Since , and is assumed as continuous, h may be chosen so small that will have the same sign as for all values of x in the interval [a - h, a + h]. Therefore has the same sign as (Chap. III). But x - a changes sign according as x is less or greater than a. Therefore, from (C), the difference
will also change sign, and, by (A) and (B), will be neither a maximum nor a minimum. This result agrees with the discussion in § 82, where it was shown that for all values of x for which is a maximum or a minimum, the first derivative must vanish.
II.Let, and.
From (C), § 107, replacing b by x and transposing ,
(D)
Since , and is assumed as continuous, we may choose our interval [a - h, a + h] so small that will have the same sign as (Chap. III). Also does not change sign. Therefore the second member of (D) will not change sign, and the difference
will have the same sign for all values of x in the interval [a - h, a + h], and, moreover, this sign will be the same as the sign of. It therefore follows from our definitions (A) and (B) that
(E)
is a maximum ifand = a negative number;
(F)
is a minimum ifand = a positive number.
These conditions are the same as (21) and (22), §84.
III.Let, and
From (D), §107, replacing b by x and transposing ,
(G)
As before, will have the same sign as . But changes its sign from - to + as x increases through a. Therefore the difference
must change sign, and is neither a maximum nor a minimum.