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Section 5.2 Problem 7:

Find the general solution

y'' - 8y' + 16y = 0


User Grreeenn
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1 Answer

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22 votes

Answer:


y(x)=C_1e^(4x)+C_2e^(4x)

Explanation:

To solve a second-order homogeneous differential equation, we need to substitute each term with the auxiliary equation
am^2+bm+c=0 where the values of
m are the roots:


y''-8y'+16y=0\\\\m^2-8m+16=0\\\\(m-4)^2=0\\\\m-4=0\\\\m=4

Since the values of
m are equal real roots, then the general solution is
y(x)=C_1e^(m_1x)+C_2e^(m_1x)

Thus, the general solution for our given differential equation is
y(x)=C_1e^(4x)+C_2e^(4x)

User Sancho
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