Answer:
1) n = 39916800
2) n = 1663200
3) n = 330
Step-by-step explanation:
1) If the blue balls are distinguishable as are the red balls
Then you can arrange these balls in the following ways, we must use a permutation
In totally we have 11 balls, then
n = 11P11
[tex]n = \frac{11!}{(11-11)!} = 11! = 39916800\\[/tex]
2) If Blue balls are distinguishable, but the red balls are identical
In this case, we need to do a correction due to the red balls are identical and we cannot identify the difference when we interchange two red balls
[tex]n = \frac{11!}{4!} = \frac{39916800}{24} = 1663200[/tex]
3) If the balls of each color are indistinguishable
We proceed equal to the before case but we include a correction due to blue balls also
[tex]n = \frac{11!}{4!*7!} = \frac{39916800}{24*5040} = 330[/tex]
11. Simplify the complex fraction. n-4/n² - 2n-15/n +1/n +3
NEED HELP ASAP!!!!
In simplifying complex fractions, first, put the individual fractions in simplest terms. Solve the equations based on the order of operations, simplify the fractions, find a common denominator, and combine the fractions. Your skill in Algebraic operations, particularly with polynomials and fractions, play a significant role in solving the problem.
Explanation:When it comes to simplifying complex fractions, you need to first ensure that the individual fractions are in their simplest terms. For the fraction n-4/n², consider factoring out n from the denominator, while for 2n-15/n +1/n +3, the expression can be simplified to (2n-15+n+3)/n or (3n-12)/n.
Following an order of operations, evaluate the expressions and perform the indicated operations for a simple and correct answer. Briefly, your steps should include: simplifying the complex fractions, finding a common denominator, and combining the fractions. Once you have done this, continue to simplify until you are left with one fraction.
Also note that a key aspect to solving this is applying your knowledge of Algebraic Operations, specifically with polynomials and fractions. It's important to take care not to make any mistakes in signs or operations as they can significantly alter your responses.
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The simplified form is (3n² - n + 11)/n².
To simplify the complex fraction (n - 4)/(n²) - (2n - 15)/n + 1/n + 3, follow these steps:
Find a common denominator for all the fractions involved. Here, the common denominator will be n².
1. Rewrite each term with the common denominator:
(n - 4)/n²
(2n - 15)/n becomes (2n - 15)n/n²
1/n becomes n/n²
3 becomes 3n²/n²
2. Combine all terms to have the same denominator:
(n - 4 - 2n + 15 + n + 3n²)/n²
3. Simplify the numerator:
(n - 4 - 2n + 15 + n + 3n²)
Combine like terms: (3n² + n - 2n + n - 4 + 15)
4. Simplifies to: (3n² - n + 11)
5. Rewrite the fraction:
(3n² - n + 11)/n²
So, the simplified fraction is (3n² - n + 11)/n².
Add and simplify. Please help
Answer: Third answer
Step-by-step explanation:
In a survey of 5100 randomly selected T.V. viewers, 40% said they watch network news programs. Find the margin of error for this survey if we want 95% confidence in our estimate of the percent of T.V. viewers who watch network news programs.
Answer:
Margin of error = 0.01344
Step-by-step explanation:
Margin of error = critical value × standard deviation.
critical value for 95% confidence interval = 1.96
Standard deviation = √[(p)(q)/n]
p = 0.4, q = 1 - p = 1 - 0.4 = 0.6, n = 5100
Standard deviation = √[(0.6×0.4)/5100] = 0.00686
Margin of error = 1.96 × 0.00686 = 0.0134
Experiments on learning in animals sometimes measure how long it takes a gerbil to nd its way through a maze. The mean time is 14 seconds for one particular maze. A researcher thinks that playing soothing music will cause the gerbils to complete the maze slower. She measures how long each of 34 gerbils takes with a noise stimulus.
Complete Question
Experiments on learning in animals sometimes measure how long it takes a gerbil to nd its way through a maze. The mean time is 14 seconds for one particular maze. A researcher thinks that playing soothing music will cause the gerbils to complete the maze slower. She measures how long each of 34 gerbils takes with a noise stimulus.
