Department of Mathematics, S.R.K.R. Engineering College, Bhimavaram, A.P., India 2

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1 Skewess Corrected Cotrol charts for two Iverted Models R. Subba Rao* 1, Pushpa Latha Mamidi 2, M.S. Ravi Kumar 3 1 Departmet of Mathematics, S.R.K.R. Egieerig College, Bhimavaram, A.P., Idia 2 Departmet of Mathematics, Vishu Istitute of Techology, Bhimavaram, A.P., Idia 3 Departmet of commuity Medicie, Koaseema Istitute of Medical Scieces & Research Foudatio, Amalapuram, A.P., Idia *Correspodig author: rsubbarao9@gmail.com ABSTRACT The well-kow Half Logistic probability model is chose ad derived the iverted versio of this distributio also obtaied some of its characteristics. The iverted versios of the two popular life testig models amely Rayleigh Distributio ad Half Logistic Distributios are cosidered. The variable cotrol charts for mea ad rage of subgroups for Iverse Rayleigh Distributio (IRD) ad Iverse Half Logistic Distributio (IHLD) are costructed by usig skewess corrected (SC) cotrol chart techique based o the Bowley s ad Kelly s coefficiet of skewess. The coverage probabilities are also computed by usig the techique of simulatio. The results are compared with respect to the probability models ad methods as well. KEY WORDS: Life testig models, iverted distributios, skewess corrected cotrol charts, cotrol limits ad coverage probability. 1. INTRODUCTION The p d f of Iverse Rayleigh Distributio (IRD) is give by 1 f(y; λ) = 2 e λ 2 y 3 λ 2 y 2, y > 0, λ > 0 (1.1) Where λ is the scale parameter The c d f is give by 1 F(y; λ) = e λ 2 y 2, λ > 0 (1.2) The cumulative distributio fuctio of the well-kow Half Logistic Distributio (HLD) is F(x) = 1 e bx 1+e bx If a radom variable X has a Half Logistic Distributio (HLD), the the distributio of Y= 1 may be X cosidered as iverse Half Logistic Distributio. Its cumulative distributio fuctio (cdf) is defied by F(Y) = P(Y y) = P ( 1 X y) = P (X 1 y ) = 1 P(X < 1 y ) F(Y) = 1 F ( 1 ) Which is the cumulative distributio fuctio (cdf) of the iverted distributio of Y. y F(y) = 2e b y, y > 0, b > 0 (1.3) 1+e b y The p d f of Iverse Half Logistic Distributio (IHLD) is give by 2be b y y 2 (1+e b y) f(y; b) = 2, y > 0, b > 0 (1.4) Where b is the scale parameter The reliability fuctio is R(t) = The hazard fuctio h(t) = 1 e b t 1+e b t 2be b t t 2 (1 e 2b t ) The stadard p d f of IHLD is give by 2e 1/y f(y) = y 2 (1+e 1/y ) 2 The distributioal characteristics for stadard IHLD are Media = Mode = Bowley s coefficiet of Skewess = (Q 3 Q 2 ) (Q 2 Q 1 ) = Kelly s coefficiet of Skewess = P 10+P 90 2P 50 = JCHPS Special Issue 10: December Page 51

