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Phy 232
Your 'the rc circuit' report has been received. Scroll down through the document to see any comments I might have inserted, and my final comment at the end.
** The RC Circuit_labelMessages **
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Measure capacitor voltage vs. t when you discharge the capacitor through the resistor
In the preceding experiment you discharged a capacitor through a bulb, and from your graphs of current vs. clock time and voltage vs. clock time you concluded that the resistance of the bulb varies very significantly with the current.
In this experiment you will measure a similar system, but will use resistors rather than a bulb. You will confirm that the resistor has a very nearly constant resistance, in contrast with the bulb.
If your kit doesn't contain a resistor, you should have noted this when you checked the contents of the kit and requested a set of resistors. However, if you do not have a resistor, you may substitute a bulb (different from the one you used previously).
You should determine the resistance of the resistor. Each resistor has a series of colored rings; the colors tell you the resistance.
To determine the resistance:
• Note the color of the first ring and write down the corresponding digit, according to the table given below.
• Write down the the digit corresponding to the color of the second ring.
• Your two digits give you a two-digit number.
• Raise 10 to the power of the number corresponding to the third ring.
• Multiply the decimal number by the power of 10 and you have the resistance.
Black Brown Red Orange Yellow Green Blue Violet Gray White
0 1 2 3 4 5 6 7 8 9
For example the resistor shown above has a blue first ring, corresponding to the number 6. It has a red second ring, corresponding to the number 2. These two digits give you the decimal number 62. The third ring is red, indicating digit 2, so raise 10 to the power 2 and multiply by your two-digit number to get 62 * 10^2 = 62 * 100 = 6200.
To find out more search for 'reading resistors' and look for a page with a color picture of the rings around the resistor, accompanied by an explanation. There are hundreds of good sites and a search will quickly lead you to some good ones.
To begin the experiment, you will charge the capacitor to 4.00 volts +- .02 volts, then set up a series circuit consisting of the capacitor and a resistor whose resistance is between 25 ohms and 150 ohms. The voltmeter should be connected in parallel with the capacitor.
• Use the TIMER program to record the clock times at which the voltage reaches 3.5 volts, 3.0 volts, 2.5 volts, 2.0 volts, 1.5 volts, 1.0 volt, .75 volt, .50 volt and .25 volt.
Give your initial voltage and the resistance in the first line; then starting in the second line give your voltage vs. clock time table, with one clock time and one voltage per line, in comma-delimited format. Starting in the line following your table give a short synopsis of what your results mean and how they were obtained.
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3.99, 40
3.5, .987
3.0, 2.213
2.5, 3.890
2.0, 4.987
1.5, 7.067
1.0, 9.297
.75, 11.651
.50, 14.030
.25, 17.899
These voltages were given as a target point to record the time at that point. I kept an eye on the multimeter and the TIMER program and clicked the button every time the voltage reached its mark and after the voltage went all the way down to zero, I recorded all of the times in the table above, in the second column.
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Sketch a good graph of voltage vs. clock time, and sketch the curve you think best represents the voltage of the system vs. clock time.
Using your graph, estimate as closely as you can:
• The time required for the voltage to fall from 4 volts to 2 volts.
• The time required for the voltage to fall from 3 volts to 1.5 volts.
• The time required for the voltage to fall from 2 volts to 1 volt.
• The time required for the voltage to fall from 1 volts to .5 volts.
Give your estimated times, one time per line. Starting in the first line after your table, describe your graph and explain how you used it to determine these times.
****
4.987
4.854
4.310
4.733
The graph of voltage vs. time is best described as an exponential function. As time in seconds approaches infinity, the voltage approaches zero. I looked at my graph, and given the voltage values, I took the recorded time at the initial voltage and took the recorded time at the final voltage and found the difference in time between the sets of two given intervals.
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Measure current vs. t when you discharge the capacitor through the resistor
You have observed and graphed the voltage across the capacitor as a function of time.
Now repeat the same procedure, but this time measure the current. In the process be sure to verify that the capacitor is in fact at 4.00 volts +- .02 volts.