She measures how long each of 34 gerbils takes with a noise stimulus. The sample mean is x = 16.5 seconds.
The alternative hypothesis for the significance test is
a. Ha:μ≠14
b. Ha:μ=16.5.
c. Ha:μ>14
Answer:
Option C is correct.
The alternative hypothesis for the significance test is Ha:μ>14
Step-by-step explanation:
The researcher sets up a maze and notes that the mean time to complete the maze is 14 seconds for gerbils.
She then theorizes that playing soothing music for the gerbils while they complete the maze slows the gerbils down.
Using a sample of 34 gerbils, she tests her hypothesis, and truly, the sample mean, when she plays soothing noise in the background, rises from 14 to 16.5 seconds; indicating that the noise stimulus indeed, slows down the gerbils.
Alternative hypothesis theorizes that there is a relationship between two variables. A relationship that is significant enough statistically, that when the hypothesis is introduced, it affects the result of the experiment just in the way that the conductors of the experimemt have predicted.
So, if the alternative hypothesis for this 'gerbils completing maze experiment' is represented by Ha, just like the researcher theorizes, when Ha is introduced, the gerbils become slower and the mean time for completing the maze is evidently higher than the mean.
Mathematically, it can be written as
Ha:μ>14
Again, this is interpreted as, when Ha is introduced (soothing music), the mean time for the gerbils completing the maze is higher than the original mean (14).
Hope this Helps!!!
The probability a student at a university is a business major is 0.17. The probability a student at a university is receiving financial aid is 0.55. Assume whether is a student is a business major is independent of whether the student is receiving financial aid. What is the probability the student is a business major and receiving financial aid
Answer: 0.0935
Step-by-step explanation: p(business major) = 0.17, p(receiving financial aids) = 0.55
The two events are independent that's the occurrence of one does not affect the other.
Hence, the probability of that the student is a business major and receiving financial aid is given below as
p(business major and financial aid) = 0.17×0.55 = 0.0935.
An art history professor assigns letter grades on a test according to the following scheme. A: Top 5% of scores B: Scores below the top 5% and above the bottom 62% C: Scores below the top 38% and above the bottom 22% D: Scores below the top 78% and above the bottom 5% F: Bottom 5% of scores Scores on the test are normally distributed with a mean of 73.3 and a standard deviation of 9.7. Find the numerical limits for a B grade. Round your answers to the nearest whole number, if necessary.
Answer:
76 ≤ B ≤ 89
Step-by-step explanation:
Mean score (μ) = 73.3
Standard deviation (σ) = 9.7
If B Scores are below the top 5% and above the bottom 62%, then:
62% ≤ B ≤ 95%
In a normal distribution, the 62nd percentile has a corresponding z-score of z = 0.305, while the 95th percentile has a corresponding z-score of z = 1.650.
The grades X1 and X2 which are the limits for a B grade are given by:
[tex]z= \frac{X-\mu}{\sigma}\\0.305= \frac{X_1-73.3}{9,7}\\X_1=76.2\\1.650= \frac{X_2-73.3}{9,7}\\X_2=89.3[/tex]
Rounding to the nearest whole number, a B grade is given to grades between 76 and 89.
Final answer:
To calculate the numerical limits for a B grade in a normally distributed set of test scores with a mean of 73.3 and a standard deviation of 9.7, we find the z-scores corresponding to the top 5% and bottom 62%. The B grade range is approximately between 70 and 89.
Explanation:
To find the numerical limits for a B grade in a normally distributed set of test scores, we must determine the z-scores that correspond to the top 5% and the bottom 38% of scores since a B grade is assigned to scores below the top 5% and above the bottom 62% (which is equivalent to being below the top 38%). Given the mean score is 73.3 and the standard deviation is 9.7, we can use z-score formulas to convert these percentages to raw scores.
