Magnetic induction with Cobra3 LEP Related Topics Maxwell s equations, electrical eddy field, magnetic field of coils, coil, magnetic flux, induced voltage. Principle A magnetic field of variable frequency and varying strength is produced in a long coil. The voltages induced across thin coils which are pushed into the long coil are determined as a function of frequency, number of turns, diameter and field strength. Equipment Field coil, 750 mm, 485 turns/m 11001.00 1 Induction coil, 300 turns, d = 40 mm 11006.01 1 Induction coil, 300 turns, d = 32 mm 11006.02 1 Induction coil, 300 turns, d = 25 mm 11006.03 1 Induction coil, 200 turns, d = 40 mm 11006.04 1 Induction coil, 100 turns, d = 40 mm 11006.05 1 Induction coil, 150 turns, d = 25 mm 11006.06 1 Induction coil, 75 turns,d = 25 mm 11006.07 1 Connecting cord, l = 750 mm, red 07362.01 2 Connecting cord, l = 750 mm, blue 07362.04 1 Connecting cord, l = 2000 mm, blue 07365.04 1 Cobra3 Basic Unit 12150.00 1 Power supply, 12 V 12151.99 2 RS 232 data cable 14602.00 1 PowerGraph Software 14525.61 1 Cobra3 Function generator module 12111.00 1 PC, Windows 95 or higher Tasks Determination of the induction voltage as a function 1. of the strength of the magnetic field, 2. of the frequency of the magnetic field, 3. of the number of turns of the induction coil, 4. of the cross-section of the induction coil. Set-up and Procedure Set up the equipment as seen in Fig.1. The field generating coil is connected to the function generator module and the induction coils to be put into the field generating coil are connected to "Analog In 2 / S2", best to the two yellow sockets (+ and - ) and not to ground. Connect the Cobra3 Basic Unit to the computer port COM1, COM2 or to USB port (for USB computer port use USB to RS232 Converter 14602.10) and start the "measure" program. Select "Gauge" > "PowerGraph" and on the now visible "Setup" chart click the function generator symbol. Use the function generator in the constant current mode the produced field strength depending on the current strength is of interest and not the voltage that is needed to produce it. Fig. 1: Experimental set-up PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH & Co. KG D-37070 Göttingen 24402 1
LEP Magnetic induction with Cobra3 First use the function generator to produce a current ramp at a fixed frequency. Set the parameters as seen on Fig. 2. Then click the "Analog In 2 / S2" symbol and set the module to "Burst measurement" as seen in Fig. 3. The "Settings" and "Display" charts of PowerGraph should look like Fig. 4 and Fig. 5. Fig. 4: The "Settings" chart of PowerGraph for amplitude ramp Fig. 2: Function generator module settings for the amplitude ramp Fig. 5: "Displays" chart of PowerGraph Fig. 3 Take a measurement for each of the induction coils. Start measuring with the "Continue" button. (If you plan to make a logarithmic plot, correct the resulting curves by subtracting the value at zero current I from all values using "Analysis" > "Channel modification " with "U2" as "Source channel". The zero offset is due to digital noise and voltage induced from stray fields and may be regarded as constant during one measurement but may change slightly from measurement to measurement due to different arrangements of your cables. The offset deforms the logarithmic plot strongly but does not matter in a normal plot.) Note down the slope of the curve evaluated with the "Regression" tool of "measure" (in the linear plot). 2 24402 PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH & Co. KG D-37070 Göttingen
Magnetic induction with Cobra3 LEP Then set the function generator on the "Setup" chart of PowerGraph to tune the frequency from 100 to 1000 Hz with constant current strength, i.e. constant magnetic field amplitude. See Fig. 6 for suitable settings. The "Settings" chart of PowerGraph should look like Fig. 7. Again take a measurement of each of the induction coils. (The correction of the zero offset may be done using the "Regression" tool of "measure": Subtract the value delivered by the "Regression" function as zero offset from the "U2" data using again "Analysis" > "Channel modification ".) Note down the slope values for further evaluation. Theory and evaluation For the first part with the constant frequency the obtained data may look like Fig. 8 if put into one single diagram with "Measurement" > "Assume channel " and scaled to the same value with "Scale curves". Fig. 8 : Voltage response of the different coils vs. current in the field generating coil for fixed frequency of 800 Hz Use the function "Regression" of "measure" to evaluate the slopes of the recorded