We discuss strategies for the general solution of single-step 1D constant acceleration problems. In
a slightly restricted form, these problems have five variables (Δ x , v 0 , v , a and t ) and two
independent equations, so three variables must be given to solve for the other two, giving 10 cases.
Instead of the haphazard solution of individual problems, we advocate teaching a strategy for
tackling the entire class of problems. We enumerate the possible strategies, and present in detail
one which reveals a number of interesting special cases and also allows the possibility of
developing an automatic problem generator and solver.