Solve the given ODE using the power series method.(22 + 1)y'" + xy' – 4y = 04.Obtain the recurrence relation.S - 2ass + 1as+2 =s + 2ass +1as+2s + 2ass +1as+2 =S - 2ass +1as +2 =5.Determine the general solution. Use up to the 5th-degree term of thesolution.-)1y = ao(1 – 2a2 + ...) + a1 x –8.83.315y = ao (1 – 2x² +a - ...)+ ai328.84.15y = ao(1+ 2x?3+ a1x +......8.1.y = ao(1+ 2a? +..) + a11x° +8...

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Answered: Solve the given ODE using the power…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Show that the differential equation2xy′′ + y′ + xy = 0 has a regular singular point at x = 0. Determine the indicial equation, the recurrence relation, and the roots of the indicial equation. Find the series solution (x > 0) corresponding to the larger root. If the roots are unequal and do not differ by an integer, find the series solutioncorresponding to the smaller root also
Find the recursion relation of the differential equation y "+ y = 0 around x0 = 0 by the power series method. (Just find the recurrence relation, analyze it.)
Show that the differential equation 3x2y′′+ 2xy′+ x2y = 0has a regular singular point at x = 0. Determine the indicial equation, the recurrence relation, and the roots of the indicial equation. Find the series solution (x > 0) corresponding to the larger root. If the roots are unequal and do not differ by an integer, find the series solutioncorresponding to the smaller root also.
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solve the given differential equation by means of a power series about the given point x0. Find the recurrence relation; also find the first four terms in each of two linearly independent solutions (unless the series terminates sooner). If possible, find the general term in each solution. normally for this type of question, I set up the y=a0+a1x+a2x^2, why this set up as a0+a1(x-1).....
xy" + x(1 + x)y' – 3(3+ x)y = 0 Use the appropriate method to determine two linearly independent series solutions about x, = 0. Indicate, the indicial equation, the root(s) of the indicial equation, and the recurrence relation, where applicable. Determine its second series solution using Wronskian Method. By substitute e^-x as a series
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I have to find the Taylor series about x = 0 for
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