open qa 22

#$&*

course Mth 271

002. `Query 2

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Question: `qWhat were temperature and time for the first, third and fifth data points (express as temp vs clock time ordered pairs)?

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Your solution:

I am using simulated data for the flow experiments and have depth vs. time data data:

(5.3, 63.7)

(15.9, 46)

(26.5, 32)

confidence rating #$&*: 3

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Given Solution:

`a Continue to the next question **

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Question: `qAccording to your graph what would be the temperatures at clock times 7, 19 and 31?

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Your solution:

I am confused. I don’t understand where these numbers are coming from. All the data and the actual experiment were concerning the FLOW experiment so I don’t know where the temperature is coming from.

confidence rating #$&*:

@& Something appears to be missing from the original Query document.

It appears that you're getting on track with subsequent problems, so don't worry about the temperature references.*@

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Given Solution:

`a Continue to the next question **

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Self-critique (if necessary):

I will continue using the data I have from the flow experiment using the simulated data. I hope it will show my understanding of the principles. The numbers themselves are irrelevant.

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Question: `qWhat three points did you use as a basis for your quadratic model (express as ordered pairs)?

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Your solution:

(5.3, 63.7)

(15.9, 46)

(26.5, 32)

confidence rating #$&*: 3

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Given Solution:

`a A good choice of points `spreads' the points out rather than using three adjacent points. For example choosing the t = 10, 20, 30 points would not be a good idea here since the resulting model will fit those points perfectly but by the time we get to t = 60 the fit will probably not be good. Using for example t = 10, 30 and 60 would spread the three points out more and the solution would be more likely to fit the data. The solution to this problem by a former student will be outlined in the remaining `answers'.

STUDENT SOLUTION (this student probably used a version different from the one you used; this solution is given here for comparison of the steps)

For my quadratic model, I used the three points

(10, 75)

(20, 60)

(60, 30). **

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Question: `qWhat is the first equation you got when you substituted into the form of a quadratic?

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Your solution:

28.09 a + 5.3b + c = 63.7

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The equation that I got from the first data point (10,75) was 100a + 10b +c = 75.**

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Question: `qWhat is the second equation you got when you substituted into the form of a quadratic?

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Your solution:

252.81a + 15.9b + c = 46

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The equation that I got from my second data point was 400a + 20b + c = 60 **

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Question: `qWhat is the third equation you got when you substituted into the form of a quadratic?

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Your solution:

702.25a + 26.5b + c = 32

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The equation that I got from my third data point was 3600a + 60b + c = 30. **

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Question: `qWhat multiple of which equation did you first add to what multiple of which other equation to eliminate c, and what is the first equation you got when you eliminated c?

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Your solution:

I multiplied the first equation by -1 and added it to the second equation and got :

224.72a + 10.6b = - 17.7

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: First, I subtracted the second equation from the third equation in order to eliminate c.

By doing this, I obtained my first new equation

3200a + 40b = -30. **

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Question: `qTo get the second equation what multiple of which equation did you add to what multiple of which other quation, and what is the resulting equation?

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Your solution:

To obtain the second equation I multiplied the first equation with -1 and added the first and the third equations and got:

674.16a + 21.2b = -31.7

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: This time, I subtracted the first equation from the third equation in order to again eliminate c.

I obtained my second new equation:

3500a + 50b = -45**

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Question: `qWhich variable did you eliminate from these two equations, and what was its value?

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Your solution:

I first eliminated b, to find the value of a. I multiplied the first equation by the coefficient of b from the second equation, and multiplied the second equation by negative b of the first and I got:

-2382.032a = -39.22

a = 0.016

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: In order to solve for a and b, I decided to eliminate b because of its smaller value. In order to do this, I multiplied the first new equation by -5

-5 ( 3200a + 40b = -30)

and multiplied the second new equation by 4

4 ( 3500a + 50b = -45)

making the values of -200 b and 200 b cancel one another out. The resulting equation is -2000 a = -310. **

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Question: `qWhat equation did you get when you substituted this value into one of the 2-variable equations, and what did you get for the other variable?

