Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/268

is a maximum point when it is "higher" than all other points on the surface in its neighborhood, the coordinate plane ${\displaystyle XOY}$ being assumed horizontal. Similarly, ${\displaystyle P'}$ is a minimum point on the surface when it is "lower" than all other points on the surface in its neighborhood. It is therefore evident that all vertical planes through P cut the surface in curves (as ${\displaystyle APE}$ or ${\displaystyle DPE}$ in the figure),

each of which has a maximum ordinate ${\displaystyle z(=MP)}$ at ${\displaystyle P}$. In the same manner all vertical planes through ${\displaystyle P'}$ cut the surface in curves (as ${\displaystyle BP'C}$ or ${\displaystyle FP'G}$), each of which has a minimum ordinate ${\displaystyle z(=NP')}$ at ${\displaystyle P'}$. Also, any contour (as ${\displaystyle HIJK}$) cut out of the surface by a horizontal plane in the immediate neighborhood of ${\displaystyle P}$ must be a small closed curve. Similarly, we have the contour ${\displaystyle LSRT}$ near the minimum point ${\displaystyle P'}$.

It was shown in §81 and §82, that a necessary condition that a function of one variable should have a maximum or a minimum for a given value of the variable was that its first derivative should be zero for the given value of the variable. Similarly, for a function ${\displaystyle f(x,y)}$ of two independent variables, a necessary condition that ${\displaystyle f(a,b)}$ should be a maximum or a minimum (i.e. a turning value) is that for ${\displaystyle x=a,y=5}$,

(C)	${\displaystyle {\frac {\partial f}{\partial x}}=0,\qquad {\frac {\partial f}{\partial y}}=0.}$

'Proof. Evidently (A) and (B) must hold when ${\displaystyle k=0}$; that is,

${\displaystyle f(a+h,\ b)-f(a,\ b)}$

is always negative or always positive for all values of ${\displaystyle h}$ sufficiently small numerically. By §81, §82, a necessary condition for this is that ${\displaystyle {\tfrac {d}{dx}}f(x,b)}$ shall vanish for ${\displaystyle x=a}$, or, what amounts to the same thing, ${\displaystyle {\tfrac {\partial }{\partial x}}f(x,y)}$ shall vanish for ${\displaystyle x=a,\quad y=b}$. Similarly, (A) and (B) must hold when ${\displaystyle h=0}$, giving as a second necessary condition that ${\displaystyle {\tfrac {\partial }{\partial y}}f(x,y)}$ shall vanish for ${\displaystyle x=a,\quad y=b}$.