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1 |
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So last time, we discussed how to find the |
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2 |
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probabilities underneath the normal curve for |
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3 |
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three cases. If the point lies in the lower tail, |
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4 |
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as this one, or upper tail, or between. So we can |
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5 |
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do the computations for this kind of |
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6 |
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probabilities. And I think we gave two examples. |
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7 |
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For example, if we are looking for probability of |
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8 |
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Z is smaller than 0.1, and Z, as we mentioned last |
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9 |
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time, is the standardized normal distribution that |
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10 |
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has mean of 0 and sigma is 1. In this case, just |
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11 |
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go to the table you have. Now we are looking for 0 |
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12 |
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.12, for example. So here we have 0.1. Under 2, we |
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13 |
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get this result. This value is the probability of |
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14 |
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Z smaller than 0.5. But you have to keep in mind |
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15 |
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that we have to transform first from normal |
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16 |
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distribution to standardized normal distribution. |
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17 |
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For this specific example, if we are looking for |
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18 |
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mean of 8 and standard deviation of 5, that's for |
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19 |
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the normal distribution. In this case, the z-score |
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20 |
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is given by this equation, which is x minus 3 |
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21 |
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divided by sigma. So 8.6 minus 8 divided by 5 |
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22 |
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gives 0.12. In this case, we can use the |
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23 |
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standardized normal table. Now, for the other |
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24 |
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case, we are looking for the probability of x |
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25 |
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greater than 8.6. So we are looking for the upper |
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26 |
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tail probability. The table we have gives the area |
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27 |
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to the left side. And we know that the total area |
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28 |
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underneath the normal curve is 1. So the |
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29 |
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probability of x greater than 8.6 is the same as 1 |
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30 |
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minus the probability of x smaller than x less |
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31 |
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than 8.6. So here, for 8.6, we got z squared to be |
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32 |
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0.12. So the probability of z greater than 0.12 is |
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33 |
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the same as 1 minus z of z is smaller than 0.12. |
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34 |
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So 1 minus the answer we just got from part A will |
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35 |
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get us to something. So this is the probability of |
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36 |
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X is greater than 8.6. So all of the time, if you |
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37 |
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are asking about computing the probability in the |
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38 |
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upper tail, you have to first find the probability |
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39 |
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in the lower tail, then subtract that value from |
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40 |
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1. So that's the probability for the upper tail. |
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41 |
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The last one, we are looking for probability |
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42 |
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between two values. For example, x. What's the |
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43 |
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probability of x greater than 8 and smaller than 8 |
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44 |
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.6? So we are looking for this area, the red area. |
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45 |
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So the probability of x between these two values |
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46 |
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actually equals the probability of x smaller than. |
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47 |
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8.6 minus the probability of X smaller than 8A. |
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48 |
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And that, in this case, you have to compute two |
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49 |
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values of this score. One for the first value, |
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50 |
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which is A. This value is zero because the mean is |
