Simplify \(corecA-cotA-11-(\cot{e})cA+cotA\) to \(corecA-11-(\cot{e})cA\).
\[corecA-11-(\cot{e})cA=1-cosAsinA\]
Add \(11\) to both sides.
\[corecA-(\cot{e})cA=1-cosAsinA+11\]
Simplify \(1-cosAsinA\) to \(1-cosAsinA\).
\[corecA-(\cot{e})cA=12-cosAsinA\]
Factor out the common term \(cA\).
\[cA(core-\cot{e})=12-cosAsinA\]
Divide both sides by \(cA\).
\[core-\cot{e}=\frac{12-cosAsinA}{cA}\]
Add \(\cot{e}\) to both sides.
\[core=\frac{12-cosAsinA}{cA}+\cot{e}\]
Divide both sides by \(o\).
\[cre=\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{o}\]
Divide both sides by \(r\).
\[ce=\frac{\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{o}}{r}\]
Simplify \(\frac{\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{o}}{r}\) to \(\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{or}\).
\[ce=\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{or}\]
Divide both sides by \(e\).
\[c=\frac{\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{or}}{e}\]
Simplify \(\frac{\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{or}}{e}\) to \(\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{ore}\).
\[c=\frac{\frac{12-cosAsinA}{cA}+\cot{e}}{ore}\]
c=((12-cosAsinA)/cA+cot(e))/(o*r*e)