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Your solution:

To find b, I substituted the value of a into the firs of the two equations:

224.72 * 0.016 + 10.6 b= -17.7

3.59 + 10.6b = -17.7

10.6b = -17.7-3.59

10.6b = -21.29

b = -2

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: After eliminating b, I solved a to equal .015

a = .015

I then substituted this value into the equation

3200 (.015) + 40b = -30

and solved to find that b = -1.95. **

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Question: `qWhat is the value of c obtained from substituting into one of the original equations?

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Your solution:

28.09 * 0.016 + 5.3 * -2 + c = 63.7

0.44 – 10.6 +c = 67.3

-10.16 + c = 67.3

C = 67.3 + 10.16

C = 77.46

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: By substituting both a and b into the original equations, I found that c = 93 **

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Question: `qWhat is the resulting quadratic model?

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Your solution:

0.016 t^2 – 2t + 77.46 = depth

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: Therefore, the quadratic model that I obtained was

y = (.015) x^2 - (1.95)x + 93. **

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Question: `qWhat did your quadratic model give you for the first, second and third clock times on your table, and what were your deviations for these clock times?

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Your solution:

Depth = 0.016t^2 – 2t + 77.46

Was evaluated for t values: 5.3, 15.9 and 26.5

D1 = 67.3

Deviation = 0.4

D2 = 49.7

Deviation = 3.7

D3 = 35.7

Deviation = 3.7

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: This model y = (.015) x^2 - (1.95)x + 93 evaluated for clock times 0, 10 and 20 gave me these numbers:

First prediction: 93

Deviation: 2

Then, since I used the next two ordered pairs to make the model, I got back

}the exact numbers with no deviation. So. the next two were

Fourth prediction: 48

Deviation: 1

Fifth prediction: 39

Deviation: 2. **

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Question: `qWhat was your average deviation?

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Your solution:

(0.4 + 3.7 + 3.7) / 3 = 2.6

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: My average deviation was .6 **

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Question: `qIs there a pattern to your deviations?

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Your solution:

First deviation was small and the two others were exactly the same.

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: There was no obvious pattern to my deviations.

INSTRUCTOR NOTE: Common patterns include deviations that start positive, go negative in the middle then end up positive again at the end, and deviations that do the opposite, going from negative to positive to negative. **

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Question: `qHave you studied the steps in the modeling process as presented in Overview, the Flow Model, Summaries of the Modeling Process, and do you completely understand the process?

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Your solution:

I do understand the modeling process.

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: Yes, I do completely understand the process after studying these outlines and explanations. **

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Question: `qHave you memorized the steps of the modeling process, and are you gonna remember them forever? Convince me.

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Your solution:

I am pretty confident I understand all the steps at the moment, but I will have it saved in my computer for future reference… we do forget things after a while.

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: Yes, sir, I have memorized the steps of the modeling process at this point. I also printed out an outline of the steps in order to refresh my memory often, so that I will remember them forever!!!

INSTRUCTOR COMMENT: OK, I'm convinced. **

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Question: `qQuery Completion of Model first problem: Completion of model from your data.Give your data in the form of depth vs. clock time ordered pairs.

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Your solution:

Well I now see where my mistake was. I haven’t read this whole document. Since I have already done the first portion as if it was clock vs. depth it is redundant to repeat it. I am still confused about the experiment with temperature since I haven’t found information about it anywhere.

Hopefully, what I have done so far will suffice to show that I have understood the process.

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION: Here are my data which are from the simulated data provided on the website under randomized problems.

(5.3, 63.7)

(10.6. 54.8)

(15.9, 46)

(21.2, 37.7)

(26.5, 32)

(31.8, 26.6). **

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Self-critique (if necessary):

Sorry about misunderstanding. I hope that what I have done so far is enough to prove I do understand the process. Thank you.

@& Your work looks very good.*@

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Question: `qWhat three points on your graph did you use as a basis for your model?

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Your solution:

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: As the basis for my graph, I used

( 5.3, 63.7)

(15.9, 46)

(26.5, 32)**

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Question: `qGive the first of your three equations.

