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Chapter 6: Problem 6

The director of admissions at Kinzua University in Nova Scotia estimated the distribution of student admissions for the fall semester on the basis of past experience. What is the expected number of admissions for the fall semester? Compute the variance and the standard deviation of the number of admissions. $$ \begin{array}{|cc|} \hline \text { Admissions } & \text { Probability } \\ \hline 1,000 & .6 \\ 1,200 & .3 \\ 1,500 & .1 \\ \hline \end{array} $$

Short Answer

Expert verified
Expected admissions: 1110; Variance: 24900; Standard deviation: 157.76.

Step by step solution

01

Calculate expected value

To find the expected number of admissions, we multiply each number of admissions by its corresponding probability and sum these products. The formula for expected value \( E(X) \) is given by \( E(X) = \sum_{i} x_i \cdot p_i \). Substituting in the given values: \( E(X) = 1000 \times 0.6 + 1200 \times 0.3 + 1500 \times 0.1 \). Calculating this gives us: \( E(X) = 600 + 360 + 150 = 1110 \). Hence, the expected number of admissions is 1110.
02

Compute variance

To find the variance, we calculate \( Var(X) = \sum_{i} (x_i - \mu)^2 \cdot p_i \), where \( \mu \) is the expected value from Step 1. Therefore, \( Var(X) = (1000-1110)^2 \times 0.6 + (1200-1110)^2 \times 0.3 + (1500-1110)^2 \times 0.1 \). Performing the calculations gives \( (1000-1110)^2 = 12100 \), \( (1200-1110)^2 = 8100 \), \( (1500-1110)^2 = 152100 \). So, \( Var(X) = 12100 \times 0.6 + 8100 \times 0.3 + 152100 \times 0.1 = 7260 + 2430 + 15210 = 24900 \). Thus, the variance is 24900.
03

Calculate standard deviation

The standard deviation is the square root of the variance, \( \sigma = \sqrt{Var(X)} \). From Step 2, \( Var(X) = 24900 \). Thus, \( \sigma = \sqrt{24900} \). The calculation gives \( \sigma \approx 157.76 \). Therefore, the standard deviation of the number of admissions is approximately 157.76.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

variance
Variance is a key concept in statistics that helps us measure how much a set of numbers differs, or varies, from the average. This measure is particularly important in probability distribution, where it tells us about the spread of the possible outcomes. In our exercise, we came across the variance as part of calculating how much the student admissions at Kinzua University deviate from the expected number of 1110. But what exactly is variance and how is it calculated? To find variance, you need to follow these simple steps:
  • First, determine the expected value, which in this case is 1110. It represents the mean of all possible outcomes based on their probabilities.
  • Next, subtract this expected value from each outcome.
  • Square the result for each outcome to eliminate negative numbers and give more weight to larger differences.
  • Finally, multiply each squared result by its corresponding probability, and sum these products to get the variance 24900.
Variance provides a numerical value that informs us how much the admissions numbers spread out from the average, with a higher variance indicating a wider spread.
standard deviation
The standard deviation is closely related to variance and is another important statistical measure used to describe the variability or spread of a data set. While variance gives us a sense of how data points differ from the mean, standard deviation puts this into the context of the original data units, making it easier to interpret. To compute the standard deviation, you simply take the square root of the variance. In our Kinzua University example, this was computed as follows:
  • The variance was calculated as 24900.
  • By taking the square root of 24900, we get a standard deviation of approximately 157.76.
When interpreting this, a standard deviation of 157.76 means that individual admission numbers deviate from the mean of 1110 by about 157.76 admissions on average. The standard deviation provides a straightforward way to grasp how spread out the admission numbers are against the expected mean.
probability distribution
Probability distribution is a fundamental concept in statistics. It describes how probabilities are assigned to different possible outcomes of a random variable. In essence, a probability distribution tells us the chance or likelihood of each outcome occurring. In our exercise involving Kinzua University's admissions, we have the probability distribution as follows:
  • There is a 60% probability (0.6) that admissions will be 1000.
  • There is a 30% probability (0.3) that admissions will be 1200.
  • And finally, there is a 10% probability (0.1) that admissions will be 1500.
This distribution gives us a complete view of all possible admission numbers and how likely each is to occur. By understanding the distribution, we are able to compute expected values, as well as variance and standard deviation. Probability distributions are essential in making informed predictions and assessing the risk or variability of outcomes in different scenarios.

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Most popular questions from this chapter

The speed with which utility companies can resolve problems is very important. GTC, the Georgetown Telephone Company, reports it can resolve customer problems the same day they are reported in \(70 \%\) of the cases. Suppose the 15 cases reported today are representative of all complaints. a. How many of the problems would you expect to be resolved today? What is the standard deviation? b. What is the probability 10 of the problems can be resolved today? c. What is the probability 10 or 11 of the problems can be resolved today? d. What is the probability more than 10 of the problems can be resolved today?

Acceptance sampling is a statistical method used to monitor the quality of purchased parts and components. To ensure the quality of incoming parts, a purchaser or manufacturer normally samples 20 parts and allows one defect. a. What is the likelihood of accepting a lot that is \(1 \%\) defective? b. If the quality of the incoming lot was actually \(2 \%,\) what is the likelihood of accepting it? c. If the quality of the incoming lot was actually \(5 \%,\) what is the likelihood of accepting it?

Compute the mean and variance of the following discrete probability distribution. $$ \begin{array}{|rr|} \hline {}{} {\boldsymbol{x}} & \boldsymbol{P}(\boldsymbol{x}) \\ \hline 2 & .5 \\ 8 & .3 \\ 10 & .2 \\ \hline \end{array} $$

Recent difficult economic times have caused an increase in the foreclosure rate of home mortgages. Statistics from the Penn Bank and Trust Company show their monthly foreclosure rate is now 1 loan out of every 136 loans. Last month the bank approved 300 loans. a. How many foreclosures would you expect the bank to have last month? b. What is the probability of exactly two foreclosures? c. What is the probability of at least one foreclosure?

An American Society of Investors survey found \(30 \%\) of individual investors have used a discount broker. In a random sample of nine individuals, what is the probability: a. Exactly two of the sampled individuals have used a discount broker? b. Exactly four of them have used a discount broker? c. None of them has used a discount broker?
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