Find ODE having the given function as its

Jackson Floyd

Jackson Floyd

Answered question

2022-03-25

Find ODE having the given function as its general solution.
y=x2+c1e2x+c2e3x

Answer & Explanation

Leonardo Mcpherson

Leonardo Mcpherson

Beginner2022-03-26Added 13 answers

To find the ordinary differential equation of the given function as its general solution
y=x2+c1e2x+c2e3x
Solution:
y=x2+c1e2x+c2e3x
as we can see x2 is the particular solution of the equation denoted by
yp(x)=x2
As we can determine from the complementary solution that 2 and 3 must be the solution of the equation so, we can write the characteristic equation as
(r2)(r3)=r25r+6
So its associated homogeneous equation is of the form
y5y+6y=0
We will find the non homogeneous ordinary differential equation that is of the form y5y+6y=px2+qx+r (1)
As the general second order particular solution is of the form
yp(x)=Ax2+Bx+C (2)
yp(x)=2AX+B (3)
yp(x)=2A (4)
Substituting (2),(3),(4) in (1)
2A5(2Ax+B)+6(Ax2+Bx+C)=px2+qx+r (5)
Now we are give yp(x)=x2
On equating (1) and yp(x)=x2 we get:
A=1, B=0, C=0
Putting A=1, B=0, C=0 in equation (5) we get:
210x+6x2=px2+qx+r
On equating the coefficients we get:
p=6, q=10, r=2
This implies the non homogeneous equation is
y5y+6e=6x210x+2
So, the ODE of the general solution y=x2+c1e2x+c2e3x is
y5y+6y=6x210x+2
Jeffrey Jordon

Jeffrey Jordon

Expert2022-03-31Added 2605 answers

Answer is given below (on video)

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