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51 |
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zero. And we know that Z can be negative. If X is |
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52 |
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smaller than Mu, Z can positive if X is greater |
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53 |
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than Mu and equals zero only if X equals Mu. In |
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54 |
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this case, X equals Mu, so Z score is zero. The |
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55 |
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other one as we got before is 0.12. So now, we |
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56 |
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transform actually the probability of X between |
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57 |
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8 and 8.6 to z-score between 0 and 0.12. In this |
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58 |
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case, we can use the normal theorem. Now, this |
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59 |
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area is, as we mentioned, just b of x smaller than |
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60 |
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0.12 minus b of x, b of z smaller than 0. This |
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61 |
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probability, we know that, 0.54878. Now, the |
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62 |
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probability of z smaller than 0 is one-half. |
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63 |
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Because the total area underneath the normal curve |
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64 |
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is 1, and 0 divided the curve into two equally |
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65 |
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parts. So the area to the right of 0 is the same |
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66 |
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as the area to the left of 0. So in this case, |
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67 |
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minus 0.5. So this is your answer. So the |
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68 |
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probability of Z between 8 and 8.6 is around 0478. |
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69 |
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00:05:04,320 |
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I think we stopped last time at this point. |
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70 |
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This is another example to compute the probability |
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71 |
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of X greater than 7.4 and 8. Also, it's the same |
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72 |
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idea here, just find these scores for the two |
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73 |
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values. |
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74 |
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L with B of Z greater than minus 0.12 up to 0. Now |
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75 |
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this red area equals the area below 0. I mean B of |
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76 |
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Z smaller than 0 minus the probability of Z |
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77 |
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smaller than minus 0.12. Now by using symmetric |
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78 |
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probability of the normal distribution, we know |
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79 |
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that The probability of Z smaller than minus 0.12 |
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80 |
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equals the probability of Z greater than 0.12. |
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81 |
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00:06:11,780 |
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Because this area, if we have Z smaller than minus |
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82 |
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0.12, the area to the left, that equals the area |
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83 |
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to the right of the same point, because of |
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84 |
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symmetry. And finally, you will end with this |
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85 |
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result. |
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86 |
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D of z minus 0.12, all the way up to 0, this area, |
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87 |
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is the same as the area from 0 up to 0.5. So this |
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88 |
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area actually is the same as D of z between 0 and |
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89 |
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0.5. So if you have negative sign, and then take |
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90 |
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the opposite one, the answer will be the same |
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91 |
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because the normal distribution is symmetric |
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92 |
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around 0.9. The questions, I think we stopped |
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93 |
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here. And also we talked about empirical rules. |
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94 |
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The one we mentioned in chapter three, in chapter |
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95 |
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three. And we know that, as we mentioned before, |
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96 |
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that is 68.16% of the observations fall within one |
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97 |
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standard deviation around the mean. So this area |
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98 |
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from mu minus one sigma up to mu plus sigma, this |
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99 |
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area covers around 68%. Also |
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100 |
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95% or actually 95.44% of the data falls within |