2 Moor s coefficiet of kurtosis = Q(7 8 ) Q(5 8 ) Q(3 8 )+Q(1 8 ) = Q( 6 8 ) Q(2 8 ) Cotrol charts for process mea ad rage are developed to may symmetric ad skewed probability models by several authors. The refereces i this study icludes Cha (2003), studied o Skewess Correctio for X ad R Charts for Skewed Distributios, Katam (2006), obtaied o the Cotrol Charts for the Log-Logistic Distributio, Subba rao ad katam (2008), discussed variable cotrol charts for process mea with referece to Double Expoetial Distributio, Chaitaya (2011), determied the Kurtosis Correctio Method for Variable Cotrol Charts a Compariso i Laplace Distributio, Derya (2012), discussed o Cotrol Charts for Skewed Distributios like Weibull, Gamma, ad Logormal, Sriivasa Rao (2012), obtaied the mea ad rage charts for skewed distributios ad a compariso based o Half Logistic Distributio, Subba rao (2014), discussed o Acceptace Samplig Plas for Size Biased Lomax Model, Sriivasa rao (2014), derived the Variable Cotrol Charts Based o Percetiles of Size Biased Lomax Distributio, Sriivasa rao (2015), discussed o Variable cotrol charts based o Expoetial- Gamma distributio, Sriivasa rao (2015), attempted the variable cotrol charts based o percetiles of the ew Weibull- Pareto distributio. The research paper is orgaized as follows: for a ready referece, the summary of Cha ad Cui (2003), is give i sectio II. Costructio of skewess corrected cotrol charts adopted for IRD are preseted i sectio III. Sectio IV deals with the costructio of skewess corrected cotrol chart costats for IHLD. The coverage probabilities for both the distributios usig Bowley s ad Kelly s methods are calculated i sectio V. The summary ad coclusios betwee the two probability models with respect to the two methods are give i sectio VI. Skewess Corrected Cotrol Chart: Cha ad Cui (2003), have worked out cotrol chart costats for skewed data depedet o the coefficiet of skewess of the populatio for selected sub group sizes ad coefficiet of skewess. The cotrol limits ad the cetral lie for a skewess corrected (SC) cotrol chart for X Chart are; SC X Chart: UCL X = X + (3 + CL X = X, LCL X = X + ( 3 + 4k k 3 2 4k k 3 2 ) R ) R X + R, X R Where the costats is specially developed ad as available i Cha ad Cui (2003). The results of SC method cotrol limits are tabulated for =2 (1) 5, 7, 10 i Cha ad Cui (2003) ad these are reproduced i Table.1. Table.1. Skewess Corrected X - Chart Costats =2 =3 =4 =5 =7 =10 k If the value of k 3 for our specified model is ot ay oe of those values i the above table, it is suggested to take the earest tabulated value of k 3 or to use iterpolatio. Proceedig o similar lies the cotrol limits for the skewess corrected rage chart is give by; UCL R = [1 + (3 + d 4 ) d 3 ] R = D 4 R, SC R Chart: CL R = R, LCL R = [1 + ( 3 + d 4 ) d 3 ] R = R Where, d 3, d 4 cotrol chart costats are specially costructed takig ito cosideratio the o-ormality of the model. For ready referece the costats for SC rage chart are also reproduced here from Cha ad Cui (2003) i Table.2. JCHPS Special Issue 10: December Page 52

3 Table.2. Skewess Corrected R - Chart Costats =2 =3 =4 =5 =7 =10 k Cotrol Chart Costats for IRD: The coefficiet of skewess usig Bowley s ad Kelly s methods are calculated for Iverse Rayleigh Distributio. The Bowley s coefficiet of skewess is k 3(B) = (Q 3 Q 2 ) (Q 2 Q 1 ) = The Kelly s coefficiet of skewess is k 3(K) = P 10+P 90 2P 50 = Where Q i (i = 1, 2, 3) is the i th quartile ad P i (i = 10, 50, 90) is the percetile of the IRD. To fid the costats A L, A U, ad for specified choices of ad k 3 iterpolatio Techique is used. For the choice of IRD the costats for cotrol chart are calculated ad are preseted i Table III for X ad R charts. Table.3. Skewess Corrected Cotrol Chart Costats for IRD Bowley s coefficiet of Skewess (= ) Kelly s Coefficiet of Skewess (= ) Radom samples of size 5(5) 25 are geerated from stadard IRD. The mea ad rage are calculated for each sample. The grad mea ad the mea of the rages are also computed. Usig the costats A L, ad D 3, of Table III the cotrol limits amely UCL ad LCL of X Chart ad R- Chart for stadard IRD are calculated. Table.4. Skewess Corrected Cotrol Limits of IRD Bowley s coefficiet of Skewess (= ) Kelly s Coefficiet of Skewess (= ) LCL UCL LCL UCL LCL UCL LCL UCL Cotrol Chart Costats for IHLD: The procedure adopted to costruct the skewess corrected cotrol limits for IRD is used for Iverse Half Logistic Distributio. The values obtaied are give uder The Bowley s coefficiet of skewess is k 3(B) = (Q 3 Q 2 ) (Q 2 Q 1 ) = The Kelly s coefficiet of skewess is k 3(K) = P 10+P 90 2P 50 = Where Q i (i = 1, 2, 3) is the i th quartile ad P i (i = 10, 50, 90) is the percetile of the IHLD. To fid the costats A L, A U, ad for specified choices of ad k 3 iterpolatio techique is used. For the choice of IHLD the costats for cotrol chart are calculated ad are preseted i Table V for X ad R charts. JCHPS Special Issue 10: December Page 53

