a constant coefficient linear homogeneous differential equation of lowest order that...
Problem #1 Y1(x)= x and Y2(x)=e* are linearly independent solution of the homogeneous equation: (x-1)y"-xy'+y = 0 Find a particular solution of (x-1) y”-xy’+y = (x-1)} e2x
Verify that the given functions Y1 and y2 satisfy the corresponding homogeneous equation; then find a particular solution of the given nonhomogeneous equation. x2y" – 3xy' + 4y = 7x? In x, x>0; 71(x) = x2, yz(x) = x2 In x Y(x) =
differential equations Consider the following differential equation to be solved using a power series. y" + xy = 0 On Using the substitution y = cryn, find an expression for Ck + 2 in terms of Ck - 1 for k = 1, 2, 3... n = 0 Ck +2= + 6 Find two power series solutions of the given differential equation about the ordinary point x = 0. x3 O Y1 = 1 - xo and y2 = x...
A third-order homogeneous linear equation and three linearly independent solutions are given below. Find a particular solution satisfying the given initial conditions. yl) + 2y'' – y' - 2y = 0; y(0) = 2, y'(0) = 12, y''(0) = 0; Y1 = ex, y2 = e -X, y3 = e - 2x The particular solution is y(x) = .
Please help on these HW problems It can be shown that yı = x-2, y2 = x-6 and y3 = 7 are solutions to the differential equation xạy" + 11xy" + 21y' = 0. W(y1, y2, y3) = For an IVP with initial conditions at x = 3, C1yı + C2y2 + c3y3 is the general solution for x on what interval? It can be shown that yı = x-2, y2 = x-7 and y3 = 5 are solutions to...
x = 0 is an ordinary point of a certain linear differential equation. After the assumed solution y = ∞ n = 0 cnxn is substituted into the DE, the following algebraic system is obtained by equating the coefficients of x0, x1, x2, and x3 to zero. 2c2 + 2c1 + c0 = 0 6c3 + 4c2 + c1 = 0 12c4 + 6c3 + c2 − 1 3 c1 = 0 20c5 + 8c4 + c3 − 2 3...
(b) (30 points) Solve the following IVP given that yı (x) = x and y2 (x) = x3 are solutions to the corresponding homogeneous differential equation. Be sure to fully evaluate any integrals that arise. (You will have to use polynomial long division.) " - 3xy' + 3y = y(1) = 0, y(1) = 0 1+2
0 x = 1 - 2x + a to 5x? and Y2 = x + 1x? Find two power series solutions of the given differential equation about the ordinary point x = 0. y" + xły' + xy = 0 14 and Y2 = x - -X + 6 45 252 Oy₂ = 1 1,3 5 + хб 4 12 672 3 15 14 O Y = 1 - 12+ 1 and 1 2 8 Y2 = x - 10...
Question 5. (4 marks) Consider the first order differential equation y' = x² + y2 subject to the condition y(0) = 0. As discussed in lectures, the solution to this problem for x > 0 has a vertical asymptote. Use the transformation Y u to transform the above differential equation into a second-order linear homogeneous equation. Determine equivalent initial conditions for this transformed equation, and identify what the transformation implies about solutions to the original equation, y.