Solve differential equation L'(x)=k(x+b)(L-a)

Daniaal Sanchez

Daniaal Sanchez

Answered question

2020-12-17

Solve differential equation L(x)=k(x+b)(La)

Answer & Explanation

au4gsf

au4gsf

Skilled2020-12-18Added 95 answers

(dL)/(La)=k(x+b)dx
(dL)/(La)=(kx+bk)dx
Now integrating both sides
(dL)/(La)=(kx+bk)dx ln(La)=(kx2)/(2+bkx+c) (because (1/(x+a)dx=ln(x+a)) and xndx=x(n+1)/(n+1) where c is the constant of integration
So, the solution of the differential equation L(x)=k(x+b)(La) will be ln(La)=(kx2)/(2+bkx+c)

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