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The point (5.3, 63.7) gives me the equation 28.09a + 5.3b + c = 63.7 **

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Question: `qGive the second of your three equations.

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The point (15.9, 46) gives me the equation 252.81a +15.9b + c = 46 **

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Question: `qGive the third of your three equations.

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The point (26.5,32) gives me the equation 702.25a + 26.5b + c = 32. **

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Question: `qGive the first of the equations you got when you eliminated c.

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: Subtracting the second equation from the third gave me 449.44a + 10.6b = -14. **

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Question: `qGive the second of the equations you got when you eliminated c.

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Your solution:

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Given Solution:

`a ** STUDENT SOLUTION CONTINUED: Subtracting the first equation from the third gave me 674.16a + 21.2b = -31.7. **

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Question: `qExplain how you solved for one of the variables.

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: In order to solve for a, I eliminated b by multiplying the first equation by 21.2, which was the b value in the second equation. Then, I multiplied the seond equation by -10.6, which was the b value of the first equation, only I made it negative so they would cancel out. **

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Question: `qWhat values did you get for a and b?

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: a = .0165, b = -2 **

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Question: `qWhat did you then get for c?

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: c = 73.4 **

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Question: `qWhat is your function model?

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: y = (.0165)x^2 + (-2)x + 73.4. **

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Question: `qWhat is your depth prediction for the given clock time (give clock time also)?

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Your solution:

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The given clock time was 46 seconds, and my depth prediction was 16.314 cm.**

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Question: `qWhat clock time corresponds to the given depth (give depth also)?

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Your solution:

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Given Solution:

`a The specifics will depend on your model and the requested depth. For your model y = (.0165)x^2 + (-2)x + 73.4, if we wanted to find the clock time associated with depth 68 we would note that depth is y, so we would let y be 68 and solve the resulting equation:

68 = .01t^2 - 1.6t + 126

using the quadratic formula. There are two solutions, x = 55.5 and x = 104.5, approximately. **

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Question: `qCompletion of Model second problem: grade average Give your data in the form of grade vs. clock time ordered pairs.

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Your solution:

(0, 1)

(10, 1.77)

(20, 2.12)

(30, 2.4)

(40, 2.58)

(50, 2.77)

(60, 2.94)

(70, 3.09)

(80, 3.24)

(90, 3.37)

(100, 3.5)

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION: Grade vs. percent of assignments reviewed

(0, 1)

(10, 1.790569)

(20, 2.118034)

(30, 2.369306)

(40, 2.581139)

(50, 2.767767)

(60, 2.936492)

(70, 3.09165)

(80, 3.236068)

(90, 3.371708)

(100, 3.5). **

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Self-critique (if necessary):

I have rounded to two decimal places. Hopefully that is OK for the sake of practice.

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Question: `qWhat three points on your graph did you use as a basis for your model?

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Your solution:

(10, 1.79)

(50, 2.77)

(100, 3.5)

confidence rating #$&*:

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Given Solution:

`a STUDENT SOLUTION CONTINUED:

(20, 2.118034)

(50, 2.767767)

(100, 3.5)**

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Question: `qGive the first of your three equations.

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Your solution:

100a + 10b + c = 1.79

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 400a + 20b + c = 2.118034**

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Question: `qGive the second of your three equations.

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Your solution:

2500a + 50b + c = 2.77

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 2500a + 50b + c = 2.767767 **

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Question: `qGive the third of your three equations.

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Your solution:

10000a + 100b + c = 3.5

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 10,000a + 100b + c = 3.5 **

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Question: `qGive the first of the equations you got when you eliminated c.

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Your solution:

2400a + 40b = 0.98

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 7500a + 50b = .732233. **

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Question: `qGive the second of the equations you got when you eliminated c.

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Your solution:

9900a + 90b = 1.71

confidence rating #$&*: 3

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Given Solution:

`a STUDENT SOLUTION CONTINUED: Subracting the first equation from the third I go

9600a + 80b = 1.381966 **

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Question: `qExplain how you solved for one of the variables.

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Your solution:

Multiplied first. Eq. by -9 and 2nd one by 4 to get 360 and -360 b and eliminate b.

