Question

A particle of mass $m$ and charge $q$ has an initial velocity $\overrightarrow{v}=v_0\hat{j}$, If an electric field $\overrightarrow{E}=E_0\hat{i}$ and magnetic field $\overrightarrow{B}=B_0\hat{i}$ act on the particle, its speed will double after a time

• A. $\frac{\sqrt{3}{v}_{0}m}{q{E}_0}$
• B. $\frac{\sqrt{2}{v}_{0}m}{q{E}_0}$
• C. $\frac{3v_{0}m}{q{E}_0}$
• D. $\frac{2v_{0}m}{q{E}_0}$

Answer 1

The correct option is A

$\frac{\sqrt{3}{v}_{0}m}{q{E}_0}$

Step 1: Given data

Mass of the particle$=m$

Charge $=q$

Initial velocity, $\overrightarrow{v}=v_0\hat{j}$,

Electric field, $\overrightarrow{E}=E_0\hat{i}$

Magnetic field, $\overrightarrow{B}=B_0\hat{i}$

Step 2: Finding the net speed of particles

We know that the magnetic field can only change the direction of speed as it cannot do any work.

As given,

$\overrightarrow{v}=v_0\hat{j}$

Since, the speed of the particle doubles after time $t$ in $y$-direction, the speed will be ​$v_0$ only in $y-z$ plane which is always perpendicular to $x$-direction so the net speed at time $t$.

${\left(v_{net}\right)}^2={\left(v_0\right)}^2+{\left(v_x\right)}^2$

Where $V_{net}$ is the net speed of particles, $V_0$ is speed in $y-z$ plane and $V_x$ in $x$-direction .

Step 3: Finding the time when the speed double.

We know that the force, $F$ is the product of mass, $m$ and acceleration, $a$.

$$\begin{gathered} F=ma \\ a=\frac{F}{m}\cdots \cdots \left(1\right) \end{gathered}$$

Also, force, $F$ is the product of the charge, $q$ and the electric field, $E$

$F=qE$

Putting this value in $\left(1\right)$, we get

$a=\frac{qE}{m}$

$\frac{d{v}_x}{dt}=\frac{qE}{m}$

[ Acceleration is the rate of change of the velocity, $v_x$ with respect to the time, $t$.]

Integrating both sides, we get

$v_x=\frac{qE}{m}t$

$v_x=\frac{q{E}_0}{m}t$ [ $E=E_0$]

Also by given condition $v_{net}=2v_0$​ then

${\left(2v_0\right)}^2={\left(v_0\right)}^2+{\left(\frac{q{E}_{0}t}{m}\right)}^2$ $\left[\because v_x=\frac{q{E}_{0}t}{m}\right]$

$\Rightarrow$ $3v_0^2={\left(\frac{q{E}_{0}t}{m}\right)}^2$

$\Rightarrow$ $t=\frac{\sqrt{3}{v}_{0}m}{q{E}_0}$

Hence, option (A) is correct.