For the top 5% cutoff (z = 1.645), the score is calculated as follows:
Top 5% cutoff score = mean + (z x standard deviation)
Top 5% cutoff score = 73.3 + (1.645 x 9.7)
Top 5% cutoff score = 73.3 + 15.9565
Top 5% cutoff score ≈ 89
For the top 38% cutoff (z = -0.31), which is the bottom 62%, the score is calculated as:
Bottom 62% cutoff score = mean + (z x standard deviation)
Bottom 62% cutoff score = 73.3 + (-0.31 x 9.7)
Bottom 62% cutoff score = 73.3 + (-2.997)
Bottom 62% cutoff score ≈ 70
Therefore, a B grade on this test would be for scores roughly between 70 and 89.
A factory makes 10% defective items and items are independently defective. If a sample of 10 items is to be selected, find the probability that 9 or more are NOT defective in two ways. (Round to 3 decimal places) g
Answer:
[tex]P(x \geq 9)=P(X=9)+P(X=10)[/tex]
[tex]P(X=9)=(10C9)(0.9)^9 (1-0.9)^{10-9}=0.387[/tex]
[tex]P(X=10)=(10C10)(0.9)^{10} (1-0.9)^{10-10}=0.349[/tex]
And adding we got:
[tex]P(x \geq 9)=P(X=9)+P(X=10)=0.387+0.349=0.736[/tex]
Step-by-step explanation:
Previous concepts
The binomial distribution is a "DISCRETE probability distribution that summarizes the probability that a value will take one of two independent values under a given set of parameters. The assumptions for the binomial distribution are that there is only one outcome for each trial, each trial has the same probability of success, and each trial is mutually exclusive, or independent of each other".
Solution to the problem
Let X the random variable of interest, on this case we now that:
[tex]X \sim Binom(n=10, p=1-0.1=0.9)[/tex]
Where 1-p = 1-0.1=0.9 represent the probability of being NOT defective
The probability mass function for the Binomial distribution is given as:
[tex]P(X)=(nCx)(p)^x (1-p)^{n-x}[/tex]
Where (nCx) means combinatory and it's given by this formula:
[tex]nCx=\frac{n!}{(n-x)! x!}[/tex]
And we want to find this probability:
[tex]P(x \geq 9)=P(X=9)+P(X=10)[/tex]
[tex]P(X=9)=(10C9)(0.9)^9 (1-0.9)^{10-9}=0.387[/tex]
[tex]P(X=10)=(10C10)(0.9)^{10} (1-0.9)^{10-10}=0.349[/tex]
And adding we got:
[tex]P(x \geq 9)=P(X=9)+P(X=10)=0.387+0.349=0.736[/tex]
A study of consumer smoking habits includes 194194 people in the 18-22 age bracket (4848 of whom smoke), 142142 people in the 23-30 age bracket (3333 of whom smoke), and 8989 people in the 31-40 age bracket (2020 of whom smoke). If one person is randomly selected from this sample, find the probability of getting someone who is age 18-22 or does not smoke.
Answer:
0.8753
Step-by-step explanation:
Total Population=194+142+89=425
Population of those who smoke=48+33+20=101
Population of non smokers=425-101=324
Population of those in 18-22 bracket=194
Population of nonsmoker's in 18-22 age bracket=194-48=146
Probability of getting someone who is age 18-22 = [TeX]\frac{194}{425}[/TeX]
Probability of getting someone who does not smoke = [TeX]\frac{324}{425}[/TeX]
Let the event that the person is in age bracket 18-22 be A
Let the event that the person does not smoke be B
Therefore, the probability of getting someone who is age 18-22 or does not smoke
=Probability of getting someone who is age 18-22 + Probability of getting someone who does not smoke - Probability of those who do not smoke and are in the age bracket 18-22
P(A or B)=P(A)+P(B)-P(A and B)
=[TeX]\frac{194}{425}+\frac{324}{425}-\frac{146}{425}[/TeX]
[TeX]=\frac{194+324-146}{425}=\frac{372}{425}=0.8753[/TeX]
Suppose we are interested in analyzing the weights of NFL players. We know that on average, NFL players weigh 247 pounds with a population standard deviation of 47 pounds. Suppose we take a sample of 30 new players and we find that the average weight from that sample is 237 pounds. We are interested in seeing if the weight of NFL players is decreasing. What is the standard error? What is the margin of error at 90% confidence? Using my sample of 30, what would be the 90% confidence interval for the population mean? If I wanted to control my margin of error and set it to 5 at 90% confidence, what sample size would I need to take instead of the 30? What are the null and alternative hypotheses? What is the critical value at 90% confidence? Calculate the test statistic (using the sample of 30 and NOT the answer from part d). Find the p-value. What conclusion would be made here at the 90% confidence level?
