Muhammad Imdad Ullah

Currently working as Assistant Professor of Statistics in Ghazi University, Dera Ghazi Khan. Completed my Ph.D. in Statistics from the Department of Statistics, Bahauddin Zakariya University, Multan, Pakistan. l like Applied Statistics, Mathematics, and Statistical Computing. Statistical and Mathematical software used is SAS, STATA, Python, GRETL, EVIEWS, R, SPSS, VBA in MS-Excel. Like to use type-setting LaTeX for composing Articles, thesis, etc.

Weighted Average Real Life Examples

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Introduction to Weighted Averages

The multipliers or sets of numbers that express more or less relative importance of various observations (data points) in a data set are called weights.

The weighted arithmetic mean (simply called weighted average or weighted mean) is similar to an ordinary arithmetic mean except that instead of each data point contributing equally to the final average, some data points contribute more than others. Weighted means are useful in a wide variety of scenarios. Weighted averages are used when there are a bunch of values, but some of those values are more important or contribute more to the overall result.

Example of Weighted Average

For example, a student may use a weighted mean to calculate his/her percentage grade in a course. In such an example, the student would multiply the weight of all assessment items in the course (e.g., assignments, exams, sessionals, quizzes, projects, etc.) by the respective grade that was obtained in each of the categories.

As an example, suppose in a course there are a total of 60 marks, while the distribution of marks is as follows, Assignment-1 has a weightage of 10%, Assignment-2 has a weightage of 10%, the mid-term examination has a weightage of 30% and the final term examination have the weightage of 50%. The scenario is described in the table below:

Assessment
Item		Weight
($w_i$)		Grades
($x_i$)		MarksWeighted Marks
($w_ix_i$)
Midterm10 %70 %67 %
Assignment # 210 %65 %66.5 %
Midterm Examination30 %70 %1221 %
Final Term Examination50 %85 %3042.5 %
 100 %290 %6077 %

Weighted Average Formula

Mathematically, the weighted average forma is given as

$$\overline{x}_w = \frac{\sum\limits_{i=1}^n w_i x_i}{\sum\limits_{i=1}^n w_i}$$

Another Example

Consider another example: Suppose we have monthly expenditures of a family on different items with their quantity

ItemsWeights ($w_i$)Expenses ($x_i$)Weighted Expenses
$w_ix_i$
Food7.52902175
Rent2.054108
Clothing1.596144
Fuel and light1.07575
Misc0.57537.5
Total12.55902539.5

The average expenses will be: $AM = \frac{590}{5} = 118$.

However, the weighted average of the scenario will be $\overline{x}_w = \frac{\sum\limits_{i=1}^n w_i x_i}{\sum\limits_{i=1}^n w_i} = \frac{2539.5}{12.5}=203.16$

Keeping in mind the importance of weight, the average monthly expenses of a family was 203.16, not 118.

Note that in a frequency distribution, the computation of relative frequency (rf) is also related to the concept of weighted averages.

ClassesFrequencyMid point ($X$)rfPercentage
65-84974.5$\frac{9}{60} = 0.15$15
85-1041094.5$\frac{10}{60} = 0.17$17
105-12417114.5$\frac{10}{60} = 0.28$28
125-14410134.5$\frac{10}{60} = 0.17$17
145-1645154.5$\frac{5}{60} = 0.08$8
165-1844174.5$\frac{4}{60} =0.07$7
185-2045194.5$\frac{5}{60} =0.08$8
Total60  

Some Real-World Examples of Weighted Averages

  • Calculating class grade: Different assignments might have different weights (e.g., exams worth more than quizzes). A weighted mean considers these weights to determine the overall grade.
  • Stock market performance: A stock index might use a weighted average to reflect the influence of large companies compared to smaller ones.
  • Customer Satisfaction: Finding the average customer satisfaction score when some customers’ feedback might hold more weight (e.g., frequent buyers).
  • Average Customer Spending: if some customers buy more frequently.
  • Expected Value: Determining the expected value of outcomes with different probabilities.
Weighted Average

The following are some important questions. What is the importance of weighted mean? Describe its advantages and disadvantages. What is an average? What are the qualities of a good average? What does Arithmetic mean? Describe the advantages and disadvantages of Arithmetic mean. In which situations do we apply arithmetic mean?

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Important MCQs Sampling Distribution Quiz with Answer 11

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Online Sampling Distribution Quiz with Answers for the preparation of exams and different statistical job tests in Government/ Semi-Government or Private Organization sectors. This Online Quiz about Sampling Distributions is also helpful in getting admission to various colleges and Universities. There are 20 Multiple Choice Type Questions from the Sampling and Sampling Distribution Quiz. Let us start with the Sampling Distribution Quiz.

