Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/219

We shall next consider a function of two variables, both of which depend on a single independent variable. Consider the function

${\displaystyle u=f(x,\ y),}$

where ${\displaystyle x}$ and ${\displaystyle y}$ are functions of a third variable ${\displaystyle t}$.

Let ${\displaystyle t}$ take on the increment ${\displaystyle \Delta t}$, and let ${\displaystyle \Delta x}$, ${\displaystyle \Delta y}$, ${\displaystyle \Delta u}$ be the corresponding increments of ${\displaystyle x}$, ${\displaystyle y}$, ${\displaystyle u}$ respectively. Then the quantity

${\displaystyle \Delta u=f(x+\Delta x,\ y+\Delta y)-f(x,\ y)}$

is called the total increment of ${\displaystyle u}$.

Adding and subtracting ${\displaystyle f(x,y+\Delta y)}$ in the second member,

(A)	${\displaystyle \Delta u=[f(x+\Delta x,\ y+\Delta y)-f(x,\ y+\Delta y)]+[f(x,\ y+\Delta y)-f(x,\ y)].}$

Applying the Theorem of Mean Value (46), §106, to each of the two differences on the right-hand side of (A), we get, for the first difference,

(B)	${\displaystyle f(x+\Delta x,y+\Delta y)-f(x,y+\Delta y)=f_{x}'(x+\theta _{1}\cdot \Delta x,y+\Delta y)\Delta x.}$
	[${\displaystyle a=x,\Delta a=\Delta x}$, and since ${\displaystyle x}$ varies while ${\displaystyle y+\Delta y}$ remains constant, we get the partial derivative with respect to ${\displaystyle x}$.]

For the second difference we get

(C)	${\displaystyle f(x,y+\Delta y)-f(x,y)=f_{y}'(x,y+\theta _{2}\cdot \Delta y)\Delta y.}$
	[${\displaystyle a=y,\delta a=\Delta y,}$ and since ${\displaystyle y}$ varies while ${\displaystyle x}$ remains constant, we get the partial derivative with respect to ${\displaystyle y}$.]

Substituting (B) and (C) in (A) gives

(D)	${\displaystyle \Delta u=f_{x}'(x+\theta _{1}\cdot \Delta x,y+\Delta y)\Delta x+f_{y}'(x,y+\theta _{2}\cdot \Delta y)\Delta y,}$

where ${\displaystyle \theta _{1}}$ and ${\displaystyle \theta _{2}}$ are positive proper fractions. Dividing (D) by ${\displaystyle \Delta t}$,

(E)	${\displaystyle {\frac {\Delta u}{\Delta t}}=f_{x}'(x+\theta _{1}\cdot \Delta x,y+\Delta y){\frac {\Delta x}{\Delta t}}+f_{y}'(x,y+\theta _{2}\cdot \Delta y){\frac {\Delta y}{\Delta t}}.}$

Now let ${\displaystyle \Delta t}$ approach zero as a limit, then

(F)	${\displaystyle {\frac {du}{dt}}=f_{x}'(x,y){\frac {dx}{dt}}+f_{y}'(x,y){\frac {dy}{dt}}.}$
	[Since ${\displaystyle \Delta x}$ and ${\displaystyle \Delta y}$ converge to zero with ${\displaystyle \Delta t}$, we get ${\displaystyle \lim _{\Delta t\to 0}f_{x}'(x+\theta _{1}\cdot x,y+\Delta y)=f_{x}'(x,y),}$ and ${\displaystyle \lim _{\Delta t\to 0}f_{y}'(x,y+\theta _{2}\cdot \Delta y)=f_{y}'(x,y),f_{x}'(x,y)}$ and ${\displaystyle f_{y}'(x,y)}$ being assumed continuous.]

Replacing ${\displaystyle f(x,y)}$ by ${\displaystyle u}$ in (F), we get the total derivative

(51)	${\displaystyle {\frac {du}{dt}}={\frac {\partial u}{\partial x}}{\frac {dx}{dt}}+{\frac {\partial u}{\partial y}}{\frac {dy}{dt}}.}$