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101 |
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two standard deviations of the mean. And finally, |
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102 |
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around most of the data, around 99.73% of the data |
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103 |
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falls within three subdivisions of the population |
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104 |
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mean. |
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105 |
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And now the new topic is how can we find the X |
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106 |
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value if the probability is given. It's vice |
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107 |
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versa. In the previous questions, we were asking |
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108 |
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about find the probability, for example, if X is |
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109 |
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smaller than a certain number. Now suppose this |
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110 |
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probability is given, and we are looking to find |
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111 |
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this value. I mean, for example, suppose in the |
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112 |
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previous examples here, |
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113 |
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00:08:43,380 |
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Suppose we know this probability. So the |
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114 |
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probability is given. The question is, how can we |
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115 |
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find this value? It's the opposite, sometimes |
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116 |
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called backward normal calculations. |
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117 |
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00:09:01,660 |
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There are actually two steps. to find the x value |
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118 |
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for a certain probability or for a given or for a |
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119 |
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known probability the first step we have to find |
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120 |
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the z score then use this equation to find the x |
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121 |
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value corresponding to the z score you have and x |
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122 |
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is just mu plus sigma times mu so first step you |
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123 |
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have to find the z score |
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124 |
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corresponding to the probability we have. So find |
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125 |
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the z value for the non-probability, then use that |
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126 |
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z score to find the value of x by using this |
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127 |
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equation. So x equals mu plus z sigma. z could be |
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128 |
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negative, could be positive, depends on the |
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129 |
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probability you have. If the probability is above |
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130 |
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0.5, I mean 0.5 and greater than 0.5, this |
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131 |
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corresponds to 10. But if z-score is negative, I'm |
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132 |
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sorry, if z-score is negative, then the |
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133 |
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00:10:10,680 |
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probability should be smaller than 0.5. So if the |
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134 |
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00:10:14,880 |
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probability is given less than 0.5, then your z |
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135 |
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-score should be negative, otherwise should be |
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136 |
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00:10:21,100 |
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positive. So you have to be careful in this case. |
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137 |
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00:10:25,700 |
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Now look at this example. Let x represent the time |
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138 |
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it takes in seconds. to download an image file |
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139 |
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00:10:35,770 |
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from the internet. The same example as we did |
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140 |
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before. And here we assume that x is normal |
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141 |
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distribution with mean of 8 and standard deviation |
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142 |
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00:10:46,330 |
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of 5. Now, let's see how can we find the value of |
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143 |
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x such that 20% of download times are smaller than |
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144 |
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x. |
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145 |
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00:11:01,060 |
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So, this probability is a fraction. Also, always |
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146 |
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00:11:04,580 |
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the probability is between 0 and 1. So, the |
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147 |