Online Multiple Choice Questions about Sampling and Sampling Distributions with Answers

1. When sampling is done with or without replacement, $E(\overline{y})$ is equal to

 
 
 
 

2. When the number of observations drawn from a stratum is small relative to the overall size of the stratum then the ————- will also be small.

 
 
 
 

3. Regardless of the difference in the distribution of the sample and population, the mean of sampling distribution must be equal to

 
 
 
 

4. Which one of the following is the benefit of using simple random sampling?

 
 
 
 

5. A group consists of 300 people and we are interviewing all members of a given group called:

 
 
 
 

6. Consider a population of size 700 consisting of three strata such that $N_1=100, N_2=250$, and $N_3=350$. The required sample size is 18. What will be the sample size for stratum-II according to proportional allocation?

 
 
 
 

7. A procedure in which the number of elements in a stratum is proportional to the number of elements in the population is called

 
 
 
 

8. If a researcher randomly samples 100 observations in each population category then his ————— sample will be ———-.

 
 
 
 

9. Consider a population of size 700 consisting of three strata such that $N_1=100, N_2=250$, and $N_3=350$. The required sample size is 18. What will be the sample size for stratum-III according to proportional allocation?

 
 
 
 

10. When the procedure of selecting the elements from the population is not based on probability is known as:

 
 
 
 

11. Sampling in which a sampling unit can be repeated more than once is called

 
 
 
 

12. The weight of the stratum is equal to the proportion of:

 
 
 
 

13. Which one of the following is the main problem with using non-probability sampling techniques?

 
 
 
 

14. When the sample size increases, everything else remains the same, and the width of a confidence interval for a population parameter will

 
 
 
 

15. Which one of these sampling methods is a probability method?

 
 
 
 

16. The value of $n_2$ by a proportional allocation from the following information is:
$N_1=580$, $N_2=140$ and $n=80$.

 
 
 
 

17. The weight of the stratum is equal to the proportion of

 
 
 
 

18. The university has 5000 students belonging to the following classes: (i) 1500 are freshmen, (ii) 1200 are sophomores, (iii) 1400 are juniors, and (iv) 900 are seniors. The university administration wants to get an estimate of all the student’s views on a proposal to help alleviate the parking problem on campus. Suppose, that a sample of 100 students is chosen, what is the required sample size for the freshman stratum under proportional allocation?

 
 
 
 

19. The margin of error is the level of _________ you require.

 
 
 
 

20. Stratification is to produce estimators with small

 
 
 
 

MCQs Sampling Distribution Quiz with Answers

  • The weight of the stratum is equal to the proportion of:
  • A group consists of 300 people and we are interviewing all members of a given group called:
  • When the procedure of selecting the elements from the population is not based on probability is known as:
  • The university has 5000 students belonging to the following classes: (i) 1500 are freshmen, (ii) 1200 are sophomores, (iii) 1400 are juniors, and (iv) 900 are seniors. The university administration wants to get an estimate of all the student’s views on a proposal to help alleviate the parking problem on campus. Suppose, that a sample of 100 students is chosen, what is the required sample size for the freshman stratum under proportional allocation?
  • When the sample size increases, everything else remains the same, and the width of a confidence interval for a population parameter will
  • The value of $n_2$ by a proportional allocation from the following information is: $N_1=580$, $N_2=140$ and $n=80$.
  • Sampling in which a sampling unit can be repeated more than once is called
  • Which one of these sampling methods is a probability method?
  • Which one of the following is the main problem with using non-probability sampling techniques?
  • Which one of the following is the benefit of using simple random sampling?
  • When sampling is done with or without replacement, $E(\overline{y})$ is equal to
  • The margin of error is the level of ———- you require.
  • If a researcher randomly samples 100 observations in each population category then his ————— sample will be ———-.
  • Stratification is to produce estimators with small
  • The weight of the stratum is equal to the proportion of
  • When the number of observations drawn from a stratum is small relative to the overall size of the stratum then the ————- will also be small.
  • Regardless of the difference in the distribution of the sample and population, the mean of sampling distribution must be equal to
  • A procedure in which the number of elements in a stratum is proportional to the number of elements in the population is called
  • Consider a population of size 700 consisting of three strata such that $N_1=100, N_2=250$, and $N_3=350$. The required sample size is 18. What will be the sample size for stratum-II according to proportional allocation?
  • Consider a population of size 700 consisting of three strata such that $N_1=100, N_2=250$, and $N_3=350$. The required sample size is 18. What will be the sample size for stratum-III according to proportional allocation?
MCQs Sampling and Sampling Distribution Quiz with Answers

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A sampling distribution depends on several factors:

  • The statistic being used: Is the researcher looking at the mean, median, or something else?
  • The original population’s distribution: Is the population data normally distributed, skewed, or something else?
  • Sample size: Generally, larger samples lead to sampling distributions closer to the actual population distribution.
https://itfeature.com Sampling Distribution Quiz

In conclusion, sampling distributions are vital tools in statistics. Sampling Distributions help us to understand the variability of statistics calculated from samples and make informed inferences about the population from which the samples were drawn.

