Page:Optics.djvu/82

When ${\displaystyle Q}$ is between ${\displaystyle A}$ and ${\displaystyle E}$, ${\displaystyle q}$ is between ${\displaystyle Q}$ and ${\displaystyle E.}$ This may easily be seen from the geometrical construction, (Fig. 77.) or it may be shown from the formula: for

which shows that ${\displaystyle \Delta }$ is greater or less than ${\displaystyle \Delta '}$ according as it is greater or less than ${\displaystyle r.}$

When ${\displaystyle Q}$ comes to ${\displaystyle A}$, ${\displaystyle q}$ coincides with it.

By differentiating the equation ${\displaystyle {\frac {1}{\Delta '}}={\frac {m-1}{mr}}+{\frac {1}{m\Delta }},}$ we find

which shows that the distance ${\displaystyle Qq}$ is at a maximum in the space between ${\displaystyle A}$ and ${\displaystyle E}$ when ${\displaystyle mr^{2}=({\overline {m-1}}\Delta +r)^{2}}$, or

for when ${\displaystyle \Delta -\Delta '}$ is at a maximum ${\displaystyle d\Delta -d\Delta '=0;}$ and ${\displaystyle \therefore {\frac {d\Delta '}{d\Delta }}=1.}$

If we place ${\displaystyle Q}$ on the other side of ${\displaystyle A,}$ (Fig. 78.) or make ${\displaystyle \Delta }$ negative, we shall have

whence we collect that as long as ${\displaystyle \Delta <{\frac {r}{m-1}},}$ ${\displaystyle \Delta '}$ is negative and increasing: that when ${\displaystyle \Delta ={\frac {r}{m-1}},}$ or ${\displaystyle Q}$ is at ${\displaystyle f}$, ${\displaystyle \Delta '}$ is infinite, and that afterwards it becomes positive, or that ${\displaystyle q}$ goes to the other side of ${\displaystyle A.}$

Obs. It will probably have occurred to the reader, that by placing ${\displaystyle Q}$ within the denser medium, we have virtually passed from the first case to the fourth, with the only difference that the places of ${\displaystyle Q}$and ${\displaystyle q}$ are inverted. I have, however, purposely placed ${\displaystyle Q}$ in all possible positions, in order to illustrate the connexion between the