As you read about regression this week, try to think of pairs of variables whose values might be associated, or as we say in statistics have a correlation. For example, height and weight have a positive correlation because in general we expect taller people to weigh more than shorter people. This does not mean every taller person weighs more than every shorter person, but that's the tendency. Can you think of another pair of variable that have a positive correlation? How about a pair of variables that have a negative correlation? Try to think of pairs of variables from your field of study! For each variable, consider the following: give a brief description of each variable, how is it measured, what are its possible values, Why do you think the correlation between your two variables is positive or negative?
In: Math
The following frequency distribution shows the price per share for a sample of 30 companies listed on the New York Stock Exchange.
| Price per Share | Frequency | |
| $20-29 | 7 | |
| $30-39 | 4 | |
| $40-49 | 6 | |
| $50-59 | 4 | |
| $60-69 | 5 | |
| $70-79 | 1 | |
| $80-89 | 3 |
Compute the sample mean price per share and the sample standard deviation of the price per share for the New York Stock Exchange companies (to 2 decimals). Assume there are no price per shares between 29 and 30, 39 and 40, etc.
| Sample mean | $ |
| Sample standard deviation | $ |
In: Math
Q 4
A computer program translates texts between different languages.
Experience shows that the probability of a word being incorrectly
translated is 0.002.
We enter a text with 5000 words.
What is the probability that no word is translated incorrectly?
(Tips, Po)
What is the probability that at most 2 words will be translated
incorrectly?
What is the probability that 3 or more words are translated
incorrectly?
In: Math
The better-selling candies are often high in calories. Assume that the following data show the calorie content from samples of M&M's, Kit Kat, and Milky Way candies.
| M&M's | Kit Kat | Milky Way |
|---|---|---|
| 250 | 245 | 200 |
| 210 | 205 | 208 |
| 240 | 225 | 202 |
| 230 | 235 | 190 |
| 250 | 220 | 180 |
Test for significant differences among the calorie content of these three candies.
A) State the null and alternative hypotheses.
H0: MedianMM =
MedianKK = MedianMW
Ha: MedianMM ≠ MedianKK ≠
MedianMW
H0: All populations of calories are
identical.
Ha: Not all populations of calories are
identical.
H0: Not all populations of calories are
identical.
Ha: All populations of calories are
identical.
H0: MedianMM =
MedianKK = MedianMW
Ha: MedianMM >
MedianKK > MedianMW
H0: MedianMM ≠
MedianKK ≠ MedianMW
Ha: MedianMM = MedianKK =
MedianMW
B) Find the value of the test statistic. (Round your answer to two decimal places.)
C) Find the p-value. (Round your answer to three decimal places.)
D) At a 0.05 level of significance, what is your conclusion?
Reject H0. There is sufficient evidence to conclude that there is a significant difference among the calorie content of these three candies.
Do not reject H0. There is sufficient evidence to conclude that there is a significant difference among the calorie content of these three candies.
Reject H0. There is not sufficient evidence to conclude that there is a significant difference among the calorie content of these three candies.
Do not reject H0. There is not sufficient evidence to conclude that there is a significant difference among the calorie content of these three candies.
In: Math
What are the major difference between univariate, bivariate, and multivariate analysis?
What is the difference between correlation and regression?
Inferential statistics allow us to
In: Math
Consider the random experiment of tossing two fair dice and recording the up faces. Let X be the sum of the two dice, and let Y be the absolute value of the difference of the two dice.
1.Compute the skewness coefficient and kurtosis of the distribution of X and Y.
2. For each of x=4,5,6 from the sample space of X do the following:
Construct the pff of the conditional distribution of X given Y = y
Compute the mean variance SD skewness coefficient snd kurtosis of the conditional distribution of Y given X = x. Are they distributional characteristics constant, or do they depend upon x?
