Examples
Last updated at July 14, 2026 by Teachoo
Transcript
Example 2 Verify that the function š¦=š^(ā3š„) is a solution of the differential equation (š^2 š¦)/(šš„^2 )+šš¦/šš„ā6š¦=0 š¦=š^(ā3š„) š š/š š=š(š^(ā3š„) )/šš„ šš¦/šš„=ćā3 šć^(ā3š„) (š ^š š)/(š š^š )=š/šš„ (šš¦/šš„) =š(ćā3 šć^(ā3š„) )/šš„ =ā3 š(š^(ā3š„) )/šš„ =ā3 Ć (ćā3 šć^(ā3š„) ) = ć9 šć^(ā3š„) Now, we have to verify (š ^š š)/(š š^š )+š š/š šāšš=š Solving L.H.S (š^2 š¦)/(šš„^2 )+šš¦/šš„ā6š¦ Putting values = ć9 šć^(ā3š„)+(ā3š^(ā3š„) )ā6(š^(ā3š„) ) =ć9 šć^(ā3š„)ā3š^(ā3š„)ā6š^(ā3š„) =ć9 šć^(ā3š„)ā9š^(ā3š„) =š = R.H.S ā“ Hence Verified