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00:11:07,840 |
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probability here is 20%. In this case, your z |
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148 |
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00:11:11,820 |
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-score should be negative. Because 20% is more |
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149 |
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00:11:15,560 |
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than 0.5. So, z-score should be in this side, in |
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150 |
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00:11:18,660 |
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the left side. |
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151 |
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00:11:22,340 |
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So, again, he asks about finding x-value such that |
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152 |
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00:11:26,380 |
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20%. |
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153 |
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00:11:31,740 |
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So here again we are looking for this value, for |
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154 |
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00:11:35,400 |
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the value of x, which is smaller than the area to |
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155 |
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the left of this x, equals 0.2. |
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156 |
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00:11:47,480 |
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Now, the first step, we have to find the z-score. |
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157 |
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00:11:52,650 |
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It's backward, z-score first, then x. Find a z |
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158 |
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00:11:56,430 |
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-score corresponding to the probability of 0.2. |
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159 |
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00:12:02,510 |
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The approximate one, the near value, I mean, to |
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160 |
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00:12:07,710 |
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the 0.2 is 0.2005. Sometimes you have the exact |
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161 |
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00:12:12,190 |
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value from the table you have, but most of the |
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162 |
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00:12:16,570 |
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time you don't have it. So you have to look at the |
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163 |
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00:12:19,050 |
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approximate value, which is very close to the one |
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164 |
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00:12:21,790 |
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you have. So here, we are looking for 0.2. The |
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165 |
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00:12:25,840 |
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closest value to 0.2 is 0.2005. Now, the |
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166 |
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00:12:30,660 |
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corresponding value to this probability is minus 0 |
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167 |
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00:12:34,720 |
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.8 all the way up to 4. So your z-score is |
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168 |
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00:12:40,120 |
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negative 0.84. So this is the first step. Any |
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169 |
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00:12:47,840 |
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question? Again. |
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170 |
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00:12:53,950 |
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Now if we just go back to this equation, |
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171 |
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00:12:59,930 |
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z equals x minus mu over sigma. A cross |
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172 |
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00:13:03,670 |
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multiplication, I mean if you multiply both sides |
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173 |
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00:13:07,810 |
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by sigma, you will get sigma times z equals x |
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174 |
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00:13:16,110 |
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minus mu. |
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175 |
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00:13:32,120 |
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Now, in this question, |
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176 |
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00:13:37,960 |
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he asks about, find the value of x such that 20% |
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177 |
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00:13:43,160 |
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of download times are less than x. |
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178 |
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00:13:50,740 |
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Now the probability is less than 0.5, so your z |
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179 |
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00:13:54,080 |
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-score should be on the left side. So here we need |
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180 |
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00:13:57,780 |
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to find the value of z first. Go back to the |
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181 |
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00:14:03,660 |
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normal table you have. |
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182 |
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00:14:07,680 |
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This is the normal table. |
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183 |
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00:14:16,800 |
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We are looking for minus 0.2. I'm sorry, we are |
