- "Solve a spring and rod problem for @var{count} objects, that "
- "are connected by @var{count-1} springs, and an arbitrary number of rods "
- "Springs have the format (ideal, hooke) and rods (idx1, idx2, distance) "
- "@var{length} is a number, @var{ragged} a boolean "
- "Return: a list containing the force (positive for stretching, "
- "negative for compressing and #f for non-satisfied constraints) "
- "followed by the @var{spring-count}+1 positions of the objects. ")
+ "Solve a spring and rod problem for @var{count} objects, that"
+ " are connected by @var{count}-1 @var{springs}, and an arbitrary"
+ " number of @var{rods}. @var{count} is implicitly given by"
+ " @var{springs} and @var{rods}. The @var{springs} argument has"
+ " the format @code{(ideal, inverse_hook)} and @var{rods} is of"
+ " the form @code{(idx1, idx2, distance)}.\n"
+ "\n"
+ "@var{length} is a number, @var{ragged} a boolean.\n"
+ "\n"
+ "The function returns a list containing the force (positive for"
+ " stretching, negative for compressing and @code{#f} for"
+ " non-satisfied constraints) followed by @var{spring-count}+1"
+ " positions of the objects.")