Difference between revisions of "TF ErrAna Homework"
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=Binomial Probability Distributions= | =Binomial Probability Distributions= | ||
− | 1.)Evaluate the following | + | 1.)Evaluate the following (at least one by hand) |
− | a.) <math>{6\choose 3}=</math> | + | a.) <math>{6\choose 3}</math> |
+ | |||
+ | b.) <math>{4\choose 2}</math> | ||
+ | |||
+ | c.) <math>{10\choose 3}</math> | ||
+ | |||
+ | d.) <math>{52\choose 4}</math> | ||
+ | |||
+ | |||
+ | |||
+ | 2.) Plot the binomial distribution for n=6 and p=1/2 from x=0 to 6. | ||
+ | |||
+ | 3.) Prove that <math>\sigma^2 = npq</math> for the Binomial distribtuion. | ||
=Error Propagation= | =Error Propagation= | ||
[http://wiki.iac.isu.edu/index.php/Forest_Error_Analysis_for_the_Physical_Sciences] [[Forest_Error_Analysis_for_the_Physical_Sciences]] | [http://wiki.iac.isu.edu/index.php/Forest_Error_Analysis_for_the_Physical_Sciences] [[Forest_Error_Analysis_for_the_Physical_Sciences]] |
Revision as of 16:18, 27 January 2010
Errors
Give examples of 5 a Systematic error.
Find 3 published examples of data which is wrongly represented.
Identify what is incorrect about it. What does it mean to be wrongly presented? A typical example is a political poll which does not identify the statistical uncertainty properly or at all.
Create a Histogram using ROOT
some commands that may interest you
root [1] TH1F *Hist1=new TH1F("Hist1","Hist1",50,-0.5,49.5); root [2] Hist1->Fill(10); root [3] Hist1->Draw();
You can use the above commands but you need to change the names and numbers above to receive credit. You must also add a title to the histogram which contains your full name. You will printout the histogram and hand it in with the above two problems.
- Notice how the square rectangle in the histogram is centered at 10!
- Notice that if you do the commands
root [2] Hist1->Fill(10); root [3] Hist1->Draw();
the rectangle centered a 10 will reach the value of 2 on the vertical axis.
Two dice are rolled 20 times. Create a histogram to represent the 20 trials below
Trial | Value |
1 | 8 |
2 | 10 |
3 | 9 |
4 | 5 |
5 | 9 |
6 | 6 |
7 | 5 |
8 | 6 |
9 | 3 |
10 | 9 |
11 | 8 |
12 | 5 |
13 | 8 |
14 | 10 |
15 | 8 |
16 | 11 |
17 | 12 |
18 | 6 |
19 | 7 |
20 | 8 |
Mean and SD
Electron radius
The probability that an electron is a distance
from the center of the hydrogen atomDoing the integrals by hand (no tables) ,
a.)Find the value of C
b.) Find the mean electron radius and standard deviation for an electron in a hydrogen atom
Histograms by Hand
Given the following test scores from 40 students.
Trial | Value | Trial | Value | Trial | Value | Trial | Value |
1 | 49 | 11 | 90 | 21 | 69 | 31 | 74 |
2 | 80 | 12 | 84 | 22 | 69 | 32 | 86 |
3 | 84 | 13 | 59 | 23 | 53 | 33 | 78 |
4 | 73 | 14 | 56 | 24 | 55 | 34 | 55 |
5 | 89 | 15 | 62 | 25 | 77 | 35 | 66 |
6 | 78 | 16 | 53 | 26 | 82 | 36 | 60 |
7 | 78 | 17 | 83 | 27 | 81 | 37 | 68 |
8 | 92 | 18 | 81 | 28 | 76 | 38 | 92 |
9 | 56 | 19 | 65 | 29 | 79 | 39 | 87 |
10 | 85 | 20 | 81 | 30 | 83 | 40 | 86 |
a.) calculate the mean and standard deviation
b.) construct a histogram by hand which has 10 bins centered on 10,20,...
c.) Use ROOT to construct a histogram. Compare the mean and RMS from ROOT with your result in part (a) above. What is the difference between the RMS report in the ROOT histogram and the standard deviation you calculated in part (a)?
Variance using Probability function
Given that
Justify that
- Note
- The standard deviation ( ) is the root mean square (RMS) of the deviations.
RMS =
soBinomial Probability Distributions
1.)Evaluate the following (at least one by hand)
a.)
b.)
c.)
d.)
2.) Plot the binomial distribution for n=6 and p=1/2 from x=0 to 6.
3.) Prove that
for the Binomial distribtuion.