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184 |
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00:14:21,250 |
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looking for 0.2. So the closest value to 0.2 is |
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185 |
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00:14:28,910 |
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this one, 0.2005. So this is the closest value. |
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186 |
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00:14:49,630 |
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So the exact answer is sometimes not given. So the |
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187 |
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00:14:54,470 |
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approximate one, minus 0.8, all the way up to 4. |
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188 |
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00:15:00,030 |
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So z-score minus 0.8. Any question? |
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189 |
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00:15:10,330 |
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So the value of z-score is minus 0.84. So my |
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190 |
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00:15:15,330 |
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corresponding x-value equals X equal mu. The mu is |
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191 |
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00:15:21,430 |
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given as A plus Z is minus 0.84 times sigma. Sigma |
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192 |
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00:15:31,770 |
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is 5. You will end with 3.8. So this means the |
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193 |
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00:15:42,150 |
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probability of X less than 3.8. Equal point. |
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194 |
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00:15:47,810 |
|
Exactly, equal point. |
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195 |
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00:15:52,430 |
|
So in this case, the probability is given, which |
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196 |
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00:15:57,230 |
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is 0.20. And we ask about what's the value of x in |
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197 |
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00:16:01,710 |
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this case. So the first step was find the z-score. |
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198 |
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00:16:09,210 |
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Then use this value. I mean, plug this value in. |
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199 |
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00:16:17,380 |
|
to find the corresponding X score. That's the |
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200 |
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00:16:22,520 |
|
backward normal calculations. |
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201 |
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00:16:28,820 |
|
Let's do one problem from the practice, which is |
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202 |
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00:16:34,920 |
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number 18. |
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203 |
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00:16:53,390 |
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Is it clear? |
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204 |
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00:17:00,590 |
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The owners of a fish market determined |
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205 |
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00:17:10,310 |
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that the average weight for a catfish is 3.2 So |
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206 |
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00:17:20,570 |
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this is the |
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207 |
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00:17:27,230 |
|
value of the mean 40 |
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208 |
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00:17:48,310 |
|
So again, the owner of a fish market determined |
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209 |
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00:17:57,010 |
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that the average weight for a catfish is 3.2 |
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210 |
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00:18:02,350 |
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pounds. So the mean is 3.2 with a standard |
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211 |
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00:18:08,950 |
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deviation of 0.8. So sigma is 0.8. Now, assuming |
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212 |
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00:18:18,280 |
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the weights of catfish are normally distributed. |
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213 |
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00:18:23,580 |
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In this case, you ask about what's the probability |
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214 |
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00:18:27,220 |
|
that a randomly selected catfish will weigh more |
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215 |
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00:18:31,800 |
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than 4.4. So what's the probability of X More |
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216 |
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00:18:38,870 |
|
than. So greater than 4. |
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217 |
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00:18:45,830 |
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I just gave the idea to solve this problem. At |
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218 |
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00:18:49,290 |
|
home, you can compute it to find the exact answer. |
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219 |
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00:18:54,590 |
|
So first step, find z score. z is 4.4. |
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220 |
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00:19:01,730 |
|
Divide by z. |
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221 |
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00:19:05,910 |
|
Just compute this value. It's 0.8 divided by 0.8 |
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222 |
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00:19:12,360 |
|
equals 1. |
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223 |
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00:19:18,560 |
