Pruebas de normalidad
Heidy Judith Álvarez Pineda
2023-05-08
library(wooldridge)
data(hprice1)
head(force(hprice1),n=5)## price assess bdrms lotsize sqrft colonial lprice lassess llotsize lsqrft
## 1 300 349.1 4 6126 2438 1 5.703783 5.855359 8.720297 7.798934
## 2 370 351.5 3 9903 2076 1 5.913503 5.862210 9.200593 7.638198
## 3 191 217.7 3 5200 1374 0 5.252274 5.383118 8.556414 7.225482
## 4 195 231.8 3 4600 1448 1 5.273000 5.445875 8.433811 7.277938
## 5 373 319.1 4 6095 2514 1 5.921578 5.765504 8.715224 7.8296301. Estime el modelo
modelo_estimado <- lm(formula = price ~ lotsize + sqrft + bdrms, data = hprice1)
summary(modelo_estimado)##
## Call:
## lm(formula = price ~ lotsize + sqrft + bdrms, data = hprice1)
##
## Residuals:
## Min 1Q Median 3Q Max
## -120.026 -38.530 -6.555 32.323 209.376
##
## Coefficients:
## Estimate Std. Error t value Pr(>|t|)
## (Intercept) -2.177e+01 2.948e+01 -0.739 0.46221
## lotsize 2.068e-03 6.421e-04 3.220 0.00182 **
## sqrft 1.228e-01 1.324e-02 9.275 1.66e-14 ***
## bdrms 1.385e+01 9.010e+00 1.537 0.12795
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
##
## Residual standard error: 59.83 on 84 degrees of freedom
## Multiple R-squared: 0.6724, Adjusted R-squared: 0.6607
## F-statistic: 57.46 on 3 and 84 DF, p-value: < 2.2e-162. Verifique el supuesto de normalidad a traves de:
a) La prueba JB
library(tseries)## Registered S3 method overwritten by 'quantmod':
## method from
## as.zoo.data.frame zoosalida_JB <- jarque.bera.test(modelo_estimado$residuals)
salida_JB##
## Jarque Bera Test
##
## data: modelo_estimado$residuals
## X-squared = 32.278, df = 2, p-value = 9.794e-08# Cargar el paquete fastGraph
library(fastGraph)
# Establecer el nivel de significancia alpha
alpha_sig <- 0.05
# Extraer el valor del estadístico JB del objeto de salida de la prueba de Jarque-Bera
JB <- salida_JB$statistic
# Extraer el número de grados de libertad de la distribución chi-cuadrado del objeto de salida de la prueba de Jarque-Bera
gl <- salida_JB$parameter
# Calcular el valor crítico de la distribución chi-cuadrado para el nivel de significancia alpha y los grados de libertad gl
VC <- qchisq(1 - alpha_sig, gl, lower.tail = TRUE)
# Graficar la distribución chi-cuadrado sombreada a partir del valor de JB, los grados de libertad gl y el valor crítico VC, con una línea vertical que indica el valor de JB
# También se establece el subtitulo de la gráfica con los valores de VC y JB redondeados a 2 decimales
shadeDist(JB, ddist = "dchisq", parm1 = gl, lower.tail = FALSE, xmin = 0, sub = paste("VC:", round(VC, 2), " ", "JB:", round(JB, 2)))
b) La prueba KS
library(dplyr) # Carga la librería dplyr para manipulación de datos##
## Attaching package: 'dplyr'## The following objects are masked from 'package:stats':
##
## filter, lag## The following objects are masked from 'package:base':
##
## intersect, setdiff, setequal, unionlibrary(gt) # Carga la librería gt para crear tablas con estilo
library(gtExtras) # Carga la librería gtExtras para aplicar estilos a las tablas
