Gió Apr 6, 2015 Well...I am not sure about this one... \displaystyle\theta=\frac{{{7}-{4}{i}}}{{i}}= \displaystyle=\frac{{{7}-{4}{i}}}{{i}}\cdot\frac{{i}}{{i}}=\frac{{{7}{i}+{4}}}{{-{{1}}}}=-{4}-{7}{i} ...

\displaystyle{e}{<}-{5} Explanation: \displaystyle-{9}-{e}{>}{3}{e}+{11} Add \displaystyle{e} to both sides: \displaystyle-{9}-{e}\quad{\left(+\quad{e}\right)}{>}{3}{e}+{11}\quad{\left(+\quad{e}\right)} ...

Assuming a projectile is launched at angle \theta from horizontal from a height y_0 above the ground, where the ground is assumed to be represented by the line y = 0. The measurement of the ...

Note that substituting t=\theta-\pi (or originally, t=-(2\phi+\pi)) will yield the traditional parametric form of a cycloid: x=R(t-\sin t), y=R(1-\cos t) where R=\frac{k^2}{2} is the radius ...

So, you figured out that re_r = xe_i+y e_j+z e_k, e_\theta = \cos\theta\cos\phi e_i + \cos\theta\sin\phi e_j-\sin\theta e_k, e_\phi = -\sin\phi e_i + \cos\phi e_j. Moreover you also found x = r\sin\theta\cos\phi ...

You have found the defect of a perfect spherical lens called spherical aberration which manifests itself when dealing with rays which are far from the principal axis. It is precisely the fact that ...