• Remember to be very sure the meter is connected in series rather than in parallel. The safest way to do this is to first put the meter in series with the bulb, the capacitor and an open switch, set to read volts, then close the switch and watch for a few seconds to be sure the reading on the meter doesn't change. If you don't have a switch, you can simply unclip one of the leads leading to capacitor, bulb and meter in order to simulate an open switch, then connect it to simulate a closed switch.
• The reason this works is that the voltmeter has a very high resistance and will not permit significant current to flow. However if the meter is in parallel with the bulb and capacitor, the capacitor will discharge, resulting in a change of voltage.
• If the voltmeter shows unchanging voltage, then it's probably safe to open the switch, then turn the dial to the 200 mA setting.
• The ammeter has a very low resistance and if connected in parallel, a very large current will flow, with the potential to damage the meter.
After setting up the circuit go ahead and close the switch (or connect the lead) and observe current at a function of clock time, then give your table of current vs. clock time in the box below, using the same conventions you used above in reporting voltage vs. clock time. Starting in the following line give a short synopsis of what your results mean and how they were obtained.
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100, 0
87.5, 1.156
75, 2.485
62.5, 4.079
50, 5.112
37.5, 7.310
25, 9.567
18.75, 11.908
12.5, 14.767
6.25, 19.502
The currents located in the left column were obtained through recording them as time passed. The currents above are measured in mA. The time located in the right column corresponds to how long it took to reach the corresponding current to its left. Ohm’s Law states that current is equal to voltage divided by resistance.
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Sketch a good graph of current vs. clock time, and sketch the curve you think best represents the voltage of the system vs. clock time.
Using your graph, estimate as closely as you can:
• The time required for the current to fall from the initial current to half the initial current.
• The time required for the current to fall from 75% of the initial current to half of this value.
• The time required for the current to fall from half the initial current to half of this value.
• The time required for the current to fall from 1/4 the initial current to half of this value.
Give your estimated times, one time per line. Starting in the first line after your table, describe your graph, explain what the graph represents and explain how you used it to determine these times.
****
5.112
7.082
4.455
5.200
The graph has some resemblance to that of the voltage versus times graph. As we can see from the data, as the time values increase, the current values decrease. This means that the graph is somewhat exponential with a negative slope, starting high and then ending up around 0 for the current values. The current is located on the y axis while the time is located on the x axis.
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Within experimental uncertainty, are the times you reported above the same? Are they the same as the times you reports for voltages to drop from 4 v to 2 v, 3 v to 1.5 v, etc? Is there any pattern here?
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The times listed for the current versus time and voltage versus time are very similar. The times follow a close pattern indicates that they have similar behaviors. They seem to have somewhat of a proportional relationship however because of experimental uncertainties and human error, the times are slightly off of the real times values. These values are still relatively close though.
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Determine voltage vs. current; conclude resistance vs. current for resistor
Using your graph of current vs. clock time determine the clock times at which the current is .8, .6, .4, .2 and .1 times the initial current.
• Then using the graph of voltage vs. clock time determine the voltage at each of these clock times.
• Using voltage and current at each clock time, determine the resistance at each clock time.
Report a table of voltage, current and resistance vs. clock time, giving in each line in comma-delimited format a clock time, the corresponding voltage and current, and the resistance. Starting in the first line following the table, explain how you obtained your values.
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3.2 V, 80 mA, 40 ohms, 1.75 s
2.4 V, 60 mA, 40 ohms, 3.80 s
1.6 V, 40 mA, 40 ohms, 6.95 s
.80 V, 20 mA, 40 ohms, 11.23 s
.40 V, 10 mA, 40 ohms, 17.18 s
I first took the percent of the total current that was asked for, .8 then .6 etc. Then found the corresponding time at that given current. Next, I found the voltage in a close proportion to that of the current. After finding current and voltage, I was able to find the resistance using Ohm’s Law. Each percentage of the current is listed in a row above, with voltage, current, resistance, and time.
