Important MCQs Sampling Techniques Quiz 2

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The post is about MCQs Sampling Techniques Quiz with Answers. There are 20 Multiple-Choice Questions from topics related to sampling and sampling distribution, probability and non-probability sampling distribution, examples related to sampling methods, sampling error, and standard error of sampling distribution. Let us start with the MCQs Sampling Techniques Quiz.

Online MCQs about Sample and Sampling Distribution for PPSC and FPSC Lecturer job.

1. In a _____ sample, every member of a population is selected randomly and has an equal chance of being chosen.

 
 
 
 

2. A restaurant wants to gather data about a new dish by giving out free samples and asking for feedback. Who should the restaurant give samples to?

 
 
 
 

3. A magazine conducts a survey and asks its readers to cut the questionnaire from the magazine, fill it and send it via mail. It is a type of

 
 
 
 

4. The standard error of mean is the standard deviation of the

 
 
 
 

5. A data professional is conducting an employee satisfaction survey. First, they list all the employees alphabetically by first name. Then, they randomly choose a starting point on the list and pick every third name to be in the sample. What sampling method are they using?

 
 
 
 

6. Bias is

 
 
 
 

7. What best describes a sample size?

 
 
 
 

8. The sampling Error is

 
 
 
 
 

9. What term describes a probability distribution of a sample statistic?

 
 
 
 

10. The sampling technique in which every element of the population has an equal, non-zero probability of being selected in a sample is called

 
 
 
 
 

11. When working with sample data, what is the first step in the sampling process?

 
 
 
 

12. In the data analysis process, how does a sample relate to a population?

 
 
 
 

13. Probability sampling uses ________ selection to generate a sample.

 
 
 
 

14. Non-probability sampling includes which of the following sampling methods?

 
 
 
 

15. The probability distribution of a statistic is called

 
 
 
 
 

16. The unbiased point estimator of the population mean is

 
 
 
 
 

17. A data professional is conducting an election poll. As a first step in the sampling process, they identify the target population. What is the second step in the sampling process?

 
 
 
 

18. If the mean of the sampling distribution is equal to the parameters then estimators will be

 
 
 
 
 

19. Probability distribution of $\overline{X}$ is called its

 
 
 
 
 

20. The height distribution of a few students in a school is an example of

 
 
 
 


MCQS Sampling Techniques Quiz

MCQs Sampling Techniques Quiz with Answers
  • The sampling Error is
  • The height distribution of a few students in a school is an example of
  • The unbiased point estimator of the population mean is
  • Bias is
  • The sampling technique in which every element of the population has an equal, non-zero probability of being selected in a sample is called
  • If the mean of the sampling distribution is equal to the parameters then estimators will be
  • Probability distribution of $\overline{X}$ is called its
  • The probability distribution of a statistic is called
  • A magazine conducts a survey and asks its readers to cut the questionnaire from the magazine, fill it and send it via mail. It is a type of
  • The standard error of mean is the standard deviation of the
  • What best describes a sample size?
  • In the data analysis process, how does a sample relate to a population?
  • When working with sample data, what is the first step in the sampling process?
  • Probability sampling uses ———— selection to generate a sample.
  • A data professional is conducting an election poll. As a first step in the sampling process, they identify the target population. What is the second step in the sampling process?
  • In a ———– sample, every member of a population is selected randomly and has an equal chance of being chosen.
  • Non-probability sampling includes which of the following sampling methods?
  • What term describes a probability distribution of a sample statistic?
  • A data professional is conducting an employee satisfaction survey. First, they list all the employees alphabetically by first name. Then, they randomly choose a starting point on the list and pick every third name to be in the sample. What sampling method are they using?
  • A restaurant wants to gather data about a new dish by giving out free samples and asking for feedback. Who should the restaurant give samples to?
statistics help: mcqs sampling techniques quiz with answers

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Top Online Sampling MCQs 3

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The post is about Online Sampling MCQs. There are 20 multiple-choice questions each with four possible options. The quiz covers the topics related to sample and sampling techniques, Types of Sampling Techniques, Sampling Frame and Sampling unit, and Sampling Error. Let us start with the Sampling MCQs Quiz.

