Difference between revisions of "Determining wire-phi correspondance"
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File:Conic section.png.png
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Following the rules of conic sections we know that the eccentricity of the conic is given by: | Following the rules of conic sections we know that the eccentricity of the conic is given by: | ||
− | <center><math>e=\frac{\sin | + | <center><math>e=\frac{\sin \beta}{\sin\alpha}</math></center> |
Revision as of 05:19, 3 January 2017
Using Mathematica, we can produce a 3D rendering of how the sectors for Level 1 would have to interact with a steady angle theta with respect to the beam line, as angle phi is rotated through 360 degrees.
Looking just at sector 1, we can see that the intersection of level 1 and the cone of constant angle theta forms a conic section.
Following the rules of conic sections we know that the eccentricity of the conic is given by:
Where β is the angle of the plane, and α is the slant of the cone.
If the conic is an circle, e=0
If the conic is an parabola, e=1
If the conic is an ellipse,