|
|
| Line 35: |
Line 35: |
| | \left ( \frac{q}{k} \right )^2 d^{\prime 2} | | \left ( \frac{q}{k} \right )^2 d^{\prime 2} |
| | & = \begin{alignat}{2} [ | | & = \begin{alignat}{2} [ |
| − | & x^2 \cos^2 \phi_g - x \cos \phi_g \sin \phi_g ( v_{2y} ) + \sin^2 \phi_g ( v_{2y} )^2 \\ | + | & x^2 + ( v_{2y} )^2 \\ |
| − | & + x^2 \sin^2 \phi_g + x \sin \phi_g \cos \phi_g ( v_{2y} ) - d^{\prime} x \sin \phi_g \\ | + | & - 2 d^{\prime} x \sin \phi_g \\ |
| − | & + x \sin \phi_g \cos \phi_g ( v_{2y} ) + \cos^2 \phi_g ( v_{2y} )^2 - d^{\prime} \cos \phi_g ( v_{2y} ) \\ | + | & + x \sin \phi_g \cos \phi_g ( v_{2y} ) - d^{\prime} \cos \phi_g ( v_{2y} ) \\ |
| − | & - d^{\prime} x \sin \phi_g - d^{\prime} \cos \phi_g ( v_{2y} ) + d^{\prime 2} \\ | + | & - d^{\prime} \cos \phi_g ( v_{2y} ) + d^{\prime 2} \\ |
| | & + d^2 \sin^2 \theta_g + d z \sin \theta_g \cos \theta_g + z^2 \cos^2 \theta_g ] \end{alignat} \\ | | & + d^2 \sin^2 \theta_g + d z \sin \theta_g \cos \theta_g + z^2 \cos^2 \theta_g ] \end{alignat} \\ |
| | | | |
| | + | & = \begin{alignat}{2} [ |
| | + | & x^2 + ( d^2 \cos^2 \theta_g -dz \cos \theta_g \sin\theta_g + z^2 \sin^2 \theta_g ) \\ |
| | + | & - 2 d^{\prime} x \sin \phi_g \\ |
| | + | & + (x \sin \phi_g - d^{\prime} - d^{\prime}) \cos \phi_g ( v_{2y} ) \\ |
| | + | & + d^{\prime 2} + d^2 \sin^2 \theta_g + d z \sin \theta_g \cos \theta_g + z^2 \cos^2 \theta_g ] \end{alignat} \\ |
| | | | |
| | + | & = \begin{alignat}{2} [ |
| | + | & d^{\prime 2} + x^2 + d^2 + z^2 \\ |
| | + | & - 2 d^{\prime} x \sin \phi_g \\ |
| | + | & + (x \sin \phi_g - 2 d^{\prime}) \cos \phi_g ( v_{2y} ) ] \end{alignat} \\ |
| | + | |
| | + | & = 2 d^{\prime 2} - 2 d^{\prime} x \sin \phi_g + (x \sin \phi_g - 2 d^{\prime}) \cos \phi_g ( v_{2y} ) \\ |
| | | | |
| | & = ? \\ | | & = ? \\ |
Revision as of 16:25, 13 January 2016
Check
We define:
And calculate:
![{\displaystyle {\begin{alignedat}{2}q^{2}&=[(q_{x})^{2}+(q_{y})^{2}+(q_{z})^{2}]\\\left({\frac {q}{k}}\right)^{2}d^{\prime 2}&={\begin{alignedat}{2}[&\left(x\cos \phi _{g}-\sin \phi _{g}(d\cos \theta _{g}-z\sin \theta _{g})\right)^{2}\\&+\left(x\sin \phi _{g}+\cos \phi _{g}(d\cos \theta _{g}-z\sin \theta _{g})-d^{\prime }\right)^{2}\\&+\left(d\sin \theta _{g}+z\cos \theta _{g}\right)^{2}]\end{alignedat}}\\&={\begin{alignedat}{2}[&\left(x\cos \phi _{g}-\sin \phi _{g}(v_{2y})\right)^{2}\\&+\left(x\sin \phi _{g}+\cos \phi _{g}(v_{2y})-d^{\prime }\right)^{2}\\&+\left(d\sin \theta _{g}+z\cos \theta _{g}\right)^{2}]\end{alignedat}}\\&={\begin{alignedat}{2}[&x^{2}\cos ^{2}\phi _{g}-x\cos \phi _{g}\sin \phi _{g}(v_{2y})+\sin ^{2}\phi _{g}(v_{2y})^{2}\\&+x^{2}\sin ^{2}\phi _{g}+x\sin \phi _{g}\cos \phi _{g}(v_{2y})-d^{\prime }x\sin \phi _{g}\\&+x\sin \phi _{g}\cos \phi _{g}(v_{2y})+\cos ^{2}\phi _{g}(v_{2y})^{2}-d^{\prime }\cos \phi _{g}(v_{2y})\\&-d^{\prime }x\sin \phi _{g}-d^{\prime }\cos \phi _{g}(v_{2y})+d^{\prime 2}\\&+d^{2}\sin ^{2}\theta _{g}+dz\sin \theta _{g}\cos \theta _{g}+z^{2}\cos ^{2}\theta _{g}]\end{alignedat}}\\\end{alignedat}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/e1d130272f812a340935d488b10bdb7a1dbacb3f)
Grouping and rearranging:
![{\displaystyle {\begin{alignedat}{2}\left({\frac {q}{k}}\right)^{2}d^{\prime 2}&={\begin{alignedat}{2}[&x^{2}+(v_{2y})^{2}\\&-2d^{\prime }x\sin \phi _{g}\\&+x\sin \phi _{g}\cos \phi _{g}(v_{2y})-d^{\prime }\cos \phi _{g}(v_{2y})\\&-d^{\prime }\cos \phi _{g}(v_{2y})+d^{\prime 2}\\&+d^{2}\sin ^{2}\theta _{g}+dz\sin \theta _{g}\cos \theta _{g}+z^{2}\cos ^{2}\theta _{g}]\end{alignedat}}\\&={\begin{alignedat}{2}[&x^{2}+(d^{2}\cos ^{2}\theta _{g}-dz\cos \theta _{g}\sin \theta _{g}+z^{2}\sin ^{2}\theta _{g})\\&-2d^{\prime }x\sin \phi _{g}\\&+(x\sin \phi _{g}-d^{\prime }-d^{\prime })\cos \phi _{g}(v_{2y})\\&+d^{\prime 2}+d^{2}\sin ^{2}\theta _{g}+dz\sin \theta _{g}\cos \theta _{g}+z^{2}\cos ^{2}\theta _{g}]\end{alignedat}}\\&={\begin{alignedat}{2}[&d^{\prime 2}+x^{2}+d^{2}+z^{2}\\&-2d^{\prime }x\sin \phi _{g}\\&+(x\sin \phi _{g}-2d^{\prime })\cos \phi _{g}(v_{2y})]\end{alignedat}}\\&=2d^{\prime 2}-2d^{\prime }x\sin \phi _{g}+(x\sin \phi _{g}-2d^{\prime })\cos \phi _{g}(v_{2y})\\&=?\\&=?\\&=?\\&=2d^{\prime 2}-2d^{\prime }x\sin \phi _{g}+2d^{\prime }\cos \phi _{g}(d\cos \theta _{g}-z\sin \theta _{g})\\&=2d^{\prime }\left(d^{\prime }-x\sin \phi _{g}+\cos \phi _{g}(d\cos \theta _{g}-z\sin \theta _{g})\right)\\\left({\frac {q}{k}}\right)^{2}&=2\left(1-{\frac {x\sin \phi _{g}+\cos \phi _{g}(d\cos \theta _{g}-z\sin \theta _{g})}{d^{\prime }}}\right)\end{alignedat}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/68fbf2089d31b7f1d2771a551ad3bd89950bd348)
