course mth163 end programѾ›|¡Ì†òË„ïFÒ„Äß‚¤…˜€•¡Üº
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16:15:23 `q001. Note that this assignment has 10 questions Recall that the graph of y = x^2 + 3 was identical to the graph of y = x^2, except that it was raised 3 units. This function is of the form y = x^2 + c. In the case of this specific function, c = 3. What function would this form give us for c = -1? How would the graph of this function compare with the graph of y = x^2?
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RESPONSE --> y= x^2-1 The - 1 indicates that the graph will be lowered a whole unit and will have -1 difference from the graph of x^2 + 3 confidence assessment: 3
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16:17:16 If c = -1 the form y = x^2 + c gives us y = x^2 - 1. Every value on a table of this function would be 1 less than the corresponding value on a table of y = x^2, and the graph of y = x^2 - 1 will lie 1 unit lower at each point then the graph of y = x^2.
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RESPONSE --> I understand how the graph would be adjusted. self critique assessment: 3
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16:36:06 `q002. Suppose that we wish to graph the functions y = x^2 + c for c = -3, then for c = -2, then for c = -1, then for c = 0, then for c = 1, then for c = 2, then for c = 3. If all these functions were plotted on the same set of coordinate axes, what would the final graph look like? It is suggested that you actually sketch your graph and describe your sketch.
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RESPONSE --> The new graph is one unit higher than the new one, and it is also bigger. confidence assessment: 2
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16:39:01 The graph of the c= -3 function y = x^2 - 3 will lie 3 units lower than the graph of y = x^2. The graph of the c= -2 function y = x^2 - 2 will lie 22222 units lower than the graph of y = x^2. The progression should be obvious. The graph of the c= 3 function y = x^2 + 3 will lie 3 units higher than the graph of y = x^2. The final graph will therefore show a series of 7 functions, with the lowest three units below the parabolic graph of y = x^2 and the highest three units above the graph of this function. Each graph will lie one unit higher than its predecessor.
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RESPONSE --> I thought it was harder to describe the new graph. It was very similar to the old graph, but it was much longer. self critique assessment: 2
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16:42:03 `q003. The function y = (x -1)^3 is of the form y = (x -k)^3 with k = 1. What function would this form give us for k = 3? How would the graph of this function compare with that of y = x^3?
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RESPONSE --> y=(x-3)^3 k=3 This graph is placed to the right three spaces when compared to y=x^3 confidence assessment: 3
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16:44:28 Recall how the graph of y = (x-1)^3 lies one unit to the right of the graph of y = x^3. The k = 3 function y = (x -3)^3 will lie 3 units to the right of the graph of y = x^3.
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RESPONSE --> I simply plugged k=3 into the equation and sketched a rough graph. This graph was easier for me to draw and compare. self critique assessment: 3
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16:50:42 `q004. Suppose we wish to graph the functions y = (x -k)^3 for k values 2, then 3, then 4. If we graph all these functions on the same set of coordinate axes, what will the graph look like? It is suggested that you actually sketch your graph and describe your sketch.
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RESPONSE --> y=(x-2)^3 2 to the right y=(x-3)^3 3 to the right y=(x-4)^3 4 to the right Compared to y=x^3 from previous problems these graphs are farther right, but they all look the same. confidence assessment: 3
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16:52:17 The k = 2 graph will lie 2 units to the right of the graph of y = x^3, and the k = 4 graph will lie 4 units to the right. The three graphs will all have the same shape as the y = x^3 graph, but will lie 2, 3 and 4 units to the right.
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RESPONSE --> I understand the comparison of all these graphs to y=x^3 self critique assessment: 3
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16:57:23 `q005. The function y = 3 * 2^x is of the form y = A * 2^x for A = 3. What function would this form give us for A = 2? How would the graph of this function compare with that of y = 2^x?
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RESPONSE --> y= 2*2^ x y=2^ x y=2*2^ x is twice as far from the x axis as y=2^ x confidence assessment: 2
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17:00:10 As we saw earlier, the graph of y = 3 * 2^x lies 3 times as far from the x-axis as a graph of y = 2^x and is at every point three times as steep. We would therefore expect the A = 2 function y = 2 * 2^x to lie 2 times is far from the x-axis as the graph of y = 2^x.
