- a minimal extremum (minimal turning point or relative minimum) is one where the derivative of the function changes from negative to positive;
- a maximal extremum (maximal turning point or relative maximum) is one where the derivative of the function changes from positive to negative;
- a rising point of inflection (or inflexion) is one where the derivative of the function is positive on both sides of the stationary point; such a point marks a change in concavity
- a falling point of inflection (or inflexion) is one where the derivative of the function is negative on both sides of the stationary point; such a point marks a change in concavity
Extensive Definition
Notice: Global (or absolute) maxima and minima
are sometimes called global (or absolute) maximal (resp. minimal)
extrema. By
Fermat's theorem, they must occur on the boundary or at
critical points, but they do not necessarily occur at
stationary points.
Curve sketching
Determining the position and nature of stationary points aids in curve sketching, especially for continuous functions. Solving the equation f'(x) = 0 returns the x-coordinates of all stationary points; the y-coordinates are trivially the function values at those x-coordinates. The specific nature of a stationary point at x can in some cases be determined by examining the second derivative f''(x):- If f''(x) 0, the stationary point at x is a minimal extremum.
- If f''(x) = 0, the nature of the stationary point must be determined by way of other means, often by noting a sign change around that point provided the function values exist around that point.
A more straightforward way of determining the
nature of a stationary point is by examining the function values
between the stationary points. However, this is limited again in
that it works only for functions that are continuous in at least a
small interval surrounding the stationary point.
A simple example of a point of inflection is the
function f(x) = x3. There is a clear change of concavity about the
point x = 0, and we can prove this by means of calculus. The second derivative
of f is the everywhere-continuous 6x, and at x = 0,
f′′ = 0, and the sign changes about this point.
So x = 0 is a point of inflection.
More generally, the stationary points of a real
valued function f: Rn → R are those points x0 where the
derivative in every direction equals zero, or equivalently, the
gradient is zero.
Example
At x1 we have f' (x) = 0 and f''(x) = 0. Even though f''(x) = 0, this point is not a point of inflexion. The reason is that the sign of f' (x) changes from negative to positive.At x2, we have f' (x) \ne 0 and f''(x) =
0. But, x2 is not a stationary point, rather it is a point of
inflexion. This because the concavity changes from concave upwards
to concave downwards and the sign of f' (x) does not change; it
stays positive.
At x3 we have f' (x) = 0 and f''(x) = 0.
Here, x3 is both a stationary point and a point of inflexion. This
is because the concavity changes from concave upwards to concave
downwards and the sign of f' (x) does not change; it stays
positive.
See also
External links
extremal in Czech: Stacionární bod
extremal in German: Extremwert
extremal in Hebrew: נקודת קיצון
extremal in Italian: Punto stazionario
extremal in Dutch: Stationair_punt
extremal in Polish: Ekstremum
extremal in Chinese: 平穩點