The resulting equation was:

18000a = 5.18

a = 0.0002

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Given Solution:

`a STUDENT SOLUTION CONTINUED: In order to solve for a, I eliminated the variable b. In order to do this, I multiplied the first new equation by 80 and the second new equation by -50. **

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Question: `qWhat values did you get for a and b?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

a = 0.0002

b = 39600 * 0.0002 + 360b = 14

7.92 + 360b = 14

360b = 6.08

b = 0.017

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED:

a = -.0000876638

b = .01727 **

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Self-critique (if necessary):

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Question: `qWhat did you then get for c?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

100 * 0.0002 + 10 * 0.017 + c = 1.79

c = 1.6

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: c = 1.773. **

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Self-critique (if necessary):

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Question: `qWhat is your function model?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

y = 0.0002x^2 + 0.017x + 1.6

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT ANSWER: y = (0) x^2 + (.01727)x + 1.773 **

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Self-critique (if necessary):

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Question: `qWhat is your percent-of-review prediction for the given range of grades (give grade range also)?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

We have to substitute the grade range for y and solve the quation.

If we let y = 4

0.0002x^2 + 0.017x + 1.6 = 4

0.0002x^2 + 0.017x – 2.4 = 0

And this can be solved using the quadratic equation:

X1 = -157

X2 = 72

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a The precise solution depends on the model desired average.

For example if the model is y = -.00028 x^2 + .06 x + .5 (your model will probably be different from this) and the grade average desired is 3.3 we would find the percent of review x corresponding to grade average y = 3.3 then we have

3.3 = -.00028 x^2 + .06 x + .5.

This equation is easily solved using the quadratic formula, remembering to put the equation into the required form a x^2 + b x + c = 0.

We get two solutions, x = 69 and x = 146. Our solutions are therefore 69% grade review, which is realistically within the 0 - 100% range, and 146%, which we might reject as being outside the range of possibility.

To get a range you would solve two equations, on each for the percent of review for the lower and higher ends of the range.

In many models the attempt to solve for a 4.0 average results in an expression which includes the square root of a negative number; this indicates that there is no real solution and that a 4.0 is not possible. **

STUDENT QUESTION

I did the quadratic formula but came up with negative numbers or errors??

INSTRUCTOR RESPONSE

The possibility of a negative under the square root is addressed in the last line of the given solution. A little more detail:

It's perfectly plausible that your quadratic function will 'peak' before reaching y = 4.0; perhaps even before reaching y = 3.0. (as you should know if you've had precaculus, and as you will see soon if you haven't, the graph of your quadratic function is a parabola opening downward, and its vertex might well lie below y = 4.0).

In that case the quadratic equation will tell you so by giving you a negative under the square root.

The interpretation would then be that 4.0 is not attainable, no matter how much you review. This would probably indicate a really tough school.

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Self-critique (if necessary):

I also got a negative solution, but I used 4.0, and after reviewing I understand why I got that solution.

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Question: `qWhat grade average corresponds to the given percent of review (give grade average also)?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

If I dismiss the negative solution, I will use 72% of review and plug it into the equation.

0.0002 * 72^2 + 0.017 * 72 + 1.6 = 3.86

confidence rating #$&*: 2

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a Here you plug in your percent of review for the variable. For example if your model is y = -.00028 x^2 + .06 x + .5 and the percent of review is 75, you plug in 75 for x and evaluate the result. The result gives you the grade average corresponding to the percent of review according to the model. **

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Self-critique (if necessary):

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Question: `qHow well does your model fit the data (support your answer)?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

I have calculated deviations for all 3 sets of values.

The average deviation is 0.99, so the conclusion is that the model fits the data well.

