Show that the indicial roots of the singularity do no differ by an integer. Use the...
Show that the indicial roots of the singularity do no differ by an integer. Use the method of Frobenius to obtain two linearly independent series solutions about x = 0. 9x2y" + 9(x2 + x)y' + (12x - 1)y = 0 What is the radius of convergence of those series solution
Given that x =0 is a regular singular point of the given differential equation, show that the indicial roots of the singularity do not differ by an integer. Use the method of Frobenius to obtain two linearly independent series solutions about x = 0. Form the general solution on (0, ∞) 2xy''-y'+y=0
20. 0/2 points | Previous Answers ZillDiffEQ9 6.3.018 The point x 0 is a regular singular point of the given differential equation. 4x2y"-xy + (x2 + 1)y = 0 Show that the indicial roots r of the singularity do not differ by an integer. (List the indicial roots below as a comma-separated list.) Use the method of Frobenius to obtain two linearly independent series solutions about x-0. Form the general solution on (0, ) 2015 340**. y = C-X1/4 1672...
4. Given that x =0 is a regular singular point of the given differential equation, show that the indicial roots of the singularity do not differ by an integer. Use the method of Frobenius to obtain to linearly independent series solutions about x = 0. Form the general solution on (0, 0) kxy” – (2x + 3)y' + y = 0
2. Solve each of these ODEs using power series method expanded around Xo = 0. Find the recurrence relation and use it to find the first FOUR terms in each of the two linearly independent solution. Express your answer in general form where possible (well, it is not always possible). (a) (25 marks) (x2 + 2)y” - xy + 4y = 2x - 1-47 Note: expressa in terms of power series. (b) 2x2y" + 3xy' + (2x - 1) =...
DETAILS ZILLDIFFEQ9M 6.3.022. MY NOTES The point x = 0 is a regular singular point of the given differential equation. *?y" + xy' + +(x2-3) = 0 Show that the indicial roots r of the singularity do not differ by an integer. (List the indicial roots below as a comma-separated list.) Use the method of Frobenius to obtain two linearly independent series solutions about x = 0. Form the general solution on (0,co). 3 9 9 1 ...) 3328 448...
please show the recurrence formula 1) Show that zo-0 is a regular singular point for the diferenta equation Zo = 0 is a regular singular point for the differential equation 15ェy" + (7 + 15r)y, +-y = 0, x>0. Use the method of Frobenius to obtain two linearly independent series solutions about zo Find the radii of convergence for these series. Form the general solution on (0, 0o). 0. 1) Show that zo-0 is a regular singular point for the...
Use the method of Frobenius and the larger indicial root to find the first four nonzero terms in the series expansion about x = 0 for a solution to the given equation for X>0 36x2y + 12x²y + 5y = 0 What are the first four terms for the series? y(x)=0-.. (Type an expression in terms of a.)
Use the method of Frobenius to obtain linearly independent series solutions about r = 0. 1.0"y" + 1ry' + (22 – 1)y=0. Use an initial index of k = 2 to develop the recurrence relation. The indicial roots are(in ascending order) rı = .12= Corresponding to the larger indicial root, the recurrence relation of the solution is given by C = Xq-2. The initial index is k = The solution is yı = (Q10 where Q1 = + Q222 +230...
5. (20 pts) For the differential equation: sume the following information (you don't need to show this). e roots of the indicial equation are ri 4 and 2--2. In addition, after substituting y t and its derivatives into the differential equation and reindexing we get: Given this information, find all Frobenius solutions for x >0. Make sure you include the "nth" term in your solution(s). If a solution does not exist for an exponent, show why. 5. (20 pts) For...