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Sketch a graph of resistance vs. current. Fit the best possible straight line to your graph. Give in the first line the slope and vertical intercept of your graph. In the second line give the units of your slope and vertical intercept. In the third line give the equation of your straight line, using R for resistance and I for current. Beginning in the fourth line describe your graph, explain what you think it means and explain how you got the slope, the vertical intercept and the equation of the line.
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0, 40
Ohms/mA, mA
Y = 0x + 40
This graph, explained by its equation, is a horizontal line with a slope of zero. This is because the y axis contains the resistance value, which is constant throughout the experiment. This shows that while the current increases, the resistance is constant in this scenario.
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Repeat for the 'other' resistor
Repeat all the above measurements for the 100 ohm resistor (assuming you started with the 33-ohm resistor; if you started with the 100-ohm resistor, then use the 33-ohm resistor here).
Give in the first line the resistance in the first line.
In the second line give the time required for current or voltage to fall to half its original value. Give in the form t +- `dt, where t is the single time you think you best answers the questions and `dt is the uncertainty in the time. In the third line explain how you determined t and `dt.
In the fourth line give your equation of R vs. I for this resistor.
Starting in the fourth line, in any order you deem appropriate to the needs of the reader, report your procedure, data, analysis and interpretation of results:
****
100
2.45 +- .2
Due to Ohm’s Law, we see that when resistance increases, the voltage increases. This shows us a relationship for a constant current. Since the resistance is now higher, the voltage decreases at a faster rate making the time that it reaches half of its original value faster than previous times.
Y = .25x + 0
The data was calculated in the same manner as the data above. Once you find the resistance from the current and voltage, you can plot a resistance versus current graph and find the slope of the line of best fit.
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Charge capacitor through bulb then use 'square wave' pattern until voltage reaches 0
Set up a circuit using the 'switch', the 6.3 volt .25 amp bulb, and the capacitor, in series with the generator. Put the voltmeter in parallel with the capacitor. Set the 'beeps' program to 1.5 beeps per second.
• Discharge the capacitor and close the switch.
• Crank the generator at this rate for 100 'beeps'. Keep an eye on the voltmeter and the bulb.
• Immediately reverse the generator for 5 'beeps'; don't miss a beat. Keep an eye on the voltmeter and the bulb.
• Again, immediately reverse the generator for 5 'beeps'. Keep an eye on the voltmeter and the bulb.
• Continue reversing the generator every 5 'beeps' until you first register a negative voltage.
Report in the first line about how many times you had to reverse the cranking before you first saw a negative voltage. You probably won't remember the exact number; just give your best estimate. In the second line report whether you think your estimate was accurate, and if not how close you think you probably were. Starting in the third line describe the behavior of the bulb, your best explanation for this behavior, your impressions of how the capacitor voltage changed with time, and how you think the brightness of the bulb was affected by the direction of cranking and the voltage across the capacitor.
****
16 beeps
I feel like my estimate was relatively close but not 100% accurate. I believe that the true number of beeps lies within a few of the number I gave, whether up or down. However, I believe that was estimate is fair enough to results in solid data.
When I reversed the direction of cranking, the bulb got brighter. By doing this, I must have increased the current in the circuit, causing for an increase in voltage and an increase in power. This increase in power leads to the bulb lighting up brighter.
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When the voltage was changing most quickly, was the bulb at it brightest, at its dimmest, or somewhere in between? What do you think is the relationship between the brightness of the bulb and the rate at which capacitor voltage changes, and what might be the reason for this relationship?
****
The voltage seemed to change the fastest when the bulb was at its brightest. The higher the voltage drop across the circuit, the brighter the bulb is going to burn. This is because the voltage moving results in a great change in current and in power, resulting in an increase in the brightness of the bulb to make it brighter.
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Charge capacitor through resistor then use 'square wave' pattern until voltage reaches 0
Now set up the circuit using the 'switch', 33 ohm resistor, and the capacitor, in series with the generator. Put the voltmeter in parallel with the capacitor. The circuit will be the same as before but with the resistor in place of the bulb.
Using the 'beeps' program, you will do the following. Read through the complete set of instructions before you begin:
• Set the 'beeps' program to beep at the rate which will generate 4 volts. If you aren't sure what rate is required, hook up the meter and the generator and find out.
