7. Find the general solution of the ODE below as a power series solution about the...
Consider the ODE:3xy"+y' - 2xy = 0. Find the general solution in power series form about the regular singular point x = 0, following parts (a) – (c), below. (a) Obtain the recurrence relation. (b) Find the exponents of the singularity. (e) Obtain only one of the two linearly independent solutions, call it y(x), that corresponds to the smaller exponent of the singularity; but, only explicitly include the first four non-zero terms of the power series solution. Write down the...
Find a series solution, centered about x0 = 0, for the given
ODE
Find a series solution, centered about to = 0, for the given ODE (1 – 2?)y" - 2xy + 2y = 0
Question 1 4 pts To find a power series solution about x = 0 to y + 2xy = 0, which are procedures needed? Apply the Theorem 3 that all coefficients must be O to determine the coefficients an Show x = 0 is an ordinary point. Shift the indices so that the general term in each is a constant times ck and combined these power series as only one series. All of them Write the solution as a power...
First-Order ODE
(a) .Find the general solution of the following ODE:
(b). Find the general solution (for x > 0) of the ODE :
Hint: try the change of variables u ≜ x, v ≜ y/x.
(c). Find the solution to the ODE
that satisfies y(2) = 15.
Hint: Try separation of variables. For integration,
try partial fraction decomposition.
2Ꮖy 2 Ꭸ , . + <+5 12 , fi - z - ,fix = zu y' = y2...
2. Find two power series solutions and give the general solution about the ordinary point i = 0. It is suffeient to find the first four nonzero terms of each solution. Continue on the next page if necessary. y" + xy = 0
4. (a) Find and write down the general solution of the ODE 2y" – xạy=0 in the form of a power series about x = 0. Only include the first three non-zero terms in each of the two linearly independent solutions in an interval I centered at x = 0) that you obtain. (b) Check that each of the two linearly independent solutions you found in part (a) individually satisfies the ODE, up through terms of order x12.
4. (a) Find and write down the general solution of the ODE 2y" – xºy=0 in the form of a power series about x = 0. Only include the first three non-zero terms in each of the two linearly independent solutions (in an interval I centered at x = 0) that you obtain. (b) Check that each of the two linearly independent solutions you found in 12 part (a) individually satisfies the ODE, up through terms of order x'
Find the first four nonzero terms in a power series expansion about x = 0 for a general solution to the given differential equation.(x2 + 18)y'' + y = 0
(1 point) Find the indicated coefficients of the power series solution about x = 0 of the differential equation -(sinx)y y(0) = -5, y'(0) = 3 = cos x, x2 y 53x
(1 point) Find the indicated coefficients of the power series solution about x = 0 of the differential equation -(sinx)y y(0) = -5, y'(0) = 3 = cos x, x2 y 53x
4. (a) Find and write down the general solution of the ODE 2y'-x^3=0 in the form of a power series about x = 0. Only include the first three non-zero terms in each of the two linearly independent solutions (in an interval I centered at x = 0) that you obtain. (b) Check that each of the two linearly independent solutions you found in part (a) individually satisfies the ODE, up through terms of order x^12