|
So z-score is 1. So we are looking for the |
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224 |
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00:19:22,660 |
|
probability of z greater than 1. |
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225 |
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00:19:28,340 |
|
1.5. 1.2. 1.5. 1.5. 1.5. So I'm looking for the |
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226 |
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00:19:35,220 |
|
probability of x of z greater than |
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227 |
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00:19:40,980 |
|
1 minus P |
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228 |
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00:19:48,700 |
|
of Z less than or equal to 1.5. Now go back to the |
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229 |
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00:19:52,700 |
|
table. |
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230 |
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00:20:01,540 |
|
Now 1.5 under 0. It's 0.9332. |
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231 |
|
00:20:11,410 |
|
So, 1 minus this probability gives 0.668. |
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232 |
|
00:20:21,210 |
|
That's the probability of X greater than 4.4. |
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233 |
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00:20:28,130 |
|
So, the answer is 0.0668. |
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234 |
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00:20:34,870 |
|
Now, for the same question. |
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235 |
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00:20:41,320 |
|
What's the probability that a randomly selected |
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236 |
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00:20:44,380 |
|
fish will weigh between 3 and 5 pounds? |
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237 |
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00:20:49,660 |
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3? |
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238 |
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00:20:52,940 |
|
Up to 5. So first we have to find the score for 3 |
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239 |
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00:21:01,040 |
|
out of 5. For it to be just 3 minus 3.2. Divide by |
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240 |
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00:21:11,260 |
|
0.8 is the first z value. Negative 0.2 divided by |
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241 |
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00:21:17,380 |
|
0.8 minus 0.25. The other one, 5 minus 3.2 divided |
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242 |
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00:21:30,360 |
|
by 0.8. 1 minus 0.8 divided by 0.8 equals |
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243 |
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00:21:42,680 |
|
2.25. |
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244 |
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00:21:50,840 |
|
Just double check this result. So here, the |
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245 |
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00:21:57,020 |
|
probability of X between 3 and 5 equals minus 0 |
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246 |
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00:22:04,520 |
|
.25, smaller than Z, smaller than 2.5. |
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247 |
|
00:22:12,650 |
|
So it's transformed from normal distribution to |
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248 |
|
00:22:17,210 |
|
standardized normal distribution. So here instead |
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|
249 |
|
00:22:20,750 |
|
of computing the probability of X between three |
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250 |
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00:22:23,530 |
|
and five, we are looking for the probability |
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251 |
|
00:22:26,070 |
|
between Z between actually minus. It's minus |
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252 |
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00:22:31,350 |
|
because your value here is smaller than the |
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253 |
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00:22:34,590 |
|
average. The average was 3.2, so it should be |
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|
254 |
|
00:22:37,790 |
|
negative. So z score between minus 0.25 all the |
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|
255 |
|
00:22:42,630 |
|
way up to 2.25. So now, this is the probability we |
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|
256 |
|
00:22:48,150 |
|
are looking for. Zero in the middle minus one |
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|
257 |
|
00:22:56,590 |
|
-fourth to the left of z of zero, mu of zero. And |
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|
258 |
|
00:23:03,610 |
|
this is the value of 2.25. Now we are looking |
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|
259 |
|
00:23:08,560 |
|
actually for this probability. |
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|
260 |
|
00:23:12,960 |
|
The area between minus 0.25 all the way up to 2.5. |
|
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|
261 |
|
00:23:19,980 |
|
So this area equals the |
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|
262 |
|
00:23:25,200 |
|
probability of Z less than 2.25 minus. |
|
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|
263 |
|
00:23:34,280 |
|
And again, use the normal. table to give this |
|
|
|
264 |
|
00:23:38,780 |
|
value and another one. |
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|
265 |
|
00:23:42,980 |
|
Any questions? So first step here, we compute the |
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|
266 |
|
00:23:52,400 |
|
z-score for each value x. So the problem is |
|
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|
267 |
|
00:23:56,880 |
|
transformed from normal distribution to |
|
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|
268 |
|
00:24:01,380 |
|
standardized normal distribution. So it becomes z |
|
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|
269 |
|
00:24:05,060 |
|
between minus 1.25 up to 2.25. Now, this area, |
|
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|
270 |
|
00:24:11,960 |
|
this dashed area equals the area below 2.25 minus |
|
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|
271 |
|
00:24:19,900 |
|
the area below minus 1.25. Now, by using the |
|
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|
272 |
|
00:24:25,000 |
|
similar way we did before, you will compute the |
|
|
|
273 |
|
00:24:27,760 |
|
value of z. The probability of z is smaller than 2 |
|
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|
274 |
|
00:24:30,960 |
|
.25 by using The normal table. So here, 2.2 up to |
|
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|
275 |
|
00:24:39,580 |
|
5. So 9, 8, 7, 8. 9, 8, 7, 8. |
|
|
|
276 |
|
00:24:53,900 |
|
So the area below 2.25, 2.2, this value. All the |
|
|
|
277 |
|
00:25:00,260 |
|
way up to 5 gives 987. |
|
|
|
278 |
|
00:25:05,540 |
|
Now, what's about the probability of Z smaller |
|
|
|
279 |
|
00:25:08,860 |
|
than minus 0.25? If you go back to the Z table, |
|
|
|
280 |
|
00:25:15,380 |
|
but for the other one, the negative one. |
|
|
|
281 |
|
00:25:23,120 |
|
Minus 2 minus 0.2 up |
|
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|