# Obtiene los residuos del modelo y los almacena en una tibble
residuos <- modelo_estimado$residuals %>%
as_tibble() %>%
# Añade una columna con la posición de cada residuo en la tibble
mutate(Position = row_number()) %>%
# Ordena los residuos de menor a mayor
arrange(value) %>%
# Calcula la distribución empírica de los residuos
mutate(dist1 = row_number() / n()) %>%
mutate(dist2 = (row_number() - 1) / n()) %>%
# Estandariza los residuos
mutate(zi = as.vector(scale(value, center = TRUE))) %>%
# Calcula la probabilidad acumulada de los residuos
mutate(pi = pnorm(zi, lower.tail = TRUE)) %>%
# Calcula la diferencia entre la distribución empírica y la normal
mutate(dif1 = abs(dist1 - pi)) %>%
mutate(dif2 = abs(dist2 - pi)) %>%
# Renombra la columna "value" a "residuales"
rename(residuales = value)
# Almacena la tabla de los residuos estandarizados y la diferencia entre las distribuciones en una variable
tabla_KS <- residuos
# Crea la tabla con estilo
tabla_KS %>%
gt() %>%
# Añade el encabezado
tab_header("Tabla para calcular el estadistico KS") %>%
# Añade la nota de fuente
tab_source_note(source_note = "Fuente: Elaboración propia") %>%
# Aplica el estilo a las celdas con la máxima diferencia de la distribución empírica y la normal
tab_style(
style = list(cell_fill(color="#13b407"), cell_text(style = "italic")),
locations = cells_body(columns = dif1, rows = dif1 == max(dif1))
) %>%
tab_style(
style = list(cell_fill(color="#0e85b0"), cell_text(style = "italic")),
locations = cells_body(columns = dif2, rows = dif2 == max(dif2))
)| Tabla para calcular el estadistico KS | |||||||
| residuales | Position | dist1 | dist2 | zi | pi | dif1 | dif2 |
|---|---|---|---|---|---|---|---|
| -120.026447 | 81 | 0.01136364 | 0.00000000 | -2.041515459 | 0.02059981 | 0.0092361731 | 0.0205998094 |
| -115.508697 | 77 | 0.02272727 | 0.01136364 | -1.964673586 | 0.02472601 | 0.0019987418 | 0.0133623781 |
| -107.080889 | 24 | 0.03409091 | 0.02272727 | -1.821326006 | 0.03427866 | 0.0001877487 | 0.0115513850 |
| -91.243980 | 48 | 0.04545455 | 0.03409091 | -1.551957925 | 0.06033615 | 0.0148816002 | 0.0262452366 |
| -85.461169 | 12 | 0.05681818 | 0.04545455 | -1.453598781 | 0.07302879 | 0.0162106057 | 0.0275742421 |
| -77.172687 | 32 | 0.06818182 | 0.05681818 | -1.312620980 | 0.09465535 | 0.0264735301 | 0.0378371665 |
| -74.702719 | 54 | 0.07954545 | 0.06818182 | -1.270609602 | 0.10193378 | 0.0223883300 | 0.0337519664 |
| -65.502849 | 39 | 0.09090909 | 0.07954545 | -1.114130117 | 0.13261169 | 0.0417025941 | 0.0530662305 |
| -63.699108 | 69 | 0.10227273 | 0.09090909 | -1.083450505 | 0.13930425 | 0.0370315271 | 0.0483951634 |
| -62.566594 | 83 | 0.11363636 | 0.10227273 | -1.064187703 | 0.14362184 | 0.0299854747 | 0.0413491110 |
| -59.845223 | 36 | 0.12500000 | 0.11363636 | -1.017900230 | 0.15436269 | 0.0293626861 | 0.0407263225 |
| -54.466158 | 13 | 0.13636364 | 0.12500000 | -0.926408352 | 0.17711690 | 0.0407532663 | 0.0521169027 |
| -54.300415 | 14 | 0.14772727 | 0.13636364 | -0.923589260 | 0.17785010 | 0.0301228311 | 0.0414864675 |
