Modeling an object falling with air resistance
Purpose
Determining the relationship between air resistance force and speed. modeling the fall of an object including air resistance. Put on the data into logger pro and calculate the terminal velocity of your various coffee filters.
Procedure
We need to repair 5 coffee filters and a one meter stick. We also need a computer which have video capture and logger pro. We have to practice a few times to be able to use the program, plotting the point once you have the video of falling object. By using 1 meter stick and scaling the blue point on the vertical component, we are ready for the experiment.
We still use the approach that the above handout suggests, but we will do this in the Design Technology building and to use video capture. One student will hold the coffee filter and drop them from the balcony. Another student will be ready to take the video from the stairs on the North side of the building across the balcony by using the logger pro. Student will drop 1 coffee filter for the first time and record the video. For the next time, student will drop 2 coffee filter at the same time. Make sure the the first coffee filter is always at the bottom each time. Next time will be 3,4, and 5. student need to record every single drop and save it into computer.
When we had all 5 video captures, we returned to our class room and worked and the graph. We opened the video capture by using the logger pro. We need to scale the yellow line straight vertical and horizontal component to make sure all the data will be accurate. By plotting all the blue point into on the video capture, we got the position of the coffee filter closer and closer to the ground. After that we put all the values into the position vs. time graph (Fig.2). We did linear fit for the graph and chose the some good values to calculate the slope of the graph (Fig.3).
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| Fig.2 Position vs. Time graph of falling object |
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| Fig.3 Do linear fit and calculate the slope |
We had to do all 5 video captures and figure out 5 slopes. These slope will be the values of k. After we get all the slopes, they are velocity of the coffee filters while falling down each time.
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| Fig.4 Graphing and finding the slope |
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| Fig.5 Graphing and finding the slope |
After we get all the velocity value, we put them into a new graph which is velocity vs. force. Then we did power fit for the graph and we got a curve line F=AV^B (A is the constant, V^B is velocity m/s of the falling object raise to some power). If all the points stay close to the point, it means our experiment is good (Fig.6).
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| Fig.6 Power fit of the falling object |
Next, we measured the mass of all 5 coffee filters and divide by 5, so we get the mass of single coffee filter. We did the calculation on the white board as shown in Fig.7 finding the force of air resistance. F=mg (m is the mass of the object, g is the gravity 9.8 m/s^2).
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| Fig.7 calculate the Force of air resistance |
Then, we did the excel for testing all the values that we have, we use it to make predictions compare predictions with our reality (Fig.7). First, we plot in the values for k, n, m, g, and delta t as the value in (Fig.8). In this table, k is the value of A, n is the value of B (F=AV^B in Fig.7), m is the mass of coffee filter from every dropping, g is the gravity, and delta t is the changing time of the falling object. For column A in excel, we plot the value into t A9=A8+$B$5$ (t is the time interval), delta t is equal 0.01 . For column B, a is acceleration of the falling object. We plot the value into column B for B8 is 9.8 and we have F net= mg - kv^n = ma => a = g-((k/m)v^n). We plot in the value of a = g-((k/m)v^n) into B9 (Fig.11). We plot the value into column C for C9= A8*delta t. We plot the value into column D for D9=V1 + delta V (Fig.13). For column E, we plot the value into E9= (delta V)/2 (Fig.14). For column F, we plot the value into F9=X1 + delta X.
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| Fig.8 Excel of falling object |
After putting all the values into the table, we calculated columns in excel for v and x as functions of time, determine what our model predicts for the terminal velocity of the various coffee filters. If our model is good based on the measurements, then the model should spit out values for terminal velocity that are a good match to our experiment data.
In the Fig.9, we can see that when time t=2.16s the delta velocity is almost equal 0 and delta x stays constant 1.824. We can compare to the value of the slope (v=m/s) in Fig.7 which is also equal to 1.82. Both values are very closed to each other, that means our experiment is good.
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Fig.9
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Error
There were some several mistakes while we were doing the experiment. First, the videos which we were recorded not working very well because they were leaned to one side. As we put into the logger pro, we tried to fix the vertical components, but not very well done. Next, while doing calculated for some value, we rounded up some numbers. It made the results not very accurately.
Conclusion
We have an experiment and expectation that air resistance force on a particular object depends on the object's speed, its shape, and the material it is moving through. We learned how to set up an experiment and working as a group to figure out the result based on modeling lab of falling object. We learned how to use excel as a program to predict our experiment.
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