Maxwell's electromagnetic theory of light is based on Faraday induction experiment that is not optical. Planck uses the blackbody radiation effect that emits the radio induction effect and light to structurally unify induction with light but the blackbody light emission is not an induction effect since electrons are released from the blackbody surface when light is emitted. Lenard's photoelectric effect proves light is composed of particles which contradicts the lateral continuity of Maxwell's EM induction field. In addition, the wave effects and velocity of the radio induction effect does not justify Maxwell's theory since induction is not optical. Furthermore, the derivation of Maxwell's EM wave equations of light using the expansion and divergent methods are patently incorrect*.
*In the gradient (horizontal) method, http://en.wikipedia.org/wiki/Electro..._wave_equation , a vector identity, that produces a second order gradient, results in the derivation of the EM horizontal wave equations of light that contradicts Maxwell's transverse wave structure of light that is used to represent polarization.
In the expansion method (Jenkins, Francis and White, Harvy. Fundamentals of Optics. 3rd ed. McGraw-Hill. 1957. p. 410), an EM transverse wave equations of light are derived. After Maxwell's equations are expanded, 16 of the first order differential components are eliminated to produce,
dEy/dx = - (1/c)(dBz/dt] ........... - dBy/dx = (1/c)(dEz/dt)..............Equ 1a,b
that are used to derive
(d"E/d"x) = c(d"E/d"t).............................................. .........................Equ 2
Equation 2 is used in the derivation of the x-direction EM transverse wave equations of light.
Ex = Eo cos(kx - wt)j..............Bz = Bo cos(kx -wt)k...........................Equ 3a,b
Using the electromagnetic transverse wave equations, in equations 1a forms,
d/dx (Eo cos(kx - wt)j) = - (1/c) d/dt(Bo cos(kx - wt)k).......................Equ 4
Using Bo = Eo, in equation 4 forms,
j = k (unit vectors). .................................................. ......................Equ 5
Equation 1b also produces equation 5 which I calls the unit vector of catastrophe. In addition, Condon also uses the expansion method to derive the EM transverse wave equations of light, using equation 2, but neglects the representation of equations 1a,b (Condon, Handbook of Physics. McGraw-Hill. 1958. 4-108). Furthermore, Hecht also uses the expansion method to derive the EM transverse wave equations of light, using equation 2, and neglects the representation of equations 1a,b (Hecht, Eugene. Optics. Addison-Wesley. 4th ed. p. 44). In general, physicists uses Condon-Hecht expansion method or the divergence method but physicists are intensionally concealing an extremely important and critcal fact, unit vector catastrophe, formed by equation 1a,b because the wave theory of light is the foundation of modern theoretical physics which is the reasoning for the intense group afford at concealment of the derivation of the derivation of the EM transverse wave equations of light. One of the agruements used is that Maxwell's equations are not vector equations and that equations 3a,b are not EM vector transverse waves.
*In the gradient (horizontal) method, http://en.wikipedia.org/wiki/Electro..._wave_equation , a vector identity, that produces a second order gradient, results in the derivation of the EM horizontal wave equations of light that contradicts Maxwell's transverse wave structure of light that is used to represent polarization.
In the expansion method (Jenkins, Francis and White, Harvy. Fundamentals of Optics. 3rd ed. McGraw-Hill. 1957. p. 410), an EM transverse wave equations of light are derived. After Maxwell's equations are expanded, 16 of the first order differential components are eliminated to produce,
dEy/dx = - (1/c)(dBz/dt] ........... - dBy/dx = (1/c)(dEz/dt)..............Equ 1a,b
that are used to derive
(d"E/d"x) = c(d"E/d"t).............................................. .........................Equ 2
Equation 2 is used in the derivation of the x-direction EM transverse wave equations of light.
Ex = Eo cos(kx - wt)j..............Bz = Bo cos(kx -wt)k...........................Equ 3a,b
Using the electromagnetic transverse wave equations, in equations 1a forms,
d/dx (Eo cos(kx - wt)j) = - (1/c) d/dt(Bo cos(kx - wt)k).......................Equ 4
Using Bo = Eo, in equation 4 forms,
j = k (unit vectors). .................................................. ......................Equ 5
Equation 1b also produces equation 5 which I calls the unit vector of catastrophe. In addition, Condon also uses the expansion method to derive the EM transverse wave equations of light, using equation 2, but neglects the representation of equations 1a,b (Condon, Handbook of Physics. McGraw-Hill. 1958. 4-108). Furthermore, Hecht also uses the expansion method to derive the EM transverse wave equations of light, using equation 2, and neglects the representation of equations 1a,b (Hecht, Eugene. Optics. Addison-Wesley. 4th ed. p. 44). In general, physicists uses Condon-Hecht expansion method or the divergence method but physicists are intensionally concealing an extremely important and critcal fact, unit vector catastrophe, formed by equation 1a,b because the wave theory of light is the foundation of modern theoretical physics which is the reasoning for the intense group afford at concealment of the derivation of the derivation of the EM transverse wave equations of light. One of the agruements used is that Maxwell's equations are not vector equations and that equations 3a,b are not EM vector transverse waves.
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