| -52.129801 | 15 | 0.15909091 | 0.14772727 | -0.886669532 | 0.18762842 | 0.0285375141 | 0.0399011505 |
| -51.441108 | 17 | 0.17045455 | 0.15909091 | -0.874955638 | 0.19079902 | 0.0203444766 | 0.0317081129 |
| -48.704980 | 47 | 0.18181818 | 0.17045455 | -0.828417174 | 0.20371714 | 0.0218989601 | 0.0332625965 |
| -48.350295 | 29 | 0.19318182 | 0.18181818 | -0.822384375 | 0.20542908 | 0.0122472664 | 0.0236109028 |
| -47.855859 | 11 | 0.20454545 | 0.19318182 | -0.813974573 | 0.20782976 | 0.0032843043 | 0.0146479407 |
| -45.639765 | 1 | 0.21590909 | 0.20454545 | -0.776281294 | 0.21879146 | 0.0028823668 | 0.0142460032 |
| -43.142550 | 9 | 0.22727273 | 0.21590909 | -0.733806463 | 0.23153335 | 0.0042606233 | 0.0156242596 |
| -41.749618 | 57 | 0.23863636 | 0.22727273 | -0.710114247 | 0.23881665 | 0.0001802823 | 0.0115439187 |
| -40.869022 | 27 | 0.25000000 | 0.23863636 | -0.695136302 | 0.24348494 | 0.0065150566 | 0.0048485798 |
| -37.749811 | 34 | 0.26136364 | 0.25000000 | -0.642082009 | 0.26040997 | 0.0009536682 | 0.0104099682 |
| -36.663785 | 71 | 0.27272727 | 0.26136364 | -0.623609925 | 0.26644190 | 0.0062853771 | 0.0050782592 |
| -36.646568 | 79 | 0.28409091 | 0.27272727 | -0.623317083 | 0.26653809 | 0.0175528221 | 0.0061891857 |
| -33.801248 | 37 | 0.29545455 | 0.28409091 | -0.574921384 | 0.28267223 | 0.0127823120 | 0.0014186757 |
| -29.766931 | 16 | 0.30681818 | 0.29545455 | -0.506302171 | 0.30632227 | 0.0004959124 | 0.0108677240 |
| -26.696234 | 22 | 0.31818182 | 0.30681818 | -0.454073044 | 0.32488813 | 0.0067063089 | 0.0180699452 |
| -24.271531 | 23 | 0.32954545 | 0.31818182 | -0.412831567 | 0.33986501 | 0.0103195566 | 0.0216831929 |
| -23.651448 | 86 | 0.34090909 | 0.32954545 | -0.402284648 | 0.34373728 | 0.0028281851 | 0.0141918214 |
| -19.683427 | 88 | 0.35227273 | 0.34090909 | -0.334793052 | 0.36889060 | 0.0166178738 | 0.0279815102 |
| -17.817835 | 10 | 0.36363636 | 0.35227273 | -0.303061413 | 0.38092153 | 0.0172851663 | 0.0286488027 |
| -16.762094 | 60 | 0.37500000 | 0.36363636 | -0.285104441 | 0.38778206 | 0.0127820638 | 0.0241457002 |
| -16.596960 | 21 | 0.38636364 | 0.37500000 | -0.282295711 | 0.38885839 | 0.0024947507 | 0.0138583870 |
| -16.271207 | 58 | 0.39772727 | 0.38636364 | -0.276755010 | 0.39098411 | 0.0067431583 | 0.0046204781 |
| -13.815798 | 56 | 0.40909091 | 0.39772727 | -0.234991254 | 0.40710776 | 0.0019831485 | 0.0093804879 |
| -13.462160 | 75 | 0.42045455 | 0.40909091 | -0.228976273 | 0.40944368 | 0.0110108666 | 0.0003527698 |
| -12.081520 | 4 | 0.43181818 | 0.42045455 | -0.205493119 | 0.41859344 | 0.0132247451 | 0.0018611087 |
| -11.629207 | 51 | 0.44318182 | 0.43181818 | -0.197799788 | 0.42160086 | 0.0215809622 | 0.0102173258 |
| -11.312669 | 74 | 0.45454545 | 0.44318182 | -0.192415834 | 0.42370825 | 0.0308372092 | 0.0194735728 |
| -8.236558 | 3 | 0.46590909 | 0.45454545 | -0.140094626 | 0.44429261 | 0.0216164775 | 0.0102528411 |
| -7.662789 | 70 | 0.47727273 | 0.46590909 | -0.130335452 | 0.44815052 | 0.0291222111 | 0.0177585748 |
