Introducing the dimensionless frequency-squared, ${\displaystyle {\sigma }_c^2\equiv 3{\omega }^2/(2\pi G{\rho }_c)}$, we can rewrite this LAWE as,

where, as a reminder, ${\displaystyle g_0\equiv GM(r_0)/r_0^2}$. Now, for our ${\displaystyle (n_c,n_e)=(5,1)}$ bipolytrope, we have found it useful to adopt the following four dimensionless variables:

This means that,

Making these substitutions, the LAWE can be rewritten as,

then, multiplying through by ${\displaystyle [K{G}^{-1}{\rho }_c^{-4/5}]}$ allows us to everywhere switch from ${\displaystyle (r_0{)}^2}$ to ${\displaystyle (r^{*}{)}^2}$, namely,

${\displaystyle 0}$

${\displaystyle =}$

${\displaystyle x^{″}+\frac{{\mathscr{H}}}{r^{*}}{x}^{\prime }+{𝒦}x,}$

${\displaystyle x^{\prime }}$

${\displaystyle =}$

${\displaystyle \frac{dx}{d{r}^{*}}}$

${\displaystyle x^{″}}$

${\displaystyle =}$

${\displaystyle \frac{d^{2}x}{d(r^{*}{)}^2};}$

${\displaystyle {\mathscr{H}}}$

${\displaystyle \equiv }$

${\displaystyle \{4-(\frac{{\rho }^{*}}{P^{*}}\left)\frac{M_r^{*}}{(r^{*})}\right\}.}$

${\displaystyle \frac{{\rho }^{*}}{P^{*}}}$

${\displaystyle =}$

${\displaystyle (1+\frac{{\xi }^2}{3}{)}^{-5/2}(1+\frac{{\xi }^2}{3}{)}^{6/2}=(1+\frac{{\xi }^2}{3}{)}^{1/2}}$

${\displaystyle \frac{M^{*}}{r^{*}}}$

${\displaystyle =}$

${\displaystyle \left(\frac{2\cdot 3}{\pi }{)}^{1/2}\right[{\xi }^3(1+\frac{{\xi }^2}{3}{)}^{-3/2}](\frac{2\pi }{3}{)}^{1/2}{\xi }^{-1}=2{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-3/2}}$

${\displaystyle \Rightarrow {\mathscr{H}}}$

${\displaystyle =}$

${\displaystyle 4-2{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-3/2}(1+\frac{{\xi }^2}{3}{)}^{1/2}=4-2{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-1}.}$

${\displaystyle \Rightarrow {𝒦}}$

${\displaystyle =}$

${\displaystyle (1+\frac{{\xi }^2}{3}{)}^{1/2}\{\left(\frac{{\sigma }_c^2}{{\gamma }_{\mathrm{g}}}\right)\frac{2\pi }{3}-(3-\frac{4}{{\gamma }_{\mathrm{g}}})2{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-3/2}(\frac{2\pi }{3}\left){\xi }^{-2}\right\}=\frac{2\pi }{3}(1+\frac{{\xi }^2}{3}{)}^{1/2}\{\left(\frac{{\sigma }_c^2}{{\gamma }_{\mathrm{g}}}\right)-2(3-\frac{4}{{\gamma }_{\mathrm{g}}})(1+\frac{{\xi }^2}{3}{)}^{-3/2}\}}$

${\displaystyle 0}$

${\displaystyle =}$

${\displaystyle \left[\frac{2\pi }{3}{\xi }^{-2}\right]\frac{d^{2}x}{d{\xi }^2}+\left[{\mathscr{H}}\right]\frac{2\pi }{3}{\xi }^{-1}\frac{dx}{d\xi }+\frac{2\pi }{3}(1+\frac{{\xi }^2}{3}{)}^{1/2}\{\left(\frac{{\sigma }_c^2}{{\gamma }_{\mathrm{g}}}\right)-2(3-\frac{4}{{\gamma }_{\mathrm{g}}})(1+\frac{{\xi }^2}{3}{)}^{-3/2}\}x.}$

${\displaystyle 0}$

${\displaystyle =}$

${\displaystyle \frac{d^{2}x}{d{\xi }^2}+[4\xi -2{\xi }^3(1+\frac{{\xi }^2}{3}{)}^{-1}]\frac{dx}{d\xi }+{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{1/2}\left\{\right(\frac{{\sigma }_c^2}{{\gamma }_{\mathrm{g}}})-2(3-\frac{4}{{\gamma }_{\mathrm{g}}}\left)\right(1+\frac{{\xi }^2}{3}{)}^{-3/2}\}x.}$

Let's compare this with the equivalent expression presented separately, namely,

The primary E-type solution for n = 5 polytropes states that,

${\displaystyle 0}$

${\displaystyle =}$

${\displaystyle \frac{d^{2}x}{d{\xi }^2}+[4\xi -2{\xi }^3(1+\frac{{\xi }^2}{3}{)}^{-1}]\frac{dx}{d\xi }+\frac{2}{3}{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-1}x}$

LAWE

${\displaystyle =}$

${\displaystyle -\frac{2}{15}-[4\xi -2{\xi }^3(1+\frac{{\xi }^2}{3}{)}^{-1}]\frac{2\xi }{15}+\frac{2}{3}{\xi }^2(1+\frac{{\xi }^2}{3}{)}^{-1}[1-{\xi }^2/15]}$

${\displaystyle \Rightarrow 15(1+\frac{{\xi }^2}{3})}$  LAWE

${\displaystyle =}$

${\displaystyle -2(1+\frac{{\xi }^2}{3})-\left[60\xi \right(1+\frac{{\xi }^2}{3})-30{\xi }^3]\frac{2\xi }{15}+10{\xi }^2[1-{\xi }^2/15]}$

${\displaystyle =}$

${\displaystyle -2-\frac{2{\xi }^2}{3}-[60{\xi }^2-10{\xi }^4]\frac{2}{15}+\frac{10}{15}[15{\xi }^2-{\xi }^4]}$

${\displaystyle =}$

${\displaystyle -2-\frac{2}{15}\left[5{\xi }^2\right]-[60{\xi }^2-10{\xi }^4]\frac{2}{15}+\frac{2}{15}[75{\xi }^2-5{\xi }^4]}$

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