Answer:
[tex] SE= \frac{\sigma}{\sqrt{n}} = \frac{47}{\sqrt{30}}= 8.58[/tex]
[tex] ME= 1.64 *\frac{\sigma}{\sqrt{n}} = 1.64*\frac{47}{\sqrt{30}}= 14.073[/tex]
[tex] \bar X - ME = 237- 14.073 = 222.927[/tex]
[tex] \bar X + ME = 237+ 14.073 = 251.073[/tex]
[tex]n=(\frac{1.640(47)}{5})^2 =237.65 \approx 238[/tex]
So the answer for this case would be n=238 rounded up to the nearest integer
Null hypothesis:[tex]\mu \geq 247[/tex]
Alternative hypothesis:[tex]\mu <247[/tex]
[tex]z=\frac{237-247}{\frac{47}{\sqrt{30}}}=-1.165[/tex]
[tex]p_v =P(z<-1.165)=0.122[/tex]
If we compare the p value and the significance level given [tex]\alpha=0.1[/tex] we see that [tex]p_v>\alpha[/tex] so we can conclude that we have enough evidence to FAIL to reject the null hypothesis, and we can't conclude that the true mean is lower than 247 at 10% of significance.
Step-by-step explanation:
For this case we have the following data given:
[tex] \bar X =237[/tex] represent the sample mean
[tex]\sigma = 47[/tex] represent the population deviation
[tex] n =30[/tex] represent the sample size selected
[tex]\mu_0 = 247[/tex] represent the value that we want to test.
The standard error for this case is given by:
[tex] SE= \frac{\sigma}{\sqrt{n}} = \frac{47}{\sqrt{30}}= 8.58[/tex]
For the 90% confidence the value of the significance is given by [tex] \alpha=1-0.9 = 0.1[/tex] and [tex] \alpha/2 = 0.05[/tex] so we can find in the normal standard distribution a quantile that accumulates 0.05 of the area on each tail and we got:
[tex] z_{\alpha/2}= 1.64[/tex]
And the margin of error would be:
[tex] ME= 1.64 *\frac{\sigma}{\sqrt{n}} = 1.64*\frac{47}{\sqrt{30}}= 14.073[/tex]
The confidence interval for this case would be given by:
[tex] \bar X - ME = 237- 14.073 = 222.927[/tex]
[tex] \bar X + ME = 237+ 14.073 = 251.073[/tex]
The margin of error is given by this formula:
[tex] ME=z_{\alpha/2}\frac{\sigma}{\sqrt{n}}[/tex] (a)
And on this case we have that ME =5 and we are interested in order to find the value of n, if we solve n from equation (a) we got:
[tex]n=(\frac{z_{\alpha/2} \sigma}{ME})^2[/tex] (b)
Replacing into formula (b) we got:
[tex]n=(\frac{1.640(47)}{5})^2 =237.65 \approx 238[/tex]
So the answer for this case would be n=238 rounded up to the nearest integer
State the null and alternative hypotheses.
We need to conduct a hypothesis in order to check if the true mean is lower than 247 pounds, the system of hypothesis would be:
Null hypothesis:[tex]\mu \geq 247[/tex]
Alternative hypothesis:[tex]\mu <247[/tex]
Since we know the population deviation, is better apply a z test to compare the actual mean to the reference value, and the statistic is given by:
[tex]z=\frac{\bar X-\mu_o}{\frac{\sigma}{\sqrt{n}}}[/tex] (1)
z-test: "Is used to compare group means. Is one of the most common tests and is used to determine if the mean is (higher, less or not equal) to an specified value".
