Answer to Question #285246 in Differential Equations for meera

Question #285246

S how that y = c 1

e

x + c 2

e

2 x

is the general solution of y

′′ − 3 y

′ + 2y = 0 on any

interval, and find the particular solution for w hich y 0 = − 1 a n d y

′

( 0) = 1.

Expert's answer

"y''-3y'+2y=0"

Characteristic (auxiliary) equation

"r^2-3r+2=0"

"(r-1)(r-2)=0"

"r_1=1, r_2=2"

The general solution of the differential equation is

"y=c_1e^x+c_2e^{2x}, x\\in \\R"

Given "y(0)=-1, y'(0)=1"

"y(0)=c_1e^0+c_2e^{2(0)}"

"c_1+c_2=-1"

"y'=c_1e^x+2c_2e^{2x}"

"y'(0)=c_1e^0+2c_2e^{2(0)}"

"c_1+2c_2=1"

Then

"c_1=-1-c_2"

"c_2=2"

"c_1=-3, c_2=2"

The particular solution is

"y=-3e^x+2e^{2x}"

Learn more about our help with Assignments: Differential Equations

No comments. Be the first!