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a You should have evaluated your function at each given percent of review-i.e., at 0, 10, 20, 30, . 100 to get the predicted grade average for each. Comparing your results with the given grade averages shows whether your model fits the data. **

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Self-critique (if necessary):

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Question: `qillumination vs. distance

Give your data in the form of illumination vs. distance ordered pairs.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

(1, 935.1395)

(2, 264.4411)

(3,105.1209)

(4, 61.01488)

(5, 43.06238)

(6, 25.91537)

(7, 19.92772)

(8, 16.27232)

(9, 11.28082)

(10, 9.484465)

confidence rating #$&*:

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION: (1, 935.1395)

(2, 264..4411)

(3, 105.1209)

(4, 61.01488)

(5, 43.06238)

(6, 25.91537)

(7, 19.92772)

(8, 16.27232)

(9, 11.28082)

(10, 9.484465)**

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Self-critique (if necessary):

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Question: `qWhat three points on your graph did you use as a basis for your model?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

(1, 935.1395)

(5, 43.0624)

(10, 4845)

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED:

(2, 264.4411)

(4, 61.01488)

(8, 16.27232) **

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Self-critique (if necessary):

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Question: `qGive the first of your three equations.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

a + b + c = 935.1395

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 4a + 2b + c = 264.4411**

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Self-critique (if necessary):

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Question: `qGive the second of your three equations.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

25a + 5b + c = 43. 0624

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 16a + 4b + c = 61.01488**

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Self-critique (if necessary):

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Question: `qGive the third of your three equations.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

100a + 10b + c = 9.4845

confidence rating #$&*:

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 64a + 8b + c = 16.27232**

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Self-critique (if necessary):

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Question: `qGive the first of the equations you got when you eliminated c.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

24a +4b = -892.0771

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 48a + 4b = -44.74256**

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Self-critique (if necessary):

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Question: `qGive the second of the equations you got when you eliminated c.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

99a + 9b = -925.655

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: 60a + 6b = -248.16878**

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Self-critique (if necessary):

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Question: `qExplain how you solved for one of the variables.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

I multiplied the first equation by -6 and the second one by 4 and got and after adding them got:

252a = 1622.8426

a = 6.4398

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: I solved for a by eliminating the variable b. I multiplied the first new equation by 4 and the second new equation by -6 **

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Self-critique (if necessary):

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Question: `qWhat values did you get for a and b?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

a = 6.4398

b = -173.6883

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: a = 15.088, b = -192.24 **

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Self-critique (if necessary):

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Question: `qWhat did you then get for c?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

C = 755.0114

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: c = 588.5691**

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Self-critique (if necessary):

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Question: `qWhat is your function model?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

y = 6.4398x^2 + 173.6883x + 766.0114

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: y = (15.088) x^2 - (192.24)x + 588.5691 **

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Self-critique (if necessary):

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Question: `qWhat is your illumination prediction for the given distance (give distance also)?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

For the distance x = 20, illumination prediction is:

6.4398 * 20^2 + 173. 6883 * 20 + 755.0114 = 6804.6974

confidence rating #$&*: 3

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a STUDENT SOLUTION CONTINUED: The given distance was 1.6 Earth distances from the sun. My illumination prediction was 319.61 w/m^2, obtained by evaluating my function model for x = 1.6. **

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Self-critique (if necessary):

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Question: `qWhat distances correspond to the given illumination range (give illumination range also)?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

confidence rating #$&*:

@& The questions for this model are

Determine from your model what illumination would be expected at 1.6 Earth distances from the sun.

At what range of distances from the sun would the illumination be comfortable for reading, if reading comfort occurs in the range from 25 to 100 Watts per square meter?

Analyze how well your model fits the data and give your conclusion. The model might fit, and it might not. You determine whether it does or doesn't.

The present question is asking about the second question:

'At what range of distances from the sun would the illumination be comfortable for reading, if reading comfort occurs in the range from 25 to 100 Watts per square meter?'*@

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Given Solution:

`a The precise solution depends on the model and the range of averages.

For example if the model is y =9.4 r^2 - 139 r + 500 and the illumination range is 25 to 100 we would find the distance r corresponding to illumination y = 25, then the distance r corresponding to illumination y = 100, by solving the equations

25=9.4 r^2 - 139 r + 500

and

100 =9.4 r^2 - 139 r + 500

Both of these equations are easily solved using the quadratic formula, remembering to put both into the required form a r^2 + b r + c = 0. Both give two solutions, only one solution of each having and correspondence at all with the data.

