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 the only difference in length of path occurs, before reflection, i. e., $$AB=L_{1}>AC=L_{2}$$

Consider first a stationary source, and let &tau; be the period of the source which produces a bright line at D. For the production of such a line, it is evident that light impulses coming over the two paths ABD and ACD must arrive at D in the same phase. If &Delta;t is the time interval between the departures from the source of two light impulses which arrive simultaneously at D, the condition necessary for their arrival in phase is evidently given by the equation

where i is a whole number. (Note that $$L_{2}-L_{1}$$ with the apparatus as arranged.)

Consider now a source of light approaching the slit with the velocity v. If &tau;' is the period of the source which now produces a bright line at D and &Delta;t' the time interval between departures from the source of two light impulses which now arrive simultaneously at D we evidently have the relation

$$i\tau'=\Delta t'$$.

In order to obtain an expression for &Delta;t' in terms of $$L_1$$ and $$L_2$$, we must note that the source moves toward the slit the distance v&Delta;t' during the interval of time between the departures of the two light impulses, and hence the difference in path which was $$L_{1}-L_{2}$$ for a stationary source has now become $$L_{1}-L_{2}+v\Delta t'$$. Furthermore we must remember that according to the theory which we are investigating the light before reflection will have the velocity c+v, and hence

which by comparison with equation (i) gives us $$\tau'=\tau$$.

In other words if the first of the above emission theories of light is true, both before and after the source of light is set in motion, light produced by the same period of the source gives a bright line at the point D, that is, the expected Doppler effect or shifting of the lines does not occur.

In interpreting actual experimental results, it must be borne in mind that the adjustment of the grating was assumed to be such that the