Current in Electric Circuit/L, R in Series/Minimum Current implies Increasing EMF

Theorem
Consider the electrical circuit $K$ consisting of:
 * a resistance $R$
 * an inductance $L$

in series with a source of electromotive force $E$ which is a function of time $t$.


 * [[File:CircuitRLseries.png]]

Let the current $I$ be at a minimum.

Then the EMF $E$ is increasing.

Proof
From Electric Current in Electric Circuit: L, R in Series:
 * $L \dfrac {\mathrm d I} {\mathrm d t} + R I = E$

defines the behaviour of $I$.

Taking the derivative:
 * $L \dfrac {\mathrm d^2 I} {\mathrm d t^2} + R \dfrac {\mathrm d I} {\mathrm d t} = \dfrac {\mathrm d E} {\mathrm d t}$

From Second Derivative of Real Function at Minimum:
 * $L \dfrac {\mathrm d^2 I} {\mathrm d t^2} \ge 0$

while from Derivative at Maximum or Minimum:
 * $R \dfrac {\mathrm d I} {\mathrm d t} = 0$

and so:
 * $\dfrac {\mathrm d E} {\mathrm d t} \ge 0$

The result follows from Increasing Function has Positive Derivative.