`color{blue} ✍️` The cyclotron is a machine to accelerate charged particles or ions to high energies. `I`
`color{blue} ✍️` The cyclotron uses both electric and magnetic fields in combination to increase the energy of charged particles.
`color {blue}{➢➢}` As the fields are perpendicular to each other they are called crossed fields. Cyclotron uses the fact that the frequency of revolution of the charged particle in a magnetic field is independent of its energy.
`color{blue} ✍️` The particles move most of the time inside two semicircular disc-like metal containers, `D_1` and `D_2,` which are called dees as they look like the letter `D`.
`color {blue}{➢➢}` Figure 4.8 shows a schematic view of the cyclotron.
`color {blue}{➢➢}` Inside the metal boxes the particle is shielded and is not acted on by the electric field.
`color{blue} ✍️` The magnetic field, however, acts on the particle and makes it go round in a circular path inside a dee.
`color{blue} ✍️` Every time the particle moves from one dee to another it is acted upon by the electric field. The sign of the electric field is changed alternately in tune with the circular motion of the particle.
`color{blue} ✍️` This ensures that the particle is always accelerated by the electric field. Each time the acceleration increases the energy of the particle. As energy increases, the radius of the circular path increases.
`color {blue}{➢➢}` So the path is a spiral one. The whole assembly is evacuated to minimise collisions between the ions and the air molecules. A high frequency alternating voltage is applied to the dees.
`color{blue} ✍️` In the sketch shown in Fig. 4.8, positive ions or positively charged particles (e.g., protons) are released at the centre `P`.
`color {blue}{➢➢}` They move in a semi-circular path in one of the dees and arrive in the gap between the dees in a time interval `T/2`; where `T`, the period of revolution, is given by Eq. (4.6),
`color{navy}(T = 1/(ν_c) = (2pim)/(qB))`
`color {blue}{➢➢}`or `color{navy}(ν_c = (qB)/(2pim))`
...........(4.8)
`color {blue}{➢➢}` This frequency is called the cyclotron frequency for obvious reasons and is denoted by `ν_c .` The frequency `ν_a` of the applied voltage is adjusted so that the polarity of the dees is reversed in the same time that it takes the ions to complete one half of the revolution.
`color {blue}{➢➢}` The requirement `ν_a = ν_c` is called the resonance condition. The phase of the supply is adjusted so that when the positive ions arrive at the edge of `D_1, D_2` is at a lower potential and the ions are accelerated across the gap.
`color {blue}{➢➢}` Inside the dees the particles travel in a region free of the electric field. The increase in their kinetic energy is qV each time they cross from one dee to another ( `V` refers to the voltage across the dees at that time). From Eq. (4.5), it is clear that the radius of their path goes on increasing each time their kinetic energy increases.
`color {blue}{➢➢}` The ions are repeatedly accelerated across the dees until they have the required energy to have a radius approximately that of the dees. They are then deflected by a magnetic field and leave the system via an exit slit. From Eq. (4.5) we have,
`color{navy}(v = (qBR)/m)`
............(4.9)
`color {blue}{➢➢}` where `R` is the radius of the trajectory at exit, and equals the radius of a dee.
`color {blue}{➢➢}` Hence, the kinetic energy of the ions is,
`color{navy}(1/2 mv^2 = (q^2B^2R^2)/(2m))`
...............(4.10)
`color{blue} ✍️` The operation of the cyclotron is based on the fact that the time for one revolution of an ion is independent of its speed or radius of its orbit.
`color {blue}{➢➢}` The cyclotron is used to bombard nuclei with energetic particles, so accelerated by it, and study the resulting nuclear reactions.
`color {blue}{➢➢}` It is also used to implant ions into solids and modify their properties or even synthesis new materials. It is used in hospitals to produce radioactive substances which can be used in diagnosis and treatment.
`color{blue} ✍️` The cyclotron is a machine to accelerate charged particles or ions to high energies. `I`
`color{blue} ✍️` The cyclotron uses both electric and magnetic fields in combination to increase the energy of charged particles.
`color {blue}{➢➢}` As the fields are perpendicular to each other they are called crossed fields. Cyclotron uses the fact that the frequency of revolution of the charged particle in a magnetic field is independent of its energy.
`color{blue} ✍️` The particles move most of the time inside two semicircular disc-like metal containers, `D_1` and `D_2,` which are called dees as they look like the letter `D`.
`color {blue}{➢➢}` Figure 4.8 shows a schematic view of the cyclotron.
`color {blue}{➢➢}` Inside the metal boxes the particle is shielded and is not acted on by the electric field.
`color{blue} ✍️` The magnetic field, however, acts on the particle and makes it go round in a circular path inside a dee.
`color{blue} ✍️` Every time the particle moves from one dee to another it is acted upon by the electric field. The sign of the electric field is changed alternately in tune with the circular motion of the particle.
`color{blue} ✍️` This ensures that the particle is always accelerated by the electric field. Each time the acceleration increases the energy of the particle. As energy increases, the radius of the circular path increases.
`color {blue}{➢➢}` So the path is a spiral one. The whole assembly is evacuated to minimise collisions between the ions and the air molecules. A high frequency alternating voltage is applied to the dees.
`color{blue} ✍️` In the sketch shown in Fig. 4.8, positive ions or positively charged particles (e.g., protons) are released at the centre `P`.
`color {blue}{➢➢}` They move in a semi-circular path in one of the dees and arrive in the gap between the dees in a time interval `T/2`; where `T`, the period of revolution, is given by Eq. (4.6),
`color{navy}(T = 1/(ν_c) = (2pim)/(qB))`
`color {blue}{➢➢}`or `color{navy}(ν_c = (qB)/(2pim))`
...........(4.8)
`color {blue}{➢➢}` This frequency is called the cyclotron frequency for obvious reasons and is denoted by `ν_c .` The frequency `ν_a` of the applied voltage is adjusted so that the polarity of the dees is reversed in the same time that it takes the ions to complete one half of the revolution.
`color {blue}{➢➢}` The requirement `ν_a = ν_c` is called the resonance condition. The phase of the supply is adjusted so that when the positive ions arrive at the edge of `D_1, D_2` is at a lower potential and the ions are accelerated across the gap.
`color {blue}{➢➢}` Inside the dees the particles travel in a region free of the electric field. The increase in their kinetic energy is qV each time they cross from one dee to another ( `V` refers to the voltage across the dees at that time). From Eq. (4.5), it is clear that the radius of their path goes on increasing each time their kinetic energy increases.
`color {blue}{➢➢}` The ions are repeatedly accelerated across the dees until they have the required energy to have a radius approximately that of the dees. They are then deflected by a magnetic field and leave the system via an exit slit. From Eq. (4.5) we have,
`color{navy}(v = (qBR)/m)`
............(4.9)
`color {blue}{➢➢}` where `R` is the radius of the trajectory at exit, and equals the radius of a dee.
`color {blue}{➢➢}` Hence, the kinetic energy of the ions is,
`color{navy}(1/2 mv^2 = (q^2B^2R^2)/(2m))`
...............(4.10)
`color{blue} ✍️` The operation of the cyclotron is based on the fact that the time for one revolution of an ion is independent of its speed or radius of its orbit.
`color {blue}{➢➢}` The cyclotron is used to bombard nuclei with energetic particles, so accelerated by it, and study the resulting nuclear reactions.
`color {blue}{➢➢}` It is also used to implant ions into solids and modify their properties or even synthesis new materials. It is used in hospitals to produce radioactive substances which can be used in diagnosis and treatment.