## Abstract

Refer to Fig. T4.1, which shows the outline of a conventional ski as seen from the top view. The contact length between the shovel and tail is labeled C. The tail width is T, the waist width is
thus .

*W*, and the shovel width is*S*. We assume that the waist of the ski, where*W*is measured, is near the midpoint of the contact line. The sidecut, SC, is given by the relation SC = (*S*+*T*- 2*W*)/4. From the geometry illustrated in Fig. T4.1, we can write*C*≈*δR*_{ SC }, and then expand the cosine function to use the first two terms only, as follows:$$ \begin{array}{l}W = {F_N} + {F_{S,}} \\{F_N} = W\cos \alpha ,\quad {F_S} = W\sin \alpha \\\end{array} $$

(T3.1)

$$ \begin{array}{l}W = {F_N} + {F_{S,}} \\{F_N} = W\cos \alpha ,\quad {F_S} = W\sin \alpha \\\end{array} $$

(T3.1)

$$ {R_{SC}} = \frac{{{C^2}}}{{8SC}} $$

## Keywords

Reaction Force Contact Line Cosine Function Edge Point Contact Length
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

## Copyright information

© Springer Science+Business Media New York 2004