In: Math
Allegiant Airlines charges a mean base fare of $89. In addition, the airline charges for making a reservation on its website, checking bags, and inflight beverages. These additional charges average $35 per passenger. Suppose a random sample of 80 passengers is taken to determine the total cost of their flight on Allegiant Airlines. The population standard deviation of total flight cost is known to be $38. Use z-table.
b. What is the probability the sample mean will be within $10 of the population mean cost per flight (to 4 decimals)?
c. What is the probability the sample mean will be within $5 of the population mean cost per flight (to 4 decimals)?
In: Math
A qualifying exam for a graduate school program has a math section and a verbal section. Students receive a score of 1, 2, or 3 on each section. Define X as a student’s score on the math section and Y as a student’s score on the verbal section. Test scores vary according to the following bivariate probability distribution.
|
y |
||||
|---|---|---|---|---|
| 1 | 2 | 3 | ||
| 1 | 0.22 | 0.33 | 0.05 | |
| x | 2 | 0.00 | 0.08 | 0.20 |
| 3 | 0.07 | 0.05 | 0.00 |
μXX = , and μYY =
σXX = , and σYY =
The covariance of X and Y is ________ . The coefficient of correlation is _________ . The variables X and Y_______ independent.
The expected value of X + Y is_______ , and the variance of X + Y is ________________ .
To be accepted to a particular graduate school program, a student must have a combined score of 4 on the qualifying exam.
What is the probability that a randomly selected exam taker qualifies for the program?
0.46
0.33
0.47
0.45
Chebysheff’s Theorem states that the proportion of observations in any population that lie within k standard deviations of the mean is at least 1 – 1 / k² (for k > 1).
According to Chebysheff’s Theorem, there is at least a 0.75 probability that a randomly selected exam taker has a combined score between_______ and_______ .
In: Math
Problem 4: House Prices
Use the “Fairfax City Home Sales” dataset for parts of this problem.
a) Use StatCrunch to construct an appropriately titled and labeled relative frequency histogram of Fairfax home closing prices stored in the “Price” variable. Copy your histogram into your document.
b) What is the shape of this distribution? Answer this question in one complete sentence.
c) Assuming the population has a similar shape as the sample with population mean $510,000 and population standard deviation $145,000; calculate the probability that in a random sample of size 10, the mean of the sample will be greater than $600,000. You may assume a random sample was taken and the sample came from a big population. However, be sure to check the central limit theorem condition of a large sample size before completing this problem using one complete sentence. If this condition is not met, you cannot complete the problem.
d) Assuming the population has a similar shape as the sample with population mean $510,000 and population standard deviation $145,000; calculate the probability that in a random sample of size 36, the mean of the sample will be greater than $600,000. You may assume a random sample was taken and the sample came from a big population. However, be sure to check the central limit theorem condition of a large sample size before completing this problem using one complete sentence. If this condition is not met, you cannot complete the problem.
Data:
Price Year, Days, TLArea, Acres
369900 1922 44 1870 0.39
373000 1952 0 1242 0.27
375000 1952 8 932 0.15
375000 1950 2 768 0.19
379000 1952 31 816 0.21
380000 1941 53 1092 0.19
385000 1951 5 984 0.27
387700 1953 5 975 0.36
395000 1954 18 957 0.29
395000 1951 12 1105 0.22
399900 1954 29 1206 0.28
399900 1951 6 1226 0.18
