Find the particular solution to the initial value

afasiask7xg

afasiask7xg

Answered question

2022-03-22

Find the particular solution to the initial value problem
y2y+y=0, y(0)=1, y(0)=1

Answer & Explanation

lernarfnincln6g

lernarfnincln6g

Beginner2022-03-23Added 14 answers

Given second order differential equation is y''+y=0 and y(0)=1, y(0)=1 .
Characteristic equations of differential equation will be:
m22m+1=0
(m1)2=0
(m1)(m1)=0
m=1,1
When the roots of characteristics equation is same then solution is given as:
y=(c1+c2x)eax
Hence, general solution of the given differential equation will be:
y=(c1+c2x)e1x
=(c1+c2x)ex
Now, y(0)=1
y(0)=(c1+c2)e0
1=c1
c1=1
Now, differentiating the solution.
y(x)=d dx (c1ex+c2xex)
=c1ex+c2(xex+ex)
=1ex+c2(xex+ex)
=ex+c2(xex+ex)
Now, y(0)=1
y(0)=e0+c2(0+e0)
1=1+c2
c2=2
So, required particular solution will be:
y=(12x)ex
Therefore, required particular solutions is y=(12x)ex

Jeffrey Jordon

Jeffrey Jordon

Expert2022-03-31Added 2605 answers

Answer is given below (on video)

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