282 |
|
00:25:28,540 |
|
to 5. 0.4013 minus, |
|
|
|
283 |
|
00:25:36,620 |
|
that will give the probability between three and |
|
|
|
284 |
|
00:25:43,100 |
|
five. |
|
|
|
285 |
|
00:25:46,180 |
|
This is the second part. |
|
|
|
286 |
|
00:25:51,120 |
|
So the final answer. |
|
|
|
287 |
|
00:26:00,630 |
|
So this is the probability that the selected cash |
|
|
|
288 |
|
00:26:05,450 |
|
fish will weigh between three and five pounds. |
|
|
|
289 |
|
00:26:11,810 |
|
Now, other question is, for the same problem, you |
|
|
|
290 |
|
00:26:20,770 |
|
said a citation Catfish should be one of the top 2 |
|
|
|
291 |
|
00:26:28,020 |
|
% in the weight. Assuming the weights of catfish |
|
|
|
292 |
|
00:26:33,860 |
|
are normally distributed, at what weight in bounds |
|
|
|
293 |
|
00:26:38,660 |
|
should the citation, the notation be established? |
|
|
|
294 |
|
00:26:45,800 |
|
So in this board, he asked about what's the value |
|
|
|
295 |
|
00:26:50,600 |
|
of x, for example. |
|
|
|
296 |
|
00:26:57,160 |
|
is greater than what value here. And this |
|
|
|
297 |
|
00:27:01,680 |
|
probability equals 2%. Because you said the |
|
|
|
298 |
|
00:27:07,880 |
|
citation catfish should be one of the top 2%. So |
|
|
|
299 |
|
00:27:14,720 |
|
the area in the right here, this area is 2%. |
|
|
|
300 |
|
00:27:26,000 |
|
What's the value of x in this case? So here, the |
|
|
|
301 |
|
00:27:34,080 |
|
value of x greater than a equals 0.02, and we are |
|
|
|
302 |
|
00:27:38,420 |
|
looking for this value. |
|
|
|
303 |
|
00:27:45,750 |
|
gives the area to the left side. So this |
|
|
|
304 |
|
00:27:49,170 |
|
probability actually, the area to the right is 2%, |
|
|
|
305 |
|
00:27:54,490 |
|
so the area to the left is 98%. So this is the |
|
|
|
306 |
|
00:28:00,810 |
|
same as, |
|
|
|
307 |
|
00:28:04,610 |
|
as we know, the equal sign does not matter because |
|
|
|
308 |
|
00:28:07,930 |
|
we have continuous distribution. |
|
|
|
309 |
|
00:28:12,050 |
|
continuous distribution, so equal sign does not |
|
|
|
310 |
|
00:28:14,650 |
|
matter. So now, if you ask about P of X greater |
|
|
|
311 |
|
00:28:18,510 |
|
than a certain value equals a probability of, for |
|
|
|
312 |
|
00:28:22,190 |
|
example, 0.02, you have to find the probability to |
|
|
|
313 |
|
00:28:27,330 |
|
the left, which is 0.98, because our table gives |
|
|
|
314 |
|
00:28:31,890 |
|
the area to the left. Now, we have to find the |
|
|
|
315 |
|
00:28:36,470 |
|
value of A such that Probability of X is more than |
|
|
|
316 |
|
00:28:40,820 |
|
or equal to 0.98. So again, we have to look at the |
|
|
|
317 |
|
00:28:44,820 |
|
normal table, but backwards, because this value is |
|
|
|
318 |
|
00:28:50,140 |
|
given. If the probability is given, we have to |
|
|
|
319 |
|
00:28:53,720 |
|
look inside the body of the table in order to find |
|
|
|
320 |
|
00:28:58,900 |
|
the z-score. |
|
|
|
321 |
|
00:29:03,350 |
|
x equals mu plus z sigma in order to find the |
|
|
|
322 |
|
00:29:07,850 |
|
corresponding value x. So again, go back to the |
|
|
|
323 |
|
00:29:12,290 |
|
normal table, and we are looking for 98%. The |
|
|
|
324 |
|
00:29:22,010 |
|
closest value to 98%, look here, if you stop here |
|
|
|
325 |
|
00:29:27,930 |
|
at 2, go to the right, |
|
|
|
326 |
|
00:29:33,660 |
|
Here we have 9798 or |
|
|
|
327 |
|
00:29:39,380 |
|
9803. |
|
|
|
328 |
|
00:29:42,640 |
|
So the answer might be your z-score could be 2.05 |
|
|
|
329 |
|
00:29:50,460 |
|
or 2.06. So again, in this case, the table does |
|
|
|
330 |
|
00:29:59,440 |
|
not give the exact. So the approximate one might |
|
|
|
331 |
|
00:30:04,400 |
|
be between them exactly. Or just take one of |
|
|
|
332 |
|
00:30:08,920 |
|
these. So either you can take 9798, which is |
|
|
|
333 |
|
00:30:13,140 |
|
closer to 98% than 9803, because it's three |
|
|
|
334 |
|
00:30:19,500 |
|
distant apart. So maybe we can take this value. |
|
|
|
335 |
|
00:30:24,500 |
|
Again, if you take the other one, you will be OK. |
|
|
|
336 |
|
00:30:28,540 |
|
So you take either 2.05. or 2.06. So let's take |
|
|
|
337 |
|
00:30:36,730 |
|
the first value, for example. So my x equals mu, z |
|
|
|
338 |
|
00:30:45,270 |
|
is 2.05, times sigma, 0.8. Multiply 2.05 by 8, 0 |
|
|
|
339 |
|
00:30:56,570 |
|
.8, then add 3.2, you will get What's your answer? |
|
|
|
340 |
|
00:31:08,390 |
|
3.2 plus 2 point... So around 4.8. So your answer |
|
|
|
341 |
|
00:31:17,450 |
|
is 4.84. |
|
|
|
342 |
|
00:31:23,810 |
|
Now if you go back to the problem, and suppose you |
|
|
|
343 |
|
00:31:29,470 |
|
know the value of x. |
|
|
|
344 |
|
00:31:34,250 |
|
So the probability of X. |
|
|
|
345 |
|
00:31:42,990 |
|
Double check to the answer. |
|
|
|
346 |
|
00:31:49,490 |
|
4.84. Just check. V of X greater than this value |
|
|
|
347 |
|
00:31:58,010 |
|
should |
|
|
|
348 |
|
00:32:03,290 |
|
be Two percent. Two percent. So the probability of |
|
|
|
349 |
|
00:32:09,500 |
|
X greater than this value should be equal to one |
|
|
|
350 |
|
00:32:13,440 |
|
zero. So this problem is called backward normal |
|
|
|
351 |
|
00:32:18,980 |
|
calculation because here first step we find the |
|
|
|
352 |
|
00:32:24,960 |
|
value of this score corresponding to this |
|
|
|
353 |
|
00:32:28,040 |
|
probability. Be careful. The probability of X |
|
|
|
354 |
|
00:32:33,420 |
|
greater than 2 is 0.02. So my value here should be |
|
|
|
355 |
|
00:32:38,740 |
|
to the right. Because it says greater than A is |
|
|
|
356 |
|
00:32:44,980 |
|
just 2%. If you switch the position of A, for |
|
|
|
357 |
|
00:32:51,240 |
|
example, if A is on this side, And he asked about |
|
|
|
358 |
|
00:32:57,130 |
|
E of X greater than E is 2%. This area is not 2%. |
|
|
|
359 |
|
00:33:02,850 |
|
From A up to infinity here, this area is not 2% |
|
|
|
360 |
|
00:33:10,050 |
|
because at least it's greater than 0.5. Make |
|
|
|
361 |
|
00:33:14,070 |
|
sense? So your A should be to the right side. |
|
|
|
362 |
|
00:33:17,590 |
|
Because the value of X greater than E, 2% is on |
|
|
|
363 |
|
00:33:21,810 |
|
the other side. Let's move to the next one. |
|
|
|
364 |
|
00:33:36,180 |
|
For the same question. |
|
|
|
365 |
|
00:33:52,790 |
|
Again, the owner of Catfish Market determined the |
|
|
|
366 |
|
00:33:57,150 |
|
average weight of a catfish 3.2 with |
|
|
|
367 |
|
00:34:00,930 |
|
standardization 0.8 and we are assuming the |
|
|
|
368 |
|
00:34:04,670 |
|
weights of catfish are normally distributed, kiosk |
|
|
|
369 |
|
00:34:08,270 |
|
above. Above what weight? Do 89.8% of the weights |
|
|
|
370 |
|
00:34:17,390 |
|
care? |
|
|
|
371 |
|
00:34:20,630 |
|
Above? And above, so x greater than. X minus. And |
|
|
|
372 |
|
00:34:27,980 |
|
98, 89, sorry, 89. So this is a percentage he's |
|
|
|
373 |
|
00:34:34,900 |
|
looking for. 89.8%. Now what's the value of A? Or |
|
|
|
374 |
|
00:34:45,860 |
|
above what weight? Do 89.8% of the weights occur? |
|
|
|
375 |
|
00:34:57,730 |
|
You just make the normal curve in order to |
|
|
|
376 |
|
00:35:02,670 |
|
understand the probability. Now, A should be to |
|
|
|
377 |
|
00:35:07,010 |
|
the right or to the left side? Imagine A in the |
|
|
|
378 |
|
00:35:11,550 |
|
right side here. Do you think the area above A is |
|
|
|
379 |
|
00:35:15,990 |
|
89%? It's smaller than 0.5 for sure. So it should |
|
|
|
380 |
|
00:35:21,670 |
|
be the other side. So this is your 8. Now, this |
|
|
|
381 |
|
00:35:29,950 |
|
area makes sense that it's above 0.5. It's 0.8980. |
|
|
|
382 |
|
00:35:38,750 |
|
Now, B of X greater than equals this value. And |
|
|
|
383 |
|
00:35:42,850 |
|
again, the table gives the area to the left. So |
|
|
|
384 |
|
00:35:46,990 |
|
this is actually X less than A, 1 minus this |
|
|
|
385 |
|
00:35:53,740 |
|
value, equals 0.1020. |
|
|
|
386 |
|
00:36:01,480 |
|
Now go back to |
|
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|
387 |
|
00:36:08,760 |
|
the normal table. Here it's 0.1020. So it should |
|
|
|
388 |
|
00:36:14,400 |
|
be negative. I mean, your z-scope should be |