4 Table.5. Skewess Corrected Cotrol Chart Costats for IHLD Bowley s coefficiet of Skewess(=0.4509) Kelly s Coefficiet of Skewess (=0.7542) I the similar lies of IRD the cotrol limits for X Chart ad R- Chart of stadard IHLD are calculated ad are give i Table.6. Table.6. Skewess Corrected Cotrol Limits of IHLD Bowley s coefficiet of Skewess (=0.4509) Kelly s Coefficiet of Skewess (=0.7542) LCL UCL LCL UCL LCL UCL LCL UCL Calculatio of Coverage Probabilities: The umber of sub-group meas ad sub-group rages that fall withi LCL ad UCL out of 10,000 rus are oted dow. The proportios of sample poits falls withi the cotrol limits will be calculated. These proportios are amed as coverage probabilities of the respective pair of cotrol limits for X Chart ad R- Chart. The respective skewess corrected coverage probabilities separately for X ad R charts usig both the probability models IRD ad IHLD for both the methods Bowley s ad Kelly s are give i Table VII. Table.7. Coverage Probabilities X chart R - Chart IRD IHLD IRD IHLD Bowley s Kelly s Bowley s Kelly s Bowley s Kelly s Bowley s Kelly s SUMMARY & CONCLUSIONS O careful observatio of coverage probabilities give i Table.7, the followig poits are oted. With referece to X chart, for both IRD ad IHLD the preferece goes to Kelly s method, also amog the two probability models the coverage probabilities are more for IHLD whe compared with IRD. I case of Rage chart by cosiderig IRD for = 2 ad 3 Kelly s method is preferable ad for remaiig the coverage probabilities for Bowley s method are more. Therefore we may say that as is large Bowley s method is preferable. I case of IHLD also the same tred is maitaied. Therefore for Rage chart we caot coclude oe method is preferable rather tha the other. REFERENCES Chaitaya Priya M, Kurtosis Correctio Method for Variable Cotrol Charts a Compariso i Laplace Distributio, Pakista joural of statistics ad operatios research, 7 (1), 2011, Katam R.R.L, Vasudeva Rao A ad Sriivasa Rao G, Cotrol Charts for the Log-Logistic Distributio, Ecoomic Quality Cotrol, 21 (1), 2006, Karagoz Derya, Hamurkaro glu Caa ad Metodoloski zvezki, Cotrol Charts for Skewed Distributios: Weibull, Gamma, ad Logormal, 9 (2), 2012, Lai Cha K ad Heg Cui J, Skewess Correctio X ad R Charts for Skewed Distributios, Wiley Periodicals, Ic, 2003, JCHPS Special Issue 10: December Page 54

5 Sriivas Rao B, Sulema Nasiru ad Lakshmi K.N.V.R, Variable Cotrol Charts Based o Percetiles of the New Weibull-Pareto Distributio, Pakista joural of statistics ad operatios research, 9 (4), 2015, Sriivasa Rao B ad Katam R.R.L, Mea ad rage charts for skewed distributios A compariso based o half logistic distributio, Pakista Joural of Statistics, 28 (4), 2012, Sriivasa Rao B ad Sriivasa Kumar CH, Variable cotrol charts based o Expoetial-Gamma distributio, Electroic Joural of Applied Statistical Aalysis, 8 (1), 2015, Sriivasa Rao B, Durgamamba A.N ad Subba Rao R, Variable Cotrol Charts Based o Percetiles of Size Biased Lomax Distributio, Prob. Stat. Forum, 7, 2014, Subba Rao R ad Katam R.R.L, Variable Cotrol Charts for Process Mea with referece to Double Expoetial Distributio, Acta Ciecia Idica, 34 (4), Subba Rao R, Naga Durgamamba A ad Katam R.R.L, Acceptace Samplig Plas: Size Biased Lomax Model, Uiversal Joural of Applied Mathematics, 2 (4), 2014, JCHPS Special Issue 10: December Page 55

ii. Interval estimation:

ii. Interval estimation: 1 Types of estimatio: i. Poit estimatio: Example (1) Cosider the sample observatios 17,3,5,1,18,6,16,10 X 8 X i i1 8 17 3 5 118 6 16 10 8 116 8 14.5 14.5 is a poit estimate for usig the estimator X ad