Here's a really brief summary:
Point of Inflexion
Occurs where f"(x)=0
A point of inflexion is a point where concavity changes in the function.
Stationary Point
Any point where f'(x)=0
A point in the function where the gradient is equal to 0.
Maxima/Minima
A special case where f'(x)=0
A stationary point of a function that yields either the greatest or lowest value for y
Possibly the easiest way to determine a stationary point is to test the gradient (ie first derivative) just before and just after the line. A maxima will have a positive gradient just before it and a negative gradient just afterwards (assuming a continuous function). Conversely, the opposite is true for a minima.
Other Notes
Always inspect the function carefully, there will be instances where you are given a function that is non-continuous.
e.g. f(x)=sin-1(x)
Dom(x)={-1 ≤ 0 ≤ 1}
.'. The f(x) is undefined for all values < -1, > 1. This means you obviously will end the graph line at those points.