|
|
|
389 |
|
00:36:17,500 |
|
negative. |
|
|
|
390 |
|
00:36:22,000 |
|
Now look at 0.102. |
|
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|
391 |
|
00:36:28,560 |
|
Exactly this value. 0.102 is minus 1.2 up to 7. So |
|
|
|
392 |
|
00:36:38,680 |
|
minus 1.27. |
|
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|
393 |
|
00:36:49,120 |
|
Minus 1.2. All the way up to 7 is 0.102. So the |
|
|
|
394 |
|
00:36:57,900 |
|
corresponding z-score is minus 1.17. Now x again |
|
|
|
395 |
|
00:37:04,160 |
|
equals mu plus z sigma. |
|
|
|
396 |
|
00:37:10,280 |
|
Mu is 3.2 plus z is negative 1.17 times sigma. |
|
|
|
397 |
|
00:37:24,250 |
|
So it's equal to 3.2 minus 127 times 0.3. By |
|
|
|
398 |
|
00:37:34,390 |
|
calculator, you'll get the final result. |
|
|
|
399 |
|
00:37:51,120 |
|
If the probability is smaller than 0.5, then this |
|
|
|
400 |
|
00:37:56,180 |
|
one is negative. Go to the other one. If the |
|
|
|
401 |
|
00:38:00,480 |
|
probability is above 0.5, then use the positive z |
|
|
|
402 |
|
00:38:04,040 |
|
-score. So what's the answer? 2.18. |
|
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|
403 |
|
00:38:12,680 |
|
Be careful. In the previous one, We had a |
|
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|
404 |
|
00:38:19,850 |
|
probability of X greater than A equal 2%. In |
|
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|
405 |
|
00:38:28,870 |
|
this case, the value of A, for example, is located |
|
|
|
406 |
|
00:38:33,070 |
|
in the upper tail here. |
|
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|
407 |
|
00:38:40,210 |
|
For this part, you ask about B of X greater than A |
|
|
|
408 |
|
00:38:45,530 |
|
equal 0.89. It's here more than 0.5 should be on |
|
|
|
409 |
|
00:38:51,090 |
|
the other side. So you have U of X greater than |
|
|
|
410 |
|
00:38:54,290 |
|
equal this value, which is the score in this case |
|
|
|
411 |
|
00:38:58,910 |
|
minus 1.17. So the corresponding guess score |
|
|
|
412 |
|
00:39:02,490 |
|
actually is 2.24. So this is the weight that 89.8% |
|
|
|
413 |
|
00:39:11,810 |
|
of the weights are above it. So around 90% of the |
|
|
|
414 |
|
00:39:17,970 |
|
catch fish have weights above this value. So |
|
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|
415 |
|
00:39:25,350 |
|
around 2 pounds. So around 90% of the weights are |
|
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|
416 |
|
00:39:31,170 |
|
above 2.18 pounds. Maybe this is one of the most |
|
|
|
417 |
|
00:39:37,070 |
|
important questions in this chapter. Any question? |
|
|
|
418 |
|
00:39:51,660 |
|
The last part here, for the same problem he asked |
|
|
|
419 |
|
00:39:57,580 |
|
about, what's the probability that a randomly |
|
|
|
420 |
|
00:40:01,700 |
|
selected fish will weigh less than 2.2 pounds? I |
|
|
|
421 |
|
00:40:06,120 |
|
think straightforward. We did similar in part A. |
|
|
|
422 |
|
00:40:14,900 |
|
So B of X less than 0.2. So he's looking for this |
|
|
|
423 |
|
00:40:23,880 |
|
probability, which is straightforward one. This |
|
|
|
424 |
|
00:40:28,300 |
|
score, 3.2 minus, I'm sorry, it's 2.2 minus minus. |
|
|
|
425 |
|
00:40:39,280 |
|
It's 2.2 minus 3.2 divided by sigma. |
|
|
|
426 |
|
00:41:04,900 |
|
So again, find the probability now of Z less than |
|
|
|
427 |
|
00:41:10,240 |
|
or equal to negative 1.5. |
|
|
|
428 |
|
00:41:14,870 |
|
Now, in this case, we have to use the negative z. |
|
|
|
429 |
|
00:41:20,370 |
|
It's negative 1.15 minus 1.2 up to 5. |
|
|
|
430 |
|
00:41:28,150 |
|
So 0.1056. |
|
|
|
431 |
|
00:41:33,730 |
|
So the answer is around 10% of the catfish will |
|
|
|
432 |
|
00:41:40,660 |
|
weigh less than 2 pounds. So the answer is 0.1056. |
|
|
|
433 |
|
00:41:48,340 |
|
Questions? |
|
|
|
434 |
|
00:41:52,780 |
|
So go back to the PowerPoint presentation we have. |
|
|
|
435 |
|
00:41:57,780 |
|
The last topic, |
|
|
|
436 |
|
00:42:02,560 |
|
evaluating normality. |
|
|
|
437 |
|
00:42:06,930 |
|
Many times we mentioned something about normality |
|
|
|
438 |
|
00:42:09,350 |
|
and outliers. For sure, if outliers exist, in this |
|
|
|
439 |
|
00:42:14,750 |
|
case, the situation is not normal. Now, how can we |
|
|
|
440 |
|
00:42:19,410 |
|
tell if a data point is an outlier? |
|
|
|
441 |
|
00:42:24,650 |
|
If you remember, we talked about outliers in |
|
|
|
442 |
|
00:42:28,270 |
|
Chapter 3. By two ways. |
|
|
|
443 |
|
00:42:36,750 |
|
By this score. |
|
|
|
444 |
|
00:42:42,650 |
|
And we mentioned that any data point. |
|
|
|
445 |
|
00:42:54,950 |
|
Below minus 3, I mean smaller than minus 3, or |
|
|
|
446 |
|
00:42:59,010 |
|
above 3, these points are suspected to be |
|
|
|
447 |
|
00:43:04,010 |
|
outliers. |
|
|
|
448 |
|
00:43:09,230 |
|
So any point, any data value smaller than minus 3 |
|
|
|
449 |
|
00:43:16,230 |
|
in this form, or above plus 3 is considered to be |
|
|
|
450 |
|
00:43:22,330 |
|
an outlier. If we compute the lower limit, which |
|
|
|
451 |
|
00:43:30,250 |
|
is Q1 minus 1.5 IQR over the upper limit. |
|
|
|
452 |
|
00:43:40,170 |
|
So we |
|
|
|
453 |
|
00:43:47,490 |
|
have lower limit, upper limit. So lower limit. |
|
|
|
454 |
|
00:43:55,400 |
|
And upper limit. |
|
|
|
455 |
|
00:43:59,980 |
|
Any data point below lower limit or above upper |
|
|
|
456 |
|
00:44:08,420 |
|
limit is considered to be a type. So therefore, we |
|
|
|
457 |
|
00:44:13,080 |
|
have two methods to determine or to examine if the |
|
|
|
458 |
|
00:44:18,320 |
|
observation is enough there or not. One by using |
|
|
|
459 |
|
00:44:20,960 |
|
this score, straightforward. And the other one, we |
|
|
|
460 |
|
00:44:24,060 |
|
have to look for The lower limit and upper limit. |
|
|
|
461 |
|
00:44:28,960 |
|
The other method by using software and later on |
|
|
|
462 |
|
00:44:34,200 |
|
you will take SPSS in order to determine if the |
|
|
|
463 |
|
00:44:39,380 |
|
data is normally distributed by using something |
|
|
|
464 |
|
00:44:43,100 |
|
called QQ plot or normal probability plot. So I'm |
|
|
|
465 |
|
00:44:52,540 |
|
going to skip this part. Because data is taken by |
|
|
|
466 |
|
00:44:56,710 |
|
using software. But in general, |
|
|
|
467 |
|
00:45:04,330 |
|
you may look at this graph. Generally speaking, if |
|
|
|
468 |
|
00:45:11,750 |
|
you have a probability plot of a data, and the |
|
|
|
469 |
|
00:45:17,730 |
|
points lie on a straight line, or close to it, In |
|
|
|
470 |
|
00:45:25,530 |
|
this case, the distribution is normal. It's hard |
|
|
|
471 |
|
00:45:29,650 |
|
to make this graph manual. It's better to use |
|
|
|
472 |
|
00:45:33,390 |
|
software. But at least if we have this graph, and |
|
|
|
473 |
|
00:45:38,510 |
|
the points are close to the straight line. I mean, |
|
|
|
474 |
|
00:45:42,250 |
|
the points are either on the straight line, lies |
|
|
|
475 |
|
00:45:45,950 |
|
on the straight line, or close it. In this case, |
|
|
|
476 |
|
00:45:50,870 |
|
the data is normally distributed. If the data |
|
|
|
477 |
|
00:45:55,030 |
|
points scattered away of the straight line, then |
|
|
|
478 |
|
00:46:00,870 |
|
the distribution is not normal either skewed to |
|
|
|
479 |
|
00:46:04,390 |
|
the right or skewed to the left. So for this |
|
|
|
480 |
|
00:46:08,690 |
|
specific graph, the plot is normally distributed, |
|
|
|
481 |
|
00:46:14,290 |
|
approximately normally distributed. Because most |
|
|
|
482 |
|
00:46:17,550 |
|
of the points here lie close to the line and few |
|
|
|
483 |
|
00:46:24,260 |
|
are scattered away. Or it means that there are few |
|
|
|
484 |
|
00:46:29,660 |
|
outliers in this case, we can ignore these values. |
|
|
|
485 |
|
00:46:33,100 |
|
So here plot is approximately a straight line |
|
|
|
486 |
|
00:46:35,620 |
|
except for a few outliers at the low and the |
|
|
|
487 |
|
00:46:40,360 |
|
right, those points. So generally speaking, the |
|
|
|
488 |
|
00:46:44,780 |
|
distribution is normal distribution. That's all |
|
|
|
489 |
|
00:46:51,200 |
|
for this chapter. |
|
|
|
|
