Nikola Tesla: Difference between revisions
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The following equation for the magnitude of a rotational magnetic field produced by a wire is as follows: | The following equation for the magnitude of a rotational magnetic field produced by a wire is as follows: | ||
<math>B_{wire}=\frac{\mu _{0}{I}}{2\pi R}</math> | <math>B_{wire}=\frac{\mu _{0}{I}}{2\pi R}</math> | ||
This is a very important concept in this course. It follows the right hand rule, just like many other concepts do. If you point the thumb of your right hand in the direction of current flowing through the wire, your fingers will curl in the direction of magnetic field. The field strength is given by the above equation, dependent on distance from the wire and amount of current running through the wire. | This is the general equation for the magnetic field around an infinitely long wire, or more simply, where R <<< L. It is the sum of the magnetic fields caused by the tiny segments of current if you were to chop up the wire into little pieces, integrated down the entire length of the wire. | ||
This is a very important concept in this course. It follows the right hand rule, just like many other concepts do. If you point the thumb of your right hand in the direction of current flowing through the wire, your fingers will curl in the direction of magnetic field. The field strength is given by the above equation, dependent on distance from the wire and amount of current running through the wire. For more information about the Magnetic Field equation, see the page [http://physicsbook.gatech.edu/Magnetic_Field Magnetic Field] and its special case subcategories | |||
We can see from this equation that the units simplify to: <math>kg*s^{-2}*A^{-1}</math>. This is equivalent to the unit Tesla, given by <math>T</math>. | We can see from this equation that the units simplify to: <math>kg*s^{-2}*A^{-1}</math>. This is equivalent to the unit Tesla, given by <math>T</math>. | ||
Revision as of 20:06, 5 December 2015
Nikola Tesla was the physicist who "Lit the World." He is most famous for his work in alternating current power production, although in PHYS 2112, he will be known for his solution to the rotational magnetic field. His last name was dedicated to the SI unit for Magnetic Field Strength, or Magnetic Flux Density. He is patented for his alternating electric current generator, which utilizes coils of current to magnetically induce an alternating current.
The Main Idea
Tesla's AC generator is a successful application of his rotational magnetic field discovery. His invention can be seen in the picture to the right; the coils of current act out of phase from each other to create an alternation in current that can be repeated many thousands of times per second. Furthermore, AC current could travel long distances with high amounts of voltage, unlike Thomas Edison's Direct Current solution. He recognized that these benefits of alternating current would be more effective for power production than Edison's direct current system. The two men were in competition with each other until he demonstrated the abilities of alternating current at the 1893 Chicago World Columbian Exposition. The culminating achievement of Tesla's AC power generation was a hydroelectric power plant installed at Niagara Falls in 1895.
Important Equations
The following equation for the magnitude of a rotational magnetic field produced by a wire is as follows:
[math]\displaystyle{ B_{wire}=\frac{\mu _{0}{I}}{2\pi R} }[/math]
This is the general equation for the magnetic field around an infinitely long wire, or more simply, where R <<< L. It is the sum of the magnetic fields caused by the tiny segments of current if you were to chop up the wire into little pieces, integrated down the entire length of the wire.
This is a very important concept in this course. It follows the right hand rule, just like many other concepts do. If you point the thumb of your right hand in the direction of current flowing through the wire, your fingers will curl in the direction of magnetic field. The field strength is given by the above equation, dependent on distance from the wire and amount of current running through the wire. For more information about the Magnetic Field equation, see the page Magnetic Field and its special case subcategories
We can see from this equation that the units simplify to: [math]\displaystyle{ kg*s^{-2}*A^{-1} }[/math]. This is equivalent to the unit Tesla, given by [math]\displaystyle{ T }[/math].
Visualization
While it is not necessary to know how Tesla's AC generator works, it is a really neat application of rotational magnetic fields. File:Nikoatesla.gif]
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