Utledning kurveveksler: Forskjell mellom sideversjoner

${\displaystyle C^{2}=A^{2}+B^{2}-2AB\cdot cos(\gamma )}$

${\displaystyle (R+r)^{2}=(r+x)^{2}+(R+x)^{2}-2(r+x)(R+x)\cdot cos(\pi -\alpha )}$

${\displaystyle Rr=rx+x^{2}+Rx+(Rr+Rx+rx+x^{2})\cdot cos(\alpha )}$

${\displaystyle R(r-x-rcos(\alpha )-xcos(\alpha ))=(rx+x^{2})(1+cos(\alpha ))}$

${\displaystyle R\left(r(1-cos(\alpha ))-x(1+cos(\alpha ))\right)=(rx+x^{2})(1+cos(\alpha ))}$

${\displaystyle R\left(r\cdot {\frac {1-cos(\alpha )}{1+cos(\alpha )}}-x\right)=x(r+x)}$

${\displaystyle tan^{2}(\alpha /2)={\frac {1-cos(\alpha )}{1+cos(\alpha )}}}$

${\displaystyle R\left({\frac {r}{x}}\cdot tan^{2}(\alpha /2)-1\right)=r+x}$

${\displaystyle tan(\alpha /2)={\frac {t}{r_{0}}}}$

${\displaystyle tan(\alpha /2)={\frac {x}{t}}}$

${\displaystyle {\frac {t}{r_{0}}}={\frac {x}{t}}}$

${\displaystyle R({\frac {r\cdot r_{0}}{t^{2}}}\cdot {\frac {t^{2}}{r_{0}^{2}}}-1)=r+{\frac {t^{2}}{r_{0}}}}$

${\displaystyle R={\frac {r\cdot r_{0}+t^{2}}{r-r_{0}}}}$

${\displaystyle r={\frac {R\cdot r_{0}+t^{2}}{R-r_{0}}}}$

${\displaystyle 2t=R\beta }$

${\displaystyle r_{0}\alpha =r\xi }$

${\displaystyle \alpha =\beta +\xi }$

${\displaystyle \alpha =\xi -\beta }$

${\displaystyle R=\pm {\frac {2r_{0}\cdot tan(\alpha /2)}{\alpha \cdot (1-{\frac {r_{0}}{r}})}}}$

${\displaystyle r={\frac {r_{0}}{1\mp {\frac {2r_{0}\cdot tan(\alpha /2)}{R\alpha }}}}}$

${\displaystyle cos(\phi )={\frac {r_{0}-s/2}{r_{0}+s/2}}}$

${\displaystyle tan(\phi )={\frac {2\cdot {\sqrt {2r_{0}\cdot s}}}{2r_{0}-s}}}$