Mean, Median, and Mode
Selected Reading
- Choosing the Best Measure to Describe Data
- Finding Outliers in a Data Set
- How Changing a Value Affects the Mean and Median
- Mean and Median of a Data Set
- Finding the Value for a New Score that will yield a Given Mean
- Computations Involving the Mean, Sample Size, and Sum of a Data Set
- Finding the Mean of a Symmetric Distribution
- Understanding the Mean Graphically: Four or more bars
- Understanding the Mean Graphically: Two bars
- Mean of a Data Set
- Finding the Mode and Range from a Line Plot
- Finding the Mode and Range of a Data Set
- Mode of a Data Set
- Home
Selected Reading
- Who is Who
- Computer Glossary
- HR Interview Questions
- Effective Resume Writing
- Questions and Answers
- UPSC IAS Exams Notes
Finding the Value for a New Score that will yield a Given Mean
Finding the Value for a New Score that will yield a Given Mean
In this lesson, we are given a data set. We are given a new mean of the data set and are required find a new data member which when added will yield the new mean of the changed data set.
Rules to find new score that will yield a new given mean
We start by taking the new score as x.
We add x to the sum of data to find the new sum of data.
If the number of data were ‘n’, now we have ‘n+1’ as the new number of data.
Equating new sum of data spanided by ‘n+1’ to the new mean and solving we find the value of new score x.
Find the value for a new score that will yield a given mean.
8, 12, 8, 10, 18, 12, 4; New mean = 11
Solution
Step 1:
Let the new score to be added = x
Step 2:
New mean = $frac{(8 + 12 + 8 + 10 + 18 + 12 + 4 + x )}{8}$ = 11
= 72 + x = 88; x = 88 – 72 = 16
Step 3:
Required new score = 16.
Find the value for a new score that will yield a given mean.
25, 18, 18, 13, 4, 17, 18, 19, 3; New mean = 17
Solution
Step 1:
Let the new score to be added = x
Step 2:
New mean = $frac{(25 + 18 + 18 + 13 + 4 + 17 + 18 + 19 + 3 + x )}{10}$ = 17
= 135 + x = 170; x = 170 – 135 = 35
Step 3:
Required new score = 35