If potential difference V applied across a conductor is increased to 2V , how will the drift velocity of the electron change?
1 Answer
Short Answer
If the potential difference V applied across a conductor is increased to 2V, the drift velocity of the electrons will also double.
Detailed Explanation
Let's break down why this happens step-by-step:
Potential Difference and Electric Field:
When you apply a potential difference (voltage) $V$ across a conductor of length $L$, it creates a uniform electric field $E$ inside the conductor. The relationship is:
$E = \frac{V}{L}$
This electric field is what "pushes" the free electrons.Electric Field and Force:
The electric field $E$ exerts a force $F$ on each free electron. Since an electron has a charge $e$, the force is:
$F = eE$Force and Acceleration:
According to Newton's second law ($F=ma$), this force causes the electrons to accelerate. The acceleration $a$ of an electron with mass $m$ is:
$a = \frac{F}{m} = \frac{eE}{m}$Drift Velocity:
An electron doesn't accelerate indefinitely. It constantly collides with the atoms (ions) of the conductor's lattice. These collisions randomize its direction and slow it down.
Drift velocity ($v_d$) is the average velocity that an electron achieves due to the electric field, despite these constant collisions. It is related to the electron's acceleration ($a$) and the average time between collisions, known as the relaxation time ($\tau$).
$v_d = a \tau$Putting It All Together:
Now, let's substitute the expressions from the previous steps into the equation for drift velocity:
$v_d = (\frac{eE}{m}) \tau$
And since $E = V/L$:
$v_d = (\frac{e(V/L)}{m}) \tau$
$v_d = (\frac{e \tau}{mL}) V$In this final equation, the terms in the parenthesis ($e, \tau, m, L$) are all constants for a given conductor under constant temperature.
$e$ = charge of an electron (constant)
$m$ = mass of an electron (constant)
$L$ = length of the conductor (constant)
$\tau$ = relaxation time (assumed constant if temperature doesn't change)Therefore, we can see a direct relationship:
$v_d \propto V$
The drift velocity is directly proportional to the applied potential difference.
Conclusion
- Initial State: $v_{d1} \propto V$
- New State: The potential difference is doubled to $2V$.
- Result: The new drift velocity $v{d2}$ will be:
$v{d2} \propto 2V$
Therefore, $v{d2} = 2 \times v{d1}$.
Doubling the potential difference doubles the electric field, which doubles the force on the electrons, which doubles their average drift velocity.