Day9 Math151

Math 151 , Fall 2005, Day 9 Wed. Sept 14 Hit reload...After class

HW Day9(Wed.Sept. 14): Reading: D&V Ch6 pp. 82-98. (today 82-89) (Normal Prob. Plots p. 94-95 is Optional, but don't miss What Can Go Wrong, p95 bottom). AS Ch. 6 is very good, in order. (Today thru 6-3) (Normal Density Tool for you : Use AS30-2 "Normal distribution based Confidence Intervals tool for best setup*CAUTION: Don't hit the Enter key! It closes the tool-box!))

Hand in (All D&VCh6 unless otherwise noted
A. Complete the Handout: Tables for simple models (densities)

68-95-99.7 rule: Ch6 p. 99ff: Sketch normals&mark, do questions.
11 guzzlers
14 Rivets (d is a judgment call--depends on circumstance to some extent...)
13 downhill (for d: Data is in order already. Stemplot or histo-by-hand (widths=1) is quicker than going to SPSS.)
18 %white (for d, your answer can be rough. Noting where Q1 is may help in guesstimating.)
p. 99, #9 Professors
+ + + + + + + + + + + +
Postpone everything below here:
standardizing: Ch6 p. 99: Sketch each Normal model and label its axis with both the "real/raw" values and the "z" values. Mark the observations on the pictures, do questions.
5 temperatures
6 placement exams
= = = = = = = = = = = = =
Table use: Always sketch the model first, mark the area you are looking for! Find the answers using Table Z, Appendix p. A-30. Check your answers with one of the Technology Normal tools (see above)
p.101 #20, 22 (Note: 22d finds what numbers from the 5-number summary?)

Read,
to discuss

Optional
Use technology to check on &
picture your Normal models:
Moore website http://www.whfreeman.com/scc/
Uncheck the 2-tail box for most uses. OR
ActivStats Normal Density Tool for you :
for best setup*
Use AS30-2 "Normal distribution based
Confidence Intervals tool"
CAUTION: Don't hit the Enter key! It closes the tool-box!

Normal Prob. Plots (D&Vp. 94-95).
Do AS6-4¶3, print out your graphs.
(Problem: SPSS Data set has Hospital charges (money) as String/Nominal, because the missing values were imported as characters.
Change the Type String to Numerical, & then you
can change Measure to Scale.)

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Postpone everything below here:
More table practice: z's:
p.101 #19, 21

Cluster in 4's (approx.). Pool (write down) answers to p. 73#13 Marriage age. Ithaca Journal Jan 22, '05 had quiz answers: "How old is the average bride? 24.5 years.... How old is the average groom? 26.5 years." Give some reasons that could account for the big difference between these numbers and the graphed numbers.
HW questions? p.73#13 Marriage age. p. 79#38Holes

GET handout HW sheet if you didn't: "Tables for simple models (densities)"
Models for quantitative variables (AS6-2 ¶1) See Day 8

Symmetric, unimodal, no outliers, (not "uniform") is candidate for
"Normal" Model:("Gaussian", "Bell-shaped") AS6-1,2,3 are good. Normal Density Tool (Use AS30-2 "Normal distribution based Confidence Intervals tool for best setup*CAUTION: Don't hit the Enter key! It closes the tool-box! ), acts like http://www.whfreeman.com/scc/

What "mechanism"? &&Thing measured is the result of many small independent influences.
Family: all the same basic shape, except for measurement units.
Mean gives middle, standard deviation gives spread..
Knowing parameters mean (µ "mu") and standard deviation ("sigma") tells you everything. "N(mean, s.d.)"
Symmetric. Mean at middle. &&Curvature changes at 1 standard deviation on either side of mean.
"Standard normal": mean = 0, s.d. = 1 Standardized -- "s.d.'s from the mean".
"Middle s. d." && A center region one standard deviation wide spans about 38% (AS, not in D&V)
68-95-99.7 rule: 68% within 1 s.d. of mean, 95% within 2 s.d. of mean, 99.7% within 3 (roughly).

higher

Back-of-the-envelope: Sketch the curve, mark mean, + 1, +2, +3 s.d.'s-- in real units.

Example:

Start here Friday:
Standardizing: A "raw value" x is standardized by telling how many standard deviations above the mean it is.
Find z: Subtract the mean from x. Now you know how far "above" the mean x is, in "raw" units. (If it's below the mean, the number will be negative.) Find how far this is in "standard deviations" by dividing by the standard deviation.
That's the z-score.

Standardizing:   A way of comparing an individual against its pack.
                                Comparing individuals from different packs, each relative to its own.
                        Removes "units of measurement" from the discussion.
                        Enables use of the standard normal table.

Examples: Wechsler Adult Intelligence Scale scores used to be approximately N(110, 25)
   A score of   85 is 1 s.d. below the mean. Computation: z = (85 – 110)/25 = (–25 raw points)/25 = –1 s.d. from mean.
           (About the 16th percentile--16% get scores < 85)
   145 is how many s.d.'s above the mean?
            Computation: z = (145 – 110)/ 25= (35 raw points above mean)/25 = 1 2/5 = 1.4 s.d. above mean

~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ First standard normal table use, then with "real" values~ ~ ~ ~ ~ ~ ~ ~ ~ ~
Standard Normal N(0, 1). Our tables give area to the left of a z value. TableZ, Appendix E, A-50
Using standard normal table: See D&V p. 88. (Wrong side of graph is shaded in my text)
       z | .00     .01     .02 .....
      ...|
     1.4 | .9192   .9207   .9222 ....
   P(z < 1.40) = .9192,   P(z < 1.41) = .9207 P(z < 1.42) = .9222.
                                              ?z has more than 2 dec. places? Round to 2.

    Sketch the density, mark the area you're looking for.
    Figure out how to get it using areas to the left of one or more z-values.
        Think cutting up paper bell-curves. (Remember whole area is 1.) Like handout.

Example: Proportion of observations between 0.5 and 1.4 P(0.5 < z <1.4) =
Proportion of observations below 1.4 minus Proportion of observations below 0.5
P (z < 1.4) - P(z < 0.5) = .9192 - .6915 = .2277

. bell curves. Use 202x515 pixels to print.
Example: Proportion of observations above 0.5,    P( z > 0.5) =
                ONE minus proportion of observations below 0.5,   1 - P( z < 0.5) = 1-.6915 = .3085
. Reading table "backward":
What z value has area ..... to the left/right of it?
        Sketch roughly.
        Restate (if needed) as "What z value has area A to the LEFT of it."
        Look in body of table for the value closest to A.
        Go to edge(s) of table to find what z that goes with.
Example: "What z value has 10% of the observations above it?" This is the same z as the one for:
        "What z value has 90% of the observations below (to the left of) it." (What z is the 90th percentile.)

        Find in the table .8997 and .9015 -- .9000, our number, is between them.
                    .8997 is a little closer to.9000, so use it.
           For .8997, the z value is 1.28.   1.28 is the 90th percentile.
            1.28 has 10% of the observations above it.

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* AS6 Normal Density tool: Use AS30-2 "Normal distribution based Confidence Intervals" tool for best setup.CAUTION: Don't hit the Enter key! It closes the tool-box! To use it from Tool1 from the menu bar in Ch. 6: Right click for menu. Choose Show Buttons. Choose Show Flag Values, Mean, StandardDeviation; Real Values. Now you can type in mean and s.d. and the mean + 1,2,3 s.d.'s will show on the axis. CAUTION: Don't hit the Enter key! It closes the tool-box! To register a typed number, click in a different box.

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