The solutions which correspond to the data are

r = 3.9 when y = 100 and r = 5.4 when y = 25.

So when the distance x has range 50% - 69% if the illumination range is 25 to 100.

Note that a quadratic model does not fit this data well. Sometimes data is quadratic in nature, sometimes it is not. We will see as the course goes on how some situations are accurately modeled by quadratic functions, while others are more accurately modeled by exponential or power functions. **

STUDENT SOLUTION TO SIMILAR PROBLEM

When putting 25 and 100 into my function model, I got x = 8.1 and 8.4. so when the distance has an x range between 8.1 and 8.5 the illuminating range is 25 to 100.

INSTRUCTOR COMMENT

You don't show the equations you solved.

Each equation has two possible solutions, and your given results are consistent with solutions to the equation. 8.1 is a solution to the equation 25 = 40.0 x^2 -492 x + 1387 and 8.4 is a solution to 100 = 40.x^2 -492 x + 1387

However if we consider the data

(1, 935.1395)

(2, 264..4411)

(3, 105.1209)

(4, 61.01488)

(5, 43.06238)

(6, 25.91537)

(7, 19.92772)

(8, 16.27232)

(9, 11.28082)

(10, 9.484465)

the range from x = 8.1 to x = 8.4 occurs when the illumination is decreasing. Your illumination values are 25 at x = 8.1, and 100 at x = 8.4, which would indicate increasing illumination.

It's clear that you've done almost all of the right things. But you didn't consider both solutions to the quadratic equations.

For example the equation 100 = 40.03x^2 + (-491.57)x + 1386.81 has solutions 3.8 and 8.4, approx.. The second agrees with the value you gave, but you don't seem to have considered the first.

You do need to choose between the two solutions. If you look at your data (which I've copied below for easy reference) you see that illumination 100 was observed around x = 3, and by the time you get to x = 8 the illumination has fallen to somewhere around 20. So the solution x = 3.8 is consistent with the pattern of the data, while x = 8.4 is not. The x = 3.8 solution gives us the point (3.8, 100), which fits nicely into the data set.

The equation 25 = 40.0 x^2 -492 x + 1387 has solutions x = 4.2 and x = 8.1. Neither solution fits the data set particularly well (this data can't be fit very well by a quadratic function), but the x = 8.1 solution and the corresponding point (8.1, 25) fits into the observed data points better than would the points (4.2, 25).

So we probably want to conclude that x values between 3.8 and 8.1 result in illuminations between 100 and 25.

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Self-critique (if necessary):

`sc1

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Question: Solve the equation

• | 3x + 1 | > 4.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

3x + 1 > 4

3x > 3

x>1

3x +1 < -4

3x < -5

x < -5/3

confidence rating #$&*: 2

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Given Solution:

The equation

• | a | >= b

translates to the two equations

• a >= b OR a <= -b.

In this case | 3x+1 | > 4 translates to

• 3x + 1 >= 4 OR 3x + 1 <= -4,

which on solution for x gives

• x >= 1 OR x < = -5/3. **

ALTERNATIVE (and very similar) EXPLANATION:

the given inequality is equivalent to the two inequalities 3x+1 >= 4 and 3x+1 =< -4.

The solution to the first is x >= 1. The solution to the second is x <= -5/3.

Thus the solution is

• x >= 1 OR x <= -5/3.

COMMON ERROR:

-5/3 > x > 1

INSTRUCTOR COMMENT: It isn't possible for -5/3 to be greater than a quantity and to have that same quantity > 1.

Had the inequality read |3x+1|<4 you could have translated it to -4 < 3x+1 <4, which could be rearranged to -5/3 < x < 1. However reversing the directions of the inequalities changes their meaning.

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Self-critique (if necessary):

I am still learning about absolute inequalities…But it’s getting there.

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Question: `q0.2.24 (was 0.2.16 solve abs(2x+1)<5. What inequality or inequalities did you get from the given inequality, and are these 'and' or 'or' inequalities? Give your solution.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

2x + 1 < 5

2x +1 > -5

2x< 4

x < 2

2x > -6

x > -3

-3 < x < 2

confidence rating #$&*: 2

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Given Solution:

`a abs(a) < b means a < b AND -b < -a so from the given inequality abs(2x+1) < 5 you get

-5 < 2x+1 AND 2x+1 < 5.

