Lab 6: E-4, Magnetic fields and forces Lab Worksheet Name_____________________________ This sheet is the lab document your TA will use to score your lab. It is to be turned in at the end of lab. To receive full credit you must use complete sentences and explain your reasoning clearly. In this lab you investigate magnetic fields and magnetic forces. As discussed in class, the fundamental ‘charge’ in magnetism is the magnetic dipole. The magnetic monopole (an elementary magnetic charge, analogous to an electric charge) is believed not to exist. Permanent magnets are approximations to magnetic dipoles. As are compass needles. You’ll use these in the first part of the lab to look at magnetic field lines, the forces between permanent magnets, and torques on magnetic dipoles. In the second part of the lab you measure the magnetic force on a moving charged particle (electron), given the mass of the electron. Or you can turn it into a measurement of the charge to mass ratio of an electron by assuming the form of the Lorentz force on a moving charged particle. A. Mapping a Magnetic Field: The plastic board has two strong magnets mounted in rotating holders. These produce the magnetic fields that you will map. You map the fields by looking at the direction of a test dipole as it aligns with the field. You will use: A compass A strong cylindrical magnet that rotates on a string. A grid of small magnets enclosed in a plastic case. Set up the magnets on the string by - Fold a piece of masking tape over the middle of the string and stick it to itself, so that about ½” or so of masking tape sticks out from the string. - Take two of the small cylindrical magnets and stick them to each other through the masking tape right up against the string. - The magnet can now rotate around the string axis to align with a B-field.2 1. Orient the magnets in the plastic so that red (North) of one magnet faces blue (South) of the other. Use the compass to map the direction of the magnetic field at the points indicated, and any others necessary to sketch the magnetic field lines below. Here is a side view of the plastic block and the magnets. Use your string with the cylindrical magnets to measure the direction of the field above the magnets at the points indicated, and sketch the field lines. S N S N S N S N3 2. Now orient the magnets red to red, and sketch the magnetic field lines using the compass as a test dipole. Here is a side view of this setup. Find field direction at points indicated and sketch field lines. S N N S S N N S4 3. Force on a magnetic dipole from these fields. As discussed in class, a model for a magnetic dipole is a circular loop of current. Suppose a magnetic dipole is oriented as shown below in a uniform magnetic field (generated by some external means – the dipole’s field lines are not shown). Use the right-hand rule for the Lorentz force to determine the net force on the dipole (magnitude and direction). Now suppose the magnetic field is not spatially uniform, but is as below (magnetic field lines use the same convention as electric: higher density of field lines means larger magnetic field). Now what is the direction of the net force? I I5 4. Based on these considerations, you should be able to use one of the small cylindrical magnets to test the magnetic field uniformity in the region between the large magnets. Detach one of the small magnets from the masking tape and hold it loosely between your fingers. Move it around while resting it flat on the plastic board in the region between the two large magnets for both of the configurations and feel the forces. Based on this, which configuration generates more uniform fields? Write down what you did. Is this consistent with your field mapping in parts 1 and 2? Explain.6 5. Forces between magnetic dipoles. You have a Pasco force sensor with a disc magnet attached. Try to be a little careful with this, because it is just superglued to a flat-head screw threaded into the force sensor. If you glue joint breaks, your TA (or you) can superglue it back. Start up DataStudio from the Lab6Settings lab settings file on the “Laboratory” page of the course web site. Lay the force sensor on the table, and put 8 sheets of cardboard in front of the large magnet. Then gently stick the larger of the two cylindrical magnets onto the center of the disc magnet. You will use DataStudio to record how much force is required to pull the magnets apart. Click ‘Start’ on DataStudio and pull the cylindrical magnet until it detaches from the disc magnet. The maximum recorded force is the attractive force at that distance. Now repeat this with various thicknesses of cardboard between the two magnets. If the magnet slips and strikes the disc magnet with some force, the superglue joint will break, so practice bringing the magnet in slowly. By the time you get to zero sheets, you should be an expert! This will give you attractive force versus separation for these two dipoles. Make a graph below (you could use excel). NOTE: if your force sensor doesn’t report zero for zero force, it needs to be calibrated. Ask your TA.7 In class we found that the magnetic field on the axis of a current loop was ! µoI2R2x2+ R2( )3 / 2 where R is the radius of the current loop, and x the distance from center. Ask your TA to help you measure the magnetic field at the surface of the disc with the gaussmeter. Taking this position to be x=0, calculate the equivalent current I required to produce this field if it were a current loop of the same radius as the disc magnet. Is the distance dependence of the above formula enough to explain your force measurements? What determines the attractive force between the dipole magnets. Answer this question qualitatively.8 6. Lorentz force on moving charged particles. In this section of the lab you use the huge apparatus that has been taking up most of your lab table. It is a system in which you can launch an electron beam and measure the effect of an applied magnetic field on the path of the electron beam. This effect is the Lorentz force, ! r F B= qr v "r B The magnetic field is
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