400000 1954 31 957 0.27
410000 1949 6 1440 0.2
410000 1954 17 1344 0.23
412500 1954 4 1008 0.25
415000 1953 17 1371 0.28
420000 1954 2 957 0.25
426000 1952 3 1694 0.25
430000 1953 19 975 0.23
434900 1950 5 1128 0.18
435000 1954 32 1252 0.24
440000 1960 3 1161 0.26
440000 1954 2 1036 0.28
440000 1955 12 1645 0.28
440000 1960 5 1746 0.31
441000 1952 133 1062 0.23
442000 1961 4 1414 0.32
443000 1951 26 962 0.2
444900 1955 4 1122 0.19
446500 1953 3 962 0.26
450000 1952 2 1488 0.15
450000 1955 49 1122 0.23
450000 1979 0 1092 0.28
450000 1951 70 962 0.2
450000 1957 23 1300 0.51
451000 1947 12 1325 0.34
455000 1952 7 2267 0.81
455000 1962 4 1050 0.31
460000 1955 5 997 0.3
460000 1954 10 1125 0.17
465000 1954 77 1288 0.46
465900 1947 21 1309 0.19
469000 1963 153 1149 0.27
474000 1959 5 1319 0.32
475000 1955 4 1530 0.28
475000 1953 29 1008 0.2
475000 1955 6 1530 0.28
475000 1956 116 1345 0.5
475000 1956 1 1530 0.28
480000 1960 27 1236 0.27
480000 1959 133 1527 0.24
485000 1955 4 1008 0.24
485000 1956 74 977 0.24
488000 1960 11 1972 0.33
500000 1963 0 2145 0.25
500000 1953 14 1758 0.54
500500 1955 6 1630 0.28
510000 1959 5 1680 0.34
512000 1963 0 1968 0.22
519000 1961 1 1312 0.29
520000 1954 15 1492 0.25
520000 1958 80 1443 0.33
520000 1963 122 1822 0.32
530000 1962 6 1393 0.29
540000 1962 12 1414 0.25
543600 1962 4 1414 0.24
560000 1967 5 1530 0.28
560000 1961 16 1438 0.53
565000 1947 6 1510 0.25
565500 1967 5 1217 0.26
589000 1954 32 2368 0.3
593000 1954 9 2044 0.25
610000 1978 140 2091 0.09
655000 1976 180 2728 0.24
660000 1947 10 2635 0.22
665000 1950 37 2645 0.57
685000 1982 120 2752 0.09
795000 2002 259 3402 0.12
852000 2000 4 3215 0.11
895000 2000 63 3230 0.11
930000 2015 135 3175 0.15
940000 1860 42 3038 0.57
968500 1850 74 3630 0.34
1100000 2004 161 3640 0.19
In: Math
The probability of success is 0.68. A sample of 15 is taken. Assume independent trials. (Please show your work here)
1. What is the probability of succeeding all 15 times?
2. What is the probability of succeeding 9 times in 15 trials?
3. What is the probability of succeeding 14 times in 15 trials?
4. What is the probability of succeeding 12 or more times in 15 trials?
5. What is the probability of succeeding 11 or fewer times in 15 trials?
In: Math
PLEASE SOLVE ALL PARTS AND EXPLAIN IN DETAIL.
I'M HAVING A DIFFICULT TIME UNDERSTANDING HOW TO FIND/SOLVE THESE TYPES OF PROBLEMS:
In 2017, as reported by ACT Research Service, the mean ACT Math score was μ=20.6 μ=20.6 . ACT Math scores are normally distributed with σ=4.8 σ=4.8 .
In: Math
Develop a branding strategy for your credit repair service service that covers the brand name, logo, slogan, and at least one brand extension.
In: Math
A 95% confidence interval for the average waiting time at the
drive-thru of a fast food restaurant if a sample of 192 customers
have an average waiting time of 92 seconds with a population
deviation of 23 seconds
round to the nearest hundredth of a second
In: Math
Question 1
Given a normal distribution with µ =15 and σ =5, what is the probability that
INSTRUCTIONS: Show all your work as to how you have reached your answer. Please don’t simply state the results. Show graphs where necessary.
In: Math
Use the sample information x¯ = 36, σ = 7, n = 17 to calculate the following confidence intervals for μ assuming the sample is from a normal population.
(a) 90 percent confidence. (Round your answers to 4 decimal places.) The 90% confidence interval is from to
(b) 95 percent confidence. (Round your answers to 4 decimal places.) The 95% confidence interval is from to
(c) 99 percent confidence. (Round your answers to 4 decimal places.) The 99% confidence interval is from to
(d) Describe how the intervals change as you increase the confidence level.
In: Math