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Chapter 8: Q9 E (page 449)

Find at least the first four non-zero terms in a power series expansion about x0 for a general solution to the given differential equation with the value for x0.

(x2-2x)y''+2y=0;x0=1

Short Answer

Expert verified

The first four nonzero terms in a power series expansion about x0 for a general solution:

y=a01+(x+1)2+13(x-1)4+...+a1x-1+13(x-1)3+...

Step by step solution

01

Power series expansion

A power series expansion of can be obtained simply by expanding the exponential and integrating term-by-term. This series converges for all, but the convergence becomes extremely slow if significantly exceeds unity.

02

To determine the first four nonzero terms in a power series expansion about x0 for a general solution.

x2-2xy''+2y=0y''+2x2-2xy=0

We get the value of q(x)=2x2-2x.

y(x)=∑n=0∞anx-1ny''(x)=∑n=2∞n(n-1)anx-1n-2+2∑n=0∞anx-1n=0

Let, x-1=t:

role="math" localid="1664089919710" (t+1)(t-1)∑n=2∞n(n-1)an(t)n-2+2∑n=0∞antn=0∑n=2∞n(n-1)an(t)n-∑n=2∞n(n-1)an(t)n-2+2∑n=0∞antn=02a2t2+6a3t3+12a4t4+20a5t5+...2a0+2a1t+2a2t2+2a3t3+2a4t4+...=0(2a0-2a2)+(2a1-6a3)(x-1)+(2a2-12a4+2a2)(x-1)2+(2a3-20a5)(x-1)3+....=02a0-2a2=0⇒a2=a02a1-6a3=0⇒a3=13a12a2-12a4+2a2=0⇒a4=13a0

In the end,

y=∑n=0∞anx-1n=a0+a1(x-1)+a2(x-1)2+a3(x-1)3+...y=a01+(x+1)2+13(x-1)4+...+a1x-1+13(x-1)3+...

Hence, the final answer isy=a01+(x+1)2+13(x-1)4+...+a1x-1+13(x-1)3+...

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Most popular questions from this chapter

In Problems 1-10, use the substitution y=xrto find a general solution to the given equation for x>0.

x3y"'+3x2y"+5xy'-5y=0

In Problems 13 and 14, use variation of parameters to find a general solution to the given equation for x>0.

x2y"(x)+2xy'(x)-2y(x)=6x-2+3x

Question: In Problems 1–10, determine all the singular points of the given differential equation.

2. x2y"-3y-xy = 0

In Problems 21-28, use the procedure illustrated in Problem 20 to find at least the first four nonzero terms in a power series expansion about x=0 of a general solution to the given differential equation.

y'-xy=sinx

In Problems 13 and 14, use variation of parameters to find a general solution to the given equation for x>0.

x2y"(x)-2xy'(x)+2y(x)=x-1/2
See all solutions

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