An alpha particle (q = +2e, m = 4.00 u) travels in a circular path of radius 6.40 cm in a uniform magnetic field with B = 1.17 T. Calculate (a) its speed, (b) its period of revolution, (c) its kinetic - QAmmunity.org

An alpha particle (q = +2e, m = 4.00 u) travels in a circular path of radius 6.40 cm in a uniform magnetic field with B = 1.17 T. Calculate (a) its speed, (b) its period of revolution, (c) its kinetic

asked Jun 5, 2020 45.0k views

2 Answers

(a)
$3.59\cdot 10^6 m/s$

The magnetic force acts as centripetal force, so we can write

qvB= (mv^2)/(r)

where

q is the charge of the particle

v is its speed

B is the magnetic field strength

m is the mass

r is the radius of the circular path

For the alpha particle in the problem,

$q=2e=3.2\cdot 10^(-19) C$

$m=4.00 u = 4\cdot 1.67\cdot 10^(-27) kg=6.68\cdot 10^(-27) kg$

r = 6.40 cm = 0.064 m

B = 1.17 T

Re-arranging the equation and solving for v, we find its speed:

$v=(qBr)/(m)=((3.2\cdot 10^(-19))(1.17)(0.064 m))/(6.68\cdot 10^(-27))=3.59\cdot 10^6 m/s$

(b)
$1.12\cdt 10^(-7) s$

The period of revolution is given by the ratio between the distance travelled in one circle (so, the circumference of the path) and the speed of the particle, so

$T= (2\pi r)/(v)$

where

r is the radius of the path

v is the speed

Here we have

r = 6.40 cm = 0.064 m

$v=3.59\cdot 10^6 m/s$

So the period of revolution is

$T= (2\pi (0.064))/(3.59\cdot 10^6)=1.12\cdt 10^(-7) s$

(c)
$4.30\cdot 10^(-14)J$

The kinetic energy of a particle is given by

E_k = (1)/(2)mv^2

where

m is its mass

v is its speed

For the alpha particle in the problem, we have

$m=4.00 u = 4\cdot 1.67\cdot 10^(-27) kg=6.68\cdot 10^(-27) kg$

$v=3.59\cdot 10^6 m/s$

So its kinetic energy is

$E_k = (1)/(2)(6.68\cdot 10^(-27)(3.59\cdot 10^6)^2=4.30\cdot 10^(-14)J$

(d)
$1.34\cdot 10^5 V$

When accelerated through a potential difference, a particle gains a kinetic energy equal to the change in electric potential energy - so we can write:

$q \Delta V = E_k$

where the term on the left is the change in electric potential energy, with

q is the charge of the particle

$\Delta V$ is the potential difference

Here we have

$q=2e=3.2\cdot 10^(-19) C$ is the charge of the alpha particle

$4.30\cdot 10^(-14)J$ is the kinetic energy

Re-arranging the formula, we find

$\Delta V=(E_k)/(q)=(4.30\cdot 10^(-14))/(3.2\cdot 10^(-19))=1.34\cdot 10^5 V$

Fa answered Jun 11, 2020

by Fa

5.0k points

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