| -6.752801 | 67 | 0.48863636 | 0.47727273 | -0.114857588 | 0.45427900 | 0.0343573625 | 0.0229937262 |
| -6.707262 | 31 | 0.50000000 | 0.48863636 | -0.114083016 | 0.45458599 | 0.0454140074 | 0.0340503710 |
| -6.402439 | 85 | 0.51136364 | 0.50000000 | -0.108898313 | 0.45664157 | 0.0547220642 | 0.0433584278 |
| -5.446904 | 82 | 0.52272727 | 0.51136364 | -0.092645733 | 0.46309251 | 0.0596347676 | 0.0482711313 |
| -3.537785 | 43 | 0.53409091 | 0.52272727 | -0.060173762 | 0.47600862 | 0.0580822876 | 0.0467186512 |
| -2.824941 | 61 | 0.54545455 | 0.53409091 | -0.048049090 | 0.48083856 | 0.0646159857 | 0.0532523493 |
| -2.745208 | 68 | 0.55681818 | 0.54545455 | -0.046692922 | 0.48137899 | 0.0754391961 | 0.0640755598 |
| -0.195089 | 65 | 0.56818182 | 0.55681818 | -0.003318245 | 0.49867621 | 0.0695056040 | 0.0581419676 |
| 1.399296 | 55 | 0.57954545 | 0.56818182 | 0.023800450 | 0.50949411 | 0.0700513452 | 0.0586877088 |
| 5.363331 | 26 | 0.59090909 | 0.57954545 | 0.091224254 | 0.53634280 | 0.0545662924 | 0.0432026561 |
| 6.700640 | 53 | 0.60227273 | 0.59090909 | 0.113970383 | 0.54536936 | 0.0569033628 | 0.0455397265 |
| 7.386314 | 80 | 0.61363636 | 0.60227273 | 0.125632935 | 0.54998875 | 0.0636476093 | 0.0522839730 |
| 9.099900 | 41 | 0.62500000 | 0.61363636 | 0.154779103 | 0.56150227 | 0.0634977329 | 0.0521340965 |
| 12.433611 | 46 | 0.63636364 | 0.62500000 | 0.211481796 | 0.58374433 | 0.0526193043 | 0.0412556680 |
| 16.718018 | 62 | 0.64772727 | 0.63636364 | 0.284354766 | 0.61193074 | 0.0357965328 | 0.0244328965 |
| 18.093192 | 5 | 0.65909091 | 0.64772727 | 0.307744934 | 0.62086179 | 0.0382291219 | 0.0268654856 |
| 18.801816 | 38 | 0.67045455 | 0.65909091 | 0.319797835 | 0.62543921 | 0.0450153400 | 0.0336517036 |
| 19.168108 | 33 | 0.68181818 | 0.67045455 | 0.326028052 | 0.62779843 | 0.0540197476 | 0.0426561112 |
| 19.219211 | 72 | 0.69318182 | 0.68181818 | 0.326897255 | 0.62812720 | 0.0650546167 | 0.0536909803 |
| 20.334434 | 59 | 0.70454545 | 0.69318182 | 0.345865960 | 0.63527827 | 0.0692671805 | 0.0579035442 |
| 24.909926 | 78 | 0.71590909 | 0.70454545 | 0.423689939 | 0.66410402 | 0.0518050676 | 0.0404414312 |
| 26.236229 | 40 | 0.72727273 | 0.71590909 | 0.446248874 | 0.67229126 | 0.0549814685 | 0.0436178321 |
| 30.924022 | 25 | 0.73863636 | 0.72727273 | 0.525982978 | 0.70054998 | 0.0380863808 | 0.0267227444 |
| 32.253952 | 45 | 0.75000000 | 0.73863636 | 0.548603608 | 0.70836125 | 0.0416387548 | 0.0302751184 |
| 32.529367 | 49 | 0.76136364 | 0.75000000 | 0.553288104 | 0.70996693 | 0.0513967091 | 0.0400330727 |
| 32.675968 | 18 | 0.77272727 | 0.76136364 | 0.555781630 | 0.71081993 | 0.0619073452 | 0.0505437088 |
| 33.275839 | 20 | 0.78409091 | 0.77272727 | 0.565984762 | 0.71429793 | 0.0697929786 | 0.0584293423 |
| 36.031430 | 52 | 0.79545455 | 0.78409091 | 0.612854281 | 0.73001365 | 0.0654408934 | 0.0540772571 |
| 37.147186 | 84 | 0.80681818 | 0.79545455 | 0.631832029 | 0.73625168 | 0.0705665028 | 0.0592028664 |
| 40.320875 | 7 | 0.81818182 | 0.80681818 | 0.685812928 | 0.75358446 | 0.0645973596 | 0.0532337232 |
