b:head_first_statistics:using_the_normal_distribution
Differences
This shows you the differences between two versions of the page.
| Both sides previous revisionPrevious revisionNext revision | Previous revision | ||
| b:head_first_statistics:using_the_normal_distribution [2022/10/27 22:59] – [Exercise] hkimscil | b:head_first_statistics:using_the_normal_distribution [2024/10/28 08:09] (current) – […then squash the width] hkimscil | ||
|---|---|---|---|
| Line 88: | Line 88: | ||
| ===== So how do we find normal probabilities? | ===== So how do we find normal probabilities? | ||
| + | 평균이 0 이고 표준편차가 1일 Normal distribution 에서의 probabilities는 아래의 PDF 파일과 같이 구해 놓은 값이 있다 | ||
| + | (R을 이용하지 않는다면). [[https:// | ||
| + | 평균과 표준편차 값이 0, 1이 아닌 다른 값을 같는 분포는 0, 1 이 되도록 변환한 후에 probability를 구한다 (표준점수화). | ||
| + | |||
| + | |||
| {{: | {{: | ||
| Line 132: | Line 137: | ||
| z & = & \displaystyle \frac {x - \mu}{\sigma} \\ | z & = & \displaystyle \frac {x - \mu}{\sigma} \\ | ||
| & = & \frac {64-71} {4.5} \\ | & = & \frac {64-71} {4.5} \\ | ||
| - | & = & 1.56 | + | & = & - 1.56 |
| \end{eqnarray*} | \end{eqnarray*} | ||
| - | 따라서, 표준점수를 1.56을 가지고 표준점수 테이블에서 1.56보다 큰 부분의 면적을 구한것을 참조하면 된다. | + | 따라서, 표준점수를 |
| - | < | + | < |
| - | > scale(a) | + | > 1 - pnorm(-1.56) |
| - | [,1] | + | [1] 0.9406201 |
| - | [1,] -1.70622042 | + | > pnorm(-1.56, lower.tail = FALSE) |
| - | [2,] -1.67175132 | + | [1] 0.9406201 |
| - | [3,] -1.63728222 | + | > pnorm(64, 71, sqrt(20.25), lower.tail = FALSE) |
| - | [4,] -1.60281312 | + | [1] 0.9400931 |
| - | | + | > |
| - | [6,] -1.53387492 | + | </ |
| - | [7,] -1.49940582 | + | |
| - | [8,] -1.46493672 | + | |
| - | [9,] -1.43046762 | + | |
| - | [10,] -1.39599852 | + | |
| - | [11,] -1.36152943 | + | |
| - | [12,] -1.32706033 | + | |
| - | [13,] -1.29259123 | + | |
| - | [14,] -1.25812213 | + | |
| - | [15,] -1.22365303 | + | |
| - | [16,] -1.18918393 | + | |
| - | [17,] -1.15471483 | + | |
| - | [18,] -1.12024573 | + | |
| - | [19,] -1.08577663 | + | |
| - | [20,] -1.05130753 | + | |
| - | [21,] -1.01683843 | + | |
| - | [22,] -0.98236933 | + | |
| - | [23,] -0.94790023 | + | |
| - | [24,] -0.91343113 | + | |
| - | [25,] -0.87896203 | + | |
| - | [26,] -0.84449293 | + | |
| - | [27,] -0.81002384 | + | |
| - | [28,] -0.77555474 | + | |
| - | [29,] -0.74108564 | + | |
| - | [30,] -0.70661654 | + | |
| - | [31,] -0.67214744 | + | |
| - | [32,] -0.63767834 | + | |
| - | [33,] -0.60320924 | + | |
| - | [34,] -0.56874014 | + | |
| - | [35,] -0.53427104 | + | |
| - | [36,] -0.49980194 | + | |
| - | [37,] -0.46533284 | + | |
| - | [38,] -0.43086374 | + | |
| - | [39,] -0.39639464 | + | |
| - | [40,] -0.36192554 | + | |
| - | [41,] -0.32745644 | + | |
| - | [42,] -0.29298734 | + | |
| - | [43,] -0.25851825 | + | |
| - | [44,] -0.22404915 | + | |
| - | [45,] -0.18958005 | + | |
| - | [46,] -0.15511095 | + | |
| - | [47,] -0.12064185 | + | |
| - | [48,] -0.08617275 | + | |
| - | [49,] -0.05170365 | + | |
| - | [50,] -0.01723455 | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | [64,] 0.46533284 | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | [71,] 0.70661654 | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | | + | |
| - | [100, | + | |
| - | attr(," | + | |
| - | [1] 50.5 | + | |
| - | attr(," | + | |
| - | [1] 29.01149 | + | |
| - | > aa <- scale(a) | + | |
| - | > mean(aa) | + | |
| - | [1] 0 | + | |
| - | > sd(aa) | + | |
| - | [1] 1 | + | |
| - | > </ | + | |
| ==== exercise ==== | ==== exercise ==== | ||
| Line 288: | Line 189: | ||
| ===== Exercise ===== | ===== Exercise ===== | ||
| Julie with 5" heels = 64 + 5 = 69 | Julie with 5" heels = 64 + 5 = 69 | ||
| + | Remember X ~ N(71, 20.25) | ||
| + | mean = 71 | ||
| + | variance = 20.25 | ||
| + | sd = 4.5 | ||
| + | z = (71-69)/4.5 | ||
| z score = -0.44 | z score = -0.44 | ||
| Line 431: | Line 337: | ||
| </ | </ | ||
| {{: | {{: | ||
| + | < | ||
| + | m.s <- 100 | ||
| + | sd.s <- 15 | ||
| + | lb <- m.s - sd.s | ||
| + | ub <- m.s + sd.s | ||
| + | normal_area(mean = m.s, sd = sd.s, lb = lb, ub = ub, lwd = 2) | ||
| + | ar <- round(pnorm(ub, | ||
| + | text(m.s, .01, ar) | ||
| + | </ | ||
| </ | </ | ||
| ===== Headline ===== | ===== Headline ===== | ||
| Line 873: | Line 787: | ||
| </ | </ | ||
| + | 위는 아래와 같음을 이해해야 한다 | ||
| + | < | ||
| + | > sum(dbinom(c(0: | ||
| + | [1] 0.387207 | ||
| + | > | ||
| + | </ | ||
| </ | </ | ||
| Line 911: | Line 831: | ||
| > pnorm(-0.29) | > pnorm(-0.29) | ||
| [1] 0.3859081 | [1] 0.3859081 | ||
| + | |||
| + | # the below is the same as the above | ||
| + | > n <- 12 | ||
| + | > p <- 1/2 | ||
| + | > q <- 1-p | ||
| + | > pnorm(5.5, n*p, sqrt(n*p*q)) | ||
| + | [1] 0.386415 | ||
| + | > | ||
| </ | </ | ||
b/head_first_statistics/using_the_normal_distribution.1666879197.txt.gz · Last modified: 2022/10/27 22:59 by hkimscil