These can be combined into the form -5 < 2x+1 < 5 and solved to get your subsequent result.

Subtracting 1 from all expressions gives us

-6 < 2x < 4,

then dividing through by 2 we get

-3 < x < 2. **

STUDENT QUESTION: I answered x < 2 and x > -3.

Do I need to put it in the -3 < x < 2 form?

INSTRUCTOR RESPONSE

I wouldn't count it wrong if you didn't, as long as you have the 'and' in there, but it's easier for everyone (especially you, as the student) to see if you use the -3 < x < 2 form.

Contrast this with the solution you would have obtained if the inequality had been | 2 x + 1 | > 5.

This would be so in either of two cases:

2x + 1 > 5 OR 2x + 1 < -5.

Solving these inequalities we would express the solution as

x > 2 OR x < -3.

If we express solution for the present problem as -3 < x < 2, and the solution to the contrasting problem as x > 2 OR x < -3, it's easier to see at a glance how one solution is fundamentally different than the other.

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Self-critique (if necessary):

Is it OK if I solve two parts of the inequalities separately and then put them together in a solution, the way I did in the last two problems??? That way is easier for me to see what I’m doing.

@& That's acceptable.*@

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Question: describe [-2, 2] using an absolute value inequality

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

-2<=x or <= 2

@& You didn't express this as an absolute value inequality.

However note the following:

You could express the interval as

-2 <= x AND x <= 2.

-2<=x or <= 2 would, for example, be satisfied if x = 1000, since -x < 100. To make an 'or' true only one of the two statement has to be true.

However x = 1000 doesn't satisfy the necessary conditions.

Only values of x which are greater than -2, AND less than 2, are in the given interval [-2, 2].

*@

confidence rating #$&*:

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Given Solution:

`a The interval [-2, 2] is centered at the midpoint between x=-2 and x=2. You can calculate this midpoint as (-2 + 2) / 2 = 0.

It is also clear from a graph of the interval that it is centered at x = 0

The center is at 0. The distance to each endpoint is 2.

The interval is | x - center | < distance to endpoints.

So the interval here is | x - 0 | < 2, or just | x | < 2. **

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Self-critique (if necessary):

OK, I misunderstood this one. But I see now what the point was.

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Question: Describe [-7,-1] using an absolute value inequality.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

The point -4 is in the center. (-7 -1)/2 = -4

Distance between these points is |-7- -1| = 6

Distance from each interval to the center is 3.

|x + 4| < 3

@& Right idea, but | x + 4 | < 3 is satisfied by x values between 1 and 7, not between -1 and -7.*@

confidence rating #$&*: 3

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Given Solution:

`a the interval is centered at -4 (midpt between -7 and -1).

The distance from the center of the interval to -7 is 3, and the distance from the center of the interval to -1 is 3. This translates to the inequality | x - (-4) | < 3, which simplifies to give us | x + 4 | < 3. **

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Self-critique (if necessary):

&#This also requires a self-critique.

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Question: `q0.2.12 (was 0.2.30) describe (-infinity, 20) U (24, infinity)

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

This set of solutions includes all numbers from negative infinity to 20, and from 24 to positive infinity OR it includes all numbers except those that are in between 20 and 24.

(20 + 24) / 2 = 22 is in the center of the interval.

@& You're getting there, but the numbers between 20 and 24 are not included in the specified set. See also my previous not on AND vs. OR.*@

confidence rating #$&*: 2

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Given Solution:

`a 22 is at the center of the interval. The endpoints are 2 units from the midpoint, and are not included. Everything that lies more than 2 units from 22 is in one of the intervals, and everything in either of the intervals lies at least 2 units from 22.

So the inequality that describes this union of two intervals is | x - 22 | > 2. **

STUDENT COMMENT

I sort of understand but I had to read your solution

INSTRUCTOR RESPONSE

You should graph these two intervals on the number line. Your graph will have a 'hole' in the middle, and you can see that x = 22 is right in the middle of that 'hole'.

