Chance News 104: Difference between revisions

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<div align=right>Personal correspondence, March 21, 2015</div>
<div align=right>Personal correspondence, March 21, 2015</div>
Submitted by Margaret Cibes at the suggestion of Howard Mayer
Submitted by Margaret Cibes at the suggestion of Howard Mayer
----
“Why are governments so eager to protect their citizens against dread risks, from cows to swine, and so hesitant to protect the very same people against the risk of financial disaster from investment banking?”
<div align=right>Gerd Gigerenzer in [http://www.amazon.co.uk/Risk-Savvy-Make-Good-Decisions/dp/1846144744 <i>Risk Savvy: How to Make Good Decisions</i>, 2014</div>
Submitted by Margaret Cibes


== Transitivity, Correlation and Causation ==
== Transitivity, Correlation and Causation ==

Revision as of 16:19, 24 March 2015

Quotations

"Regression to the mean is so powerful that once-in-a-generation talent basically never sires once-in-a-generation talent. It explains why Michael Jordan’s sons were middling college basketball players and Jakob Dylan wrote two good songs....

"The Bush family’s dominance would be the basketball equivalent of Michael Jordan being the father of LeBron James and Kevin Durant — and of Michael Jordan’s father being Walt Frazier....In other words, it is virtually impossible, statistically speaking, that Bushes are consistently the most talented people to lead our country. Same for Chelsea Clinton or any other member of a political dynasty thought to be possible presidential timber."

-- Seth Stephens-Davidowitz, in Just how nepotistic are ee?, New York Times, 21 March 2015

Submitted by Bill Peterson

Forsooth

From a Vancouver demographer commenting, tongue-in-cheek, on the result of making Canada’s census long form voluntary in 2010:
“Because of the move to the voluntary NHS, Canada is a richer, whiter, more educated country now.”
Note that the response rate dropped from 98.5 percent in 2006 to 68.6 in 2011.

“The Tragedy of Canada’s Census”, The Wall Street Journal, February 26, 2015

Submitted by Margaret Cibes


"The percentage of students scoring at/above Proficient in 3rd grade math increased .... Curiale posted the highest gain ..., improving from 27.0 percent to 51.9 percent, an increase of 24.9% percent. …. In 6th grade, the percentage of students scoring at/above Goal ... increased from 28.0 percent to 39.4 percent, a gain of 11.4 percent."

"2013 CAPT Results Show Increases and CMT Results Show Decreases", CSDE News, August 13, 2013

Submitted by Margaret Cibes


“I just bought jumbo rolls of toilet paper--big bargain. It says on label: 12 mega rolls equals 48 regular rolls. On the other side of the label it says: use four times less!”

Personal correspondence, March 21, 2015

Submitted by Margaret Cibes at the suggestion of Howard Mayer


“Why are governments so eager to protect their citizens against dread risks, from cows to swine, and so hesitant to protect the very same people against the risk of financial disaster from investment banking?”

Gerd Gigerenzer in [http://www.amazon.co.uk/Risk-Savvy-Make-Good-Decisions/dp/1846144744 Risk Savvy: How to Make Good Decisions, 2014

Submitted by Margaret Cibes

Transitivity, Correlation and Causation

Theorem 1 of the article cited by Paul Alper in the previous issue, "Is the Property of Being Positively Correlated Transitive?" (The American Statistician, Vol. 55, No. 4, November, 2001), depends on the existence of non-observed independent random variables U, V, and W which cause the correlations between X=U+V, Y=W+V, and Z=W-U to be non-transitive. An interesting question is whether this relates back to the difference between causation and correlation.

The answer turns out to be no, we can get the same sort of result even in the presence of causative relationships between X, Y and Z. Here’s an example:

  • X is N(0,1);
  • Y = X + U, where U is N(0,1) and independent of X;
  • Z = Y - 1.5*X.

The correlation coefficients between X and Y and between Y and Z are both positive but the correlation coefficient between X and Z is negative.

Stan Lipopvetsky’s follow-up letter (The American Statistician, 56:4, 341-342, 2002) hints at this but does not include an actual example.

Submitted by Emil M Friedman

Followup

Thanks to John Allen Paulos for sending the following link:

Who's Counting: Non-transitivity in baseball, medicine, gambling and politics
by John Allen Paulos, ABCNews.com, 5 December 2010

This installment from the John's "Who's Counting" column describes several real world illustrations of non transitivity in correlation.

Among these is an analysis from the aforementioned American Statistician article. Looking at the 2000 batting data from the New York Yankees, it was found that the number of triples hit by a player correlated positively with the number of base hits he had, which in turn correlated positively with the number of home runs he hit; however, the number of triples a player hit correlated negatively with the number of home runs he hit. As John explains, good hitters get base hits of all kinds, so it is not surprising that home runs an triples are positively correlated with total hits. But triples tend to be the result of speed, while home runs require power, so the powerful physique typical of home run hitters makes them less likely to get triples.

See the column for further discussion, including an example of non-transitive dice, the potential for non-transitive preferences in three way elections, and the potential pitfalls resulting from the large number of correlations in medical data.

TED Talk: Mathematics of Love

“The Mathematics of Love”, by Hannah Fry, April 2014
(17 min video, transcript provided)

Fry, an aerodynamicist, discusses three topics related to mating, based on recent statistical studies:

Topic #1: How to win at online dating (presenting oneself on social media in order to be popular)
Topic #2: How to pick the perfect partner (timing one’s choice)
Topic #3: How to avoid divorce (analogy to nations headed for war)

One study she refers to is “Why I Don’t Have a Girlfriend”, by economist Peter Backus, who uses the Drake equation to estimate the number of potential girlfriends for him.

Submitted by Margaret Cibes