QUESTION IMAGE
Question
find the mean \\(\bar{x}\\), median \\(\tilde{x}\\), and mode \\(\hat{x}\\).
- number of students in six classes
\\34 \quad 35 \quad 34 \quad 35 \quad 36 \quad 36\\
- costs (\\(\mathbb{p}\\)) of the same bottle of fresh milk from different stores
\\185.00 \quad 180.00 \quad 195.50 \quad 198.70 \quad 196.25\\
- costs (\\(\mathbb{p}\\)) of lunch of george for five school days
\\95.00 \quad 120.00 \quad 99.00 \quad 135.00 \quad 100.00\\
- number of students in each class in a small school
\\20 \quad 15 \quad 20 \quad 22 \quad 18 \quad 17 \quad 19 \quad 19 \quad 20 \quad 21 \quad 20 \quad 20\\
- age in years of players in a kiddie basketball league
\\9 \quad 10 \quad 10 \quad 12 \quad 9 \quad 10 \quad 12 \quad 11 \quad 10 \quad 12\\
🆕 New Concept Discovered: Measures of Central Tendency
Finding the middle, average, or most common value in a dataset.
---
Step 1: Solve Problem 1
Dataset: \(34, 35, 34, 35, 36, 36\)
- Mean (\(\bar{x}\)): Add all values together and divide by the total number of values (\(n = 6\)).
\[
\bar{x} = \frac{34 + 35 + 34 + 35 + 36 + 36}{6} = \frac{210}{6} = 35
\]
- Median (\(\tilde{x}\)): Arrange the data in ascending order: \(34, 34, 35, 35, 36, 36\). Since there is an even number of values, find the average of the two middle values (3rd and 4th values):
\[
\tilde{x} = \frac{35 + 35}{2} = 35
\]
- Mode (\(\hat{x}\)): The value(s) that appear most frequently. Here, \(34\), \(35\), and \(36\) each appear exactly twice. This dataset is trimodal:
\[
\hat{x} = 34, 35, \text{ and } 36
\]
---
Step 2: Solve Problem 2
Dataset: \(185.00, 180.00, 195.50, 198.70, 196.25\) (\(n = 5\))
- Mean (\(\bar{x}\)):
\[
\bar{x} = \frac{185.00 + 180.00 + 195.50 + 198.70 + 196.25}{5} = \frac{955.45}{5} = 191.09
\]
- Median (\(\tilde{x}\)): Arrange in ascending order: \(180.00, 185.00, 195.50, 196.25, 198.70\). The middle (3rd) value is:
\[
\tilde{x} = 195.50
\]
- Mode (\(\hat{x}\)): No value is repeated:
\[
\hat{x} = \text{No mode}
\]
---
Step 3: Solve Problem 3
Dataset: \(95.00, 120.00, 99.00, 135.00, 100.00\) (\(n = 5\))
- Mean (\(\bar{x}\)):
\[
\bar{x} = \frac{95.00 + 120.00 + 99.00 + 135.00 + 100.00}{5} = \frac{549.00}{5} = 109.80
\]
- Median (\(\tilde{x}\)): Arrange in ascending order: \(95.00, 99.00, 100.00, 120.00, 135.00\). The middle (3rd) value is:
\[
\tilde{x} = 100.00
\]
- Mode (\(\hat{x}\)): No value is repeated:
\[
\hat{x} = \text{No mode}
\]
---
Step 4: Solve Problem 4
Dataset: \(20, 15, 20, 22, 18, 17, 19, 19, 20, 21, 20, 20\) (\(n = 12\))
- Mean (\(\bar{x}\)):
\[
\bar{x} = \frac{20 + 15 + 20 + 22 + 18 + 17 + 19 + 19 + 20 + 21 + 20 + 20}{12} = \frac{231}{12} = 19.25
\]
- Median (\(\tilde{x}\)): Arrange in ascending order: \(15, 17, 18, 19, 19, 20, 20, 20, 20, 20, 21, 22\). The two middle values (6th and 7th) are both \(20\):
\[
\tilde{x} = \frac{20 + 20}{2} = 20
\]
- Mode (\(\hat{x}\)): The value \(20\) appears most frequently (5 times):
\[
\hat{x} = 20
\]
---
Step 5: Solve Problem 5
Dataset: \(9, 10, 10, 12, 9, 10, 12, 11, 10, 12\) (\(n = 10\))
- Mean (\(\bar{x}\)):
\[
\bar{x} = \frac{9 + 10 + 10 + 12 + 9 + 10 + 12 + 11 + 10 + 12}{10} = \frac{105}{10} = 10.5
\]
- Median (\(\tilde{x}\)): Arrange in ascending order: \(9, 9, 10, 10, 10, 10, 11, 12, 12, 12\). The two middle values (5th and 6th) are both \(10\):
\[
\tilde{x} = \frac{10 + 10}{2} = 10
\]
- Mode (\(\hat{x}\)): The value \(10\) appears most frequently (4 times):
\[
\hat{x} = 10
\]
---
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- Mean (\(\bar{x}\)): \(35\), Median (\(\tilde{x}\)): \(35\), Mode (\(\hat{x}\mathbb{}\)): \(34, 35, 36\)
- Mean (\(\bar{x}\)): \(191.09\), Median (\(\tilde{x}\)): \(195.50\), Mode (\(\hat{x}\)): No mode
- Mean (\(\bar{x}\)): \(109.80\), Median (\(\tilde{x}\)): \(100.00\), Mode (\(\hat{x}\)): No mode
- Mean (\(\bar{x}\)): \(19.25\), Median (\(\tilde{x}\)): \(20\), Mode (\(\hat{x}\)): \(20\)
- Mean (\(\bar{x}\)): \(10.5\), Median (\(\tilde{x}\)): \(10\), Mode (\(\hat{x}\)): \(10\)