Problem 3: A proton in a cyclotron gains AK = 2eAV of kinetic energy per revolution, where AV is the potential between the dees. Although the energy gain comes in small pulses, the proton makes so many revolutions that it is reasonable to model the energy as increasing at the constant rate P = K = AK, where T is the period of the cyclotron motion. This is power input because it is a rate of increase of energy. Find an expression for r(t), the radius of a proton's orbit in a cyclotron, in terms of m, e, B, P, and t. Assume that r = 0 at t = 0. dt a) Using the formula for the radius of the cyclotron orbit, r = mg, work out a formula for the kinetic energy K of the proton in terms of m, e, B, and r. qB¹ 3 b) Show that equation d = P results in the following differential equation for r as a function of t: rdr = Pm. Make sure to show all the steps that lead to this equation. e² c) This differential equation can be solved by separating the variables. For that, rewrite it as r dr = Pm dt and integrate both sides. The expression on the left side should be integrated from r = 0 (center) e² B² to r(t) (an intermediate radius at the moment of time t), while the expression on the right side should be integrated from 0 to t. From here, obtain the expression for r(t) in terms of m, e, B, P, and t. d) Express the power input of the cyclotron, P = A, in terms of m, e, B, and AV. e) A relatively small cyclotron is 2.0 m in diameter, uses a 0.55 T magnetic field, and has a 400 V potential difference between the dees. What is the power input to a proton, in W? f) How long does it take a proton to spiral from the center out to the edge? (Answer: 2.17 ms.)

Hello, I really need help with all of these problems since they one problem after the other is there any chance that you label these problems because I kept getting the wrong answer 

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ΔΚ Problem 3: A proton in a cyclotron gains AK = 2eAV of kinetic energy per revolution, where AV is the potential between the dees. Although the energy gain comes in small pulses, the proton makes so many revolutions that it is reasonable to model the energy as increasing at the constant rate P = K = AK, where T is the period of the cyclotron motion. This is power input because it is a rate of increase of energy. Find an expression for r(t), the radius of a proton's orbit in a cyclotron, in terms of m, e, B, P, and t. Assume that r = 0 at t = 0. a) Using the formula for the radius of the cyclotron orbit, r = mg, work out a formula for the kinetic energy K of the proton in terms of m, e, B, and r. b) Show that equation d dK = P results in the following differential equation for r as a function of t: Make sure to show all the steps that lead to this equation. rder t = Pm e² B². 3 Pm e²B² c) This differential equation can be solved by separating the variables. For that, rewrite it as r dr = dt and integrate both sides. The expression on the left side should be integrated from r = 0 (center) to r(t) (an intermediate radius at the moment of time t), while the expression on the right side should be integrated from 0 to t. From here, obtain the expression for r(t) in terms of m, e, B, P, and t. d) Express the power input of the cyclotron, P = AK, in terms of m, e, B, and AV. e) A relatively small cyclotron is 2.0 m in diameter, uses a 0.55 T magnetic field, and has a 400 V potential difference between the dees. What is the power input to a proton, in W? f) How long does it take a proton to spiral from the center out to the edge? (Answer: 2.17 ms.)