Applications of the derivative to Geometry

We consider a theorem which is fundamental in all Differential Calculus to Geometry.

Figure 4.1: The geometry of derivatives.

$\includegraphics[height=6cm,width=8cm]{parabola-tangent.eps}$

Let

$\displaystyle y = f(x)$

(4.5)

be the equation of a curve

Now differentiate (4.5) by the General Rule and interpret each step geometrically.

FIRST STEP. $y + \Delta y = f(x + \Delta x) = NQ$
SECOND STEP.

$\begin{displaymath} \begin{array}{ll} y + \Delta y & = f(x + \Delta x) = NQ\\ ... ...= NR\\ \Delta y &= f(x + \Delta x) − f(x) = RQ. \end{array}\end{displaymath}$
THIRD STEP.

$\begin{displaymath} \begin{array}{ll} \frac{\Delta y}{\Delta x} & = \frac{f(x + ... ...an \phi \\ & = {\rm slope\ of\ secant\ line\ } PQ. \end{array}\end{displaymath}$
FOURTH STEP.

$\begin{displaymath} \begin{array}{ll} \lim_{\Delta x \to 0} \frac{\Delta y}{\De... ...dy}{dx} = {\rm value\ of\ the\ derivative\ at\ } P. \end{array}\end{displaymath}$

But when we let $\Delta x \to 0$ , the point will move along the curve and approach nearer and nearer to , the secant will turn about and approach the tangent as a limiting position, and we have also

$\begin{displaymath} \begin{array}{ll} \lim_{\Delta x \to 0} \frac{\Delta y}{\De... ... \tau\\ & = {\rm slope\ of\ the\ tangent\ at\ } P. \end{array}\end{displaymath}$