2.571   ODE No. 571

1. Problem in Latex
2. Mathematica input
3. Maple input

\[ a x^n f\left (y'(x)\right )+x y'(x)-y(x)=0 \] ✓ Mathematica : cpu = 0.0941502 (sec), leaf count = 116

\[\text {Solve}\left [\left \{y(x)=a f(\text {K$\$$138132}) x^n+\text {K$\$$138132} x,x=\left (n f(\text {K$\$$138132})^{\frac {1}{n}-1} \int _1^{\text {K$\$$138132}}-\frac {f(K[1])^{\frac {n-1}{n}-1}}{a n}dK[1]-f(\text {K$\$$138132})^{\frac {1}{n}-1} \int _1^{\text {K$\$$138132}}-\frac {f(K[1])^{\frac {n-1}{n}-1}}{a n}dK[1]+c_1 f(\text {K$\$$138132})^{\frac {1}{n}-1}\right ){}^{\frac {1}{n-1}}\right \},\{y(x),\text {K$\$$138132}\}\right ]\] ✓ Maple : cpu = 2.505 (sec), leaf count = 169

\[ \left \{ [y \left ( {\it \_T} \right ) =a \left ( \left ( {\frac {1}{anf \left ( {\it \_T} \right ) } \left ( \left ( 1-n \right ) \int \! \left ( f \left ( {\it \_T} \right ) \right ) ^{-{n}^{-1}}\,{\rm d}{\it \_T}+{\it \_C1}\,an \right ) } \right ) ^{ \left ( n-1 \right ) ^{-1}} \left ( f \left ( {\it \_T} \right ) \right ) ^{{\frac {1}{n \left ( n-1 \right ) }}} \right ) ^{n}f \left ( {\it \_T} \right ) +{\it \_T}\, \left ( {\frac {1}{anf \left ( {\it \_T} \right ) } \left ( \left ( 1-n \right ) \int \! \left ( f \left ( {\it \_T} \right ) \right ) ^{-{n}^{-1}}\,{\rm d}{\it \_T}+{\it \_C1}\,an \right ) } \right ) ^{ \left ( n-1 \right ) ^{-1}} \left ( f \left ( {\it \_T} \right ) \right ) ^{{\frac {1}{n \left ( n-1 \right ) }}},x \left ( {\it \_T} \right ) = \left ( {\frac {1}{anf \left ( {\it \_T} \right ) } \left ( \left ( 1-n \right ) \int \! \left ( f \left ( {\it \_T} \right ) \right ) ^{-{n}^{-1}}\,{\rm d}{\it \_T}+{\it \_C1}\,an \right ) } \right ) ^{ \left ( n-1 \right ) ^{-1}} \left ( f \left ( {\it \_T} \right ) \right ) ^{{\frac {1}{n \left ( n-1 \right ) }}}] \right \} \]