Calculate the statistic
We can replace in formula (1) the info given like this:
[tex]z=\frac{237-247}{\frac{47}{\sqrt{30}}}=-1.165[/tex]
P-value
Since is a left tailed test the p value would be:
[tex]p_v =P(z<-1.165)=0.122[/tex]
Conclusion
If we compare the p value and the significance level given [tex]\alpha=0.1[/tex] we see that [tex]p_v>\alpha[/tex] so we can conclude that we have enough evidence to FAIL to reject the null hypothesis, and we can't conclude that the true mean is lower than 247 at 10% of significance.
The times (in minutes) that several underwriters took to review applications for similar insurance coverage are 50, 230, 52, and 57. What is the median length of time required to review an application?
Answer:
The median is located at the 2.5th position, which is halfway between the values 52 and 57.
Step-by-step explanation:
The Median is referred to as the Middle term of a set of Data when ordered in Ascending/Descending order.
Consider the numbers 50, 230, 52, and 57
Arranging them in an Ascending Order
50, 52, 57, 230
The number of data in the set is even.
Dividing the data into two halves (50, 52 and 57, 230)
The median is halfway between the two halves.
The median is located at the 2.5th position, which is halfway between the values 52 and 57.
Suppose that X has a Poisson distribution with a mean of 64. Approximate the following probabilities. Round the answers to 4 decimal places (e.g. 98.7654). a) Upper P left-parenthesis Upper X greater-than 84right-parenthesis equals b) Upper P left-parenthesis Upper X less-than 64 right-parenthesis equals
Answer:
(a) The probability of the event (X > 84) is 0.007.
(b) The probability of the event (X < 64) is 0.483.
Step-by-step explanation:
The random variable X follows a Poisson distribution with parameter λ = 64.
The probability mass function of a Poisson distribution is:
[tex]P(X=x)=\frac{e^{-\lambda}\lambda^{x}}{x!};\ x=0, 1, 2, ...[/tex]
(a)
Compute the probability of the event (X > 84) as follows:
P (X > 84) = 1 - P (X ≤ 84)
[tex]=1-\sum _{x=0}^{x=84}\frac{e^{-64}(64)^{x}}{x!}\\=1-[e^{-64}\sum _{x=0}^{x=84}\frac{(64)^{x}}{x!}]\\=1-[e^{-64}[\frac{(64)^{0}}{0!}+\frac{(64)^{1}}{1!}+\frac{(64)^{2}}{2!}+...+\frac{(64)^{84}}{84!}]]\\=1-0.99308\\=0.00692\\\approx0.007[/tex]
Thus, the probability of the event (X > 84) is 0.007.
(b)
Compute the probability of the event (X < 64) as follows:
P (X < 64) = P (X = 0) + P (X = 1) + P (X = 2) + ... + P (X = 63)
[tex]=\sum _{x=0}^{x=63}\frac{e^{-64}(64)^{x}}{x!}\\=e^{-64}\sum _{x=0}^{x=63}\frac{(64)^{x}}{x!}\\=e^{-64}[\frac{(64)^{0}}{0!}+\frac{(64)^{1}}{1!}+\frac{(64)^{2}}{2!}+...+\frac{(64)^{63}}{63!}]\\=0.48338\\\approx0.483[/tex]
Thus, the probability of the event (X < 64) is 0.483.
To approximate probabilities for a Poisson distribution with mean 64, one can use the cumulative distribution function of the Poisson distribution. But for large means like 64, using a Normal approximation to the Poisson might be more accurate.
Explanation:The question is about the Poisson distribution which is a probability distribution used often in statistical modelling where we are counting the number of times an event happens in a fixed interval of time or space. The mean is given as 64. To compute probabilities for values more than or less than a certain value, we use the cumulative distribution function (cdf) of the Poisson distribution.
The cumulative distribution function gives us the probability that the random variable is less than or equal to a certain value. In other words, if we want to find P(X > 84), we can find it by subtracting P(X <= 83) from 1. Likewise, to find P(X < 64), we can directly use the cdf at 63.
Please note however, because of the large mean (64), it may be more accurate to use a Normal approximation to the Poisson with mean 64 and variance 64. In that case, standardize the variables and use the Standard Normal table for the probabilities.
