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| 184_notes:r_energy [2017/10/05 19:33] – dmcpadden | 184_notes:r_energy [2021/06/14 23:41] (current) – schram45 | ||
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| Sections 18.3, 18.8-18.10, and 19.4 in Matter and Interactions (4th edition) | Sections 18.3, 18.8-18.10, and 19.4 in Matter and Interactions (4th edition) | ||
| - | ===== Resistors | + | / |
| - | To this point, we have talked about what happens inside a wire when connected to two ends of battery - both in the steady state current situation and in the initial transient when the circuit is first connected. We found a few important conclusions about the circuit in steady state: | + | |
| - | * The electron current going into a location must be the same as the current leaving that location because charge is conserved. | + | |
| - | * The electron current moves through the wire because there is a constant electric field inside the wire. This electric field comes primarily from the surface charges along the wire. | + | |
| - | * The distribution of surface charges varies along the wire - from highly positive near the positive end of the battery to zero in the middle of the circuit to highly negative near the negative end of the battery. This gradient in the surface charge density causes the electric field inside the wires. | + | |
| - | These notes will apply what we learned about the electric field, current, and surface charges to what we call a resistor | + | |
| + | [[184_notes: | ||
| - | {{youtube> | + | ===== Energy around the Circuit ===== |
| - | ==== A Thin Resistor | + | One of the consequences |
| - | {{184_notes: | + | |
| - | + | ||
| - | We'll start with a similar circuit as last week - a battery connected by a wire; however, in the middle | + | |
| - | + | ||
| - | ==== Conservation of Charge in Circuits ==== | + | |
| - | {{ 184_notes: | + | |
| - | === Before steady state === | + | |
| - | + | ||
| - | Just after the circuit is connected, //__before the steady state current is established__//, | + | |
| - | + | ||
| - | === In steady state === | + | |
| - | + | ||
| - | Once a //__steady state current is reached__//, | + | |
| - | + | ||
| - | Using [[184_notes:current|the current relationships]], we can show that the electric field and therefore drift speed must be larger inside the resistor to maintain the same current. | + | |
| - | $$i_{thin}=i_{thick}$$ | + | |
| - | $$n A_{thin} u E_{thin}= n A_{thick} u E_{thick}$$ | + | |
| - | Since the thin and thick wires are made of the same materials, the electron density and electron mobility is the same, which leaves: | + | |
| - | $$E_{thin}=\frac{A_{thick}}{A_{thin}}E_{thick}$$ | + | |
| - | + | ||
| - | {{184_notes: | + | |
| - | + | ||
| - | Since $A_{thick}> | + | |
| - | + | ||
| - | As noted above, a thin wire resistor is only one kind of resistor. You could also have a resistor in a circuit made out of a different material, but still the same size as the thick wires. Or both a different size and a different material. Resistors come in a wide variety of shapes, sizes, and materials. In these cases, the electron density and electron mobility of the materials matter much more to current analysis in the circuit. | + | |
| - | + | ||
| - | ==== Energy around the Circuit ==== | + | |
| {{youtube> | {{youtube> | ||
| - | One of the consequences of adding a resistor in the circuit (with higher electron speed and a higher electric field) is that a large energy transfer occurs across the resistor. In thin wire resistors (sometimes referred to as filaments), this effect is particularly visible. The amount of energy transferred to a filament is sufficient to heat the thin wire to the point where it produces heat and light. This is actually how [[https:// | + | Let's continue to look at the simple circuit that we were using in the video above (a mechanical battery, wires, and a thin filament). To analyze the energy in our circuit, we can refer back to [[184_notes: |
| - | + | ||
| - | Let's continue to look at the simple circuit that we were using above (a mechanical battery, wires, and a thin filament). To analyze the energy in our circuit, we can refer back to the [[184_notes: | + | |
| $$\Delta E_{sys}=0$$ | $$\Delta E_{sys}=0$$ | ||
| If we breakdown what is in our system, this means that | If we breakdown what is in our system, this means that | ||
| Line 49: | Line 16: | ||