| 44.334467 | 30 | 0.82954545 | 0.81818182 | 0.754079634 | 0.77459930 | 0.0549461574 | 0.0435825211 |
| 46.907165 | 28 | 0.84090909 | 0.82954545 | 0.797838357 | 0.78751785 | 0.0533912405 | 0.0420276041 |
| 54.418366 | 87 | 0.85227273 | 0.84090909 | 0.925595465 | 0.82267187 | 0.0296008528 | 0.0182372164 |
| 55.091131 | 35 | 0.86363636 | 0.85227273 | 0.937038450 | 0.82563061 | 0.0380057535 | 0.0266421172 |
| 55.470305 | 44 | 0.87500000 | 0.86363636 | 0.943487765 | 0.82728426 | 0.0477157353 | 0.0363520989 |
| 62.939597 | 6 | 0.88636364 | 0.87500000 | 1.070532059 | 0.85781006 | 0.0285535797 | 0.0171899433 |
| 66.478628 | 50 | 0.89772727 | 0.88636364 | 1.130727018 | 0.87091500 | 0.0268122757 | 0.0154486394 |
| 67.426518 | 63 | 0.90909091 | 0.89772727 | 1.146849569 | 0.87427810 | 0.0348128083 | 0.0234491719 |
| 67.603959 | 19 | 0.92045455 | 0.90909091 | 1.149867648 | 0.87490081 | 0.0455537393 | 0.0341901029 |
| 69.707122 | 64 | 0.93181818 | 0.92045455 | 1.185640095 | 0.88211777 | 0.0497004123 | 0.0383367759 |
| 69.843246 | 8 | 0.94318182 | 0.93181818 | 1.187955411 | 0.88257451 | 0.0606073068 | 0.0492436705 |
| 74.848732 | 2 | 0.95454545 | 0.94318182 | 1.273093116 | 0.89850750 | 0.0560379553 | 0.0446743189 |
| 112.729191 | 66 | 0.96590909 | 0.95454545 | 1.917397313 | 0.97240626 | 0.0064971714 | 0.0178608078 |
| 163.795081 | 73 | 0.97727273 | 0.96590909 | 2.785970904 | 0.99733162 | 0.0200588896 | 0.0314225260 |
| 198.660139 | 42 | 0.98863636 | 0.97727273 | 3.378986513 | 0.99963623 | 0.0109998685 | 0.0223635048 |
| 209.375830 | 76 | 1.00000000 | 0.98863636 | 3.561248407 | 0.99981545 | 0.0001845478 | 0.0111790885 |
| Fuente: Elaboración propia | |||||||
Calculo del estadistico
D<-max(max(tabla_KS$dif1),max(tabla_KS$dif2))
print(D)## [1] 0.0754392Usando nortest
library(nortest)
prueba_KS<-lillie.test(modelo_estimado$residuals)
prueba_KS##
## Lilliefors (Kolmogorov-Smirnov) normality test
##
## data: modelo_estimado$residuals
## D = 0.075439, p-value = 0.24960.075443 > 0.05 No se rechaza la hipotesis nula: ϵ∼N(0,σ2), por lo que los residuos siguen una distribución normal.
p.value<-prueba_KS$p.value3. Prueba de Shapiro - Wilk
Calculo Manual
library(dplyr)
library(gt)
# Obtener los residuos del modelo
residuos <- modelo_estimado$residuals
# Crear la tabla para el test de Shapiro-Wilk
residuos %>%
as_tibble() %>%
rename(residuales=value) %>%
arrange(residuales) %>%
mutate(pi=(row_number()-0.375)/(n()+0.25)) %>%
mutate(mi=qnorm(pi,lower.tail = TRUE)) %>%
mutate(ai=0) -> tabla_SW
# Calcular los valores de ai
m <- sum(tabla_SW$mi^2)
n <- nrow(hprice1)
theta <- 1/sqrt(n)
tabla_SW$ai[n] <- -2.706056*theta^5+4.434685*theta^4-2.071190*theta^3-0.147981*theta^2+0.2211570*theta+tabla_SW$mi[n]/sqrt(m)
tabla_SW$ai[n-1] <- -3.582633*theta^5+5.682633*theta^4-1.752461*theta^3-0.293762*theta^2+0.042981*theta+tabla_SW$mi[n-1]/sqrt(m)
tabla_SW$ai[1] <- -tabla_SW$ai[n]
tabla_SW$ai[2] <- -tabla_SW$ai[n-1]
omega <- (m-2*tabla_SW$mi[n]^2-2*tabla_SW$mi[n-1]^2)/(1-2*tabla_SW$ai[n]^2-2*tabla_SW$ai[n-1]^2)
