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course Phy 121
9/15 8:19 amTried 4 times to submit lab via lab form. As you suggested, I'm sending it via another form.
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The simple device used in this experiment can serve as an accurate timing device when the 'beats' of the pendulum are synchronized with two events separated by a consistent time interval. Observations of this system are consistent with the observed and theoretically predicted behavior of pendulums. Most students report that the experiment takes around an hour, with a range from 30 minutes to 2 hours, and in a few cases longer.
The Pearl Pendulum as shown below a bead (sometimes called a 'pearl', as the bead used in the original version was a fake plastic pearl) on a string, attached to bolt glued to the top of a metal bracket, using a magnet to 'clamp' the string (in most current versions of the apparatus the bolt glued to the top of the bracket, which proved to be unhelpful, is not included).
You will need to construct the pendulum using the small bead and thin copper wire packed in your lab materials package. In the Spring 2010 version the bead and the wire were taped to the bracket, or packed in a separate bag with another small object.
The wire is formed into a loop with the two ends protruding, and threaded through the bead.
The ends are pulled through forming a small loop at the top.
The protruding ends are twisted together then flattened against the bottom of the bead.
The above pictures were actually of a steel ball and a thicker wire. The bead and wire you have in your kit look something like this:
When suspended from the pendulum bracket by a thread the system might look something like the picture below. If the pendulum is pulled back and released, it will bounce back to the bracket, rebound, and repeat its motion a number of times.
However note that in this picture the bracket is resting on end with the bolt glued to it; the bracket is not vertical.
The pearl appears to hanging in its equilibrium position, with a little space between it and the bracket.
As you will soon see, if the bead is just barely touching the bracket when it hangs at its equilibrium position, the rhythm of the bouncing pendulum will remain constant.
The bead is referred to below as the 'pearl'.
When the pearl is released it swings back to the bracket, bounces off the swings back again, repeatedly striking the bracket. The magnet can be used to clamp the thread so the length of the pendulum remains constant.
If you have just a plain bracket then you simply tilt the bracket in order to achieve a constant rhythm, as described below.
You should set the system up and allow the pearl to bounce off the bracket a few times. The bracket should be stationary; the pendulum is simply pulled back and released to bounce against the bracket.
Note whether the pearl strikes the bracket more and more frequently or less and less frequently with each bounce. If the pearl does not bounce off the bracket several times after being released, it might be because the copper wire below the pearl is getting in the way. If necessary you can clip some of the excess wire (being careful to leave enough to keep the bead from falling through).
If the bracket is tilted back a bit, as shown in the next figure below, the pearl will naturally rest against the bracket. Tilt the bracket back a little bit and, keeping the bracket stationary, release the pendulum.
Listen to the rhythm of the sounds made by the ball striking the bracket.
Do the sounds get closer together or further apart, or does the rhythm remain steady? I.e., does the rhythm get faster or slower, or does it remain constant?
Repeat a few times if necessary until you are sure of your answer.
Insert your answer into the space below, and give a good description of what you heard.
Your response (start in the next line):
I heard the pearl bounce of the bracket about 17 times. At first it seemed like the rhythm was constant, but then it was definitely getting faster until right before it stopped it was so much faster that it was difficult to tell one strike from the next.
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If the bracket is tilted forward a bit, as shown in the figure below, the pearl will naturally hang away from the bracket. Tilt the bracket forward a little bit (not as much as shown in the figure, but enough that the pearl definitely hangs away from the bracket). Keep the bracket stationary and release the pendulum. Note whether the pearl strikes the bracket more and more frequently or less and less frequently with each bounce.
Again listen to the rhythm of the sounds made by the ball striking the bracket.
Do the sounds get closer together or further apart, or does the rhythm remain steady? I.e., does the rhythm get faster or slower, or does it remain constant?
Repeat a few times if necessary until you are sure of your answer.
Insert your answer into the box below, and give a good description of what you heard.
Your response (start in the next line):
I would say the rhythm was steady here. Steadier than the last trial. Estimating the steadiness of a rhythm is difficult for me. I could never have been a drummer, for sure. I wasn’t much of a musician or dancer in my youth - I just never had any natural sense of rhythm
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Of course if we want to be precise about the rhythm we'll measure it rather than listen to it. There's a lot of variation in the ability of people to perceive a constant rhythm.
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If the bracket is placed on a perfectly level surface, the pearl will hang straight down, just barely touching the bracket. However most surfaces on which you might place the bracket aren't perfectly level. Place the bracket on a smooth surface and if necessary tilt it a bit by placing a shim (for a shim you could for example use a thin coin, though on most surfaces you wouldn't need anything this thick; for a thinner shim you could use a tightly folded piece of paper) beneath one end or the other, adjusting the position and/or the thickness of the shim until the hanging pearl just barely touches the bracket. Pull the pearl back then release it.
If the rhythm of the pearl bouncing off the bracket speeds up or slows down, adjust the level of the bracket, either tilting it a bit forward or a bit backward, until the rhythm becomes steady.
