Page:A Treatise on Electricity and Magnetism - Volume 2.djvu/388

Fig. 62. 756.] In the branch ${\displaystyle AF}$ of Wheatstone's Bridge let a coil be inserted, the coefficient of self-induction of which we wish to find. Let us call it ${\displaystyle L}$.

In the connecting wire between ${\displaystyle A}$ and the battery another coil is inserted. The coefficient of mutual induction between this coil and the coil in ${\displaystyle AF}$ is ${\displaystyle M}$. It may be measured by the method described in Art. 755.

If the current from ${\displaystyle A}$ to ${\displaystyle F}$ is ${\displaystyle x}$, and that from ${\displaystyle A}$ to ${\displaystyle H}$ is ${\displaystyle y}$, that from ${\displaystyle Z}$ to ${\displaystyle A}$, through ${\displaystyle B}$, will be ${\displaystyle x+y}$. The external electromotive force from ${\displaystyle A}$ to ${\displaystyle F}$ is

${\displaystyle A-F=Px+L{\frac {dx}{dt}}+M\left({\frac {dx}{dt}}+{\frac {dy}{dt}}\right)}$.

(9)

The external electromotive force along ${\displaystyle AH}$ is

${\displaystyle A-H=Qy}$.

(10)

If the galvanometer placed between ${\displaystyle F}$ and ${\displaystyle H}$ indicates no current, either transient or permanent, then by (9) and (10), since ${\displaystyle H-F=0}$,

${\displaystyle Px=Qy}$;

(11)

and

${\displaystyle L{\frac {dx}{dt}}+M\left({\frac {dx}{dt}}+{\frac {dy}{dt}}\right)=0}$,

(12)

whence

${\displaystyle L=-\left(1+{\frac {P}{Q}}\right)M}$.

(13)

Since ${\displaystyle L}$ is always positive, ${\displaystyle M}$ must be negative, and therefore the current must flow in opposite directions through the coils placed in ${\displaystyle P}$ and in ${\displaystyle B}$. In making the experiment we may either begin by adjusting the resistances so that

${\displaystyle PS=QR}$,

(14)

which is the condition that there may be no permanent current, and then adjust the distance between the coils till the galvanometer ceases to indicate a transient current on making and breaking the battery connexion; or, if this distance is not capable of adjustment, we may get rid of the transient current by altering the resistances ${\displaystyle Q}$ and ${\displaystyle S}$ in such a way that the ratio of ${\displaystyle Q}$ to ${\displaystyle S}$ remains constant.

If this double adjustment is found too troublesome, we may adopt