Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/203

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Hence, by Rolle's Theorem (§105), $F'(x)$ must vanish for at least two values of $x$ , one lying between $x_{0}$ and $x_{1}$ , say $x'$ , and the other lying between $x_{1}$ and $x_{2}$ say $x''$ ; that is,

F'(x')=0,\ F'(x'')=0.

Again, for the same reason, $F''(x)$ must vanish for some value of $x$ between $x'$ and $x''$ , say $x_{3}$ ; hence

F''(x_{3})\ =\ 0.

Therefore the elements $\alpha ',\beta ',R'$ of the circle passing through the points $P_{0},P_{1},P_{2}$ must satisfy the three equations

F(x_{0})=0,\ F'(x')=0,\ F''(x_{3})=0.

Now let the points $P_{1}$ and $P_{2}$ approach $P_{0}$ as a limiting position; then $x_{1},x_{2},x',x'',x_{3}$ will all approach $x_{0}$ as a limit, and the elements $\alpha ,\beta ,R$ of the osculating circle are therefore determined by the three equations

F(x_{0})=0,\ F'(x_{0})=0,\ F''(x_{0})=0;

or, dropping the subscripts, which is the same thing,

(A)	$(x-\alpha )^{2}+(y-\beta )^{2}\ =\ R^{2},$
(B)	$\left(x-\alpha \right)+\left(y-\beta \right){\frac {dy}{dx}}=0,$	differentiating (A).
(C)	$1+\left({\frac {dy}{dx}}\right)^{2}+\left(y-\beta \right){\frac {d^{2}y}{dx^{2}}}=0,$	differentiating (B).

Solving (B) and (C) for $x-\alpha$ and $y-\beta$ , we get $\left({\tfrac {d^{2}y}{dx^{2}}}\neq 0\right)$ ,

(D)

{\begin{cases}x-\alpha ={\frac {{\frac {dy}{dx}}\left[1+\left({\frac {dy}{dx}}\right)^{2}\right]}{\frac {d^{2}y}{dx^{2}}}}\\y-\beta =-{\frac {1+\left({\frac {dy}{dx}}\right)^{2}}{\frac {d^{2}y}{dx^{2}}}};\end{cases}}

hence the coördinates of the center of curvature are

(E)

$\alpha =x-{\frac {{\frac {dy}{dx}}\left[1+\left({\frac {dy}{dx}}\right)^{2}\right]}{\frac {d^{2}y}{dx^{2}}}};\beta =y+{\frac {1+\left({\frac {dy}{dx}}\right)^{2}}{\frac {d^{2}y}{dx^{2}}}}.$

\left({\frac {d^{2}y}{dx^{2}}}\neq 0\right)