measurement data yielding the response voltage of the induction coils per current strength in the field coil in V/A. Plot the response voltage per ma for induction coils with the same diameter but different number of turns vs. the number of turns and plot the response voltage per ma for induction coils with the same number of turns but different diameters vs. the cross-section area corresponding to the diameter. Use "Measurement" > "Enter data manually " to do so. Fig. 9 and Fig. 10 show possible results. Fig. 6 Module settings for frequency ramp Fig. 7: "Settings" chart for frequency ramp Fig. 9: Voltage response vs. number of turns at constant cross-section area PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH & Co. KG D-37070 Göttingen 24402 3
LEP Magnetic induction with Cobra3 For the comparison of the experimental data with theory two quantities must be determined in relation to the experimental parameters: 1. The inducted voltage in the induction coil in dependence of the number of turns and the cross sectional area of the induction coil and for a given field. 2. The magnetic field generated by the field coil in dependence of the length and the number of turns of the field coil and in dependence of the current flowing through the field coil. The generated magnetic field by the field coil is the given field for the induction coil in this experiment. Both relations follows from Maxwell s laws and the experimental conditions. Fig. 10: Voltage response vs. cross-section area with constant number of turns Fig. 11 shows the voltage response of the induction coil in dependency of the frequency of the field. With the data of Fig. 11 an analogous evaluation is possible. Induction coil: According to Maxwell's second law is the induced electric potential by a changing magnetic flux (t) the voltage U along a closed line C with U C E S d s S d dt 1t2 A B S da S (1) (2) A S is the area enclosed by the line C. Inside the long field coil the magnetic field (given field for the induction coil) is spatial homogenous and only the amount of the field can change in time. Furthermore the cross sectional area A S of the induction coil is in a plane perpendicular to B. Relation (2) can therefore be written as (t) = B (t) A. (3) Inserting (3) in (1) and taking into account that the induction coil consists out of n parallel conductor loops yields Fig. 11: Voltage response vs. frequency U1t2 n A db dt. (4) Fig. 12: Bilogarithmic plot induced voltage vs. field producing current Fig. 13: Bilogarithmic plot induced voltage vs. field frequency 4 24402 PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH & Co. KG D-37070 Göttingen
Magnetic induction with Cobra3 LEP Field coil: Maxwell s first law together with Maxwell s fourth law S B da S =0 A and results in m 0 A B S d s S j S da S I A j S da S B1t2 m 0 m l I1t2 for the magnetic field generated by the field coil. m 0 = 1.26 10-6 Vs/ is the magnetic field constant, m is the number of turns and l the lengths of the field coil. The current that flows through the field coil is denoted by I(t). Finally combination of the result for the induction coil (4), the result for the field coil (5) and I(t) = I 0 sin (vt) yields U1t2 m 0 na m l I 0 cos 1vt2 or for the effective values U eff m 0 v na m l I eff. (5) (6) (7) The figures 8 to 11 display these proportionalities. The linear dependencies can be proved with help of bilogarithmic plots. For the dependencies of the induced voltage on the frequency and amount of the current through the field coil this is shown in Fig. 12 and 13. From equation (7) follows m 0 for the magnetic field constant. With v 2 pf 5027 Hz, m, l 485 1 m yields Fig. 9 U I eff n 1 v 1 A 1 n for the area 1320 mm 2 = 0.001320 m 2 the slope 4.142 mv/(a n), thus m 0 = 1.29 10-6 and for the area 531 mm 2 = 0.000531 m 2 the slope 1.704 mv/(a n), thus m 0 = 1.32 10-6 and Fig. 10 yields for 300 turns the slope 0.941 mv/(mm 2 A), thus m 0 = 1.29 10-6 Vs Vs Vs These values fit quite well with the literature value of m 0 = 1.29 10-6 Vs for the magnetic field constant. So the voltage U eff on the induction coils should be proportional to the number of turns n of the induction coil the cross-sectional area A of the induction coil the number of turns m of the field coil the length l of the field coil the frequency v of the current through the field coil the amount I I eff I of the current through the field coil. PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH 37070 Göttingen, Germany 24402 5
LEP Magnetic induction with Cobra3 6 24402 PHYWE series of publications Laboratory Experiments Physics PHYWE SYSTEME GMBH 37070 Göttingen, Germany