• Multiply the resistance in ohms by the capacitance in Farads (the capacitance is marked on the capacitor; it is probably either 1 Farad or .47 Farad). This will give you a quantity called the 'time constant'. Its units are seconds.
• Figure out, to the nearest whole number, how many beeps there are in a time equal to double the time constant, and also in a time equal to 1/4 of a time constant.
For example if your time constant was 25 seconds then double the time constant would be 50 second, a quarter of the time constant would be 6.25 seconds. If your beeping rate is 2.5 cranks per second, then you would need 2.5 * 50 = 125 cranks to get double the time constant, and 2.5 * 6.25 = 16 cranks, approximately, for 1/4 of a time constant.
• Discharge the capacitor and close the switch.
• Crank the generator at this rate for a time equal to double the time constant, and keep an eye on the voltmeter. Just count cranks, according to your calculation above.
• As soon as you get to this count, reverse the crank and crank for 1/4 of a time constant (e.g., 16 cranks using the above calculation). Keep an eye on the voltmeter.
• Immediately reverse the cranking and continue for another 1/4 of a time constant.
• Continue the process, reversing the cranking every 1/4 of a time constant.
• Continue the process until the voltage first becomes negative.
Report in the first line about how many times you had to reverse the cranking before you first saw a negative voltage. You might not remember the exact number; just give your best estimate. In the second line report whether you think your estimate was accurate, and if not how close you think you probably were. Starting in the third line describe what you did here and give your impressions of how the capacitor voltage changed with time.
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12
I believe that my estimate of the number of cranks is accurate because I paid close attention and supported my number through multiple trials. I was consistent in my cranking and believe that I have a fairly accurate number in 12.
When I cranked the generator in the reverse direction, the voltage dropped very quickly. However as the total voltage became lower, the voltage didn’t drop at as quickly of a rate. The capacitor voltage became less and less over time.
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Charge capacitor through resistor then reverse until voltage reaches 0:
You will repeat the preceding, except you will only reverse the cranking once:
• Discharge the capacitor and close the switch.
• Crank for 100 'beeps', then reverse. Keep an eye on how quickly or slowly the voltage changes. Note the voltage at the instant you reverse the cranking, and try to remember it.
• Count the 'beeps' in reverse, until the voltage reaches 0. Keep an eye on how quickly the voltage changes.
• Sketch the graph you think best represents voltage vs. clock time for the duration of this trial. Label the clock times at which you first reverse the system, and at which the system first reaches 0.
Report in the first comma-delimited line how many 'beeps', and how many seconds, were required to return to 0 voltage after you reversed the cranking'. In the second line report whether the voltage was changing more quickly as you approached the 'peak' voltage or as you approached 0 voltage. In the third line report your 'peak' voltage, the voltage at the instant you reversed the cranking.
****
24, 12
Voltage seemed to drop more near peak voltage, but the difference didn’t seem to be that great.
4.86 V
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What voltage is produced by your generator at 1.5 cranks per second? If you aren't sure, hook the generator up to the voltmeter and find out.
****
3.3 V
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When charging the initially uncharged capacitor the voltage should be given by the function
• V(t) = V_source * (1 - e^(-t / (RC) ) ).
where R and C are the resistance and capacitance. If R is in ohms and C in farads, RC is in seconds.
V_source is the voltage of the source, which you reported in the preceding box.
What is the value of t / (R C), where t is the t at which you reversed voltage? Write down this number.
Plug into the expression e^(-t / (RC) ) the values of R, C and the clock time t at which you reversed voltage, and write down the result.
Note on evaluating the exponential function: e^x would be evaluated using the value of x and the e^x button on your calculator. Alternatively it can be evaluated using most spreadsheets by entering into the cell the expression = exp(x), where x is a number. In the case of this expression, x would be the value of - t / (R C).
What then is the value of 1 - e^(-t / (RC))? Write down this number.
What therefore is the value of V_source * ( 1 - e^(-t / (RC) ) )? Write down this number.
Report the four numbers you have written down, in order, in comma-delimited format in the first line below. Starting in the second line explain how you evaluated your results.
