1) True
2) True
3) false
for further any queries please comment and thank you.
Question 2 4 pts Consider the figures below representing the standard normal distribution: 68% 95% 34%...
Answer the following question involving "The Normal Distribution and the 68-95-99.7 Rule" and show how I got the answers below. Answers: 1)a) 68% b) 47.5% c) 2.5% 2) 12 or 13 people Questions: 1) A population of dogs have weights that are normally distributed with an average of 30 pounds with a standard deviation of 3 pounds. a) What percent of the dogs weigh between 27 and 33 pounds? b) What percent of the dogs weigh between 30 and 36...
miben so with the 68-95-99.7 Rule) on the included normal distribution 1. Suppose exam scores form an approximately normal distribution that has 500 points and 100 points. Letter grades on the exam were distributed as follows: Ds made up 15% of the exam, Ca 59%, Bs 13.5%, As 2.5%, and the rest Fs. () If 1466 students scored 733 points or more, how many students took the exam? students (b) What are the point cutoffs for each letter grade? <A...
10. Assume that 20 people take a math test, which is not enough for a normal distribution to form. If Conrad scores three standard deviations above the mean, what percentile is he? 1. 75.0% 2. 88.5% 3. 95.0% 4. 99.7% 5. Not enough information to determine. ________________________________________ 11. Assume that 20 people take a math test, which is not enough for a normal distribution to form. If Sarah scores at the median, what percentile is she? 1. 34% 2. 50%...
1. Assuming age fits a normal distribution (it definitely does not!) with your mean and standard deviation. Note: The answers will seem ridiculous! (a) Draw the normal curve with the usual labels for the 68-95-99.7 rule. (b) 68% of students are between what two ages? (c) 95% of students are between what two ages? (d) 99.7% of students are between what two ages? (e) 50% of students are older than what age? (f) 34% of students are between what two...
solve Question ID Normal Curve From the normal curve, we know that there are 68% of the data are within one standard deviation(which is between -1o and +1a 95% are within two standard deviation (between -Zo and x + 2σ) and 99.5% are within three standard deviation(between f-3ơ and f+3c). From the figure on the left, we also notice that there are 34% of the data are between and f+10. And there are .15% of the data are above x+3o,...
Use the Grouped Distribution method for the following exercise (see Self-Test 2-4 for detailed instructions), rounding each answer to the nearest whole number. Using the frequency distribution below (scores on a statistics exam taken by 80 students), determine:ion 1 of the preliminary test (scores on a statistics exam taken by 80 students), determine: 68 84 75 82 68 90 62 88 76 93 73 79 88 73 60 93 71 59 85 75 61 65 75 87 74 62 95...
Use the Grouped Distribution method for the following exercise (see Self-Test 2-4 for detailed instructions), rounding each answer to the nearest whole number. Using the frequency distribution below (scores on a statistics exam taken by 80 students), determine:ion 1 of the preliminary test (scores on a statistics exam taken by 80 students), determine: 68 84 75 82 68 90 62 88 76 93 73 79 88 73 60 93 71 59 85 75 61 65 75 87 74 62 95...
Please answer the 4 circled questions for me. Thank you. 2. Soybeans. Soybean yield in Iowa was historically low in 2012. Yield of soybeans (bushels per acre) in Iowa during 2012 can be described by a Normal distribution with a mean of 49 bushels per acre and a standard deviation of 7 bushels per acre. Use the 68-95-99.7 Rule (Empirical Rule) to answer the following questions. Note that answers based on the normal table rather than the empirical rule will...
-99.7% of data are within 3 standard deviations of the mean (* - 35 to ++ 3s) 34% 34% 2.4% 24% 0.1% 0.1% 135% 13.5% x-35 x 2s X-s *+s *+ 2s * + 3s More specifically, we can think of relabeling the labels on the x-axis. Starting at the center (the mean), moving toward the right we would have T= 35 (the center] T + s = 42 [one SD above] 1 + 2s 49 (two SDs above] T...
1. True or False: (1pt each) (T) (F) If a distribution is normal, then it is not possible to randomly select a value that is more than 4 standard deviations from the mean. (T) (F) Normal distribution is a discreet probability distribution for a random variable. (T) (F) If the variable follows a binomial distribution, then about 68 % of the variables are within 1 SD of the mean, about 95% of the variables are within +2 SD of the...