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Given the following winning percentages of the teams in a league (for a single year) compute the within-season standard deviation for the league. Team Season Winning Percentage 1 0.750 2 0.750 3 0.200 4 0.600 5 0.200 (a) 0.79 (b) 0.251 (x) 0.56 (d) 0.063
Answer:
(b) 0.251
Step-by-step explanation:
1. Standard deviation equation:
[tex]SD=\sqrt{\frac{\sum\limits^N_i {(x_{i}-X)^{2} } }{N} }[/tex]
Where X is the mean of the data, and N the amount of data. Then, N=5
2. Estimate the Mean:
[tex]X=\frac{0.750+0.750+0.200+0.600+0.200}{5}=\frac{2.5}{5}=0.5\\[/tex]
3. Caclulate Standard deviation:
[tex]SD=\sqrt{\frac{{(0.750-0.500)^{2}+(0.750-0.500)^{2}+(0.200-0.500)^{2}+(0.600-0.500)^{2}+(0.200-0.500)^{2} } }{5} }[/tex]
[tex]SD=\sqrt{\frac{0.315}{5} }=\sqrt{0.063}\\SD=0.251[/tex]
Which of the following is a quantitative continuous variable? a. Where a family goes on vacation b. Distance a family travels on vacation c. Number of vacations a family takes per year d. Number of consecutive years that a family goes on a vacation (Let a trip of at least 200 miles from home be defined as a "vacation") e. Amount spent on the vacation, to the nearest $100.
Answer:
Which of the following is a quantitative continuous variable?
b. Distance a family travels on vacation
e. Amount spent on the vacation, to the nearest $100.
Step-by-step explanation:
Quantitative variables use numbers to express attributes, there are 2 types:
1. Quantitave continuous variables use numbers to express the attributes but, could have an infinite value between its maximum and minimum values, and are able to be divided into smaller values, such as in options b and e.
2. Quantitative discrete, also use numbers to express attributes, but they may have some, but not all the values, and must be integers, such as in options:
c. Number of vacations a family takes per year
d. Number of consecutive years that a family goes on a vacation (Let a trip of at least 200 miles from home be defined as "vacation").
e. Amount spent on the vacation, to the nearest $100.
And there are the cualitative variables, which use words to express attributes, such as in:
a. Where a family goes on vacation.
Before a strike prematurely ended the 1994 major league baseball season, Tony Gwynn of the San Diego Padres had 165 hits in 419 at bats, for a .394 batting average. Baseball fans argued over whether Gwynn was effectively a .400 hitter that year. Test this hypothesis
Answer:
yes, he was effectively a .400 hitter
Step-by-step explanation:
The mean rate of success ( ÿ ) is 0.394.
The total number of hits was 419.
Under table t the value at 5% confidence interval is 1.96.
Here se the asymptotic standard deviation is given as follows
se = [tex]\sqrt{\frac{y(1 - y)}{n} }[/tex]
= [tex]\sqrt{\frac{0.394(1 - 0.394)}{419} }[/tex]
= 0.02387
The confidence interval is calculated as follows:
y ± 1.96 * se
0.394 ± 1.96 * 0.02387
the answer is -0.347 or 0.4407)
meaning that the mean lies between -0.347 to 0.4407.
There is strong evidence that 0.4 lies between the above confidence interval.
This means that Gwynn was effectively a 0.4 hitter
Tony Gwynn's batting average was .394 with 165 hits in 419 at bats. He would have needed approximately 3 more hits to officially reach a .400 average. Despite his impressive performance, it is factually incorrect to label him a .400 hitter for that season.
To test the hypothesis that Tony Gwynn was a .400 hitter in 1994 before the strike ended the season, we need to see if his actual batting average could be considered close to .400 even though it was .394.
Gwynn had 165 hits in 419 at bats, which gives a batting average of 165/419, or approximately .394 when rounded to three decimal places. To have a .400 average, he would need to have 419 * .400 hits, which equals 167.6. Therefore, he needed approximately 3 more hits (rounding up from 2.6) to achieve a .400 average with the same number of at bats.
Given that batting averages are not rounded up after the season ends, stating that Gwynn was a .400 hitter would be incorrect. However, his achievement of .394 is remarkably high, and some may argue that rounding up for discussion purposes could informally suggest he was 'effectively' a .400 hitter.