Math 151 , Day 35, Wednesday, Nov.14, 2007  .after class. hit reload...

HW Day35 .  P. 355, choosing n for a desired C and m.   Check,  sample size 14.17.  Read ahead Please! Chapter 15, Significance testing (the "other" big topic in inference)
Moore Ch. 14, Day 35  Hand in Monday, all

A.  New Shoeboxes: On a Separate sheet:  (2 shoeboxes. )The shoeboxes are outside my door if you missed doing them in class. For each sample of size  4 from a shoebox, write down the values, find the mean, (know which box you got them from: White #s, green box. Yellow, red top.) and tell whether you believe the population mean for that box is 20, or something bigger. (Your gut feeling.) Does it help to know that the standard deviations for the shoeboxes are both 4?  Bring your sample numbers and xbars  to class  to pool, and Keep for further computations.)   (This is related to Chapter 15, where we'll learn the formal methods.)If you still have the slips, please return them to me!

Sample size for C.I. (& review of CI computations)You can check using the bottom section of the Confidence Interval Excel sheet.
p. 356, 14.10 Estimating mean IQ
p. 358 14.24 Hotel managers
p. 360, 14.33 calibrating a scale

Read, 
to discuss 		Optional
A few  problems good to review for the exam
p. 419, 17.7 Day care, parameter or statistic
p. 422, 17.27 and 28 means vs. individuals.  In #27, they're taking the "about what range" to be the interval containing the middle 99.7%--almost all. (Answer to last question of #28 is
"no"--histogram of individual values in sample will be distributed (roughly) like the population.)
p. 421, 17.26 WAIS, n = 1, n = 60 (Answers: a) about .3707, b) 100, 1.936, c).0049, d) a could be quite different; b still correct, c approx. right bcs of Central Lim. Th.))
Exam 4 this Friday (next class).  Covers  Ch. 10 p. 257 on (Continuous models and R.V.'s), plus of course being able to use the rules p. 253 for areas, in the continuous case. Ch. 11 up to p. 286 only, Ch. 14 to p.354, Ch. 16 to p. 391. (i.e. thru Day 34 HW).   Sample Exam is good as written. (Handed out Fri. Outside my door..)  Solutions .
   Sign up Today. for early (>9:30) start:  Confirm with me any other time to take it.

     Buffer against one low hour exam:
The final % exam grade minus 10 points will be substituted for the lowest hour exam grade, if it is higher.

Examples:
Ex1 Ex2 Ex3
 Ex4 final % final -10
Student 1 Original 85 80 85
 60 85 75, replaces lower 60
Treated 85 80 85
 75 85 <--ß These will be used.
Student 2 Original 85 80 80
 70 75 65, lower than 70, don't replace.
Treated 85 80 80
 70 75
Student 3 Original 85 50 75
 55 85 75, replaces lower 50
Treated 85 75 75
 55 85 <--ßThese will be used
This is to encourage any who are nervous about Exam 4, and to encourage all to try to put it together for the final.

New Shoeboxes: On a Separate sheet:  (2 shoeboxes. )The shoeboxes are outside my door if you missed doing them in class.  From each shoebox, take a sample of size 4, and write down the values.  (Know which box you got them from: White #s, green box. Yellow, red top.)   Do A above for HW.

Confidence intervals, Day 34
RECAP:  Confidence Interval of the form  estimate + margin-of-error  for the mean µ with Confidence level C: (p.349-50) (Table A, or Table C, t dist. bottom row)
  Tradeoffs: for sharper (narrower) margin of error, must  accept lower confidence level, OR take larger sample.

In practice: pp. 388-391
SRS--other random samples get other formulas. 
   Nonrandom or biased  samples simply can't do C.I.
    Sometimes we can plausibly think of data as SRS from large population (rolling dice, repeated weighings on scale)
     -- For experiments, randomizing into groups allows us to use the methods; but be careful about generalizing far beyond our "volunteers" type.
     Ask how reasonably "like" a SRS the sample is.

Xbars are  normal!  OK IF 1) population is normal, or 2) n big enough for Central Limit theorem.
    Outliers?  Trouble (xbar is sensitive).   Slight outliers ok (see next)
    Skewness?  "Moderate" sample size allows CLTh to overcome all but strong skewness. (Numbers for "moderate" in Ch. 18)
Sigma for population is known.  Rarely true in practice. 
          Large n? Could substitute s calculated from sample as "good" estimate of sigma.
          Small n--Ch. 18, a slight modification of these methods takes care of unknown sigma.

- - - - - - - - - - - - - - - - - - - - - -
Homework questions?    Day 34
Homework 14.34 and 14.35 , p. 160.     
     14.35:    T = true value of parameter,  * = value of this statistic  * = results of other surveys
                           ** *
                        * ******
               * * ** ******T**** *** ** * *   
Clustering will be around True value, not around the one we got this time.
General exam questions?   Sample Exam  (Handed out Fri. Outside my door..)  Solutions .

If no more questions, new material (Not on exam)
Planning ahead:  Choose sample size big enough to satisfy desired: margin of error, confidence level. p. 355
Given C and m = margin of error,  (and sigma), find n.
   Method:  Use C to find z*.  Plug in to formula for m, and solve for n.  Or memorize formula for n and plug in to it.
,    n = (z* sigma / m)2
     Note:  z* sigma still on top.  m and n change places, and whole thing is squared!
           Round up!  If you get n = 5.06, you need a sample of size 6 to get your margin of error at least as short as you want.
                      ConfidenceInterval.xls  Excel spreadsheet will check your calculations.  Show your work on HW!

Got to here Wed.
Why does the CI formula work? (optional)

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