Describe the process you used to make the rhythm steady, and describe just how steady the rhythm was, and how many times the pendulum hit the bracket..
Your response (start in the next line):
I used pennies as shims to tilt the bracket forward so that the pearl was in equilibrium but not touching the bracket. I adjusted the number of pennies by removing them one at a time so that the pearl just barely touched the bracket (ie with one more penny it would not be touching the bracket)
The rhythm seemed steady to the best of my ability to judge. The pendulum hit the bracket about 23 times.
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On a reasonably level surface, place one domino under each of the top left and right corners of your closed textbook, with the front cover upward. Place the bracket pendulum on the middle of the book, with the base of the bracket parallel to one of the sides of the book. Release the pendulum and observe whether the sounds get further apart or closer together. Note the orientation of the bracket and whether the sounds get further apart or closer together.
Now rotate the base of the bracket 45 degrees counterclockwise and repeat, being sure to note the orientation of the bracket and the progression of the sounds.
Rotate another 45 degrees and repeat.
Continue until you have rotated the bracket back to its original position.
Report your results in such a way that another student could read them and duplicate your experiment exactly. Try to report neither more nor less information than necessary to accomplish this goal. Use a new line to report the results of each new rotation.
Your response (start in the next line):
The first position was with the bracket oriented towards the top of the book. This seemed to give a fairly steady rhythm
The second position was achieved by turning the bracket 45 degrees counterclockwise so it is pointing to the upper right left hand corner of the book. This rhythm seemed to be getting faster but I don’t have much confidence in my ability to distinguish.
The third position was achieved by turning the bracket 45 degrees counterclockwise so that the pearl was hovering above the spine of the book. This time the rhythm was definitely increasing.
The fourth position was achieved by turning the bracket 45 degrees counterclockwise so that it is pointing to the lower left hand corner of the book. The rhythm here was increasing.
The fifth position was achieved by turning the bracket 45 degrees counterclockwise so that it is pointing to the bottom of the book. The rhythm here was increasing.
The sixth position was achieved by turning the bracket 45 degrees counterclockwise so that it is pointing to the lower right hand corner of the book. The rhythm here seemed to be increasing.
The seventh position was achieved by turning the bracket 45 degrees counterclockwise so that it is pointing away from the spine of the book. The rhythm here seemed to be increasing, but I am not confident that is the case.
The eighth seventh position was achieved by turning the bracket 45 degrees counterclockwise so that it is pointing to the upper right hand corner of the book. The rhythm seemed to be fairly steady here.
I alternated several trials between position 1 and position 8 to see if I could tell which was steadier, but I really could not distinguish the difference.
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Describe how you would orient the bracket to obtain the most regular 'beat' of the pendulum.
Your response (start in the next line):
I will go with position 1 - having the bracket orient toward the top of the book. I had a difficult time distinguishing between position 1 and 8, so I’ll pick position 1 out of a gut feeling.
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Orient the bracket in this position and start the TIMER program. Adjust the pendulum to the maximum length at which it will still bounce regularly.
Practice the following procedure for a few minutes:
Pull the pendulum back, ready to release it, and place your finger on the button of your mouse. Have the mouse cursor over the Click to Time Event button. Concentrate on releasing the pendulum at the same instant you click the mouse, and release both. Do this until you are sure you are consistently releasing the pendulum and clicking the mouse at the same time.
Now you will repeat the same procedure, but you will time both the instant of release and the instant at which the pendulum 'hits' the bracket the second time. The order of events will be:
click and release the pendulum simultaneously
the pendulum will strike the bracket but you won't click
the pendulum will strike the bracket a second time and you will click at the same instant
We don't attempt to time the first 'hit', which occurs too soon after release for most people to time it accurately.
Practice until you can release the pendulum with one mouse click, then click again at the same instant as the second strike of the pendulum.
When you think you can conduct an accurate timing, initialize the timer and do it for real. Do a series of 8 trials, and record the 8 time intervals below, one interval to each line. You may round the time intervals to the nearest .001 second.
Starting in the 9th line, briefly describe what your numbers mean and how they were obtained.
Your response (start in the next line):
.563 s
.543 s
.563 s
.641 s
.547 s
.516 s
.547 s
.672 s
The numbers represent the time in seconds from the instant the pearl was released until the pearl hit the bracket the second time. To obtain these results I held the pearl pendulum away from the bracket and released the pearl at the same time I clicked the timer. I counted the hits against the bracket and on the second hit I clicked the timer again. I waited several seconds between trials so that the intervals for the pendulum would clearly stand out (since they were less than 1 second each)
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Finally, you will repeat once more, but you will time every second 'hit' until the pendulum stops swinging. That is, you will release, time the second 'hit', then time the fourth, the sixth, etc..
Practice until you think you are timing the events accurately, then do four trials.
Report your time intervals for each trial on a separate line, with commas between the intervals. For example look at the format shown below:
.925, .887, .938, .911
.925, .879, .941
etc.
