# Difference between revisions of "Chance News 8"

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This is not current news, but since Supreme Court appointments are in the news we felt that these articles might make an interesting class discussion. | This is not current news, but since Supreme Court appointments are in the news we felt that these articles might make an interesting class discussion. | ||

− | In 1936 Allen Wallis suggested that the number of supreme court appointments in a given year can be approximated by a Poisson distribution. In his | + | In 1936 Allen Wallis suggested that the number of supreme court appointments in a given year can be approximated by a Poisson distribution. In his Table 1 Wallis provided the number appointed in each year over the intervals with different numbers of Justices on the Supreme Coourt: 1790-1806 (6) 1807-1836 (7), and 1837-1932 (9). Acually there were 10 in the years 1963 to 1967 which Wallis called "negligible exceptions." |

[[Image:wallis1.png|500px|center]] | [[Image:wallis1.png|500px|center]] | ||

− | Wallis then restricts himself to the years 1837-1932 and finds that the number of court appoiintments in year can be approximated by a Poisson distrution with mean .5. His results are shown in his Figure | + | Wallis then restricts himself to the years 1837-1932 and finds that the number of court appoiintments in year can be approximated by a Poisson distrution with mean .5. His results are shown in his Figure II: |

[[Image:wallis2.png|500px|center]] | [[Image:wallis2.png|500px|center]] | ||

− | In his article, Sidney Ulmer updated the data to 1980 and also includes data from the early Supreme Courts with 6 and 7 members. Thus his data covers the years 179--1980. His | + | In his article, Sidney Ulmer updated the data to 1980 and also includes data from the early Supreme Courts with 6 and 7 members. Thus his data covers the years 179--1980. His Table 1 compares the actual number of apointments in a year with the expected number of appointments assuming a Poisson distribution with mean 5.13. |

[[Image:ulmer1.png|500px|center]] | [[Image:ulmer1.png|500px|center]] | ||

− | In | + | In his Table II Ulmer does the same thing but limited to the 9 year data, 1837 to 1862 and 1869-1980). |

[[Image:ulmer2.png|500px|center]] | [[Image:ulmer2.png|500px|center]] | ||

− | + | Testing the goodness of fit, Ulmer argues that the fit with the varying size Supreme Courts is just as good as with fixed size Supreme Courts. | |

+ | |||

+ | ===DISCUSSION=== | ||

+ | |||

+ | (1) What is the probabity that a President would make 2 or more appointments to the Supreme Court during a 4 year term? What is the probability he or she makes no appointments during a 4 year term? | ||

+ | |||

+ | (2) Do you agree with Umer that there is no reason to limit the data to years with the Supreme Court is the same size? | ||

+ | |||

+ | (2) Obtain the data needed to update Ullmar's results to 1980 providiing Tables to correspond to his Tables 1 and 2. Add your Tables and data to this Chance News. | ||

+ | |||

==DISCUSSION== | ==DISCUSSION== | ||

## Revision as of 19:31, 23 October 2005

Oct 15 to Oct 30

## Contents

## Quotation

One more fagot of these adamantine bandages, is, the new science of Statistics. It is a rule, that the most casual and extraordinary events -- if the basis of population is broad enough -- become matter of fixed calculation. It would not be safe to say when a captain like Bonaparte, a singer like Jenny Lind, or a navigator like Bowditch, would be born in Boston: but, on a population of twenty or two hundred millions, something like accuracy may be had. Ralph Waldo Emerson Fate

## Forsooth

Here's another Forsooth from the October issue of RSS News.

Your'e more likely to die in a fire in Strathclyde than anywhere else in the country

11 May 2005

## The Poisson Distribution and the Supreme Court

The Poisson Distributioin and the Supreme Court

*Journal of the American Statistical Association* 31, no. 195 ,(1936), 376-80

W. Allen Wallis

Supreme Court Appointments as a Poisson Distribution

*American Journal of Political Science*, 26, No.1, February 1982

S. Sidney Ulmer

This is not current news, but since Supreme Court appointments are in the news we felt that these articles might make an interesting class discussion.

In 1936 Allen Wallis suggested that the number of supreme court appointments in a given year can be approximated by a Poisson distribution. In his Table 1 Wallis provided the number appointed in each year over the intervals with different numbers of Justices on the Supreme Coourt: 1790-1806 (6) 1807-1836 (7), and 1837-1932 (9). Acually there were 10 in the years 1963 to 1967 which Wallis called "negligible exceptions."

Wallis then restricts himself to the years 1837-1932 and finds that the number of court appoiintments in year can be approximated by a Poisson distrution with mean .5. His results are shown in his Figure II:

In his article, Sidney Ulmer updated the data to 1980 and also includes data from the early Supreme Courts with 6 and 7 members. Thus his data covers the years 179--1980. His Table 1 compares the actual number of apointments in a year with the expected number of appointments assuming a Poisson distribution with mean 5.13.

In his Table II Ulmer does the same thing but limited to the 9 year data, 1837 to 1862 and 1869-1980).

Testing the goodness of fit, Ulmer argues that the fit with the varying size Supreme Courts is just as good as with fixed size Supreme Courts.

### DISCUSSION

(1) What is the probabity that a President would make 2 or more appointments to the Supreme Court during a 4 year term? What is the probability he or she makes no appointments during a 4 year term?

(2) Do you agree with Umer that there is no reason to limit the data to years with the Supreme Court is the same size?

(2) Obtain the data needed to update Ullmar's results to 1980 providiing Tables to correspond to his Tables 1 and 2. Add your Tables and data to this Chance News.

## DISCUSSION

(1) Find the probability that a president who serves four years will make 2 or more Supreme Court appointments.

(2) Obtain the data from 1790 to 2005 and make tables corresponding to the Ulman's Tables 1 and 2. Add the tables to this article and also include the data to make it easier to update these results in future years.

## Item2

To be added.