tabla_SW$ai[3:(n-2)] <- tabla_SW$mi[3:(n-2)]/sqrt(omega)
# Calcular los valores de ai_ui y ui^2
tabla_SW %>%
mutate(ai_ui=ai*residuales,ui2=residuales^2) -> tabla_SW
# Mostrar la tabla con los resultados del test de Shapiro-Wilk
tabla_SW %>%
gt() %>% tab_header("Tabla para calcular el Estadistico W") %>%
tab_source_note(source_note = "Fuente: Elaboración propia")| Tabla para calcular el Estadistico W | |||||
| residuales | pi | mi | ai | ai_ui | ui2 |
|---|---|---|---|---|---|
| -120.026447 | 0.007082153 | -2.45306927 | -0.286093929 | 34.338837782 | 1.440635e+04 |
| -115.508697 | 0.018413598 | -2.08767462 | -0.226331231 | 26.143225495 | 1.334226e+04 |
| -107.080889 | 0.029745042 | -1.88455395 | -0.201511408 | 21.578020632 | 1.146632e+04 |
| -91.243980 | 0.041076487 | -1.73832835 | -0.185875811 | 16.960048752 | 8.325464e+03 |
| -85.461169 | 0.052407932 | -1.62194155 | -0.173430814 | 14.821600075 | 7.303611e+03 |
| -77.172687 | 0.063739377 | -1.52411994 | -0.162970954 | 12.576906330 | 5.955624e+03 |
| -74.702719 | 0.075070822 | -1.43903134 | -0.153872609 | 11.494702279 | 5.580496e+03 |
| -65.502849 | 0.086402266 | -1.36324747 | -0.145769197 | 9.548297773 | 4.290623e+03 |
| -63.699108 | 0.097733711 | -1.29457343 | -0.138426027 | 8.817614500 | 4.057576e+03 |
| -62.566594 | 0.109065156 | -1.23151500 | -0.131683320 | 8.238976839 | 3.914579e+03 |
| -59.845223 | 0.120396601 | -1.17300649 | -0.125427129 | 7.506214499 | 3.581451e+03 |
| -54.466158 | 0.131728045 | -1.11825971 | -0.119573169 | 6.512691096 | 2.966562e+03 |
| -54.300415 | 0.143059490 | -1.06667420 | -0.114057239 | 6.193355472 | 2.948535e+03 |
| -52.129801 | 0.154390935 | -1.01778137 | -0.108829231 | 5.673246083 | 2.717516e+03 |
| -51.441108 | 0.165722380 | -0.97120790 | -0.103849228 | 5.342119306 | 2.646188e+03 |
| -48.704980 | 0.177053824 | -0.92665123 | -0.099084876 | 4.825926905 | 2.372175e+03 |
| -48.350295 | 0.188385269 | -0.88386232 | -0.094509548 | 4.569564512 | 2.337751e+03 |
| -47.855859 | 0.199716714 | -0.84263354 | -0.090101040 | 4.311862673 | 2.290183e+03 |
| -45.639765 | 0.211048159 | -0.80278966 | -0.085840618 | 3.917745629 | 2.082988e+03 |
| -43.142550 | 0.222379603 | -0.76418130 | -0.081712307 | 3.525277277 | 1.861280e+03 |
| -41.749618 | 0.233711048 | -0.72667986 | -0.077702356 | 3.244043648 | 1.743031e+03 |
| -40.869022 | 0.245042493 | -0.69017366 | -0.073798824 | 3.016085791 | 1.670277e+03 |
| -37.749811 | 0.256373938 | -0.65456498 | -0.069991263 | 2.642156946 | 1.425048e+03 |
| -36.663785 | 0.267705382 | -0.61976766 | -0.066270458 | 2.429725818 | 1.344233e+03 |
| -36.646568 | 0.279036827 | -0.58570518 | -0.062628228 | 2.295109622 | 1.342971e+03 |
| -33.801248 | 0.290368272 | -0.55230918 | -0.059057264 | 1.996209250 | 1.142524e+03 |
| -29.766931 | 0.301699717 | -0.51951819 | -0.055550992 | 1.653582575 | 8.860702e+02 |
| -26.696234 | 0.313031161 | -0.48727661 | -0.052103467 | 1.390966354 | 7.126889e+02 |
| -24.271531 | 0.324362606 | -0.45553386 | -0.048709282 | 1.182248861 | 5.891072e+02 |