The 'hole' consists of all numbers which are within 2 units of 22.

The two intervals you graphed contain all the numbers which are more than two units from 22.

The distance between x and 22 is | x - 22 |.

A point is within 2 units of 22 if its distance from 22 is less than 2, and this is the same as saying that | x - 22 | < 2.

A point more than 2 units from 22 if its distance from 22 is more than 2, and this is the same as saying that | x - 22 | > 2.

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Self-critique (if necessary):

I am getting this better now, but had to read this solution to see what the trick was. Does it mean that if there is a hole, we always have a “>” sign before the distance??? And “<” sign” in other cases??? I know it makes sense that this is the case, but I am looking for some connection to remember it easier.

@& Your statement is valid, and if you find it helpful you can safely use it.

Be sure you also have the other details right, of course, but yours is a good observation.*@

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Question: The allowable weight of a male dog of a certain breed, for show purposes, is described by the inequality

• abs( (w-57.5)/7.5 ) < 1

Express this as an interval of the number line.

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

W – 57.5 < 7.5

W< 7.5 + 57.5

W < 65

W – 57.5 > -7.5

W > 50

5065

@& 5065 means that w is greater than 50 and also greater than 65.

50 < 2 < 65 means that w is between 50 and 65.*@

confidence rating #$&*: 2

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a The inequality is translated as

-1<=(w-57.5)/7.5<=1. Multiplying through by 7.5 we get

-7.5<=w-57.5<=7.5

Now add 57.5 to all expressions to get

-7.5 + 57.5 <= x <= 7.5 + 57.5 or

50 < x < 65,

which tells you that the dogs weigh between 50 and 65 pounds. **

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Self-critique (if necessary):

I keep forgetting the other part of inequality, but it is sinking in.

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Question: Stock price is predicted to lie within 2 of 33 1/8.

What absolute value inequality or inequalities correspond(s) to this prediction?

YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY

Your solution:

|x-33 1/8| <= 2

confidence rating #$&*: 2

^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^

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Given Solution:

`a this statement says that the 'distance' between a stock price and 33 1/8 must not be more than

2, so this distance is <= 2

The distance between a price p and 33 1/8 is | p - 33 1/8 |.

The desired inequality is therefore | p = 33 1/8 | < = 2. **

&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&

Self-critique (if necessary):

Is 33 1/8 here the center??? I think I am getting it better and better each time.

@& You really are getting there. Good job on this one.

Yes, 33 1/8 is at the center.*@

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Self-critique Rating:

self-critique rating

#(*!

open qa 22

@& Something appears to be missing from the original Query document. It appears that you're getting on track with subsequent problems, so don't worry about the temperature references.*@

@& Your work looks very good.*@

@& That's acceptable.*@

@& Right idea, but | x + 4 | < 3 is satisfied by x values between 1 and 7, not between -1 and -7.*@

&#This also requires a self-critique.

@& You're getting there, but the numbers between 20 and 24 are not included in the specified set. See also my previous not on AND vs. OR.*@

@& Your statement is valid, and if you find it helpful you can safely use it. Be sure you also have the other details right, of course, but yours is a good observation.*@

@& 5065 means that w is greater than 50 and also greater than 65. 50 < 2 < 65 means that w is between 50 and 65.*@

@& You really are getting there. Good job on this one. Yes, 33 1/8 is at the center.*@

@& Good progress throughout the exercise. See my notes and let me know if you have additional questions.*@

@& Something appears to be missing from the original Query document.

It appears that you're getting on track with subsequent problems, so don't worry about the temperature references.*@

@& Your statement is valid, and if you find it helpful you can safely use it.

Be sure you also have the other details right, of course, but yours is a good observation.*@

@& 5065 means that w is greater than 50 and also greater than 65.

50 < 2 < 65 means that w is between 50 and 65.*@

@& You really are getting there. Good job on this one.

Yes, 33 1/8 is at the center.*@

@& Good progress throughout the exercise.

See my notes and let me know if you have additional questions.*@