Please go to Top Online Sampling MCQs 3 to view the test

Online Sampling MCQs with Answers

Online Sampling MCQs with Answers
  • Probability sampling is the procedure that gives all units
  • Which of the following is not an example of a non-sampling risk?
  • The advantage of using statistical sampling techniques is that such techniques
  • Which of the following is an example of using statistical sampling?
  • Which of the following is NOT one of the principles of sampling listed in the text?
  • How is stratified sampling carried out?
  • The sampling procedure that includes all units of the population in the study is called
  • Why do sampling errors occur?
  • If all other factors specified in an attribute sampling plan remain constant, changing the specified tolerable deviation rate from 6% to 10%, and changing the specified risk from 97% to 93%, would cause the required sample size to
  • The sampling procedure in which an interviewer is asked to interview 25 teachers, 50 public servants, and 25 farmers are called
  • A large retail store needs to conduct a survey to learn why their consumers purchase the store’s products. How should the retail store survey their customers?
  • Data and business objectives might not align for a number of reasons. Which of the following issues can prevent alignment?
  • A car manufacturer wants to learn more about the brand preferences of electric car owners. There are millions of electric car owners in the world. Who should the company survey?
  • A restaurant gathers data about a new dish by providing free samples to parties of six or more diners. What does this scenario describe?
  • Which of the following statements accurately describes a representative sample?
  • What stage of the sampling process refers to creating a list of all the items in the target population?
  • The instructor of a fitness class asks their regular students to take an online survey about the quality of the class. What sampling method does this scenario refer to?
  • Which of the following activities are stages in the typical sampling process?
  • In statistics, ———- refers to the number of individuals or items chosen for a study or experiment.
  • The standard error measures the ———- of a sampling distribution.
Sampling Quiz MCQs with Answers

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Determination of Sample Size: A Quick Tutorial

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By determination of sample size, we mean to select the appropriate number of observations/ persons/ subjects from a large group to use in a sample. A sample with an appropriate number of observations and a sample with an appropriate size so that the results are statistically valid and accurate estimate the population parameters.

Importance of Determining the Sample Size

Determination of sample size is important as appropriate sample size usually saves time, costs, and labor involved in studying the members of the population. It also helps to select a representative sample of objects/subjects if an appropriate sampling technique is used for the selection of objects/subjects.

Therefore, it is important to remember that, a good sample size depends on the contexts and goals of the research being done. On the other hand, a good sample size results in reliable statistical estimates and represents the population under study accurately. In general, large sample sizes are considered better as they reduce the likelihood of sampling error. However, the larger the sample larger the time, cost, and labor required to collect the sample. The sample size directly affects the accuracy and reliability of your findings.

The margin of error will decrease by drawing a larger sample, for a given confidence level say $c$, standard deviation $\sigma$.

Determination of Sample Size and Sample Size Formula

One can determine the sample size if the maximum allowable error and level of confidence are known. If population standard deviation can be estimated, then the necessary sample size can be determined by simplifying the error formula for $n$.

The maximum allowable error is: $E=Z \frac{\sigma}{\sqrt{n}}$

By multiplying both sides with $\sqrt{n}$, we have

$E\sqrt{n} = Z \sigma$

Dividing both sides by $E$, we obtain $\sqrt{n} = \frac{Z\sigma}{E}$

Finally, squaring both sides, we get the sample size formula:
$$n=\left(\frac{Z\sigma}{E}\right)^2$$

Determination of Sample Size

Example: Determining Sample Size

Suppose, we are interested in finding the average weight of Pakistani men, and we want to be 95% confident that our estimate falls within $\pm2$lbs, of the actual mean. Let’s suppose that according to the previous studies, the population standard deviation (or estimated standard deviation) is $\sigma = 18.4$lbs. We are interested in determining sample size from the above-given information.

According to the given information
$\alpha = 0.05, Z_\alpha = 1.96$, the desired maximum error is $E=2$, and the estimated $\sigma = 18.4$. Therefore,
$$n=\left(\frac{Z\sigma}{E}\right)^2 = \left( \frac{1.96 \times 18.4}{2}\right)^2 \approx 325.15$$
The appropriate sample size for the above scenario should be 326 men for the given desired level of accuracy.

Summary

Note that If the population under study is highly diverse (heterogeneous population), a larger sample size may be necessary to ensure adequate representation of different subgroups. The type of study (e.g., survey, experiment) and the research questions can also influence the appropriate sample size. Similarly, the Practical Constraints: Factors such as budget, time, and accessibility can limit the feasible sample size.

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Properties of Arithmetic Mean with Examples

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In this post, we will discuss about properties of Arithmetic mean with Examples.

Arithmetic Mean

The arithmetic mean, often simply referred to as the mean, is a statistical measure that represents the central value of a dataset. The arithmetic mean is calculated by summing all the values in the dataset and then dividing by the total number of observations in the data.

The Sum of Deviations From the Mean is Zero

Property 1: The sum of deviations taken from the mean is always equal to zero. Mathematically $\sum\limits_{i=1}^n (x_i-\overline{x}) = 0$

Consider the ungrouped data case.

Obs. No.$X$$X_i-\overline{X}$
181-19
21000
396-4
41088
590-10
61022
71044
81033
91000
101099
1191-9
1211616
Total$\sum X_i = 1200$$\sum\limits_{i=1}^n (X_i-\overline{X})=0$

For grouped data $\overline{X} = \sum\limits_{i=1}^k f_i(X_i -\overline{X}) =0$, where for grouped data $\overline{X} =\frac{\sum\limits_{i=1}^n M_i f_i}{\sum\limits_{i=1}^n f_i}$. Suppose, we have the following grouped data

Classes$f$$M$$fM$$f_i(M_i – \overline{X})$
65 – 85975675$9\times (75 – 123) = -432$
85 – 1051095950$10\times (95 – 123) = -280$
105 – 125171151955$17\times (115 – 123) = -136$
125 – 145101351350$10\times (135 – 123) = 120$
145 – 1655155775$5\times (155 – 123) = 160$
165 – 1854175700$4\times (175 – 123) = 208$
185 – 2055195975$5\times (195 – 123) = 360$
Total$\Sigma f = n = 60$$\Sigma fM = 7380$$\sum\limits_{i=1}^k f_i(X_i -\overline{X}) =0$

Mean = $\overline{X} = \frac{\Sigma fM}{\Sigma f} = \frac{7380}{60} = 123$ .

