1 Answer

Skyler · Answer 1 · 2020-03-02T11:51:16+0000

Answer:

$y(x)=c_1e^{-(5)/(2)x}+c_2xe^{-(5)/(2)x}$

Explanation:

The given differential equation is 4y"+20y'+25y = 0

The characteristics equation is given by

4r^2+20r+25=0

Now, solve the equation for r

Factor by middle term splitting

$4r^2+10r+10r+25=0\\\\2r(2r+5)+5(2r+5)=0$

Factored out the common term

(2r+5)(2r+5)=0

Use Zero product property

(2r+5)=0,(2r+5)=0

Solve for r

r_(1,2)=-(5)/(2)

We got the repeated roots.

Hence, the general equation for the differential equation is

$y(x)=c_1e^{-(5)/(2)x}+c_2xe^{-(5)/(2)x}$

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