is
positive. and if a curve is sloping down thenis
negative
A Level Maths Notes: C1 - Maxima and Minima – The Second Differential Criterion
If a curve is sloping upis
positive. and if a curve is sloping down thenis
negative
The graph on the left has
increasing
– it goes from negative to zero to positive. This means that the
gradient of
is
positive.
The graph on the right hasdecreasing
– it goes from positive to zero to negative. This means that the
gradient of
is
negative.
In both cases at the actual turning point (maximum or minimum) the
gradientis
zero. To find and classify the turning points we first differentiate
and setequal
to zero. We solve this equation to find the x values of the turning
points, then differentiateto
find
and
put the
values
we have found into this expression. If the value we obtain here is
positive then we have found a minimum for
If
the value we obtain is negative then we have found a maximum forIf
we need to find the
–
coordinate too we can substitute the–
values of the minimum into the original expression for
To summarise:
To find a turning point solve for
To classify a turning point, put thevalues
of the turning point into the expression for
If this value is positive, we have a minimum, and if it is
negative we have a maximum. To find the
–
value of the turning point, substitute the
–
values of the turning point into the expression for
Example. Find and classify the turning points of
Solve
so
the coordinates of the turning point are
Therefore
this is a minimum.
Example. Find and classify the turning points of
Solve
When
When
At
therefore
this is a minimum.
At
therefore
this is a maximum.