cse63146
Feb26-08, 07:06 PM
1. The problem statement, all variables and given/known data
Your task is to calculate the resistance of a simple cylindrical resistor with wires connected to the ends, such as the carbon composition resistors that are used on electronic circuit boards. Imagine that the resistor is made by squirting material whose conductivity is \sigma into a cylindrical mold with length L and cross-sectional area A. Assume that this material satisfies Ohm's law. (It should if the resistor is operated within its power dissipation limits.)
What is the resistance R of this resistor?
Express the resistance in terms of variables given in the introduction. Do not use V or I in your answer.
http://session.masteringphysics.com/problemAsset/1006843/18/35941.jpg
2. Relevant equations
J=\SigmaE
V=EL
I=JA
R = V/I
3. The attempt at a solution
I start out with Ohm's Law and get resistence R to be R = V/I and I know V = EL and I = JA so I get resistence R to be R = EL/JA. I also know J = \SigmaE. So I get resistence R to be R = EL/\SigmaEA
Would the two E's cancel out?
Your task is to calculate the resistance of a simple cylindrical resistor with wires connected to the ends, such as the carbon composition resistors that are used on electronic circuit boards. Imagine that the resistor is made by squirting material whose conductivity is \sigma into a cylindrical mold with length L and cross-sectional area A. Assume that this material satisfies Ohm's law. (It should if the resistor is operated within its power dissipation limits.)
What is the resistance R of this resistor?
Express the resistance in terms of variables given in the introduction. Do not use V or I in your answer.
http://session.masteringphysics.com/problemAsset/1006843/18/35941.jpg
2. Relevant equations
J=\SigmaE
V=EL
I=JA
R = V/I
3. The attempt at a solution
I start out with Ohm's Law and get resistence R to be R = V/I and I know V = EL and I = JA so I get resistence R to be R = EL/JA. I also know J = \SigmaE. So I get resistence R to be R = EL/\SigmaEA
Would the two E's cancel out?