The Combined Mean of Different Data Sets

Property 2: If there are different sets of data say $k$ then the combined mean/ average is

\begin{align*}
\overline{X}_c &= \frac{n_1 \overline{x}_1 + n_2\overline{x}_2 +\cdots + n_k \overline{x}_k }{n_1+n_2\cdots + n_k}\\
&=\frac{\Sigma x_1 + \Sigma x_2 + \cdots + \Sigma x_k}{n_1+n_2+\cdots + n_k}
\end{align*}

Suppose, we have data of $k$ groups.

Obs. No.$X_1$$X_2$$X_3$$X_4$$X_5$
1814092107113
2100309511094
396229911493
41085194109119
590101116105
6102103118
7104100115
8103102
9100101
10109
1191
12116
Sum1200143887789524

For \begin{align*}
\overline{X}_1 &= \frac{\sum\limits_{i=1}^n X_1}{n_1} = \frac{1200}{12} = 100\\
\overline{X}_2 &= \frac{\sum\limits_{i=1}^n X_2}{n_2} = \frac{143}{4} = 35.8\\
\overline{X}_3 &= \frac{\sum\limits_{i=1}^n X_3}{n_3} = \frac{887}{9} = 98.6\\
\overline{X}_4 &= \frac{\sum\limits_{i=1}^n X_4}{n_4} = \frac{789}{7} = 112.7\\
\overline{X}_5 &= \frac{\sum\limits_{i=1}^n X_5}{n_5} = \frac{524}{5} = 104.8\\
\overline{X}_c &= \frac{n_1\overline{X}_1 + n_2 \overline{X}_2 + \cdots + n_5 \overline{X}_5}{n_1+n_2+n_3+n_4+n_5}\\
&=\frac{12\times 100 + 4\times 35.8 + 9\times 98.6 + 7\times 112.7 + 5\times 104.8}{12+4+9+7+5} =\frac{3543.5}{37} = 95.7703
\end{align*}

For combined mean, not all the data set needs to be ungrouped or grouped. It may be possible that some data sets are ungrouped and some data sets are grouped.

Sum Squared Deviations from the Mean are Always Minimum

Property 3: The sum of the squared deviations of the observations from the arithmetic mean is minimum, which is less than the sum of the squared deviations of the observations from any other values. In other words, the sum of squared deviations from the mean is less than the sum of squared deviations from any other value. Mathematically,

For Ungrouped Data: $\Sigma (X_i – \overline{X})^2 < \Sigma (X_i – A)^2$

For Grouped Data: $\Sigma f(X_i – \overline{x})^2 < \Sigma f(M_i – A)^2$

where $A$ is any arbitrary value, also known as provisional mean. For this condition, $A$ is not equal to the arithmetic mean.

Note that the difference between the sum of deviations and the sum of squared deviations is that in the sum of deviations we take the difference (subtract) of each observation from the mean and then sum all the differences. In the sum of squared deviations, we take the difference of each observation from the mean, then take the square of all the differences, and then sum all the resultant values at the end.

Properties of Arithmetic Mean with Examples

From the above calculations, it can observed that $\Sigma (X_i – \overline{X})^2 < \Sigma (X_i – 90)^2 < \Sigma (X_i – 99)^2$.

No Resistant to Outliers

Property 4: The arithmetic mean is not resistant to outliers. It means that the arithmetic mean can be misleading if there are extreme values in the data.

Arithmetic Mean is Sensitive to Outliers

Property 5: The arithmetic mean is sensitive to extreme values (outliers) in the data. If there are a few very large or very small values, they can significantly influence the mean.

The Affect of Change in Scale and Origin

Property 6: If a constant value is added or subtracted from each data point, the mean will be changed by the same amount.
Similarly, if a constant value is multiplied or divided by each data point, the mean will be multiplied or divided by the same constant.

Unique Value

Property 7: For any given dataset, there is only one unique arithmetic mean.

In summary, the arithmetic mean is a widely used statistical measure (a measure of central tendency) that provides a central value for a dataset.
However, it is important to be aware of the properties of arithmetic mean and its limitations, especially when dealing with data containing outliers.

FAQs about Arithmetic Mean Properties

  1. Explain how the sum of deviation from the mean is zero.
  2. What is meant by unique arithmetic mean for a data set?
  3. What is arithmetic mean?
  4. How combined mean of different data sets can be computed, explain.
  5. Elaborate Sum of Squared Deviation is minimum?
  6. What is the impact of outliers on arithmetic mean?
  7. How does a change of scale and origin change the arithmetic mean?
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