Overproduction of uric acid in the body can be an indication of cell breakdown. This may be an advanced indication of illness such as gout leukemia or lymphoma. Over a period of months an adult Male patient has taken eight blood tests for uric acid. The sample mean concentration was 5.33 mg/dL . The distribution of uric acid in healthy adult Males can be assumed to be normal, with population standard deviation 1.85 mg/dL. In steps we are going to find a 95% confidence interval for the population mean.
1a. In order to find any confidence interval in the chapter, you must calculate the EBM ( error bound) value. In this case you must identify the critical value to be used for zCL.
b. What is the error bound for a population mean, EMB, for this problem.
c. What is the range from low to high for the population mean.
d. Interpret the confidence interval in the context of
the problem.
I am 95% confident that.............
2. What is the critical value for a 99% confidence level when the sample size is 14 and s is known?
b. What is the critical value of 95% confidence level when the sample size is 44 and s is known?
In: Math
Elevator ride: Engineers are designing a large elevator that will accommodate 43 people. The maximum weight the elevator can hold safely is 8643 pounds. According to the National Health Statistics Reports, the weights of adult U.S. men have mean 189 pounds and standard deviation 63 pounds, and the weights of adult U.S. women have mean 170 pounds and standard deviation 72 pounds. Use the TI-84 Plus calculator.
(a) If 43 people are on the elevator, and their total weight is 8643 pounds, what is their average weight?
(b) If a random sample of 43 adult men ride the elevator, what is the probability that the maximum safe weight will be exceeded? Round the answer to at least four decimal places
(c) If a random sample of 43 adult women ride the elevator, what is the probability that the maximum safe weight will be exceeded? Round the answer to at least four decimal places.
In: Math
A sample of size 8 will be drawn from a normal population with
mean 63 and standard deviation 12. Use the TI-84 Plus
calculator.
(a) Is it appropriate to use the normal distribution to find
probabilities for x bar?
(b) Find the probability that x bar will be between 53 and 73.
Round the answer to at least four decimal places.
(c) Find the 83rd percentile of x bar. Round the answer
to at least two decimal places.
In: Math
In: Math
In a clinical study of an allergy drug, 109 of the 202 subjects reported experiencing significant relief from their symptoms. at the .01 significance level, test the claim that more than 50% of those using the drug experienced relief. what is the rejection rule?
In: Math
Can you find and attach here an example of a statistically incorrect graph which has really been used/published somewhere? Explain why it is considered statistically incorrect.
In: Math
1) The hypergeometric probability distribution is closely related to the binomial distribution except that the trials are not independent and the probability of success changes from trial to trial.
True/False
2) The stationarity assumption states that the probability of success in a given binomial distribution does not change from trial to trial.
True/False
3) It is possible for a discrete random variable to assume either a finite number of values or an infinite sequence of values.
True/False
4) Which distribution is used to calculate the probability of a given number of successes for a set number of trials where the only two options are success and failure?
A) The discrete - uniform distribution
B) A bivariate discrete distribution
C) The Poisson distribution
D) The binomial distribution
In: Math
Research Question: Does the
spatial ability differ by biological sex?
(Use Data A)
Null Hypothesis: Spatial ability does not differ by biological sex.
Female |
Male |
|
X bar |
76.2 |
80.5 |
s |
12.82 |
11.40 |
n |
10 |
10 |
Data A: Students’ Spatial Ability
ID |
Biological Sex |
Spatial Ability |
1= female; 0=male |
||
1 |
1 |
80 |
2 |
0 |
70 |
3 |
1 |
60 |
4 |
0 |
65 |
5 |
1 |
80 |
6 |
1 |
76 |
7 |
1 |
89 |
8 |
1 |
64 |
9 |
1 |
66 |
10 |
1 |
99 |
11 |
1 |
85 |
12 |
1 |
63 |
13 |
0 |
97 |
14 |
0 |
94 |
15 |
0 |
83 |
16 |
0 |
79 |
17 |
0 |
72 |
18 |
0 |
68 |
19 |
0 |
88 |
20 |
0 |
89 |
In: Math
For this problem, carry at least four digits after the decimal
in your calculations. Answers may vary slightly due to
rounding.
A random sample of medical files is used to estimate the proportion
p of all people who have blood type B.
(a) If you have no preliminary estimate for p, how many
medical files should you include in a random sample in order to be
85% sure that the point estimate p̂ will be within a
distance of 0.03 from p? (Round your answer up to the
nearest whole number.)
medical files
(b) Answer part (a) if you use the preliminary estimate that about
9 out of 90 people have blood type B.
medical files
In: Math
In: Math
Young and Company claims that its pressurized diving bell will, on average, maintain its integrity to depths of 2500 feet or more. You take a random sample of 50 of the bells. The average maximum depth for bells in your sample is 2455 feet. Set up an appropriate hypothesis test using Young and Company’s claim as the null hypothesis. Assume the population standard deviation is 200 feet. Use a 1% significance level.
a) What is the p-value that you calculate for this sample?
b) Can you reject the company's claim at the 1% level?
In: Math
3) You are rolling a 12 sided die 8 times.
a) What is the size for the sample space? Write 3 different outcomes
Find the probability for the following
b) All of them are different
c) All of them are consecutive
d) Exactly four 9s and exactly five 12s
e) At least one 11
In: Math
Suppose a survey revealed that 19% of 494 respondents said they had in the past sold unwanted gifts over the Internet.
(a) Use the information to construct a 90% confidence interval
for the population proportion who sold unwanted gifts over the
Internet, rounding your margin of error to the nearest hundredth.
(Round your answers to two decimal places.)
(_________ , __________ )
(b) Use the information to construct a 98% confidence interval for
the population proportion who sold unwanted gifts over the
Internet, rounding your margin of error to the nearest hundredth.
(Round your answers to two decimal places.)
(_________ , __________ )
In: Math
3. Tar in cigarettes: Listed below are amounts of tar (mg per cigarette) in sing size cigarettes. 100-mm menthol cigarettes, and 100-mm non menthol cigarettes. The king size cigarettes are nonfiltered, nonmenthol, and nonlight. The 100-mm menthol cigarettes are filtered and nonlight. The 100-mm nonmenthol cigarettes are filtered and nonlight. Use a .05 significance level to test the claim that the three categories of cigarettes yield the same mean amount of tar. Given that only the king-size cigarettes are not filtered, do the filters appear to make a difference?
King 20 27 27 20 20 24 20 23 20 22 20 20 20 20 20 10 24 20 21 25 23 20 22 20 20
Menthol 16 13 16 9 14 13 12 14 14 13 13 16 13 13 18 9 19 2 13 14 14 15 16 6 8
One-Hundred 5 16 17 13 13 14 15 15 15 9 13 13 13 15 2 15 15 13 14 15 16 15 7 17 15
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Listed below are the weights of a random sample of blue M&Ms (in grams): 0.881 0.863 0.775 0.854 0.810 0.858 0.818 0.768 0.803 0.833 0.742 0.832 0.807 0.841 0.932 (a) Create a vector with these data. Find the mean, standard deviation and number of observations for these data. (b) Draw a histogram and a normal probability plot for these data. Is the assumption of normality valid for these data? (c) Test the claim that the mean weight of all blue M&Ms is greater than 0.82 grams (α = 0.05). Include the null and alternative hypotheses and your conclusion in the context of the data. (e) Create a plot that includes the sampling distribution of your statistic under the null hypothesis, the value of the statistic as a vertical line, and the P-value. R code
In: Math