****
2, 0.135, 0.865, 2.85
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The final value reported above, that of V(t) = V_source * (1 - e^(- t / (RC) ), should theoretically be equal to the voltage you observed at the time of reversal. However the resistor you used is accurate only to within +-2%, and the meter isn't completely accurate either.
If necessary in order to get an accurate result, you may repeat the charging process, first discharging the capacitor then charging through 100 'beeps'. If you obtained an accurate reading before, you may use that reading.
Report in the first line your reported value of V(t) = V_source * (1 - e^(- t / (RC) ) and of the voltage observed after 100 'cranks'. In the second line give the difference between your observations and the value of V(t) as a percent of the value of V(t):
****
2.85, 4.86
171% or 58.6%
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According to the function V(t) = V_source * (1 - e^(- t / (RC) ), what should be the voltages after 25, 50 and 75 'beeps'?
****
2.2, 2.94, 3.18
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Now, when you reverse the voltage the function becomes
• V1(t) = V_previous + V1_0 * (1 - e^(- t / (RC) ),
where V_previous is the voltage at the instant of reversal, V1_0 = reversed voltage - V_previous and t is the time since the instant of reversal.
After the first reversal what is the reversed voltage? Write this quantity down. (e.g., if the generator voltage was +2.5 volts, the reversed voltage would be -2.5 volts)
What are the values of V_previous and V1_0? Write these quantities down.
How long after the reversal did the voltage reach 0? This is the value of t. Write it down.
What do you get when you use these values to find V1(t)?
Report the four numbers you have written down in the first line, in comma-delimited format. Report the value of V1(t) in the second line. Starting in the third line explain how you did your calculations, and what the result means.
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-3.3, 2.85, 0.45, 10
1.24
I think that the voltage at t = 10 should be 0. So V1_0 * (1 - e^(- t / (RC) ) should equal -V_previous.
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When its voltage is V the charge on the capacitor is Q = C * V. A Farad is a Coulomb per volt: Farad = Coulomb / Volt.
How many Coulombs does your capacitor store at 4 volts? Explain how you got your result.
****
4 C
The capacitance of my capacitor is 1 F, so 4V*1F would equal 4C.
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The negative charge on the capacitor is repelled by other negative charges and attracted by positive charges. The capacitor keeps the negative and positive charges separate. The positive charges are in contact with one of the posts, the negative charges with the other.
If you connect a lead between the two posts, the negative charge carriers (the electrons) in the wire are repelled from the negative post and attracted to the positive post, so that electrons migrate from the negative to the positive. As electrons flow from the wire onto the positive 'plate' of the capacitor, they are replaced by electrons from the negative 'plate'. This continues until both the positive and negative charges on the capacitor are neutralized. If only a lead is connected, there is no significant resistance to the flow of current and the exchange takes place quickly. The capacitor in your kit actually releases its charge very slowly compared to the capacitors used in most applications.
If a circuit containing resistance is connected across the posts of the capacitor, then the flow of current is slowed and it takes longer for the exchange to occur. This is the case for the circuits you have observed.
As the charge on the capacitor decreases, its voltage decreases.
How many Coulombs does the capacitor contain at 3.5 volts? How many Coulombs does it therefore lose between 4 volts and 3.5 volts? Reply with two numbers, delimited by commas, in the first line, an explanation starting in the second.
****
3.5 C, 0.5 C
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According to your data, how long did it take for this to occur when the flow was through a 33-ohm resistor? On the average how many Coulombs therefore flowed per second as the capacitor discharged from 4 V to 3.5 V? Reply with two numbers, delimited by commas, in the first line, an explanation starting in the second.
****
1.21, 413 mA
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You have graphs of voltage vs. clock time and current vs. clock time, and current vs. voltage. According to your data, what was the average current during the time the voltage dropped from 4 V to 3.5 V? Answer in the first line. In the second line, state how this compares with the result you reported in the previous box, how you think it should compare and why:
****
210 mA
The current I recorded is almost half the value of the current previously calculated.
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*#&!
&#Your work on this lab exercise looks very good. Let me know if you have any questions. &#