| -23.651448 | 0.335694051 | -0.42424369 | -0.045363489 | 1.072912217 | 5.593910e+02 |
| -19.683427 | 0.347025496 | -0.39336354 | -0.042061540 | 0.827915257 | 3.874373e+02 |
| -17.817835 | 0.358356941 | -0.36285409 | -0.038799229 | 0.691318234 | 3.174752e+02 |
| -16.762094 | 0.369688385 | -0.33267878 | -0.035572645 | 0.596272007 | 2.809678e+02 |
| -16.596960 | 0.381019830 | -0.30280344 | -0.032378138 | 0.537378676 | 2.754591e+02 |
| -16.271207 | 0.392351275 | -0.27319601 | -0.029212277 | 0.475319006 | 2.647522e+02 |
| -13.815798 | 0.403682720 | -0.24382619 | -0.026071824 | 0.360203050 | 1.908763e+02 |
| -13.462160 | 0.415014164 | -0.21466524 | -0.022953704 | 0.309006447 | 1.812298e+02 |
| -12.081520 | 0.426345609 | -0.18568573 | -0.019854987 | 0.239878409 | 1.459631e+02 |
| -11.629207 | 0.437677054 | -0.15686137 | -0.016772858 | 0.195055032 | 1.352385e+02 |
| -11.312669 | 0.449008499 | -0.12816677 | -0.013704604 | 0.155035654 | 1.279765e+02 |
| -8.236558 | 0.460339943 | -0.09957734 | -0.010647596 | 0.087699542 | 6.784089e+01 |
| -7.662789 | 0.471671388 | -0.07106908 | -0.007599268 | 0.058231584 | 5.871833e+01 |
| -6.752801 | 0.483002833 | -0.04261848 | -0.004557105 | 0.030773222 | 4.560033e+01 |
| -6.707262 | 0.494334278 | -0.01420234 | -0.001518626 | 0.010185824 | 4.498736e+01 |
| -6.402439 | 0.505665722 | 0.01420234 | 0.001518626 | -0.009722911 | 4.099122e+01 |
| -5.446904 | 0.516997167 | 0.04261848 | 0.004557105 | -0.024822110 | 2.966876e+01 |
| -3.537785 | 0.528328612 | 0.07106908 | 0.007599268 | -0.026884576 | 1.251592e+01 |
| -2.824941 | 0.539660057 | 0.09957734 | 0.010647596 | -0.030078835 | 7.980294e+00 |
| -2.745208 | 0.550991501 | 0.12816677 | 0.013704604 | -0.037621996 | 7.536170e+00 |
| -0.195089 | 0.562322946 | 0.15686137 | 0.016772858 | -0.003272200 | 3.805971e-02 |
| 1.399296 | 0.573654391 | 0.18568573 | 0.019854987 | 0.027782994 | 1.958028e+00 |
| 5.363331 | 0.584985836 | 0.21466524 | 0.022953704 | 0.123108313 | 2.876532e+01 |
| 6.700640 | 0.596317280 | 0.24382619 | 0.026071824 | 0.174697904 | 4.489858e+01 |
| 7.386314 | 0.607648725 | 0.27319601 | 0.029212277 | 0.215771059 | 5.455764e+01 |
| 9.099900 | 0.618980170 | 0.30280344 | 0.032378138 | 0.294637808 | 8.280817e+01 |
| 12.433611 | 0.630311615 | 0.33267878 | 0.035572645 | 0.442296424 | 1.545947e+02 |
| 16.718018 | 0.641643059 | 0.36285409 | 0.038799229 | 0.648646203 | 2.794921e+02 |
| 18.093192 | 0.652974504 | 0.39336354 | 0.042061540 | 0.761027520 | 3.273636e+02 |
| 18.801816 | 0.664305949 | 0.42424369 | 0.045363489 | 0.852915978 | 3.535083e+02 |
| 19.168108 | 0.675637394 | 0.45553386 | 0.048709282 | 0.933664777 | 3.674164e+02 |
| 19.219211 | 0.686968839 | 0.48727661 | 0.052103467 | 1.001387528 | 3.693781e+02 |
| 20.334434 | 0.698300283 | 0.51951819 | 0.055550992 | 1.129598008 | 4.134892e+02 |
| 24.909926 | 0.709631728 | 0.55230918 | 0.059057264 | 1.471112049 | 6.205044e+02 |
| 26.236229 | 0.720963173 | 0.58570518 | 0.062628228 | 1.643128534 | 6.883397e+02 |
