covpALR: Coverage Probability of Adjusted Likelihood method for given...
In RajeswaranV/proportion: Inference on Single Binomial Proportion and Bayesian Computations
View source: R/212.CoverageProb_ADJ_All.R
covpALR R Documentation
Coverage Probability of Adjusted Likelihood method for given n
Description
Coverage Probability of Adjusted Likelihood method for given n
Usage
covpALR(n, alp, h, a, b, t1, t2)
Arguments
n
- Number of trials
alp
- Alpha value (significance level required)
h
- Adding factor
a
- Beta parameters for hypo "p"
b
- Beta parameters for hypo "p"
t1
- Lower tolerance limit to check the spread of coverage Probability
t2
- Upper tolerance limit to check the spread of coverage Probability
Details
Evaluation of adjusted Likelihood ratio limits using coverage probability,
root mean square statistic, and the proportion of proportion lies within the desired
level of coverage
Value
A dataframe with
mcpAL
Adjusted Likelihood Coverage Probability
micpAL
Adjusted Likelihood minimum coverage probability
RMSE_N
Root Mean Square Error from nominal size
RMSE_M
Root Mean Square Error for Coverage Probability
RMSE_MI
Root Mean Square Error for minimum coverage probability
tol
Required tolerance for coverage probability
References
[1] 1998 Agresti A and Coull BA.
Approximate is better than "Exact" for interval estimation of binomial proportions.
The American Statistician: 52; 119 - 126.
[2] 1998 Newcombe RG.
Two-sided confidence intervals for the single proportion: Comparison of seven methods.
Statistics in Medicine: 17; 857 - 872.
[3] 2008 Pires, A.M., Amado, C.
Interval Estimators for a Binomial Proportion: Comparison of Twenty Methods.
REVSTAT - Statistical Journal, 6, 165-197.
See Also
Other Coverage probability of adjusted methods:
PlotcovpAAS(),
PlotcovpAAll(),
PlotcovpALR(),
PlotcovpALT(),
PlotcovpASC(),
PlotcovpATW(),
PlotcovpAWD(),
covpAAS(),
covpAAll(),
covpALT(),
covpASC(),
covpATW(),
covpAWD()
Examples
n= 10; alp=0.05; h=2;a=1;b=1; t1=0.93;t2=0.97
covpALR(n,alp,h,a,b,t1,t2)
RajeswaranV/proportion documentation built on June 17, 2022, 9:11 a.m.
R Package Documentation
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View source: R/212.CoverageProb_ADJ_All.R
| covpALR | R Documentation |
Coverage Probability of Adjusted Likelihood method for given n
Description
Coverage Probability of Adjusted Likelihood method for given n
Usage
covpALR(n, alp, h, a, b, t1, t2)
Arguments
n |
- Number of trials |
alp |
- Alpha value (significance level required) |
h |
- Adding factor |
a |
- Beta parameters for hypo "p" |
b |
- Beta parameters for hypo "p" |
t1 |
- Lower tolerance limit to check the spread of coverage Probability |
t2 |
- Upper tolerance limit to check the spread of coverage Probability |
Details
Evaluation of adjusted Likelihood ratio limits using coverage probability, root mean square statistic, and the proportion of proportion lies within the desired level of coverage
Value
A dataframe with
mcpAL |
Adjusted Likelihood Coverage Probability |
micpAL |
Adjusted Likelihood minimum coverage probability |
RMSE_N |
Root Mean Square Error from nominal size |
RMSE_M |
Root Mean Square Error for Coverage Probability |
RMSE_MI |
Root Mean Square Error for minimum coverage probability |
tol |
Required tolerance for coverage probability |
References
[1] 1998 Agresti A and Coull BA. Approximate is better than "Exact" for interval estimation of binomial proportions. The American Statistician: 52; 119 - 126.
[2] 1998 Newcombe RG. Two-sided confidence intervals for the single proportion: Comparison of seven methods. Statistics in Medicine: 17; 857 - 872.
[3] 2008 Pires, A.M., Amado, C. Interval Estimators for a Binomial Proportion: Comparison of Twenty Methods. REVSTAT - Statistical Journal, 6, 165-197.
See Also
Other Coverage probability of adjusted methods:
PlotcovpAAS(),
PlotcovpAAll(),
PlotcovpALR(),
PlotcovpALT(),
PlotcovpASC(),
PlotcovpATW(),
PlotcovpAWD(),
covpAAS(),
covpAAll(),
covpALT(),
covpASC(),
covpATW(),
covpAWD()
Examples
n= 10; alp=0.05; h=2;a=1;b=1; t1=0.93;t2=0.97 covpALR(n,alp,h,a,b,t1,t2)
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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