Answer to Question #289483 in Differential Equations for ramya

Question #289483

Show that 𝑦=𝑐1𝑒𝑥+𝑐2𝑒2𝑥 is the general solution of 𝑦′′−3𝑦′+2𝑦=0 on any interval, and find the particular solution for which 𝑦 0 =−1 and 𝑦′(0)=1. 


1
Expert's answer
2022-01-24T18:09:53-0500

Given:

"\ud835\udc66=\ud835\udc50_1\ud835\udc52^\ud835\udc65+\ud835\udc50_2\ud835\udc52^{2\ud835\udc65}"


We have:

"y'=\ud835\udc50_1\ud835\udc52^\ud835\udc65+2\ud835\udc50_2\ud835\udc52^{2\ud835\udc65}"

"y''=\ud835\udc50_1\ud835\udc52^\ud835\udc65+4\ud835\udc50_2\ud835\udc52^{2\ud835\udc65}"

Hence


"\ud835\udc66''\u22123\ud835\udc66'+2\ud835\udc66=(\ud835\udc50_1\ud835\udc52^\ud835\udc65+4\ud835\udc50_2\ud835\udc52^{2\ud835\udc65})\\\\\n-3(\ud835\udc50_1\ud835\udc52^\ud835\udc65+2\ud835\udc50_2\ud835\udc52^{2\ud835\udc65})+2(\ud835\udc50_1\ud835\udc52^\ud835\udc65+\ud835\udc50_2\ud835\udc52^{2\ud835\udc65})=0"

The initial conditions give

"y(0)=c_1+c_2=-1"

"y'(0)=c_1+2c_2=1"

Roots:

"c_1=-3,\\quad c_2=2"

Finally

"\ud835\udc66=-3\ud835\udc52^\ud835\udc65+2\ud835\udc52^{2\ud835\udc65}"


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