Solusi - Probabilitas kumulatif dalam distribusi normal standar
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Probabilitas kumulatif dalam distribusi normal standarPenjelasan langkah demi langkah
1. Find the cumulative probability of the z-scores values up to
Más del del tiempo, los datos con una distribución normal estándar se encuentran dentro de más o menos desviaciones estándar de la media.
La probabilidad acumulativa de los valores hasta es .
La probabilidad acumulativa de que sea
2. Find the cumulative probability of the z-scores values up to
Use the positive or negative z-table to find the value corresponding to . This value is the cumulative probability of the area to the left of .
| Z | 0.00 | 0.01 | 0.02 | 0.03 | 0.04 | 0.05 | 0.06 | 0.07 | 0.08 | 0.09 |
| 0,0 | 5 | 50399 | 50798 | 51197 | 51595 | 51994 | 52392 | 5279 | 53188 | 53586 |
| 0,1 | 53983 | 5438 | 54776 | 55172 | 55567 | 55962 | 56356 | 56749 | 57142 | 57535 |
| 0,2 | 57926 | 58317 | 58706 | 59095 | 59483 | 59871 | 60257 | 60642 | 61026 | 61409 |
| 0,3 | 61791 | 62172 | 62552 | 6293 | 63307 | 63683 | 64058 | 64431 | 64803 | 65173 |
| 0,4 | 65542 | 6591 | 66276 | 6664 | 67003 | 67364 | 67724 | 68082 | 68439 | 68793 |
| 0,5 | 69146 | 69497 | 69847 | 70194 | 7054 | 70884 | 71226 | 71566 | 71904 | 7224 |
| 0,6 | 72575 | 72907 | 73237 | 73565 | 73891 | 74215 | 74537 | 74857 | 75175 | 7549 |
| 0,7 | 75804 | 76115 | 76424 | 7673 | 77035 | 77337 | 77637 | 77935 | 7823 | 78524 |
| 0,8 | 78814 | 79103 | 79389 | 79673 | 79955 | 80234 | 80511 | 80785 | 81057 | 81327 |
| 0,9 | 81594 | 81859 | 82121 | 82381 | 82639 | 82894 | 83147 | 83398 | 83646 | 83891 |
| 1,0 | 84134 | 84375 | 84614 | 84849 | 85083 | 85314 | 85543 | 85769 | 85993 | 86214 |
| 1,1 | 86433 | 8665 | 86864 | 87076 | 87286 | 87493 | 87698 | 879 | 881 | 88298 |
| 1,2 | 88493 | 88686 | 88877 | 89065 | 89251 | 89435 | 89617 | 89796 | 89973 | 90147 |
| 1,3 | 9032 | 9049 | 90658 | 90824 | 90988 | 91149 | 91308 | 91466 | 91621 | 91774 |
| 1,4 | 91924 | 92073 | 9222 | 92364 | 92507 | 92647 | 92785 | 92922 | 93056 | 93189 |
| 1,5 | 93319 | 93448 | 93574 | 93699 | 93822 | 93943 | 94062 | 94179 | 94295 | 94408 |
| 1,6 | 9452 | 9463 | 94738 | 94845 | 9495 | 95053 | 95154 | 95254 | 95352 | 95449 |
| 1,7 | 95543 | 95637 | 95728 | 95818 | 95907 | 95994 | 9608 | 96164 | 96246 | 96327 |
| 1,8 | 96407 | 96485 | 96562 | 96638 | 96712 | 96784 | 96856 | 96926 | 96995 | 97062 |
| 1,9 | 97128 | 97193 | 97257 | 9732 | 97381 | 97441 | 975 | 97558 | 97615 | 9767 |
| 2,0 | 97725 | 97778 | 97831 | 97882 | 97932 | 97982 | 9803 | 98077 | 98124 | 98169 |
| 2,1 | 98214 | 98257 | 983 | 98341 | 98382 | 98422 | 98461 | 985 | 98537 | 98574 |
| 2,2 | 9861 | 98645 | 98679 | 98713 | 98745 | 98778 | 98809 | 9884 | 9887 | 98899 |
| 2,3 | 98928 | 98956 | 98983 | 9901 | 99036 | 99061 | 99086 | 99111 | 99134 | 99158 |
| 2,4 | 9918 | 99202 | 99224 | 99245 | 99266 | 99286 | 99305 | 99324 | 99343 | 99361 |
| 2,5 | 99379 | 99396 | 99413 | 9943 | 99446 | 99461 | 99477 | 99492 | 99506 | 9952 |
| 2,6 | 99534 | 99547 | 9956 | 99573 | 99585 | 99598 | 99609 | 99621 | 99632 | 99643 |
| 2,7 | 99653 | 99664 | 99674 | 99683 | 99693 | 99702 | 99711 | 9972 | 99728 | 99736 |
| 2,8 | 99744 | 99752 | 9976 | 99767 | 99774 | 99781 | 99788 | 99795 | 99801 | 99807 |
| 2,9 | 99813 | 99819 | 99825 | 99831 | 99836 | 99841 | 99846 | 99851 | 99856 | 99861 |
| 3,0 | 99865 | 99869 | 99874 | 99878 | 99882 | 99886 | 99889 | 99893 | 99896 | 999 |
| 3,1 | 99903 | 99906 | 9991 | 99913 | 99916 | 99918 | 99921 | 99924 | 99926 | 99929 |
| 3,2 | 99931 | 99934 | 99936 | 99938 | 9994 | 99942 | 99944 | 99946 | 99948 | 9995 |
| 3,3 | 99952 | 99953 | 99955 | 99957 | 99958 | 9996 | 99961 | 99962 | 99964 | 99965 |
| 3,4 | 99966 | 99968 | 99969 | 9997 | 99971 | 99972 | 99973 | 99974 | 99975 | 99976 |
| 3,5 | 99977 | 99978 | 99978 | 99979 | 9998 | 99981 | 99981 | 99982 | 99983 | 99983 |
| 3,6 | 99984 | 99985 | 99985 | 99986 | 99986 | 99987 | 99987 | 99988 | 99988 | 99989 |
| 3,7 | 99989 | 9999 | 9999 | 9999 | 99991 | 99991 | 99992 | 99992 | 99992 | 99992 |
| 3,8 | 99993 | 99993 | 99993 | 99994 | 99994 | 99994 | 99994 | 99995 | 99995 | 99995 |
| 3,9 | 99995 | 99995 | 99996 | 99996 | 99996 | 99996 | 99996 | 99996 | 99997 | 99997 |
A z-score of corresponds to an area of
The cumulative probability that is
3. Calculate the cumulative probability between 200 and 0
To find the cumulative probability of the area between the two z-scores, subtract the smaller cumulative probability (everything to the left of ) from the larger cumulative probability (everything to the left of ):
The cumulative probability that is
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