What magnetic field B is needed to keep 959-GeV protons revolving in a circle of radius 1.4 km ? Use the relativistic mass. The proton's "rest mass" is 0.938 GeV/c2.(1 GeV = 109eV) [Hint: In relativity, mrelv2/r = qvB in still valid in a magnetic field, mrel = γm.]
Express your answer to two significant figures and include the appropriate units
What magnetic field B is needed to keep 959-GeV protons revolving in a circle of radius...
Part A What magnetic field B is needed to keep 999-GeV protons revolving in a circle of radius 2.0 km ? Use the relativistic mass. The proton's "rest mass" is 0.938 GeV/c2 1 GeV - 10 eV) [Hint: In relativity, mrelvr-quB in still valid in a magnetic field, mrel-m Express your answer to two significant figures and include the appropriate units B-Value Units Submit Request Answer
Relativity question protons with total energy 0.9TeV travel around a circle circumference 6.86 km. Show that a magnetic field of strength 0.44 T is needed to keep them moving around the circle. if protons made to collide with a stationary hydrogen target, show the largest mass of particle that can be produced is 41 GeV.
Protons move in a circle of radius 7.50 cm in a 0.507-T magnetic field. What value of electric field could make their paths straight? Express your answer using three
(1) Cyclotron radiation Free electrons and protons will gyrate, or circle, around magnetic field lines at a frequency fgy equal to JEyrO2T m where B is the magnetic field. q is the charge of the particle, and m is the mass of the particle. Jgyro is call the gyro frequency, and is also called the cyclotron frequency. As we discussed in class, charges which change their velocity will create electromagnetic waves If they change their velocity in a repeating pattern...
Consider a proton cyclotron with a radius 3 meters, a magnetic field B=0.6 T and a voltage source with an amplitude V = 10 kV. What is the maximum energy in joules the protons can reach? To reach the same energy using a single DC potential, how many volts would be required? How long would it take for a proton starting at rest to reach this energy? (hint how much work is done on the proton in each full orbit?)...