3.5.2 Algorithm description to obtain the above solutions
Starting with
\[ \left ( y^{\prime }\right ) ^{\frac {n}{m}}=ax+by+c \]
Find the solution
\(z\) of equation
\[ z^{\frac {n}{m}}=u \]
Where
\(u\) now is a symbol. Lets say we found
\(s_{1},s_{2},\cdots \)
solutions (depending on what
\(n,m\) are). Then for each solution
\(s_{i}\) change it to be
\[ s_{i}=bs_{i}+a \]
Then write
\[ \int \frac {du}{s_{i}}=x+c_{1}\]
Then replace each with letter
\(u\) in each
\(s_{i}\) by new letter say
\(z\) (the integration variable). Now
the solution becomes
\[ \int ^{ax+by+c}\frac {dz}{s_{i}}=x+c_{1}\]
This is basically what was done in the above examples. There is no
need to find an explicit solution for the integral. But this can be done if needed
afterwords.