| 30.924022 | 0.732294618 | 0.61976766 | 0.066270458 | 2.049349072 | 9.562951e+02 |
| 32.253952 | 0.743626062 | 0.65456498 | 0.069991263 | 2.257494854 | 1.040317e+03 |
| 32.529367 | 0.754957507 | 0.69017366 | 0.073798824 | 2.400629035 | 1.058160e+03 |
| 32.675968 | 0.766288952 | 0.72667986 | 0.077702356 | 2.538999708 | 1.067719e+03 |
| 33.275839 | 0.777620397 | 0.76418130 | 0.081712307 | 2.719045583 | 1.107281e+03 |
| 36.031430 | 0.788951841 | 0.80278966 | 0.085840618 | 3.092960242 | 1.298264e+03 |
| 37.147186 | 0.800283286 | 0.84263354 | 0.090101040 | 3.347000059 | 1.379913e+03 |
| 40.320875 | 0.811614731 | 0.88386232 | 0.094509548 | 3.810707636 | 1.625773e+03 |
| 44.334467 | 0.822946176 | 0.92665123 | 0.099084876 | 4.392875123 | 1.965545e+03 |
| 46.907165 | 0.834277620 | 0.97120790 | 0.103849228 | 4.871272904 | 2.200282e+03 |
| 54.418366 | 0.845609065 | 1.01778137 | 0.108829231 | 5.922308882 | 2.961359e+03 |
| 55.091131 | 0.856940510 | 1.06667420 | 0.114057239 | 6.283542333 | 3.035033e+03 |
| 55.470305 | 0.868271955 | 1.11825971 | 0.119573169 | 6.632760113 | 3.076955e+03 |
| 62.939597 | 0.879603399 | 1.17300649 | 0.125427129 | 7.894332885 | 3.961393e+03 |
| 66.478628 | 0.890934844 | 1.23151500 | 0.131683320 | 8.754126443 | 4.419408e+03 |
| 67.426518 | 0.902266289 | 1.29457343 | 0.138426027 | 9.333585010 | 4.546335e+03 |
| 67.603959 | 0.913597734 | 1.36324747 | 0.145769197 | 9.854574914 | 4.570295e+03 |
| 69.707122 | 0.924929178 | 1.43903134 | 0.153872609 | 10.726016772 | 4.859083e+03 |
| 69.843246 | 0.936260623 | 1.52411994 | 0.162970954 | 11.382420482 | 4.878079e+03 |
| 74.848732 | 0.947592068 | 1.62194155 | 0.173430814 | 12.981076532 | 5.602333e+03 |
| 112.729191 | 0.958923513 | 1.73832835 | 0.185875811 | 20.953629849 | 1.270787e+04 |
| 163.795081 | 0.970254958 | 1.88455395 | 0.201511408 | 33.006577315 | 2.682883e+04 |
| 198.660139 | 0.981586402 | 2.08767462 | 0.226331231 | 44.962993843 | 3.946585e+04 |
| 209.375830 | 0.992917847 | 2.45306927 | 0.286093929 | 59.901153719 | 4.383824e+04 |
| Fuente: Elaboración propia | |||||
calculos del estadistico W
W<-(sum(tabla_SW$ai_ui)^2)/sum(tabla_SW$ui2)
print(W)## [1] 0.9413208Calculo del Wn
# Calcular el valor esperado y la desviación estándar de Wn
mu <- 0.0038915*log(n)^3 - 0.083751*log(n)^2 - 0.31082*log(n) - 1.5861
sigma <- exp(0.0030302*log(n)^2 - 0.082676*log(n) - 0.4803)
# Calcule la estadística de prueba estandarizada Wn
Wn <- (log(1-W) - mu) / sigma
print(Wn)## [1] 3.241867P value
p.value<-pnorm(Wn,lower.tail = FALSE)
print(p.value)## [1] 0.0005937472library(fastGraph)
shadeDist(Wn,ddist = "dnorm",lower.tail = FALSE)
Dado que 0.0005937472 < 0.05 Se rechaza la hipotesis nula: ϵ∼N(0,σ2), por lo que los residuos no siguen una distribución normal.
Usando librerias
salida_SW<-shapiro.test(modelo_estimado$residuals)
print(salida_SW)##
## Shapiro-Wilk normality test
##
## data: modelo_estimado$residuals
## W = 0.94132, p-value = 0.0005937Calculando el Wn
Wn_salida<-qnorm(salida_SW$p.value,lower.tail = FALSE)
print(Wn_salida)## [1] 3.241867