a) [tex]1.55\cdot 10^{-3} T[/tex]
The magnetic force exerted on a charged particle in motion is given by:
[tex]F=qvB sin \theta[/tex]
where
q is the charge of the particle
v is the velocity of the particle
B is the magnetic field strength
[tex]\theta[/tex] is the angle between the direction of v and B
The expression can be rewritten as
[tex]B=\frac{F}{qv sin \theta}[/tex]
We see that the minimum magnetic field needed is the one for which [tex]sin \theta=1[/tex], so with [tex]\theta=90^{\circ}[/tex]. In this problem, we have:
[tex]q=1.6\cdot 10^{-19} C[/tex] (charge of the electron)
[tex]f=5.7 fN=5.7\cdot 10^{-15}N[/tex] is the force
[tex]v=23 Mm/s = 23\cdot 10^6 m/s[/tex] is the electron's velocity
Substituting, we find
[tex]B=\frac{5.7\cdot 10^{-15}N}{(1.6\cdot 10^{-19} C)(23\cdot 10^6 m/s) sin 90^{\circ}}=1.55\cdot 10^{-3} T[/tex]
b) [tex]2.19\cdot 10^{-3} T[/tex]
In this case, the field is at 45 degrees to the electron's velocity, so we have
[tex]\theta=45^{\circ}[/tex]
Therefore, the field strength required to obtain a force of
[tex]f=5.7 fN=5.7\cdot 10^{-15}N[/tex] is the force
will be equal to
[tex]B=\frac{F}{qv sin \theta}=\frac{5.7\cdot 10^{-15}N}{(1.6\cdot 10^{-19} C)(23\cdot 10^6 m/s) sin 45^{\circ}}=2.19\cdot 10^{-3} T[/tex]
The minimum magnetic field needed to exert the given force is [tex]1.55 \times 10^{-3} \ T[/tex]
When the field is 45 degrees to the electron's speed, the magnetic field strength is [tex]2.19\times 10^{-3} \ T[/tex]
The given parameters;
The minimum magnetic field is calculated as follows;
[tex]F = qvB \\\\B = \frac{F}{qv} \\\\B = \frac{5.7\times 10^{-15}}{(1.602\times 10^{-19})(23\times 10^6)} \\\\B = 1.55 \times 10^{-3} \ T[/tex]
When the field is 45 degrees to the electron's speed, the magnetic field strength is calculated as follows;
[tex]B = \frac{F}{q\times v \times sin(45)} = \frac{5.7 \times 10^{-15}}{1.602 \times 10^{-19} \times 23 \times 10^6 \times sin(45)} = 2.19 \times 10^{-3} \ T[/tex]
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