In the example just given, the second trial only observed 3 intervals, while the first observed 4. This is possible. Just report what happens in the space below. Then on a new line give a brief description of what your results mean and how they were obtained.
Your response (start in the next line):
.578, .621, .734, .750
.668, .671, .734
.641, .699, .797, .750
.578, .652, .766, .859
The results are the intervals in seconds between the release of the pendulum and the second, fourth, sixth, and (in 3 out of the 4 trials) eighth hit. Results were obtained by pulling back the pendulum and releasing it at the instant I clicked the timer. I counted the hits and clicked the timer on all the even numbered hits.
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Now measure the length of the pendulum. (For the two-pearl system the length is measured from the bottom of the 'fixed' pearl (the one glued to the top of the bracket) to the middle of the 'swinging' pearl. For the system which uses a bolt and magnet at the top instead of the pearl, you would measure from the bottom of the bolt to the center of the pearl). Using a ruler marked in centimeters, you should be able to find this length to within the nearest millimeter.
What is the length of the pendulum?
Your response (start in the next line):
12.7 cm
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If you have timed these events accurately, you will see clearly that the time from release to the second 'hit' appears to be different than the time between the second 'hit' and the fourth 'hit'.
On the average,
how much time elapses between release and the second 'hit' of the pendulum,
how much time elapses between the second and fourth 'hit' and
how much time elapses between the fourth and sixth 'hit'?
Report your results as three numbers separated by commas, e.g.,
.63, .97, .94
Your response (start in the next line):
.62, .66, .76
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A full cycle of a free pendulum is from extreme point to equilibrium to opposite extreme point then back to equilibrium and finally back to the original extreme point (or almost to the original extreme point, since the pendulum is losing energy as it swings)..
The pearl pendulum is released from an 'extreme point' and strikes the bracket at its equilibrium point, so it doesn't get to the opposite extreme point.
It an interval consists of motion from extreme point to equilibrium, or from equilibrium to extreme point, how many intervals occur between release and the first 'hit'?
Your response (start in the next line):
One
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How many intervals, as the word was described above, occur between the first 'hit' and the second 'hit'? Explain how your description differs from that of the motion between release and the first 'hit'.
Your response (start in the next line):
Two
Between release and first hit there is one interval because the pendulum is traveling from extreme to equilibrium one time only.
Between the first and second hit, the pendulum is traveling from equilibrium to the extreme and back to equilibrium, which is two intervals.
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How many intervals occur between release and the second 'hit', and how does this differ from the motion between the second 'hit' and the fourth 'hit'?
Your response (start in the next line):
Between the release and second hit there are three intervals ( Extreme to equilibrium is one, equlibrium back to extreme is two and extreme to equilibrium is three)
For the intervals between second and fourth hit we count four intervals. (Equilibrium to extreme is one, extreme to equilibrium is two, equilibrium to extreme is three and extreme to equilibrium is four)
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How many intervals occur between the second 'hit' and the fourth 'hit', and how does this differ from a similar description of the motion between the fourth 'hit' and the sixth 'hit'?
Your response (start in the next line):
Second hit to fourth hit is four intervals. Fourth hit to sixth hit is also four intervals. It follows the same process - Equilibrium to extreme is one, extreme to equilibrium is two, equilibrium to extreme is three and extreme to equilibrium is four.
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Why would we expect that the time interval between release to 2d 'hit' should be shorter than the subsequent timed intervals (2d to 4th, 4th to 6th, etc.)?
Your response (start in the next line):
The time interval should be shorter between the release and second hit because it is a shorter distance for the pendulum to travel.
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Would we expect additional subsequent time intervals to increase, decrease or stay the same?
Your response (start in the next line):
Based on my averages, we would expect time intervals to increase, but that is not consistent with what I would naturally expect or with what I thought I heard in the “hits” I think the numbers are more likely than not based on my limited coordination with the mouse and the my limited ear for rhythm.
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What evidence does this experiment provide for or against the hypothesis that the length of a pendulum's swing depends only on its length, and is independent of how far it actually swings?
Your response (start in the next line):
I don’t think we’ve provided any evidence for or against that hypothesis. Other than one measurement of the length of the pendulum, we haven’t measured the length of any of the swings. We also haven’t used length as a variable anywhere in the experiment.
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Your instructor is trying to gauge the typical time spent by students on these experiments. Please answer the following question as accurately as you can, understanding that your answer will be used only for the stated purpose and has no bearing on your grades:
Approximately how long did it take you to complete this experiment?
Your response (start in the next line):
2 hours.
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Copyright © 1999 [OrganizationName]. All rights reserved.
Revised: 08/06/12
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Very good.
The uncertainty in timing is closely related to the ability to distinguish rhythm. Some students get distinguishable results and some do not.
We could of course do this experiment with a lot of accuracy, for example by devising a pendulum release mechanism that makes noise at the instant of release, and use an audio program to detect the sounds of the release and the 'hits'.
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