Answer:
a. 1/2 b. 1/2 c, 20 cm d. 40 cm
Explanation:
Here is the complete question
A proton ( = +, = 1.0 u; where u = unified mass unit ā 1.66 Ć 10ā27kg), a deuteron ( = +, = 2.0 u) and an alpha particle ( = +2, = 4.0 u) are accelerated from rest through the same potential difference , and then enter the same region of uniform magnetic field āā , moving perpendicularly to the direction of the magnetic field.
A) What is the ratio of the protonās kinetic energy to the alpha particleās kinetic energy ?
B) What is the ratio of the deuteronās kinetic energy to the alpha particleās kinetic energy ?
C) If the radius of the protonās circular orbit = 10 cm, what is the radius of the deuteronās orbit ?
D) What is the radius of the alpha particleās orbit ?
Solution
a. For both particles, kinetic energy = electric potential energy
For proton K.E= Kā = 1/2māvāĀ² = +eV , for alpha particle K.E = Kā = 1/2māvāĀ²= +2eV
where mā, mā and vā, vā are the respective masses and velocities of the proton and alpha particle. So, the ratio of their kinetic energies is
1/2māvāĀ²/1/2māvāĀ² = +eV/+2eV
māvāĀ²/māvāĀ² = 1/2.
So the ratio Kā/Kā = 1/2
b. For both particles, kinetic energy = electric potential energy
For deuteron Ā Kā = 1/2māvāĀ² = +eV , for alpha particle Kā = 1/2māvāĀ²= +2eV
where mā, mā and vā, vā are the respective masses and velocities of the deuteron and alpha particle. So, the ratio of their kinetic energies is
1/2māvāĀ²/1/2māvāĀ² = +eV/+2eV
māvāĀ²/māvāĀ² = 1/2.
So the ratio Kā/Kā = 1/2
c. The radius of the proton's circular is gotten from the centripetal force which equal the magnetic force. So,
mvĀ²/r = Bev
rā = mv/Be
Since mass of deuteron mā equals twice mass of proton mā, mā = 2mā
So, radius of deuteron's circular orbit equals
rā = māv/Be = 2māv/Be = 2rā = 2 Ć 10 cm = 20 cm
d. The radius of the alpha particle is given by rā = māv/Be. Since mass of alpha particle equal four times mass of proton, mā = 4mā.
So, radius of alpha particle's circular orbit equals
rā = māv/Be = 4māv/Be = 4rā = 4 Ć 10 cm = 40 cm
