Conditions that could cause incorrect results – HP 15c User Manual
Page 250
250 Appendix E: A Detailed Look at
f
With this number of sample points, the algorithm will calculate the same
approximation for the integral of any of the functions shown. The actual
integrals of the functions shown with solid lines are about the same, so the
approximation will be fairly accurate if f(x) is one of these functions.
However, the actual integral of the function shown with a dashed line is
quite different from those of the others, so the current approximation will be
rather inaccurate if f(x) is this function.
The f algorithm comes to know the general behavior of the function by
sampling the function at more and more points. If a fluctuation of the
function in one region is not unlike the behavior over the rest of the interval
of integration, at some iteration the algorithm will likely detect the
fluctuation. When this happens, the number of sample points is increased
until successive iterations yield approximations that take into account the
presence of the most rapid, but characteristic, fluctuations.
For example, consider the approximation of
0
.
dx
x
xe