On Wed, 5 Jul 2023 00:47:24 -0000 (UTC),
[email protected] (David
Duffy) wrote:
s g <[email protected]> wrote:
My question is on the interpretation of a 95% CI for a risk difference and the pvalue from a chi2-test.
Sometimes they don't agree and this is because that both methods
are based on different assumptions but how would the interpretation
go if say the 95% CI includes 0 and the pvalue from a chi2 test is
significant?
An example of this is discussed in the statalist post:
https://www.statalist.org/forums/forum/general-stata-discussion/general/1591371-p-value-and-95-ci-don-t-match
As you say, there are "different assumptions". The point of calculating >confidence intervals is to avoid being hung up on arbitrary thresholds.
One can produce confidence intervals by inverting the chi-square test -
this would remove your dilemma ;). Another point is there are multiple >"chi-squares" (eg Pearson v Gibbs for these kinds of data; Wald, score
and likelihood ratio tests more generally), which also can disagree.
They are all only asymptotically equivalent. This is all aside from
the widely shared distrust of P-values...
(applause)
BTW, Pearson vs. Likelihood chisquared tests on (j x k) tables
are NOT asymptotically equivalent with increased N, which some
people imagine to be true. One of the two is more sensitive to
a single very-extreme cell (I forget which), while the other is more
sensitive to several moderate deviations.
I clicked on the statalist discussion cited above. Covered some
points.
If you want more discussion, check out the additional links provided
in the comments there.
--
Rich Ulrich
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