xe^{nt}=at+b Method \#1: Differentiate wrt x e^{nt}\left(nx+\dfrac{dx}{dt}\right)=a Differentiate wrt x e^{nt}n\left(nx+\dfrac{dx}{dt}\right)+e^{nt}\left(n\dfrac{dx}{dt}+\dfrac{d^2x}{dt^2}\right)=0 ...

The equilibrium points x^* \in \lbrace{0, \tfrac{1}{2}(1-a)}\rbrace are obtained by solving \dot x = f(x) = 0 with respect to x , where f(x) = \frac{-x}{x+a}\left(\frac{1-a}{2} - x\right)^2 . ...

We know the solution you have is wrong by putting it back in v' = -bv so we have in your original equation -bv + bv + axv = axv = 0 this is in general not true. Your issue was not ...

\frac{m!}{n!(m-n)!}=\frac{m(m-1)}{2} and this cancels the 2 in red.

By elementary means : S:=\sum_{n=1}^\infty nx^{n-1}=\sum_{n=0}^\infty(n+1)x^n=\sum_{n=0}^\infty nx^n+\sum_{n=0}^\infty x^n=xS+\frac1{1-x}, so that S=\frac1{(1-x)^2}. You can also discuss ...

Set x'=y then you have an equivalent system of y'= -2a(x^2-1)y - kx \space\space\space\space (1) x'=y \space\space\space\space\space (2)The critical point(s) occur where x'= y'=0. We see ...