Fields of a moving electron

The electric $:mathbf{E}:$ and magnetic $:mathbf{B}:$ parts of the electromagnetic field produced by a moving charge $:q:$ are :

---

SOURCE 1

From Jackson's 'Classical Electrodynamics', 3rd Edition, equations (14.14) and (14.13)

begin{align} !!!!!!!!!!!!!!!!!!mathbf{E}(mathbf{x},t) & = frac{q}{4piepsilon_0}left[frac{mathbf{n}-boldsymbol{beta}}{gamma^2(1 - boldsymbol{beta}boldsymbol{cdot}mathbf{n})^3 R^2} right]_{mathrm{ret}} + frac{q}{4pi}sqrt{frac{mu_0}{epsilon_0}}left[frac{mathbf{n}boldsymbol{times}left[(mathbf{n}-boldsymbol{beta})boldsymbol{times} dot{boldsymbol{beta}}right]}{(1 - boldsymbol{beta}boldsymbol{cdot}mathbf{n})^3 R}right]_{mathrm{ret}} tag{14.14} !!!!!!!!!!!!!!!!!!mathbf{B}(mathbf{x},t) & = left[mathbf{n}boldsymbol{times}mathbf{E}right]_{mathrm{ret}} tag{14.13} end{align} where begin{align} boldsymbol{beta} & = dfrac{boldsymbol{upsilon}}{c},quad beta=dfrac{upsilon}{c}, quad gamma= left(1-beta^{2}right)^{-frac12} tag{01a} dot{boldsymbol{beta}} & = dfrac{dot{boldsymbol{upsilon}}}{c}=dfrac{mathbf{a}}{c} tag{01b} mathbf{n} & = dfrac{mathbf{R}}{Vertmathbf{R}Vert}=dfrac{mathbf{R}}{R}equivdfrac{mathbf{r'}}{r'}=dfrac{mathbf{r'}}{Vertmathbf{r'}Vert}equiv mathbf{e}_{r'} tag{01c} end{align}

---

SOURCE 2

From Feynman's Lectures, Volume II 'Mainly Electromagnetism and Matter', New Millennium Edition, equations (21.1) begin{align} mathbf{E} & = frac{q}{4 pi epsilon_0} left[ frac{ mathbf{e}_{r'}}{r'^2} + frac{r'}{c} frac{d}{dt} left(frac{mathbf{e}_{r'} }{r'^2}right) + frac{1}{c^2} frac{d^2}{dt^2} mathbf{e}_{r'} right] tag{21.1-Feynman} cmathbf{B} & = mathbf{e}_{r'}boldsymbol{times}mathbf{E} nonumber end{align}

---

Without looking at the details it seems from the second equations, those giving $:mathbf{B}:$ from $:mathbf{E}:$, that the former is produced by the latter. But this is not the case : the electromagnetic field is an entity and its separation to the electric and magnetic parts depends upon the observer's inertial frame of reference.

Note that these equations are derived from the so called Liénard-Wiechert potentials which in turn are produced from the Maxwell's equations in empty space
begin{align} boldsymbol{nabla} boldsymbol{times} mathbf{E} & = -frac{partial mathbf{B}}{partial t} tag{02a} boldsymbol{nabla} boldsymbol{times} mathbf{B} & = mu_{0}mathbf{j}+frac{1}{c^{2}}frac{partial mathbf{E}}{partial t} tag{02b} nabla boldsymbol{cdot} mathbf{E} & = frac{rho}{epsilon_{0}} tag{02c} nabla boldsymbol{cdot}mathbf{B}& = 0 tag{02d} end{align} with electric charge and electric charge current densities begin{align} rho(mathbf{x},t) & = qcdot deltaleft(mathbf{x}-mathbf{x}_{q}right) tag{03a} mathbf{j}(mathbf{x},t) & = qcdot deltaleft(mathbf{x}-mathbf{x}_{q}right)cdotdfrac{mathrm dmathbf{x}_{q}}{mathrm d t} tag{03b} end{align}

---

The fact that the electromagnetic field is an entity is more clear if we take a look at its transformation. So let $:mathrm{S}:$ and $:mathrm{S}':$ two inertial frames of reference and the frame $:mathrm{S}':$ moves uniformly with velocity $:mathbf{v}=upsilonmathbf{n}, upsilon in left(-c,+cright):$ with respect to $:mathrm{S}$, see Figure in the bottom. Then from $:mathrm{S}:$ to $:mathrm{S}'$ begin{align} mathbf{E}' & =gamma mathbf{E}!-!left(gamma!-!1right)left(mathbf{E}boldsymbol{cdot}mathbf{n}right)mathbf{n}+,dfrac{gamma}{c}left(mathbf{v}boldsymbol{times}cmathbf{B}right) tag{04a} c mathbf{B}' & = gamma cmathbf{B}!-!left(gamma!-!1right)left(cmathbf{B}boldsymbol{cdot}mathbf{n}right)mathbf{n}!-!dfrac{gamma}{c}left(mathbf{v}boldsymbol{times}mathbf{E}right) tag{04b} end{align} From equations (04) the six scalar components bind together more strongly in the so-called electromagnetic field tensor begin{equation} F=F^{munu} begin{bmatrix} hphantom{-}0 & -E_1 & -E_2 & -E_3 hphantom{-}vphantom{dfrac12} hphantom{-}E_1 & hphantom{-} 0 & -cB_3 & hphantom{-} cB_2 hphantom{-}vphantom{dfrac12} hphantom{-}E_2 & hphantom{-} cB_3 & hphantom{-} 0 & -cB_1 hphantom{-}vphantom{dfrac12} hphantom{-}E_3 & -cB_2 & hphantom{-} cB_1 & hphantom{-} 0 hphantom{-}vphantom{dfrac12} end{bmatrix} tag{05} end{equation} transformed under the Lorentz Transformation $:Lambda:$ as follows begin{equation} F'=Lambda F Lambda tag{06} end{equation} or by tensors as begin{equation} F'^{alphabeta}=Lambda^{alpha}_{mu} F^{munu}Lambda^{beta}_{nu} tag{07} end{equation}

---