Best Design of Experiments MCQS with Answers 5

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Online Quiz about Design of Experiments MCQs with Answers. There are 20 MCQs in this test. Let us start with “Design of Experiments MCQs with Answer”.

Please go to Best Design of Experiments MCQS with Answers 5 to view the test

Design of Experiments MCQs with Answers

Design of Experiments MCQs with Answers

  • Laboratory experiments are usually performed under:
  • Common applications of DOE in physical sciences include.
  • When do experimental factors include the proportions of ingredients we use?
  • Physical science is the systematic study of the inorganic world, consisting of astronomy, physics, chemistry, and:
  • Common applications of DOE in management sciences include.
  • An important application of DOE in management sciences is to?
  • DOE can be used in management sciences to organize:
  • What is the most common one-factor-at-a-time design in social sciences?
  • An important application of DOE in social sciences is to:
  • Changes in mean scores over three or more time points are compared under the:
  • Initial applications of DOE are in?
  • With the passage of time, Statisticians moved from?
  • Taguchi designs were presented ———- Plackett-Burman designs.
  • Which term is estimated through replication?
  • A single performance of an experiment is called?
  • The different states of a factor are called.
  • A phenomenon whose effect on the experimental unit is observed is called.
  • The process of choosing experimental units randomly is called
  • Accidental bias (where chance imbalances happen) is minimized through
  • Selection bias (where some groups are underrepresented) is eliminated

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One Way Analysis of Variance: Made Easy

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The article is about one way Analysis of Variance. In the analysis of variance, the total variation in the data of the sample is split up into meaningful components that measure different sources of variation. Each component yields an estimate of the population variance, and these estimates are tested for homogeneity by using the F-distribution.

One Way Classification (Single Factor Experiments)

The classification of observations based on a single criterion or factor is called a one-way classification.

In single factor experiments, independent samples are selected from $k$ populations, each with $n$ observations. For samples, the word treatment is used and each treatment has $n$ repetitions or replications. By treatment, we mean the fertilizers applied to the fields, the varieties of a crop sown, or the temperature and humidity to which an item is subjected in a production process. The collected data consisting of $kn$ observations ($k$ samples of $n$ observations each) can be presented as.

One way analysis of variance

where

$X_{ij}$ is the $i$th observation receiving the $j$th treatment

$X_{\cdot j}=\sum\limits_{i=1}^n X_{ij}$ is the total observations receiving the $j$th treatment

$\overline{X}_{\cdot j}=\frac{X_{\cdot j}}{n}$ is the mean of the observations receiving the $j$th treatment

$X_{\cdot \cdot}=\sum\limits_{i=j}^n X_{\cdot j} = \sum\limits_{j=1}^k \sum\limits_{i=1}^n X_{ij}$ is the total of all observations

$\overline{\overline{X}} = \frac{X_{\cdot \cdot}}{kn}$ is the mean of all observations.

The $k$ treatments are assumed to be homogeneous, and the random samples taken from the same parent population are approximately normal with mean $\mu$ and variance $\sigma^2$.

Design of Experiments

One Way Analysis of Variance Model

The linear model on which the one way analysis of variance is based is

$$X_{ij} = \mu + \alpha_j + e_{ij}, \quad\quad i=1,2,\cdots, n; \quad j=1,2,\cdots, k$$

Where $X_{ij}$ is the $i$th observation in the $j$th treatment, $\mu$ is the overall mean for all treatments, $\alpha_j$ is the effect of the $j$th treatment, and $e_{ij}$ is the random error associated with the $i$th observation in the $j$th treatment.

The One Way Analysis of Variance model is based on the following assumptions:

  • The model assumes that each observation $X_{ij}$ is the sum of three linear components
    • The true mean effect $\mu$
    • The true effect of the $j$th treatment $\alpha_j$
    • The random error associated with the $j$th observation $e_{ij}$
  • The observations to which the $k$ treatments are applied are homogeneous.
  • Each of the $k$ samples is selected randomly and independently from a normal population with mean $\mu$ and variance $\sigma^2_e$.
  • The random error $e_{ij}$ is a normally distributed random variable with $E(e_{ij})=0$ and $Var(e_{ij})=\sigma^2_{ij}$.
  • The sum of all $k$ treatments effects must be zero $(\sum\limits_{j=1}^k \alpha_j =0)$.

Suppose you are comparing crop yields that were fertilized with different mixtures. The yield (numerical) is the dependent variable, and fertilizer type (categorical with 3 levels) is the independent variable. ANOVA helps you determine if the fertilizer mixtures have a statistically significant effect on the average yield.

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