| From this statement of energy conservation, | From this statement of energy conservation, | ||
| - | === Energy per unit charge: Electric Potential === | + | ==== Energy per unit charge: Electric Potential |
| We could also consider what is happening to the energy of a single electron as it makes a complete trip around the circuit. The energy gained by the electron as it is transported across the mechanical battery is dissipated by the collisions the electron has as it moves around the wire, particularly with the positive nuclei in the wire. While this is certainly true, it becomes cumbersome to think about every single electron that is moving around the circuit. Instead, we will often think about energy in circuits in terms of the energy per charge that is moving around the circuit. [[184_notes: | We could also consider what is happening to the energy of a single electron as it makes a complete trip around the circuit. The energy gained by the electron as it is transported across the mechanical battery is dissipated by the collisions the electron has as it moves around the wire, particularly with the positive nuclei in the wire. While this is certainly true, it becomes cumbersome to think about every single electron that is moving around the circuit. Instead, we will often think about energy in circuits in terms of the energy per charge that is moving around the circuit. [[184_notes: | ||
| - | This means we can rewrite our energy conservation statement in terms of the energy per charge instead. This is called **The Loop Rule** or sometimes Kirchhoff' | + | This means we can rewrite our energy conservation statement in terms of the energy per charge instead. This is called **//The Loop Rule//** or sometimes Kirchhoff' |
| $$\Delta V_1+\Delta V_2+\Delta V_3+...=0$$ | $$\Delta V_1+\Delta V_2+\Delta V_3+...=0$$ | ||
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| Another way to talk about energy in circuits is to look at how much energy (aka, heat or light) is used up per second by a lightbulb or more generally by a resistor (in contrast to voltage which is energy per charge). When you are talking about the change in energy per change in time, this is called **power**: | Another way to talk about energy in circuits is to look at how much energy (aka, heat or light) is used up per second by a lightbulb or more generally by a resistor (in contrast to voltage which is energy per charge). When you are talking about the change in energy per change in time, this is called **power**: | ||
| $$P=\frac{\Delta U}{\Delta t}=\frac{dU}{dt}$$ | $$P=\frac{\Delta U}{\Delta t}=\frac{dU}{dt}$$ | ||
| - | Power is a scalar quantity that has units of watts or joules per second ($W=\frac{J}{s}$). For reference, a typical lightbulb in your house is a 60 W lightbulb. On the other hand, a large power plant that produces electricity for a city generally produces $1-5$ MW $=1-5 \cdot 10^6$W. In circuits, it is fairly easy to calculate the power if you know the potential difference across a circuit element and the current that passes through that element. To get power, you multiply current times the potential difference since current has units of amps or coulombs per second, and electric potential has units of volts. $$\frac{C}{s}*V=\frac{J}{s}$$ since a volt*coulomb is a joule, we get units of energy per second, which is what we want. In other words, | + | Power is a scalar quantity that has **units of watts or joules per second** ($W=\frac{J}{s}$). For reference, a typical lightbulb in your house is a 60 W lightbulb. On the other hand, a large power plant that produces electricity for a city generally produces $1-5$ MW $=1-5 \cdot 10^6$W. In circuits, it is fairly easy to calculate the power if you know the potential difference across a circuit element and the current that passes through that element. To get power, you multiply current times the potential difference since current has units of amps or coulombs per second, and electric potential has units of volts. $$\frac{C}{s}*V=\frac{J}{s}$$ since a volt*coulomb is a joule, we get units of energy per second, which is what we want. In other words, |
| $$P=I\Delta V$$ | $$P=I\Delta V$$ | ||
| Note we are using conventional current here, not the electron current. | Note we are using conventional current here, not the electron current. | ||
| ==== Examples ==== | ==== Examples ==== | ||
| - | [[: | + | * [[: |
| + | * Example Video: Changing the Dimensions of a Wire | ||
| + | {{youtube> | ||