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RESPONSE --> It was easy to make the comparison using previous graphs. self critique assessment: 3
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17:03:09 `q006. Suppose we wish to graph the functions y = A * 2^x for values A ranging from 2 to 5. If we graph all such functions on the same set of coordinate axes, what will the final graph look like? It is suggested that you actually sketch your graph and describe your sketch.
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RESPONSE --> y=2*2^x twice as far from the x axis y=3*2^x three times as far from the x axis y=4*2^x four times as far from the x axis y=5*2^x five times as far from the x axis confidence assessment: 3
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17:06:16 These graphs will range from 2 times as far to 5 times as far from the x-axis as the graph of y = 2^x, and will be from 2 to 5 times as steep. The y intercepts of these graphs will be (0,2), (0, 3), (0, 4), (0,5).
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RESPONSE --> I did not record the y intercepts but they are very close on my graph. I understand y= A*2^x and its graph. self critique assessment: 3
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17:11:36 `q007. What is the slope of a straight line connecting the points (3, 8) and (9, 12)?
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RESPONSE --> slope= rise/run rise= 12-8=4 run=9-3=6 4/6 which reduces to 2/3 confidence assessment: 3
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17:14:03 The rise between the points is from y = 8 to y = 12. This is a rise of 12-8 = 4. The run between these points is from x = 3 to x = 9, a run of 9 - 3 = 6. The slope between these points is therefore rise/run = 4/6 = 2/3, with decimal equivalent .6666....
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RESPONSE --> Rise/Run is a very familiar to me. self critique assessment: 3
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17:18:11 `q008. What are the coordinates of the t = 5 and t = 9 points on the graph of y = 2 t^2 + 3? What is the slope of the straight line between these points?
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RESPONSE --> y=2*5^2+3 = 53 y=2*9^2+3 = 165 rise 165- 53= 112 run 9-5= 4 112/4= 28 confidence assessment: 3
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17:20:46 The t = 5 value is y = 2 * 5^2 + 3 = 2 * 25 + 3 = 50 + 3 = 53. The t = 9 value is similarly calculated. We obtain y = 165. The rise between these points is therefore 165-53 = 112. The run is from t = 5 to t = 9, a run of 9 - 5 = 4. This slope of a straight line connecting these points is therefore rise/run = 112/4 = 28.
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RESPONSE --> Again, rise/run is an easy concept for me to grasp. self critique assessment: 3
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17:23:54 `q009. Suppose y = 2 t^2 + 3 represents the depth, in cm, of water in a container at clock time t, in seconds. At what average rate does the depth of water change between t = 5 seconds and t = 9 seconds?
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RESPONSE --> y=2*5^2+3= 53 cm y=2*9^2+3= 165 cm 165cm=53cm= 112 cm 112/4=28cm/s confidence assessment: 3
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17:24:35 The t = 5 second and t = 9 second depths are easily calculated to be y = 53 cm and y = 165 cm. The depth therefore changes from 53 cm to 165 cm, a change of 165 cm - 53 cm = 112 cm, in the 4 seconds between the to clock times. The average rate of depth changes therefore 112 cm/(4 seconds) = 28 cm/second. We note that this calculation is identical to the calculation of the slope of the straight line connecting the t = 5 and t = 9 points of the graph y = 2 t^2 + 3.
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RESPONSE --> This was a sinple rise over run for slope. self critique assessment: 3
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17:26:00 `q010. If we have a graph of depth y vs. clock time t, then how to we know that the slope of a straight line connecting two points of the graph represents the average rate at which depth changes over the corresponding time interval?
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RESPONSE --> rise= depth run= time depth/ time= slope of graph changes confidence assessment: 3
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17:26:54 The rise of the graph represents the change in the depth y and the run represents the change clock time t. The slope, which is rise/run, therefore represents change in depth/change in clock time, which is the average rate at which the depth changes.
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RESPONSE --> I plugged depth and time into slope formula to make the connection that this equals slope change. self critique assessment: 3
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